Ultrasonic method of microvibration detection: part II - additional processing method and applications

Costa, José Francisco Silva; Machado, João Carlos

doi:10.1590/2446-4740.01617

Abstract

Introduction

In the last 28 years, the scientific community has been using elastography to evaluate the mechanical properties of biological tissue. The aim of this work was the optimization of the UDmV method, presented in Part I of the series, by means of modifying the technique employed to generate the reference sine and cosine functions, used for phase-quadrature demodulation, and determining how this modification improved the performance of the method. Additionally, the UDmV was employed to characterize the acoustic and mechanical properties of a 7% gelatin phantom.

Methods

A focused transducer, $T_{F}$ , with a nominal frequency of 2.25 MHz, was used to induce the shear waves, with frequency of 97.644 Hz. Then, the modified UDmV method was used to extract the phase and quadrature components from ultrasonic RF echo-signals collected from four positions along the propagation path of the shear wave, which allowed the investigation of the medium vibration caused by wave propagation. The phase velocity, $c_{s}$ , and attenuation, $α_{s}$ , of the phantom were measured and employed in the calculation of shear modulus, μ, and viscosity, η.

Results

The computational simulation demonstrated that the modification in UDmV method resulted in more accurate and precise estimates of the initial phases of the reference sinusoidal functions used for phase-quadrature demodulation. The values for $c_{s}$ and μ of 1.31 ± 0.01 m·s^-1 and 1.66 ± 0.01 kPa, respectively, are very close to the values found in the literature (1.32 m·s^-1 and 1.61 kPa) for the same material.

Conclusion

The UDmV method allowed estimating of the acoustic and viscoelastic parameters of phantom.

Keywords
Ultrasound; Shear wave; Shear modulus; Viscosity; UDmV; Kalman Filter

Introduction

Elastographic methods based on shear wave propagation and described in details by Dewall (2013)Dewall RJ. Ultrasound elastography: principles, techniques, and clinical applications. Critical Reviews in Biomedical Engineering. 2013; 41(1):1-19. PMid:23510006. http://dx.doi.org/10.1615/CritRevBiomedEng.2013006991.
http://dx.doi.org/10.1615/CritRevBiomedE... and Urban et al. (2012)Urban MW, Chen S, Fatemi M. A review of Shearwave Dispersion Ultrasound Vibrometry (SDUV) and its applications. Current Medical Imaging Reviews. 2012; 8(1):27-36. PMid:22866026. http://dx.doi.org/10.2174/157340512799220625.
http://dx.doi.org/10.2174/15734051279922... have been applied, in the last two decades, to investigate the mechanical properties of biological tissues, such as liver (Chen et al., 2013Chen X, Shen YY, Zheng Y, Lin HM, Guo YR, Zhu Y, Zhang X, Wang T, Chen S. Quantification of liver viscoelasticity with acoustic radiation force: A study of hepatic fibrosis in a rat model. Ultrasound in Medicine & Biology. 2013; 39(11):2091-102. PMid:23993170. http://dx.doi.org/10.1016/j.ultrasmedbio.2013.05.020.
http://dx.doi.org/10.1016/j.ultrasmedbio... ; Zhang et al., 2008aZhang M, Castaneda B, Christensen J, Saad WE, Bylund K, Hoyt K, Strang JG, Rubens DJ, Parker KJ. Real-time sonoelastography of hepatic thermal lesions in a swine model. Medical Physics. 2008a; 35(9):4132-41. http://dx.doi.org/10.1118/1.2968939.
http://dx.doi.org/10.1118/1.2968939... ; Zhu et al., 2014Zhu Y, Zhang XY, Zheng Y, Chen X, Shen YY, Lin HM, Guo Y, Wang T, Chen S. Quantitative analysis of liver fibrosis in rats with shearvvave dispersion ultrasound vibrometry: Comparison with dynamic mechanical analysis. Medical Engineering & Physics. 2014; 36(11):1401-7. PMid:24835187. http://dx.doi.org/10.1016/j.medengphy.2014.04.002.
http://dx.doi.org/10.1016/j.medengphy.20... ), whole blood and/or blood clot (Gennisson et al., 2006Gennisson JL, Lerouge S, Cloutier G. Assessment by transient elastography of the viscoelastic properties of blood during clotting. Ultrasound in Medicine & Biology. 2006; 32(10):1529-37. PMid:17045874. http://dx.doi.org/10.1016/j.ultrasmedbio.2006.06.008.
http://dx.doi.org/10.1016/j.ultrasmedbio... ; Huang et al., 2013Huang CC, Chen PY, Shih CC. Estimating the viscoelastic modulus of a thrombus using an ultrasonic shear-wave approach. Medical Physics. 2013; 40(4):042901-7. PMid:23556923. http://dx.doi.org/10.1118/1.4794493.
http://dx.doi.org/10.1118/1.4794493... ), breast (Garra et al., 1997Garra BS, Cespedes EI, Ophir J, Spratt SR, Zuurbier RA, Magnant CM, Pennanen MF. Elastography of breast lesions: initial clinical results. Radiology. 1997; 202(1):79-86. PMid:8988195. http://dx.doi.org/10.1148/radiology.202.1.8988195.
http://dx.doi.org/10.1148/radiology.202.... ; Meng et al., 2011Meng W, Zhang G, Wu C, Wu G, Song Y, Lu Z. Preliminary results of acoustic radiation force impulse (ARFI) ultrasound imaging of breast lesions. Ultrasound in Medicine & Biology. 2011; 37(9):1436-43. PMid:21767903. http://dx.doi.org/10.1016/j.ultrasmedbio.2011.05.022.
http://dx.doi.org/10.1016/j.ultrasmedbio... ) and prostate (Sumura et al., 2007Sumura M, Shigeno K, Hyuga T, Yoneda T, Shiina H, Igawa M. Initial evaluation of prostate cancer with real-time elastography based on step-section pathologic analysis after radical prostatectomy: a preliminary study. International Journal of Urology. 2007; 14(9):811-6. PMid:17760747. http://dx.doi.org/10.1111/j.1442-2042.2007.01829.x.
http://dx.doi.org/10.1111/j.1442-2042.20... ; Zhang et al., 2008bZhang M, Nigwekar P, Castaneda B, Hoyt K, Joseph JV, Sant’Agnese A, Messing EM, Strang JG, Rubens DJ, Parker KJ. Quantitative characterization of viscoelastic properties of human prostate correlated with histology. Ultrasound in Medicine & Biology. 2008b; 34(7):1033-42. PMid:18258350. http://dx.doi.org/10.1016/j.ultrasmedbio.2007.11.024.
http://dx.doi.org/10.1016/j.ultrasmedbio... ). Some of these investigations were designed to determine the correspondence between the mechanical properties of normal and diseased organs and consequently to establish elastographic methods as a potential diagnostic tool.

The propagation of the shear wave produces microvibrations in the medium and the vibration waveform can be determined employing a probing ultrasonic pulse-echo system and processing a sequence of radiofrequency (RF) echo signals (Catheline et al., 2003Catheline S, Gennisson JL, Fink M. Measurement of elastic nonlinearity of soft solid with transient elastography. The Journal of the Acoustical Society of America. 2003; 114(6 Pt1):3087-91. PMid:14714790. http://dx.doi.org/10.1121/1.1610457.
http://dx.doi.org/10.1121/1.1610457... ; Chen et al., 2013Chen X, Shen YY, Zheng Y, Lin HM, Guo YR, Zhu Y, Zhang X, Wang T, Chen S. Quantification of liver viscoelasticity with acoustic radiation force: A study of hepatic fibrosis in a rat model. Ultrasound in Medicine & Biology. 2013; 39(11):2091-102. PMid:23993170. http://dx.doi.org/10.1016/j.ultrasmedbio.2013.05.020.
http://dx.doi.org/10.1016/j.ultrasmedbio... ; Mitri et al., 2011Mitri FG, Urban MW, Fatemi M, Greenleaf JF. Shear wave dispersion ultrasonic vibrometry for measuring prostate shear stiffness and viscosity: an in vitro pilot study. IEEE Transactions on Biomedical Engineering. 2011; 58(2):235-42. PMid:20595086. http://dx.doi.org/10.1109/TBME.2010.2053928.
http://dx.doi.org/10.1109/TBME.2010.2053... ; Urban et al., 2009Urban MW, Chen S, Greenleaf JF. Error in estimates of tissue material properties from shear wave dispersion ultrasound vibrometry. IEEE Transactions on Ultrasonics, Ferroelectrics, and Frequency Control. 2009; 56(4):748-58. PMid:19406703. http://dx.doi.org/10.1109/TUFFC.2009.1097.
http://dx.doi.org/10.1109/TUFFC.2009.109... ; Zheng et al., 2007Zheng Y, Chen S, Tan W, Kinnick R, Greenleaf JF. Detection of tissue harmonic motion induced by ultrasonic radiation force using pulse-echo ultrasound and Kalman filter. IEEE Transactions on Ultrasonics, Ferroelectrics, and Frequency Control. 2007; 54(2):290-300. PMid:17328326. http://dx.doi.org/10.1109/TUFFC.2007.243.
http://dx.doi.org/10.1109/TUFFC.2007.243... ). In this context, the processing techniques commonly used with the sequence of RF echo signals are: cross-spectral analysis (Hasegawa and Kanai, 2006Hasegawa H, Kanai H. Improving accuracy in estimation of artery-wall displacement by referring to center frequency of RF echo. IEEE Transactions on Ultrasonics, Ferroelectrics, and Frequency Control. 2006; 53(1):52-63. PMid:16471432. http://dx.doi.org/10.1109/TUFFC.2006.1588391.
http://dx.doi.org/10.1109/TUFFC.2006.158... ), cross-correlation (Céspedes et al., 1995Céspedes I, Huang Y, Ophir J, Spratt S. Methods for estimation of subsample time delays of digitized echo signals. Ultrasonic Imaging. 1995; 17(2):142-71. PMid:7571208. http://dx.doi.org/10.1177/016173469501700204.
http://dx.doi.org/10.1177/01617346950170... ; Ophir et al., 1991Ophir J, Cespedes I, Ponnekanti H, Yazdi Y, Li X. Elastography: a quantitative method for imaging the elasticity of biological tissues. Ultrasonic Imaging. 1991; 13(2):111-34. PMid:1858217. http://dx.doi.org/10.1177/016173469101300201.
http://dx.doi.org/10.1177/01617346910130... ) and quadrature demodulation (Zheng and Greenleaf, 1999Zheng Y, Greenleaf JF. Stable and unbiased flow turbulence estimation from pulse echo ultrasound. IEEE Transactions on Ultrasonics, Ferroelectrics, and Frequency Control. 1999; 46(5):1074-87. PMid:18244301. http://dx.doi.org/10.1109/58.796113.
http://dx.doi.org/10.1109/58.796113... ). Once the vibration waveform is detected, then the shear wave properties such as phase velocity and attenuation coefficient can be measured and used in calculating the medium viscoelastic parameters such as shear modulus and viscosity.

A previous study by Costa-Júnior and Machado (2011)Costa-Júnior JFS, Machado JC. Ultrasonic method of microvibration detection: development of the method. Revista Brasileira de Engenharia Biomédica. 2011; 27(1):46-56. http://dx.doi.org/10.4322/rbeb.2011.005.
http://dx.doi.org/10.4322/rbeb.2011.005... presented the development of an ultrasonic method, named UDmV, to detect microvibrations of a medium and the current investigation applies the UDmV method in determining the vibrations caused by a shear wave propagating in a 7% gelatin tissue mimicking phantom. A method proposed by Zheng and Greenleaf (1999)Zheng Y, Greenleaf JF. Stable and unbiased flow turbulence estimation from pulse echo ultrasound. IEEE Transactions on Ultrasonics, Ferroelectrics, and Frequency Control. 1999; 46(5):1074-87. PMid:18244301. http://dx.doi.org/10.1109/58.796113.
http://dx.doi.org/10.1109/58.796113... was used to process the in-phase and quadrature components of a sequence of RF echo signals from the phantom and to yield the vibration waveform due to the propagation of a shear wave induced in the phantom. The values for the shear phase velocity and attenuation coefficient, obtained from the detected vibration waveform, were used following a procedure similar to the transient elastography (TE) technique (Catheline et al., 2004Catheline S, Gennisson JL, Delon G, Fink M, Sinkus R, Abouelkaram S, Culioli J. Measuring of viscoelastic properties of homogeneous soft solid using transient elastography: an inverse problem approach. The Journal of the Acoustical Society of America. 2004; 116(6):3734-41. PMid:15658723. http://dx.doi.org/10.1121/1.1815075.
http://dx.doi.org/10.1121/1.1815075... ), in order to estimate the phantom shear modulus and viscosity, at 24.4 ± 0.2 °C and considering the propagation of shear waves with different amplitudes. Furthermore, the current work added another two processing techniques to determine the initial phase of the reference sine and cosine signals used for phase-quadrature demodulation and compared their results with those obtained by the previous technique described previously in Costa-Júnior and Machado (2011)Costa-Júnior JFS, Machado JC. Ultrasonic method of microvibration detection: development of the method. Revista Brasileira de Engenharia Biomédica. 2011; 27(1):46-56. http://dx.doi.org/10.4322/rbeb.2011.005.
http://dx.doi.org/10.4322/rbeb.2011.005... .

Theoretical foundations

Considering a continuous shear wave propagating in a homogeneous, isotropic and viscoelastic medium represented by the Voigt model, then the shear wave phase velocity, $c_{s}$ , and the attenuation coefficient, $α_{s}$ , are given by (Yamakoshi et al., 1990Yamakoshi Y, Sato J, Sato T. Ultrasonic imaging of internal vibration of soft tissue under forced vibration. IEEE Transactions on Ultrasonics, Ferroelectrics, and Frequency Control. 1990; 37(2):45-53. PMid:18285015. http://dx.doi.org/10.1109/58.46969.
http://dx.doi.org/10.1109/58.46969... ):

c_{s} = \sqrt{\frac{2 (μ^{2} + ω_{S}^{2} η^{2})}{ρ (μ + \sqrt{μ^{2} + ω_{S}^{2} η^{2}})}}

(1)

α_{s} = \sqrt{\frac{ρ ω_{S}^{2} (\sqrt{μ^{2} + ω_{S}^{2} η^{2}} - μ)}{2 (μ^{2} + ω_{S}^{2} η^{2})}}

,(2)

where $μ$ , $η$ and $ρ$ correspond to the medium shear modulus, shear viscosity and density, respectively, and $ω_{S}$ represents the shear wave angular frequency, with $ω_{S} = 2 π f_{S}$ for $f_{S}$ as the shear wave frequency.

Solving (1) and (2) for $μ$ and $η$ comes:

μ = \frac{ω_{S}^{2} ρ c_{S}^{2} (ω_{S}^{2} - α_{S}^{2} c_{S}^{2})}{{(ω_{S}^{2} + α_{S}^{2} c_{S}^{2})}^{2}}

(3)

η = \frac{2 ω_{S}^{2} ρ c_{S}^{3} α_{S}}{{(ω_{S}^{2} + α_{S}^{2} c_{S}^{2})}^{2}}

(4)

Therefore, according to (3) and (4) then the medium viscoelastic parameters $μ$ and $η$ can be determined once the shear wave velocity and attenuation coefficient are measured. One way to measure $c_{s}$ and $α_{s}$ consists in monitoring the changes in phase and amplitude of the shear wave, along the propagation path, by means of an ultrasonic probing system operating in pulse-echo mode (Chen et al., 2004Chen S, Fatemi M, Greenleaf JF. Quantifying elasticity and viscosity from measurement of shear wave speed dispersion. The Journal of the Acoustical Society of America. 2004; 115(6):2781-5. PMid:15237800. http://dx.doi.org/10.1121/1.1739480.
http://dx.doi.org/10.1121/1.1739480... ). In the method proposed by Chen et al. (2004)Chen S, Fatemi M, Greenleaf JF. Quantifying elasticity and viscosity from measurement of shear wave speed dispersion. The Journal of the Acoustical Society of America. 2004; 115(6):2781-5. PMid:15237800. http://dx.doi.org/10.1121/1.1739480.
http://dx.doi.org/10.1121/1.1739480... , the shear wave is induced by the action of an acoustic radiation force generated at the focal point of transducer $T_{F}$ and the wave phases ( $φ_{r_{0}}$ and $φ_{r_{0} + Δ r}$ ) and amplitudes ( $D_{r_{0}}$ and $D_{r_{0} + Δ r}$ ) corresponding to locations $r_{0}$ and $r_{0} + Δ r$ , respectively, along the propagating medium are determined after processing a sequence of RF echo signals returning from locations in the medium traversed by the shear wave and collected by the transducer $T_{P}$ of an ultrasonic probing pulse-echo system.

According to Chen et al. (2004)Chen S, Fatemi M, Greenleaf JF. Quantifying elasticity and viscosity from measurement of shear wave speed dispersion. The Journal of the Acoustical Society of America. 2004; 115(6):2781-5. PMid:15237800. http://dx.doi.org/10.1121/1.1739480.
http://dx.doi.org/10.1121/1.1739480... , the shear wave generated as described above has a cylindrical wave front and at large distances (over one-tenth of the shear wavelength) from the focus of $T_{F}$ the phase delay of cylindrical shear wave changes linearly with the propagated distance. Under such circumstances, the shear wave phase velocity, at a given angular frequency $ω_{S}$ , can be estimated by;

c_{S} = \frac{ω_{S} Δ r}{Δ φ_{S}} = ω_{S} {(\frac{d φ_{S}}{d r})}^{- 1}

,(5)

where $Δ r$ and $Δ φ_{S}$ represent the distance and shear wave phase increment between two locations along the propagation path of the shear wave, respectively.

Additionally, the attenuation coefficient of a cylindrical wave, $α_{s}$ , is estimated according to:

α_{s} = - \frac{1}{Δ r} \ln (\sqrt{\frac{r_{0} + Δ r}{r_{0}}} \cdot \frac{D_{r_{0} + Δ r}}{D_{r_{0}}})

,(6)

where $r_{0}$ is a position along the propagation path of the shear wave, $D_{r_{0}}$ and $D_{r_{0} + Δ r}$ are the shear wave amplitudes at locations $r_{0}$ and $r_{0} + Δ r$ , respectively.

The estimation of $c_{s}$ and $α_{s}$ based on the method proposed by Chen et al. (2004)Chen S, Fatemi M, Greenleaf JF. Quantifying elasticity and viscosity from measurement of shear wave speed dispersion. The Journal of the Acoustical Society of America. 2004; 115(6):2781-5. PMid:15237800. http://dx.doi.org/10.1121/1.1739480.
http://dx.doi.org/10.1121/1.1739480... requires determining the medium vibration waveform related to different locations along the propagation path of the shear wave. In this sense, then according to Zheng and Greenleaf (1999)Zheng Y, Greenleaf JF. Stable and unbiased flow turbulence estimation from pulse echo ultrasound. IEEE Transactions on Ultrasonics, Ferroelectrics, and Frequency Control. 1999; 46(5):1074-87. PMid:18244301. http://dx.doi.org/10.1109/58.796113.
http://dx.doi.org/10.1109/58.796113... , the medium vibration velocity waveform, $v$ , obtained at discrete times $m T$ separated by the pulse repetition period, $T$ , of the ultrasonic pulse-echo probing system is calculated as follows:

v (m) = \frac{c}{4 π T f_{i} (m)} \tan^{- 1} \frac{\sum_{k = m + 1}^{m + K - 1} \sum_{n = 1}^{N} {I (k + 1, n) Q (k, n) - I (k, n) Q (k + 1, n)}}{\sum_{k = m + 1}^{m + K - 1} \sum_{n = 1}^{N} {I (k, n) I (k + 1, n) + Q (k, n) Q (k + 1, n)}}

,(7)

where $c$ is the acoustic wave velocity of the longitudinal wave emitted by the transducer $T_{P}$ , $f_{0}$ is the center frequency of the pulse emitted by $T_{P}$ , $I (k, n)$ and $Q (k, n)$ are in phase and quadrature components of the complex envelope of RF echoes signals collected by $T_{P}$ . The sub-indexes $k = 1, 2, ..., K$ and $n = 1, 2, ..., N$ indicate the $k^{t h}$ received echo signal and the $n^{t h}$ sample of one received echo signal, respectively.

Additionally, $f_{i} (m)$ is the mean instantaneous frequency, which is determined by

f_{i} (m) = f_{0} + \frac{1}{2 π T} \tan^{- 1} \frac{\sum_{k = m + 1}^{m + K} \sum_{n = 1}^{N - 1} {I (k, n + 1) Q (k, n) - I (k, n) Q (k, n + 1)}}{\sum_{k = m + 1}^{m + K} \sum_{n = 1}^{N - 1} {I (k, n) I (k, n + 1) + Q (k, n) Q (k, n + 1)}}

,(8)

Equations 7 and 8 are valid for $m = 0, 1,..., M - K$ , with $M$ representing the total amount of received echoes.

As demonstrated by Costa-Júnior and Machado (2011)Costa-Júnior JFS, Machado JC. Ultrasonic method of microvibration detection: development of the method. Revista Brasileira de Engenharia Biomédica. 2011; 27(1):46-56. http://dx.doi.org/10.4322/rbeb.2011.005.
http://dx.doi.org/10.4322/rbeb.2011.005... , the UDmV method allows determining the in phase and quadrature components of the complex envelopes of RF echo signals. Furthermore, applying the Kalman filter to the velocity vibration waveform given in (7) enables to estimate the vibration phases, $φ_{r_{0}}$ and $φ_{r_{0} + Δ r}$ , and amplitudes, $D_{r_{0}}$ and $D_{r_{0} + Δ r}$ .

Methods

Modification in UDmV method

Costa-Júnior and Machado (2011)Costa-Júnior JFS, Machado JC. Ultrasonic method of microvibration detection: development of the method. Revista Brasileira de Engenharia Biomédica. 2011; 27(1):46-56. http://dx.doi.org/10.4322/rbeb.2011.005.
http://dx.doi.org/10.4322/rbeb.2011.005... estimated the frequency of a sinusoidal signal employing the Kalman filter repeatedly over the signal with the input frequency value of the filter spanning over a frequency bandwidth containing the frequency of the signal. In this case, for each input frequency value, the amplitude of the signal estimated by Kalman filter was stored and the frequency corresponding to the highest amplitude value of the estimated signal was considered to be the signal frequency. This approach was employed in the current study to estimate the frequency of the signal that excited the transducer, so two frequency spannings were implemented, the first over a bandwidth corresponding to ± 10% of the nominal frequency, with steps of 1 kHz, and the second over a bandwidth of ± 5% of the frequency estimated in the previous stage, but in steps of 1 Hz. Knowing the frequency of the signal used to excite the transducer, then its initial phase can become estimated using the Kalman filter again (Zheng et al., 2007Zheng Y, Chen S, Tan W, Kinnick R, Greenleaf JF. Detection of tissue harmonic motion induced by ultrasonic radiation force using pulse-echo ultrasound and Kalman filter. IEEE Transactions on Ultrasonics, Ferroelectrics, and Frequency Control. 2007; 54(2):290-300. PMid:17328326. http://dx.doi.org/10.1109/TUFFC.2007.243.
http://dx.doi.org/10.1109/TUFFC.2007.243... ). A flow chart, in Figure 1, summarizes the process, named here KF_AP, used to estimate the frequency and the initial phase of the transducer excitation signal based on the Kalman filtering.

Figure 1
Flow chart summarizing the KF_AP approach to estimate the frequency and the initial phase of the signal used to excite the transducer, based on the Kalman filtering.

Another technique proposed in this current investigation to estimate the frequency of the transducer excitation signal, and named KF_MS, was also implemented. It consists in performing the two spannings in frequency, as done with the KF_AP technique. However, the estimated frequency is the one that resulted in the minimum mean square error between the input signal and the sinusoidal signal estimated by the Kalman filter. Once that frequency of the excitation signal was determined, then the signal initial phase was estimated employing the Kalman filter again, as done for the KF_AP technique.

The approaches KF_AP and KF_MS implemented in current work and incorporated into the UDmV method, presented by Costa-Júnior and Machado (2011),Costa-Júnior JFS, Machado JC. Ultrasonic method of microvibration detection: development of the method. Revista Brasileira de Engenharia Biomédica. 2011; 27(1):46-56. http://dx.doi.org/10.4322/rbeb.2011.005.
http://dx.doi.org/10.4322/rbeb.2011.005... provided the modified versions of the UDmV method, named UDmV_AP and UDmV_MS, respectively. In order to determine the performances of KF_AP, KF_MS and the previous approach used UDmV in estimating the initial phase of the transducer excitation signal, two metrics commonly employed in the literature, namely the bias and the jitter (Urban et al., 2008Urban MW, Chen SG, Greenleaf JF. Harmonic motion detection in a vibrating scattering medium. IEEE Transactions on Ultrasonics, Ferroelectrics, and Frequency Control. 2008; 55(9):1956-74. PMid:18986892. http://dx.doi.org/10.1109/TUFFC.887.
http://dx.doi.org/10.1109/TUFFC.887... ; Urban and Greenleaf, 2008Urban MW, Greenleaf JF. Harmonic pulsed excitation and motion detection of a vibrating reflective target. The Journal of the Acoustical Society of America. 2008; 123(1):519-33. PMid:18177179. http://dx.doi.org/10.1121/1.2805666.
http://dx.doi.org/10.1121/1.2805666... ) were considered. The bias, $φ_{B}$ , is the estimated phase average error and the jitter, $φ_{J}$ , is the standard deviation of the error for the estimated phase. These parameters are calculated as follows:

φ_{B} = \frac{1}{N_{e p}} \sum_{l = 1}^{N_{e p}} φ_{e r r o r}^{l},

(9)

φ_{J} = \sqrt{\frac{1}{N_{e p}} \sum_{l = 1}^{N_{e p}} (φ_{e r r o r}^{l} - φ_{B})^{2}},

(10)

where $N_{e p}$ represents the number of estimated phases and $φ_{e r r o r}^{l} = φ_{l} - φ_{n o m}$ , with $φ_{n o m}$ a nominal phase and $φ_{l}$ one of the $N_{e p}$ estimated phases. The smaller $φ_{B}$ and $φ_{J}$ are, the more accurate and precise will be the value determined for the initial phase.

Computational simulations were accomplished using the software Matlab® (R2011a; Mathworks, Natick, MA) to compare the performances of the three approaches based on the estimated phase bias and jitter. Then, 200 sinusoidal signals were computer simulated with center frequency of 5 MHz, sampling frequency of 50 MHz and 1 µs duration, for different signal-to-noise ratio (SNR), keeping the initial phase of 120°, and for different initial phases (keeping an SNR of 30 dB). The initial phase for each configuration of the simulated signals was determined based on KF_AP, KF_MS and the previous approach used UDmV and then $φ_{B}$ and $φ_{J}$ were determined.

Experimental procedure

The experimental setup illustrated in Figure 2 was used to generate a shear wave in the phantom and also to detect the micro-vibrations caused in the phantom due to the propagation of the shear wave.

Figure 2
Experimental setup used to generate and detect shear wave propagation in 7% gelatin phantom, using an ultrasonic pulse-echo system operating at 4.89 MHz. The excitation signals of

T_{F}

and

T_{P}

are synchronized. The echo-signals from the particles, collected by

T_{P}

from four regions, consecutively separated by

Δ r

, are used to estimate the phase velocity and attenuation coefficient of the phantom.

The longitudinal wave emitted by $T_{F}$ (NDT-V395; Olympus Scientific Solutions Americas Inc., Waltham, MA) produced an acoustic radiation force at the transducer focal point, which induced a vibration of the plastic sphere, and, consequently, it generated the propagation of shear wave. The spherical focused transducer $T_{F}$ has 38 mm in diameter, focal distance of 6.71 cm and a center frequency of 2.104 MHz. The excitation signal of $T_{F}$ was generated by the AFG 3251 function generator (Tektronix, Beaverton, OR), which was, initially, configured to output a burst signal with central frequency of 2.104 MHz, pulse repetition frequency (PRF) of 97.644 Hz, amplitude of 920 mV_PP (peak-to-peak) and 10,000 cycles. This burst signal fed the power amplifier (325LA; E & I, Rochester, NY), with a gain of 50 dB, which output signal, with an amplitude of 170 V_pp (peak-to-peak), was used to excite $T_{F}$ . The ultrasonic detection system (UDS), described in Costa-Júnior et al. (2017)Costa-Júnior JFS, Elsztain MAD, Sá AMFLM, Machado JC. Characterization of viscoelasticity due to shear wave propagation: A comparison of existing methods based on computational simulation and experimental data. Experimental Mechanics. 2017; 57(4):615-35. http://dx.doi.org/10.1007/s11340-017-0254-6.
http://dx.doi.org/10.1007/s11340-017-025... was set to excite the transducer $T_{P}$ (NDT-V326; Olympus Scientific Solutions Americas Inc., Waltham, MA) with a burst signal having the frequency of 4.89 MHz, 5 cycles and PRF of 4.8807 kHz. The RF echo signals received by $T_{P}$ were displayed and collected by a digital oscilloscope (DPO3032; Tektronix, Beaverton, OR) operating with a sampling rate of 50 MHz and 5 Mbytes of memory. Data stored in oscilloscope memory were transferred via USB interface to a netbook (Intel® Atom^TM, CPU N270, 1,60 GHz, 1 GB de RAM, Microsoft Windows XP Home Edition), where they were stored, using a communications program developed in LabVIEW® (Versão 7.1; National Instruments, Austin, Texas). The temperature of the phantom was kept at 24.4 ± 0.2 °C using an ultra-thermostatic bath (524-2D; Nova Ética, São Paulo, SP). The sensor junction of a K-type thermocouple, connected to a digital thermometer (MTH-1362; Minipa, São Paulo, SP), was imbedded in the phantom for monitoring the temperature.

The phantom used in the experiment was made with pork skin gelatin (300 Sigma Bloom; Sigma-Aldrich, St. Louis, MO), in a concentration of 7% of the volume of deionized water, and plastic particles, to act as scatterers, with 1.2 mm in diameter and with a concentration of 5% of the volume. Additionally, another plastic sphere, with a diameter of 3.92 ± 0.07 mm and density of 2575.93 ± 32.23 kg∙m^-3, was embedded in the central region of the phantom, at a region free of particles (volumetric central portion of the phantom without the plastic particles with the diameter of 1.2 mm), to enable the focal alignment of $T_{F}$ and $T_{P}$ . A cylindrical container, with 12.82 cm in diameter and 4 cm high, was used to hold the phantom. The density value for 7% gelatin phantom was considered to be 1000 kg∙m^-3, in accordance to the typical density value for gelatin phantoms used in previous works (Catheline et al., 2003Catheline S, Gennisson JL, Fink M. Measurement of elastic nonlinearity of soft solid with transient elastography. The Journal of the Acoustical Society of America. 2003; 114(6 Pt1):3087-91. PMid:14714790. http://dx.doi.org/10.1121/1.1610457.
http://dx.doi.org/10.1121/1.1610457... ; Costa-Júnior et al. (2017)Costa-Júnior JFS, Elsztain MAD, Sá AMFLM, Machado JC. Characterization of viscoelasticity due to shear wave propagation: A comparison of existing methods based on computational simulation and experimental data. Experimental Mechanics. 2017; 57(4):615-35. http://dx.doi.org/10.1007/s11340-017-0254-6.
http://dx.doi.org/10.1007/s11340-017-025... ; Zhu et al., 2015Zhu Y, Dong C, Yin Y, Chen X, Guo Y, Zheng Y, Shen Y, Wang T, Zhang X, Chen S. The role of viscosity estimation for oil-in-gelatin phantom in shear wave based ultrasound elastography. Ultrasound in Medicine & Biology. 2015; 41(2):601-9. PMid:25542484. http://dx.doi.org/10.1016/j.ultrasmedbio.2014.09.028.
http://dx.doi.org/10.1016/j.ultrasmedbio... ).

After collecting the RF ultrasonic echo-signal with $T_{P}$ in $r_{0}$ = 14.5 mm from the focal point of $T_{F}$ then the transducer moved to $r_{i} = r_{0} + Δ r = r_{0} + 4 \cdot (i - 1)$ mm, and a new RF ultrasonic echo-signal was acquired with $T_{P}$ in $r_{i}$ , where i = 2, 3 and 4. Synchronization between the excitation signals of $T_{P}$ and $T_{F}$ was performed by the programmable frequency divider circuit (PFDC), and to this end, a synchronism signal coming from the command circuit of UDS system was used. In addition, the output signal of PFDC was also used to synchronize the acquisition in oscilloscope and to generate the excitation signal of $T_{F}$ . The PFDC is formed by two ICs CD4017BE (counter/decoder Johnson) and three CIs 74LS151 (3-bit multiplexer). The multiplexers can be set through electromechanical switches that connect the IC input to +5V or GND, resulting in divisions of the input signal by 4, 5, 10 and paired combinations of these values, i.e., by the product of two of the three mentioned values. This circuit input is fed with the synchronization signal of 4.8807 kHz generated by the command circuit.

Two positioning systems, each one consisting of three manual linear stages (M-443, Newport Corporation, Irvine, Ca) and an angle bracket (360-90, Newport Corporation, Irvine, Ca), were used to adjust the position of the transducers. $T_{F}$ was focused on the plastic sphere (3.92 mm diameter) and $T_{P}$ was initially focused on the particles (1.2 mm diameter) and 8.5 mm from the $T_{F}$ focus. In the first stage, with the system responsible for producing acoustic radiation force (called here ARFS) disabled, the first acquisition of RF ultrasonic signal was performed. Then phase-quadrature demodulation was applied and the detected in phase and quadrature components used in (7) to yield the system noise term, whose variance was used in the Kalman filter. In the next stage, the ARFS was enabled and seven acquisitions of a sequence of RF ultrasonic signals took effect for each one of the four positions of $T_{P}$ separated by 4 mm. Once completed the acquisitions corresponding to all four positions, the amplitude of the signal exciting $T_{F}$ was lowered to 140 V_pp and a new data collection was carried on. This process repeated once again for and excitation signal amplitude of 110 V_pp.

After acquiring all the RF echo-signals with a sampling frequency of 50 MHz, these signals were resampled at 500 MHz employing the ‘resample.m’ function of Matlab. Additionally, the RF ultrasonic signals were time-gated with a Hanning window having a full width half maximum duration of approximately 1 μs, which corresponds to a range gate of 0.75 mm. The low-pass filter cutoff frequency used in phase-quadrature demodulation was 1 MHz.

The acquired RF echo-signals were phase-quadrature demodulated, based on the the UDmV method as presented by Costa-Júnior and Machado (2011)Costa-Júnior JFS, Machado JC. Ultrasonic method of microvibration detection: development of the method. Revista Brasileira de Engenharia Biomédica. 2011; 27(1):46-56. http://dx.doi.org/10.4322/rbeb.2011.005.
http://dx.doi.org/10.4322/rbeb.2011.005... or modified versions UDmV_AP and UDmV_MS, and corresponding in phase and quadrature components applied in (7) to extract the motion waveform. Thereafter the Kalman filter was employed to calculate the phase and amplitude of all motion waveforms, which were used in (5) and (6) to estimate the shear wave phase velocity and the attenuation coefficient, respectively.

Measurements of phase and amplitude of the vibration waveform at the four positions along the propagation path of the shear wave were repeated seven times. For each experimental run, then a linear fit to the phase values as a function of distance was implemented and the angular coefficient of the straight line was used to calculate the phase velocity in accordance to Equation 5. Similarly, a linear fit to $g (Δ r) = - \ln {\sqrt{[(r_{0} + Δ r) / r_{0}]} \cdot (D_{r_{0} + Δ r} / D_{r_{0}})}$ as a function of distance was implemented and based on Equation 6 the angular coefficient of the straight line yielded the shear wave attenuation coefficient.

Statistical analysis

The statistical analyses were performed with SPSS software (version 20.0; SPSS Inc., Chicago, USA). The results for all statistical tests were considered significant for p-value <0.05. The purpose of the statistical study was to detect significant difference between the phase velocity attenuation, shear modulus or shear viscosity values obtained using UDmV_AP, UDmV_MS and UDmV techniques, for each EA of $T_{F}$ . In addition, the statistical analysis was performed in order to investigate the influence of the amplitude of the excitation signal of $T_{F}$ , which is related to the magnitude of acoustic radiation force, on the estimates of shear modulus and viscosity, for UDmV_MS method.

Shapiro-Wilk test was used to verify the normality of the distribution and the Levene's test was applied to assess the equality of variances for $c_{s}$ values obtained with the phases estimated by UDmV_AP, UDmV_MS and UDmV techniques in all excitation conditions.

When the distributions were normal and the groups presented equality of variances, one-way analysis of variance (ANOVA) was employed. Multiple comparisons (post hoc) tests were performed applying Tukey test when the ANOVA results were statistically significant. On the other hand, when one of these condition has been not satisfied, the nonparametric Kruskal-Wallis test followed by Dunn's multiple comparison test were utilized to determine which measurements are statistically different.

In addition, these statistical tests were also employed to assess the measured values of μ and η of the gelatin phantom, obtained based on the waveform vibration extracted applying the modified UDmV method to the RF ultrasonic echo-signals acquired under three different excitation conditions of the transducer $T_{F}$ .

Results

The phase bias and jitter obtained from the phase values estimated with UDmV (Costa and Machado, 2011), UDmV_AP and UDmV_MS approaches, as a function of SNR and the initial phase, are depicted in Figure 3a and 3b, respectively.

Figure 3
Phase bias and jitter of the simulated signal and obtained with the application of the UDmV, UDmV_MS and UDmV_AP methods, as a function of (a) SNR (initial phase of 120 °) and (b) initial phase (SNR of 30 dB).

Figure 4 presents the vibration velocity waveform signals of the medium and obtained based on the UDmV_MS method applied to the RF signals collected at four positions equally spaced, considering an amplitude of 170 V_pp (peak-to-peak) for the excitation of $T_{F}$ .

Figure 4
Signals representing the velocity vibration waveform of the medium due to the propagation of shear waves with a frequency of 97.644 Hz, considering the RF echo-signals collected by

T_{P}

at four different positions (14.5, 18.5, 22.5 and 26.5 mm) and amplitude of 170 V_PP for the excitation of

T_{F}

.

Figure 5a illustrates the mean and standard deviation of the shear wave phase increment obtained at four positions along the shear wave propagation path and 5b the function $g (r_{i}) = - \ln {\sqrt{(r_{i} / r_{0})} \cdot (D_{r_{i}} / D_{r_{0}})}$ , with $r_{i} = r_{0} + 4 \cdot (i - 1)$ mm and $i$ = 0, 1, 2 and 3. Transducer $T_{F}$ was excited by a signal with the frequency of 97.644 Hz and amplitudes of 170, 140 and 110 V_PP.

Figure 5
Mean and standard deviation: a) shear wave phase increment and b)

g (r_{i}) = - \ln {\sqrt{(r_{i} / r_{0})} \cdot (D_{r_{i}} / D_{r_{0}})}

, for

r_{0} = 14.5

mm,

r_{i} = 4 \cdot (i - 1)

mm, with i = 0, 1, 2 and 3, and

D_{r_{i}}

corresponding to shear wave amplitude at the i-th position along the shear wave propagation path inside the gelatin phantom. The data correspond to the

T_{F}

excited by a signal with the frequency of 97.644 Hz.

The shear wave phase velocity and attenuation coefficient values were obtained and substituted in (3) and (4) to estimate the gelatin phantom shear modulus and viscosity. Table 1 contains the average (std) values of the phase velocity, attenuation coefficient, shear modulus and viscosity obtained based on the propagation of the 97.644 Hz cylindrical shear wave on the phantom with transducer $T_{F}$ excited by a signal with amplitudes of 170, 140 and 110 V_PP.

Thumbnail

Table 1
Estimated phase velocity, attenuation coefficient, shear modulus and viscosity (mean ± 1 std) for the 7% gelatin phantom, with the

T_{F}

excited by a signal at a frequency of 97.644 Hz and with excitation conditions (EA) of 170, 140 and 110 V_PP.

The Shapiro-Wilk test indicated that phase velocity, attenuation, shear modulus and viscosity values presented normal distribution, regardless the excitation conditions of transducer $T_{F}$ . Except for the u1 values obtained with the DmUV technique as a function of EA1. Additionally, Levene's test showed that the variances of $c_{s}$ , $α$ and $η$ groups were not significantly different. The $μ$ groups obtained in function of EA2 and EA3 also did not present significant difference. So, ANOVA was used and it indicated that $c_{s}$ and $μ$ (EA2 and EA3) values obtained from phase estimates based on UDmV_AP, UDmV_MS and UDmV approaches presented significant difference. Therefore the multiple comparisons between means of $c_{s}$ or $μ$ were performed, applying Tukey’s HSD (honest significant difference) post hoc test. The ANOVA showed that $α$ and $η$ values were not significantly different, regardless of EA employed. On the other hand, Kruskal-Wallis test was used to compare the shear modulus values estimated in function of EA1 for $T_{F}$ , and indicated that there were significant differences between $μ$ values. Thus, the Dunn post hoc test was used to determine which pairwise measurements were statistically different. Table 2 presents the difference between the mean values of $c_{s}$ (m·s^-1) or $μ$ (kPa) for pair-combinations of the approaches used to estimate the phase of the shear wave and the p-value obtained with Tukey or Dunn (bold) multiple comparison test.

Thumbnail

Table 2
Difference between the mean values of

c_{s}

(m·s^-1) or

μ

(kPa) for pairs of compared techniques used to estimate the initial phase, of reference sinusoidal signals used for phase-quadrature demodulation, and the p-value of the multiple comparison test of Tukey and Dunn (bold).

Table 3 presents the difference between the average μ or $η$ values of the pair-combinations of EA for UDmV_MS method and the result of the post hoc multiple comparisons test, which is represented by the statistical test and p-value.

Thumbnail

Table 3
Difference between the mean values of

μ

or

η

for compared-pairs of the excitation amplitude of

T_{F}

for UDmV_MS method and the results of the multiple comparison test (p-value).

Discussion

The methods UDmV_AP, UDmV_MS and UDmV used to estimate the shear wave phase presented good accuracy (values below 1.03°) and precision (values below 2.23°) with SNR values above 30 dB. However, the method implemented in this investigation (UDmV_MS) to estimate the phase presented the lowest values of phase bias and jitter, regardless the SNR. In addition, the highest values of phase bias magnitude and jitter were 0.53 and 12.14°, respectively, with a SNR of 0 dB. On the other hand, the UDmV_AP and UDmV_MS techniques yielded similar precision when the SNR is above 10 dB, even though UDmV_AP technique presented a phase bias of approximately -2°, independent of SNR.

When the computational simulation was employed to evaluate the accuracy and precision of methods used to estimate the phase, corresponding to the nominal initial phase of the simulated signal, the UDmV_AP and UDmV_MS techniques presented phase jitter values less than 2.23°, with the largest value obtained for a nominal phase of 120°. However, disregarding this values then the phase jitter becomes lower than 0.6° for both techniques. The overall phase bias of UDmV_AP and UDmV_MS methods is less than 4.5°. Nevertheless, the highest value of phase bias estimated with UDmV_MS was 1.03°. Thus, the modification made to the UDmV method allowed the estimation of the initial phase of $T_{P}$ excitation signal with improved accuracy and precision.

As in the previous study by Costa-Júnior and Machado (2011)Costa-Júnior JFS, Machado JC. Ultrasonic method of microvibration detection: development of the method. Revista Brasileira de Engenharia Biomédica. 2011; 27(1):46-56. http://dx.doi.org/10.4322/rbeb.2011.005.
http://dx.doi.org/10.4322/rbeb.2011.005... , the UDmV method was employed to detect microvibrations, but this time the microvibrations corresponded to the propagation of the shear wave in a gelatin phantom. In the worst case, when the amplitude of the excitation signal of transducer $T_{F}$ was 170 V_PP the amplitude vibration (see Figure 4) was on the same order of magnitude of the values (< 10 µm) for the shear wave propagating in biological tissue and reported in literature (Amador et al., 2013Amador C, Urban M, Kinnick R, Chen S, Greenleaf JF. In vivo swine kidney viscoelasticity during acute gradual decrease in renal blood flow: pilot study. Revista de Ingenieria Biomedica. 2013; 7(13):68-78. PMid:24533039.; Bercoff et al., 2004Bercoff J, Tanter M, Fink M. Supersonic shear imaging: a new technique for soft tissue elasticity mapping. IEEE Transactions on Ultrasonics, Ferroelectrics, and Frequency Control. 2004; 51(4):396-409. PMid:15139541. http://dx.doi.org/10.1109/TUFFC.2004.1295425.
http://dx.doi.org/10.1109/TUFFC.2004.129... ; Huang et al., 2013Huang CC, Chen PY, Shih CC. Estimating the viscoelastic modulus of a thrombus using an ultrasonic shear-wave approach. Medical Physics. 2013; 40(4):042901-7. PMid:23556923. http://dx.doi.org/10.1118/1.4794493.
http://dx.doi.org/10.1118/1.4794493... ). The amplitude of the vibration waveform at position 14.5 mm ( $r_{0}$ ), with an EA of 170 V_PP for $T_{F}$ , was 6.99 ± 0.11 µm, obtained by $D = v e l o c i t y a m p l i t u d e / ω_{S}$ . Furthermore, it is possible to observe in Figure 4 a reduction in the amplitude of the vibration velocity, resulting in a decreased in signal to noise ratio, and changing of the initial phase of vibration as a function of the increasing distances between $T_{F}$ and $T_{P}$ .

Shear wave phase velocity, shear modulus and viscosity of pig skin gelatin phantom, at a concentration of 7%, measured based on shear wave propagation are 1.32 m·s^-1, 1.61 kPa and 0.85 Pa∙s (Amador et al., 2011Amador C, Urban MW, Chen S, Chen Q, An KN, Greenleaf JF. Shear elastic modulus estimation from indentation and SDUV on gelatin phantoms. IEEE Transactions on Biomedical Engineering. 2011; 58(6):1706-14. PMid:21317078. http://dx.doi.org/10.1109/TBME.2011.2111419.
http://dx.doi.org/10.1109/TBME.2011.2111... ), respectively, at a temperature undisclosed by the authors. Additionally, the viscoelasticity of the same material, at a temperature between 24.5 and 25.5 °C, estimated by Huang et al. (2013)Huang CC, Chen PY, Shih CC. Estimating the viscoelastic modulus of a thrombus using an ultrasonic shear-wave approach. Medical Physics. 2013; 40(4):042901-7. PMid:23556923. http://dx.doi.org/10.1118/1.4794493.
http://dx.doi.org/10.1118/1.4794493... comprehends shear modulus values of 1.59 ± 0.03 and 1.63 ± 0.07 kPa, and viscosity values of 0.86 ± 0.05 and 0.32 ± 0.02 Pa∙s, determined by means of shear-wave dispersion ultrasound vibrometry (SDUV) and embedded-sphere method (ESM), respectively. Furthermore, the shear wave velocity was about 1.29 m∙s^-1 for shear wave frequency of 100 Hz. The results obtained in the present research approach for phase velocity and shear modulus of a 7% gelatin phantom at 24.4 ± 0.2 °C, using the EA of 170 V_PP for $T_{F}$ , UDmV_MS method and 97.644 Hz shear wave frequency are approximately 1.31 ± 0.00 m∙s^-1 and 1.66 ± 0.01 kPa, which are very close to the values found in literature (the difference between the µ value obtained in the present work and the one reported by Huang et al. (2013)Huang CC, Chen PY, Shih CC. Estimating the viscoelastic modulus of a thrombus using an ultrasonic shear-wave approach. Medical Physics. 2013; 40(4):042901-7. PMid:23556923. http://dx.doi.org/10.1118/1.4794493.
http://dx.doi.org/10.1118/1.4794493... , using either SDUV or ESM methods, is less than 100 Pa). On the other hand, the viscosity estimated as 0.50 ± 0.02 Pa∙s differs in 41.86 and 56.25% from the values obtained by Huang et al. (2013)Huang CC, Chen PY, Shih CC. Estimating the viscoelastic modulus of a thrombus using an ultrasonic shear-wave approach. Medical Physics. 2013; 40(4):042901-7. PMid:23556923. http://dx.doi.org/10.1118/1.4794493.
http://dx.doi.org/10.1118/1.4794493... based on SDUV and ESM methods, respectively. Another interesting fact is that the viscosity of a 12% gelatin phantom was estimated as 0.32 Pa∙s by Chen et al. (2004)Chen S, Fatemi M, Greenleaf JF. Quantifying elasticity and viscosity from measurement of shear wave speed dispersion. The Journal of the Acoustical Society of America. 2004; 115(6):2781-5. PMid:15237800. http://dx.doi.org/10.1121/1.1739480.
http://dx.doi.org/10.1121/1.1739480... , using the SDUV method, which is lower than the viscosity value obtained with this present study. Despite of this, the report of Chen et al. (2004)Chen S, Fatemi M, Greenleaf JF. Quantifying elasticity and viscosity from measurement of shear wave speed dispersion. The Journal of the Acoustical Society of America. 2004; 115(6):2781-5. PMid:15237800. http://dx.doi.org/10.1121/1.1739480.
http://dx.doi.org/10.1121/1.1739480... did not mention the temperature of the phantom. Furthermore, in the study performed by Zhu et al., (2015)Zhu Y, Dong C, Yin Y, Chen X, Guo Y, Zheng Y, Shen Y, Wang T, Zhang X, Chen S. The role of viscosity estimation for oil-in-gelatin phantom in shear wave based ultrasound elastography. Ultrasound in Medicine & Biology. 2015; 41(2):601-9. PMid:25542484. http://dx.doi.org/10.1016/j.ultrasmedbio.2014.09.028.
http://dx.doi.org/10.1016/j.ultrasmedbio... , the viscosity value (4.90 ± 0.20 Pa∙s) obtained using dynamic mechanical analysis (DMA) method was 58.98% greater than that obtained by SDUV (2.89 ± 0.14 Pa∙s) and these researchers mentioned that this difference may be due to the frequency used in the DMA method. Our present investigation used shear wave at the frequency of 97.644 Hz and therefore, this may be the reason for the difference in viscosity value obtained in the present work when compared with the values published in the literature. Henceforth, further studies should investigate the shear viscosity measurements in ultrasound elastography.

The gelatin phantom employed in the present work was prepared with ultrasound scatterers having a diameter (1.2 mm) larger than those (approximately 50 μm) of the particles generally used for ultrasound tissue-mimicking phantoms. Consequently, the larger scatterers resulted in RF-echo signals with amplitudes larger than those that would exist if smaller scatterers were considered in the phantom preparation and this effect improved the SNR of the UDS echo signal. Although using larger scatterers could present a limitation to the experimental results of the present work, the results for the shear modulus and viscosity of the gelatin phantom are closely related to the results reported in the literature.

The theoretical foundations presented in this paper are based on the propagation of shear wave in an infinite medium, which would eliminate the existence of standing waves. On the other hand, the propagation medium (phantom) used is finite (diameter = 12.82 cm and height = 4 cm), with the plastic sphere positioned in the central region of the phantom. Considering the location distant $r_{0} + 12$ mm from the phantom center, where the vibration is detected with the lowest amplitude, than the round-trip distance between this location and the phantom wall is 7.52 cm. Therefore, in order to have the effects of standing wave at this location, the wave passing and propagating towards the phantom wall would have to interact with the wave reflected from the phantom wall, which will be approximately attenuated by 28 dB. If location $r_{0}$ is considered, then the wave reflected from the phantom wall will be approximately attenuated by 37 dB. With these attenuations, the interaction between the waves travelling in opposite directions would be minimum and therefore the assumption of standing waves can be neglected.

The results from the computational simulation indicated that the UDmV technique should present the worst results in estimating the shear wave velocity, when compared to UDmV_AP and UDmV_MS methods, once the UDmV technique had the larger values for phase bias and jitter. This fact was confirmed with multiple comparison of the Tukey test applied to the phase velocity values determined using the phase values estimated with the UDmV method for all EA conditions of transducer $T_{F}$ .

Kruskal-Wallis test results indicated that μ and η values presented significant difference when the excitation configuration of $T_{F}$ changed. On the other hand, the pairwise comparisons of the Dunn test showed significant statistical difference between corresponding μ or η values when the 170-110 V_PP pairs are compared, as detailed in Table 3. It is believed that these differences are due to the fact that when the EA of 110 V_PP for $T_{F}$ was used, there was a reduction in the intensity of the ultrasonic beam, which decreased the magnitude of the acoustic radiation force and consequently the amplitude vibration of the shear wave and resulting a decrease in SNR of the detected vibration waveform. Therefore, the results obtained with the EA of 110 V_PP became less accurate.

According to the data presented in Table 2 and considering the three techniques to estimate the initial phase of the reference sinusoidal signals used for phase-quadrature demodulation, there is a statistical difference between the means of $c_{s}$ and $μ$ obtained with two techniques implemented in the present work and with the technique previously employed. These results may be explained based on the plots in Figure 3, where the UDmV_MS and UDmV_AP methods estimate, more precisely, the initial phase of reference sinusoidal signals used for phase-quadrature demodulation. In addition, the results in Table 3 indicate a statistical difference between the means of $μ$ for compared-pairs (170-110V) of the excitation amplitude of $T_{F}$ for UDmV_MS method. For a robust experimental method, the results for $μ$ should be the same independently of the excitation amplitude of $T_{F}$ . However, as emphasized in the previous paragraph and from the plots in Figure 3, the measurements of $μ$ are more susceptible to errors as the SNR of the RF-echo signal decreases. Although statistical differences between the means of $c_{s}$ and $μ$ exist depending on the method employed to determine the initial phase of the reference sinusoidal signals used for phase-quadrature demodulation and also for different excitation signal amplitudes of transducer $T_{F}$ , it must be pointed out that statistical tests may indicate differences between the means of two populations although in practice those differences are irrelevant. This will occur whenever the standard deviations are very small and in fact, when the standard deviations tend to zero, then the statistical tests will point to different means, no matter what this difference is.

In view of the results obtained so far, there is a great motivation to carry out a new experiment, which could be performed to characterize the rheology of biological tissue in vitro. For this purpose, the experimental setup would be modified in order to generate the harmonic shear waves and viscoelastic coefficients would be assessed only through the dispersion of phase velocity as a function of the frequency of the shear wave.

The computational simulation demonstrated that the modification in UmVD method resulted in more accurate and precise estimates of the phase of the sinusoidal signal, which is used to generate the sine and cosine necessary to calculate the in phase and quadrature components of the RF echo-signals. The experimental results revealed that when the push and probing systems are synchronized, the UDmV method is able to estimate the in phase and quadrature components, which were employed to form the signal that represents the vibration waveform of the medium, due to the propagation of the shear wave. In addition, it was possible to use the method to estimate the phase velocity, the attenuation coefficient, shear modulus and viscosity of the 7% gelatin phantom, based on the propagation of shear waves in the phantom.

Acknowledgements

The authors are thankful to CAPES, CNPq and FAPERJ for the financial support.

How to cite this article: Costa-Júnior JFS, Machado JC. Ultrasonic method of microvibration detection: part II - additional processing method and applications. Res Biomed Eng. 2017; 33(3):. DOI: 10.1590/2446-4740.01617.

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Publication Dates

Publication in this collection
17 Aug 2017
Date of issue
Jul-Sep 2017

History

Received
14 Apr 2017
Accepted
22 July 2017

This is an Open Access article distributed under the terms of the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

[1] How to cite this article: Costa-Júnior JFS, Machado JC. Ultrasonic method of microvibration detection: part II - additional processing method and applications. Res Biomed Eng. 2017; 33(3):. DOI: 10.1590/2446-4740.01617.

Method	EA (VPP)	$c_{S}$ (m·s-1)	$α_{S}$ (Np·m-1)	$μ$ (kPa)	$η$ (Pa·s)
UDmV_MS	170	1.306 ± 0.003	43.026 ± 1.448	1.663 ± 0.008	0.501 ± 0.017
	140	1.290 ± 0.009	39.439 ± 2.582	1.630 ± 0.022	0.444 ± 0.029
	110	1.273 ± 0.014	34.809 ± 5.060	1.594 ± 0.034	0.377 ± 0.056
UDmV_AP	170	1.306 ± 0.003	43.089 ± 1.421	1.662 ± 0.007	0.501 ± 0.017
	140	1.290 ± 0.009	39.445 ± 2.581	1.630 ± 0.022	0.444 ± 0.029
	110	1.272 ± 0.014	34.801 ± 5.070	1.594 ± 0.034	0.377 ± 0.056
UDmV	170	1.316 ± 0.003	44.145 ± 2.189	1.685 ± 0.006	0.525 ± 0.027
	140	1.301 ± 0.007	38.904 ± 2.389	1.659 ± 0.018	0.449 ± 0.028
	110	1.294 ± 0.016	38.079 ± 4.049	1.642 ± 0.041	0.432 ± 0.043

	EA (VPP)	Compared pairs	Mean difference	p-value
$c_{s}$ (m·s^-1)	170	UDmV_AP-UDmV_MS	0.000	1.00
		UDmV_MS-UDmV	-0.010	p<0.05
		UDmV_AP-UDmV	-0.010	p<0.05
	140	UDmV_AP-UDmV_MS	0.000	1.00
		UDmV_MS-UDmV	-0.011	p<0.05
		UDmV_AP-UDmV	-0.011	p<0.05
	110	UDmV_AP-UDmV_MS	-0.001	1.00
		UDmV_MS-UDmV	-0.021	p<0.05
		UDmV_AP-UDmV	-0.022	p<0.05
$μ$ (kPa)	170	UDmV_AP-UDmV_MS	-0.001	1.00
		UDmV_MS-UDmV	-0.022	p<0.05
		UDmV_AP-UDmV	-0.023	p<0.05
	140	UDmV_AP-UDmV_MS	0.000	1.00
		UDmV_MS-UDmV	-0.029	p<0.05
		UDmV_AP-UDmV	-0.029	p<0.05
	110	UDmV_AP-UDmV_MS	0.000	1.00
		UDmV_MS-UDmV	-0.048	p<0.05
		UDmV_AP-UDmV	-0.048	p<0.05

	Compared pairs [EA (V_PP)]	Mean difference	p-value
$μ$ (Pa)	170-140	32.71	0.06
	170-110	68.80	p<0.05
	140-110	36.09	0.47
$η$ (Pa·s)	170-140	0.06	0.06
	170-110	0.12	p<0.05
	140-110	0.07	0.33