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Experimental investigation of mixed-mode-I/II fracture in polymer mortars using digital image correlation method

Abstract

The purpose of this work is to investigate experimentally the effects of mixed-mode I/II loading on the fracture behavior of polymer mortars. Three point bend beam specimens with offcenter notch were used in plane-strain fracture toughness tests. Two approaches have been simultaneously used to determine the crack opening displacements. The crack mouth opening displacement was measured by means of a clip gauge, while the crack tip opening displacement was estimated through the Digital Image Correlation method. Fracture parameters, such as critical values of crack opening displacement, energy release rate and mixed-mode stress intensity factor were estimated. In addition, the values of crack mouth opening displacement and crack tip opening displacement were used to evaluate the rotational factor. Finally, the effect of sliding mode-II in fracture was not easily observed using clip gage, however this effect was noticed employing Digital Image Correlation method.

mixed-mode I/II; fracture; polymer mortar; digital image correlation method


Experimental investigation of mixed-mode-I/II fracture in polymer mortars using digital image correlation method

L.C.S. Nunes; J.M.L. Reis* * Author email: jreis@mec.uff.br

Laboratory of Theoretical and Applied Mechanics, LMTA, Department of Mechanical Engineering, PGMEC, Universidade Federal Fluminense, UFF, Rua Passo da Patria 156, 24210-240 Niterói, RJ, Brazil. Tel.: +55 21 2629-5588, Fax: +55 21 2629-5585

ABSTRACT

The purpose of this work is to investigate experimentally the effects of mixed-mode I/II loading on the fracture behavior of polymer mortars. Three point bend beam specimens with offcenter notch were used in plane-strain fracture toughness tests. Two approaches have been simultaneously used to determine the crack opening displacements. The crack mouth opening displacement was measured by means of a clip gauge, while the crack tip opening displacement was estimated through the Digital Image Correlation method. Fracture parameters, such as critical values of crack opening displacement, energy release rate and mixed-mode stress intensity factor were estimated. In addition, the values of crack mouth opening displacement and crack tip opening displacement were used to evaluate the rotational factor. Finally, the effect of sliding mode-II in fracture was not easily observed using clip gage, however this effect was noticed employing Digital Image Correlation method.

Keywords: mixed-mode I/II; fracture; polymer mortar; digital image correlation method

1 INTRODUCTION

Polymer mortars are composite materials made with polymeric materials and inorganic aggregates, Czarnecki (2010) and Ribeiro et al. (2003). These types of materials have the advantage of providing lightweight, fast curing and durability. They are three to five times stronger than conventional concrete; moreover, do not display brittle characteristics that have limited its usefulness for load-bearing applications. Nowadays, polymer mortars have been used in precast components for bridge panels, buildings, machine bases, and transportation components. Previous studies have allowed an optimization of polymer mortar formulation, considering an extensive experimental program by Reis (2009) and Reis et al. (2011a, 2011b).

Many recent studies have focused on fracture behavior of polymer mortars. An alternative procedure to identify fracture properties, Young's modulus and Poisson's ratio, of polymer mortars was proposed by Nunes et al. (2011). In addition, an investigation of mode-I fracture behavior of chopped grass fiber reinforced polymer mortars evaluating the crack-tip opening displacement, the crack extension and critical stress intensity factor through digital image correlation method was developed by Nunes and Reis (2012).

Knowledge of mixed mode fracture has a great importance for different types of structures. Several experimental works based on mixed mode fracture of concrete and similar materials have been performed by Kazemi and Vossoughi Shahvaril (2004), Gálvez et al. (1998, 2002), Swartz et al. (1988) and Jenq and Shah (1988). Some of them were developed using different experimental methods for quantifying fracture phenomena, being based on optical methods such as moiré interferometry by He et al. (1997), electronic speckle pattern interferometry by Li et al. (2009) and Richter et al. (1988) and acoustic emission by Ohtsu et al. (1999).

The possibility of obtaining full-field displacements has generated wide interest in the Digital Image Correlation (DIC) method. The DIC is a powerful available optical-numerical method developed to estimate full-field displacement without contact. This method has been well documented in the literature, Sutton (2009), Dally and Riley (2005) and Shape (2008). Several investigators have recently turned to employ the DIC method in different types of mechanical problems, including fracture problems Ferreira et al. (2011), Shah and Chandra Kishen (2010), Nunes (2012) and Veerman and Muller (1972).

The main purpose of the present work is to investigate the effects of mixed mode I/II loading on the fracture behavior of polymer mortars. In order to do that, fracture toughness tests were performed using three point bend beam specimens with off-center notch at different locations along the span. Two approaches were simultaneously employed to measure the crack opening displacement. The crack mouth opening displacement (CMOD) was measured by means of a clip gauge, while the crack tip opening displacement (CTOD) was estimated through the digital image correlation method. The experimental data were used to estimate some important fracture parameters, such as energy release rate and approximated mixed-mode stress intensity factor. Moreover, the rotational factor Veerman and Muller (1972), Kolednik, (1989), Bhattacharya and Kumar (1995) and Kumar and Bhattacharya (1995), which is associated to rotation of specimen about a plastic hinge axis with notch opening, was also estimated.

2 MATERIALS AND METHODS

Polymer mortars were prepared by mixing fine aggregates and a polymeric binder, in this case an epoxy resin based on diglycidyl ether of bisphenol-A and aliphatic-amide hardener. This low viscosity (12000 mPas) system was processed with a maximum mix-to-hardener ratio of 4:1. Resin content was 12% by weight and no filler was added to the formulation. The aggregate was a siliceous sand with an average diameter of 245 µm. The sand specific gravity is 2.65 g/cm3 and fineness modulus of 2.5. The sand was previously dried before added to the polymeric resin in an automatic mixer. The Polymer mortar formulations were manufactured following the specifications of RILEM TC113/PC-2 (1985).

Polymer mortar specimens were compacted in a steel mold of dimensions of 30 x 60 x 250 mm3. The specimens were initially cured at room temperature and then post-cured for 3 hours at 80ºC. The samples were notched using a 2mm diamond saw to a 20 mm depth. The final geometry for a single-edge-notched specimen was considered with a notch length, a, equal to 20 mm; a beam depth, W, equal to 60 mm; a beam thickness, B, equal to 30 mm; specimen loading span, S, equal to 240 mm. It is schematically illustrated in Fig. 1.


For inducing a mixed-mode fracture condition, loads were applied at the same position on the middle of specimens, while notches were located by xc values from position load at different locations along the span, as shown in Fig. 1. The values of xc were obtained from the relation xc = γS / 2, where g varies from 0 to 0.6, Kazemi and Vossoughi Shahvaril (2004) and Jeng and Shah (1988).

3 EXPERIMENTAL PROCEDURE

Three-point bend tests were performed using an electro-mechanical Shimadzu AG-X universal testing machine with a crosshead speed of 0.5mm/min. The crack mouth opening displacement (CMOD) was measured by means of a clip gauge mounted in the bottom of the beam in the notch and held in position by two 1.5mm steel knife edges glued to the specimen. At the same time, the crack tip opening displacement (CTOD) of specimen was determined through the DIC method. The experimental setup with clip gauge and DIC system is shown in Fig. 2. The DIC system for in-plane surface displacement measurement is composed of a Sony XCD-SX910 camera with Close Focus Zoom Lens (10xZoom). This system was used to record a sequence of image around notch tip, i.e., at region of interest as shown in Fig. 1.


Digital image correlation (DIC) is a well-established method based on optical-numerical approach to estimate full-field displacement. The basic principle of the DIC method is to match maximum correlation between small subsets of the specimen in the undeformed and deformed states, Sutton et al. (2009) and Dally and Riley (2005). In order to do that, all specimens were painted with white paint and sprayed with black paint to obtain a random black and white speckle pattern to perform the correlation procedure.

The captured image were processed using DIC program (home-made DIC code) for estimating full-field displacements. The size of the images was 1280x960 pixels and the reference and target subsets equal to 31x 31 and 71x71 pixels, respectively. The accuracy of the DIC algorithm was approximately equal to 0.01 pixels and the calibration factor, defined as millimeter per pixel, was equal to 10/393. It is important to emphasize that the 10x Zoom lens used in the present study provided relatively low image distortion. Those parameters were used for making accurate measurements.

4 RESULTS AND DISCUSSION

Figure 3 illustrates a set of image around notch tip, which were obtained at region of interest, as schematically illustrated in Fig.1. These images are associated with different notch locations along the span, i.e., xc equal to 0, 24, 48 and 72 mm. The crack trajectories can also be observed in Fig. 3 and taking into account these results the final failure angles were achieved, as summarized in Table1. It is important to note that the crack trajectory tends to applied load and the final failure angle of the crack increases, which accentuates the effect of sliding mode-II in fracture.


The applied loads as a function of the crack mouth opening displacements are plotted in Fig. 4. As previously described, the values of CMOD were obtained by means of clip gage. The load-CMOD values were achieved for different notch positions, i.e., xc equal to 0, 24, 48 and 72 mm. It should be noted that the critical applied load increases with xc values, when the notch tends to extreme positions of the span of test beam.


Full-field displacements near the notch tip were measured by means of the DIC method. Samples of u-displacement fields associated with different applied loads for CP1 (see Table 1) are illustrated in Fig. 5. Clearly, the crack nucleation and crack propagations can be observed.


To determine the crack tip opening displacements (CTOD), the u-displacement fields were used. CTOD values were obtained by taking the discontinuity of u-displacement at the notch tip. More detailed analysis can be found in Nunes and Reis (2012). Figure 6 illustrates the crack tip opening displacement values as a function of applied loads, considering different notch positions. These results were directly obtained from in-plane displacement fields near the notch tip. Note that for different notch locations along the span, the critical applied load increases with xc values, while the load-CTOD plots present changes in shape.


By results displayed in Figs. 4 and 6, the critical crack mouth opening displacement and the critical crack tip opening displacement were evaluated. These parameters were obtained taking into account the values of CMOD and CTOD corresponding to maximum applied loads. The results are summarized in Table 2.

As indicate in Table 2, the estimated critical CMOD have approximately the same values. Moreover, the values of critical CTOD from CP1, CP2 and CP3 are approximately equal to 0.05mm, while the critical CTOD from CP4 is larger than others. However, it is important to remark that this last value was achieved when fracture of the material was brittle and, consequently, a few number of points was taken into consideration.

Figure 7 illustrates the correlation between CMOD and CTOD for different notch locations. A nonproportional behavior may be observed when the notches are taken off-center. This effect increases as the notch tends to move towards the support span. It is associated with mixed mode condition, in which the effect of sliding mode-II in fracture is accentuated. It is important to emphasize that, in the present work, CTOD values were obtained directly. However, the indirect measurement of CTOD is usually determined by measuring the value of CMOD, considering linear relationship between them. Therefore, the use of DIC method has been proved to be useful to measure CTOD.


The energy release of three point bend beam and approximate value of mixed-mode stress intensity factor can be determined taking into account the load point displacement related with applied load. Figure 8 illustrates the result of applied load as a function of the load point displacement for different notch locations.


The energy release rate of three-point bend beam was determined using the Direct Energy Method. In this method, only energy absorbed by the beam to the point of instability is considered. The energy release rate may be given by Swartz et al. 1988

where U is the area under the load-load point displacement curve, mg is the beam weight between support, is the load point displacement at peak load. The geometrical parameters of specimens B, W and a were previously presented in section 2.

Estimated values of U and are summarized in Table 2. Moreover, the energy release values are also displayed in Table 2 and are plotted as function of notch locations, as shown in Fig 9. Note that Gc increases significantly as the location of notch approaches the extreme of the beam span. As notch is moved towards support, more energy is retained to produce failure.


Despite mixed-mode condition, in present analysis, only approximate values of mixed-mode stress intensity factor associated with different notch locations were estimated. For determining this parameter, the calculated values of energy release (see Table 2) were taken. In this way, the following expression, considering the Poisson's ratio very small, is assumed

where the Young's modulus is E = 11.7 GPa, Nunes and Reis (2012). The estimated values of approximated mixed-mode stress intensity factor are shown in Table 2. Fracture toughness increase as notch is dislocated, higher Kc is reported but more brittle failure is observed.

The tensile traction acting on the crack surface, or normal stress, can be expressed by

with the moment given by . Where q is weight per unit length of the beam. Normal stress values as a function of crack tip opening displacement for different notch locations are illustrated in Fig 10. Moreover, maximum values of normal stress are summarized in Table 2, being these values approximately the same.


The bend specimen rotates about a plastic hinge axis with notch opening. The rotational factor r is associated with this plastic hinge with the center of rotation at a distance r(W - a) from the crack tip. In order to determine the rotational factor, the crack tip opening displacement (CTOD) and crack opening displacement (COD) were taken into account. The rotational factor can be determined through a linear relationship given by Gdoutos (2005).

It is important to remark that COD and CMOD values were adjusted, considering the thickness of steel knife-edges glued to the specimen.

The rotational factor as a function of crack tip opening displacement for different notch location is shown in Fig. 11. It is important to emphasize again that the effect of sliding mode-II in fracture is observed.


5 CONCLUSIONS

In the present work, an experimental investigation of effects of mixed mode I/II loading on the fracture behavior of polymer mortars was developed based on two approaches. Crack mouth opening displacement and crack tip opening displacement were simultaneously determined using clip gauge and Digital Image Correlation method respectively. The values of energy release rate and stress intensity factor for mixed-mode I/II loading were greater than the mode I, i.e., these parameters have increased when the location of notch tended to extreme of the beam span. In addition, the effect of sliding mode-II in fracture was not easily observed in Load-CMOD curve, however in Load-CTOD curve this effect was noted. Moreover, this effect was accentuated in CTOD-CMOD curve as well as in rotational factor values. It should be noted that the linear correlation between CTOD and CMOD was not achieved and a new expression must be investigated to describe the fracture behavior of polymer mortars under mixed mode I/II condition. Furthermore, fracture in structural applications often occurs in mixed mode loading condition. Therefore, the DIC may be a practical and economical method to provide an estimate of the remaining useful life of the structure.

Acknowledgements The authors would like to thank the Research Foundation of the State of Rio de Janeiro (FAPERJ) and The Brazilian National Council for Scientific and Technological Development (CNPq) for supporting part of the work presented here.

References

Bhattacharya, S., Kumar, A.N. (1995).Rotational factor using bending moment approach under elasto-plastic situation-I. Notch 3PB geometry, Engineering Fracture Mechanics 50 (4):493-505.

Czarnecki, L., (2010). Polymer concrete, Cement WapnoBeton 15(2):63–85.

Dally, J.W., Riley, W.F., (2005) Experimental Stress Analysis, 4th ed. McGraw Hill. Ferreira, M.D.C., Venturini, W.S., Hild, F., (2011). On the analysis of notched concrete beams: From measurement with digital image correlation to identification with boundary element method of a cohesive model, Engineering Fracture Mechanics 78: 71–84.

Gálvez, J.C., Cendón, D.A., Planas, J., (2002). Influence of shear parameters on mixed–mode fracture of concrete, International Journal of Fracture 118:163–189.

Gálvez, J.C., Elices, M., Guinea, G.V., Planas, J. (1998).Mixed mode fracture of concrete under proportional and nonproportional loading, International Journal of Fracture 94: 267–284.

Gdoutos, E.E., (2005). Fracture Mechanics: An Introduction, 2nd Ed., Springer.

He, S., Feng, Z., Rowlands, R.E., (1997). Fracture process zone analysis of concrete using moiré interferometry, Experimental Mechanics 37(3):367-372.

Jenq, Y.S., Shah, S.P. (1988). Mixed-mode fracture of concrete, International Journal of Fracture38:123-142.

Kazemi, M.T., Vossoughi Shahvaril, F., (2004). Mixed mode fracture of concrete: an experimental investigation, ScientiaIranica 11(4):378-385.

Kolednik, O. (1989). Plastic and overall rotational factors in bend- and CT-specimens, International Journal of Fracture 39:269-286.

Kumar, A.N., Bhattacharya, S. (1995). Rotational factor using bending moment approach under elasto-plastic situation-II.Crack 3PB geometry, Engineering Fracture Mechanics 50 (4): 507-517.

Lin, Q., Fakhimi, A., Haggerty, M., Labuz, J.F., (2009). Initiation of tensile and mixed-mode fracture in sandstone, International Journal of Rock Mechanics and Mining Sciences 46:489–497.

Nunes, L.C.S., Reis, J.M.L., da Costa Mattos, H.S., (2011). Parameters identification of polymer concrete using a fracture mechanics test method and full-field measurements, EngineeringFractureMechanics 78(17):2957-2965.

Nunes, L.C.S., Reis, J.M.L., (2012). Estimation of crack-tip-opening displacement and crack extension of glass fiber reinforced polymer mortars using digital image correlation method, Materials and Design 33:248–253.

Nunes, L.C.S., (2012). Crack-craze opening profiles near a crack tip in a polytetrafluoroethylene, Polymer Testing 31: 375–383.

Ohtsu, M., Kaminaga, Y., Munwam, M.C., (1999). Experimental and numerical crack analysis of mixed-mode failure in concrete by acoustic emission and boundary element method, Construction and Building Materials 13:57-64.

Reis, J.M.L., (2009).Effect of textile waste on the mechanical properties of polymer concrete, Materials Research 12:63-67.

Reis, J.M.L., Moreira, D.C., Nunes, L.C.S., Sphaier, L.A., (2011)a. Experimental investigation of the mechanical properties of polymer mortars with nanoparticles, Materials Science & Engineering A 528:6083-6085.

Reis, J.M.L, Moreira, D.C., Nunes, L.C.S., Sphaier, L.A. (2011)b. Evaluation of the fracture properties of polymer mortars reinforced with nanoparticles, Composite Structures 93(11): 3002-3005.

Ribeiro, M., Tavares, C., Ferreira, A.J.M., Fernandes, A.A., (2003). Bending characteristics of resin concretes, Materials Research 6:247-254.

Richter, M.A., Wagner, J.W., (1988) Experimental evaluation of hinge phenomenon in notched three point bend bars using laser speckle metrology, Engineering Fracture Mechanics 30(6):819-826.

RILEM PC-2. (1985) Method of making polymer concrete and mortar specimens, Technical Committee TC-113 Test Methods for Concrete-Polymer Composites (CPT), International Union of Testing and Research Laboratories for Materials and Structures.

Shah, S.G., Chandra Kishen, J.M., (2010). Fracture properties of concrete–concrete interfaces using digital image correlation, Experimental Mechanics 51(3):303-313.

Sharpe, W.N., (2008). Handbook of Experimental Solid Mechanics, Springer Science and Business Media, LLC New York.

Sutton, M.A., Orteu, J.J., Schreier, H.W., (2009). Image Correlation for Shape, Motion and Deformation Measurements, Springer Science and Business Media LCC.

Swartz, S.E., Lu, L.W., Tang, L.D. (1988). Mixed-mode fracture toughness testing of concrete beams in three-point bending, Materials Structures/Matériauxet Constructions21:33-40.

Veerman, C.C., Muller, T., (1972). The location of the apparent rotation axis in notched bend testing, Engineering Fracture Mechanics 4:25-32.

Received in 28 Mar 2013

In revised form 11 Apr 2013

  • Bhattacharya, S., Kumar, A.N. (1995).Rotational factor using bending moment approach under elasto-plastic situation-I. Notch 3PB geometry, Engineering Fracture Mechanics 50 (4):493-505.
  • Czarnecki, L., (2010). Polymer concrete, Cement WapnoBeton 15(2):6385.
  • Dally, J.W., Riley, W.F., (2005) Experimental Stress Analysis, 4th ed. McGraw Hill.
  • Ferreira, M.D.C., Venturini, W.S., Hild, F., (2011). On the analysis of notched concrete beams: From measurement with digital image correlation to identification with boundary element method of a cohesive model, Engineering Fracture Mechanics 78: 7184.
  • Gálvez, J.C., Cendón, D.A., Planas, J., (2002). Influence of shear parameters on mixedmode fracture of concrete, International Journal of Fracture 118:163189.
  • Gálvez, J.C., Elices, M., Guinea, G.V., Planas, J. (1998).Mixed mode fracture of concrete under proportional and nonproportional loading, International Journal of Fracture 94: 267284.
  • Gdoutos, E.E., (2005). Fracture Mechanics: An Introduction, 2nd Ed., Springer.
  • He, S., Feng, Z., Rowlands, R.E., (1997). Fracture process zone analysis of concrete using moiré interferometry, Experimental Mechanics 37(3):367-372.
  • Jenq, Y.S., Shah, S.P. (1988). Mixed-mode fracture of concrete, International Journal of Fracture38:123-142.
  • Kazemi, M.T., Vossoughi Shahvaril, F., (2004). Mixed mode fracture of concrete: an experimental investigation, ScientiaIranica 11(4):378-385.
  • Kolednik, O. (1989). Plastic and overall rotational factors in bend- and CT-specimens, International Journal of Fracture 39:269-286.
  • Kumar, A.N., Bhattacharya, S. (1995). Rotational factor using bending moment approach under elasto-plastic situation-II.Crack 3PB geometry, Engineering Fracture Mechanics 50 (4): 507-517.
  • Lin, Q., Fakhimi, A., Haggerty, M., Labuz, J.F., (2009). Initiation of tensile and mixed-mode fracture in sandstone, International Journal of Rock Mechanics and Mining Sciences 46:489497.
  • Nunes, L.C.S., Reis, J.M.L., da Costa Mattos, H.S., (2011). Parameters identification of polymer concrete using a fracture mechanics test method and full-field measurements, EngineeringFractureMechanics 78(17):2957-2965.
  • Nunes, L.C.S., Reis, J.M.L., (2012). Estimation of crack-tip-opening displacement and crack extension of glass fiber reinforced polymer mortars using digital image correlation method, Materials and Design 33:248253.
  • Nunes, L.C.S., (2012). Crack-craze opening profiles near a crack tip in a polytetrafluoroethylene, Polymer Testing 31: 375383.
  • Ohtsu, M., Kaminaga, Y., Munwam, M.C., (1999). Experimental and numerical crack analysis of mixed-mode failure in concrete by acoustic emission and boundary element method, Construction and Building Materials 13:57-64.
  • Reis, J.M.L., (2009).Effect of textile waste on the mechanical properties of polymer concrete, Materials Research 12:63-67.
  • Reis, J.M.L., Moreira, D.C., Nunes, L.C.S., Sphaier, L.A., (2011)a. Experimental investigation of the mechanical properties of polymer mortars with nanoparticles, Materials Science & Engineering A 528:6083-6085.
  • Reis, J.M.L, Moreira, D.C., Nunes, L.C.S., Sphaier, L.A. (2011)b. Evaluation of the fracture properties of polymer mortars reinforced with nanoparticles, Composite Structures 93(11): 3002-3005.
  • Ribeiro, M., Tavares, C., Ferreira, A.J.M., Fernandes, A.A., (2003). Bending characteristics of resin concretes, Materials Research 6:247-254.
  • Richter, M.A., Wagner, J.W., (1988) Experimental evaluation of hinge phenomenon in notched three point bend bars using laser speckle metrology, Engineering Fracture Mechanics 30(6):819-826.
  • RILEM PC-2. (1985) Method of making polymer concrete and mortar specimens, Technical Committee TC-113 Test Methods for Concrete-Polymer Composites (CPT), International Union of Testing and Research Laboratories for Materials and Structures.
  • Shah, S.G., Chandra Kishen, J.M., (2010). Fracture properties of concreteconcrete interfaces using digital image correlation, Experimental Mechanics 51(3):303-313.
  • Sharpe, W.N., (2008). Handbook of Experimental Solid Mechanics, Springer Science and Business Media, LLC New York.
  • Sutton, M.A., Orteu, J.J., Schreier, H.W., (2009). Image Correlation for Shape, Motion and Deformation Measurements, Springer Science and Business Media LCC.
  • Swartz, S.E., Lu, L.W., Tang, L.D. (1988). Mixed-mode fracture toughness testing of concrete beams in three-point bending, Materials Structures/Matériauxet Constructions21:33-40.
  • Veerman, C.C., Muller, T., (1972). The location of the apparent rotation axis in notched bend testing, Engineering Fracture Mechanics 4:25-32.
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    Author email:
  • Publication Dates

    • Publication in this collection
      30 July 2013
    • Date of issue
      Mar 2014

    History

    • Accepted
      11 Apr 2013
    • Received
      28 Mar 2013
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