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Global second order effects in reinforced concrete buildings: simplified criterion based on Galerkin’s method

Efeitos globais de segunda ordem em estruturas de concreto armado: critério simplificado com base no método de Galerkin

Abstract

Global second order effects in reinforced concrete buildings can be estimated using numerical or simplified methods, such as the γz coefficient, presented in the Brazilian standard. This paper proposes a new simplified parameter, which is deduced by the Galerkin’s Method by Weighted Residuals. In order to evaluate the accuracy of the proposed methodology, 42 planar frames (21 framed system structures and 21 dual system structures) were analysed in terms of internal forces and displacements. Such results were compared to those obtained by the γz coefficient and to the reference results obtained throughout a geometric nonlinear elastic finite element program. The precision of the results was defined by statistical analyses, which showed that the results using the proposed parameter were closer to the reference ones, even in the recommended range for using the γz coefficient.

Keywords:
global second order effects; reinforced concrete structures; weighted residuals; Galerkin’s method

Resumo

Efeitos globais de segunda ordem em edifícios de concreto armado podem ser estimados por métodos numéricos ou procedimentos simplificados, como o coeficiente γz, apresentado na norma brasileira. Neste artigo propõe-se um novo parâmetro simplificado, que é deduzido pelo Método de Galerkin por Resíduos Ponderados. De modo a avaliar a acurácia do modelo proposto, 42 pórticos planos (21 com contraventamento por pórticos e 21 com contraventamento por elementos rígidos) foram analisados em termos de esforços internos e deslocamentos. Tais resultados foram comparados aos obtidos pelo coeficiente γz e a resultados de referência obtidos por um programa de elementos finitos com análises de não linearidade geométrica. A precisão dos resultados foi definida por parâmetros estatísticos, que mostram que os resultados obtidos utilizando o parâmetro proposto estavam mais próximos dos resultados de referência, mesmo na faixa recomendada para a utilização do parâmetro γz.

Palavras-chave:
efeitos globais de segunda ordem; estruturas de concreto armado; resíduos ponderados; Método de Galerkin

1 INTRODUCTION

The design of tall buildings must take into account several factors, such as structure dimensions, wind velocity, terrain, nearby buildings and others ones that may increase lateral loads. Moreover, according to Khanduri et al. [11 A. C. Khanduri, T. Stathopoulos, and C. Bédard, "Wind-induced interference effects on buildings - a review of the state-of-the-art," Eng. Struct., vol. 20, no. 7, pp. 617–630, 1998, http://dx.doi.org/10.1016/S0141-0296(97)00066-7.
http://dx.doi.org/10.1016/S0141-0296(97)...
], for small buildings that have tall buildings nearby, the pressure gradient may induce a downward draft of air, which may cause high velocities and pressures.

International codes present ways to determine equivalent static lateral loads and suggest their application for building design [22 Associação Brasileira de Normas Técnicas, Forças Devidas ao Vento em Edificações, NBR 6123, 1988.]–[55 American Society of Civil Engineers, Minimum design loads and associated criteria for buildings and other structures, American Society of Civil Engineers, 2017.]. These loads may be used to estimate lateral displacements, interstorey drift ratio and internal forces [66 H. S. Hu, R. T. Wang, Z. X. Guo, and B. M. Shahrooz, "A generalized method for estimating drifts and drift components of tall buildings under lateral loading," Struct. Des. Tall Spec., vol. 29, no. 2, pp. e1688, 2020, http://dx.doi.org/10.1002/tal.1688.
http://dx.doi.org/10.1002/tal.1688...
]–[88 American Concrete Institute (ACI) Committee, "Building code requirements for structural concrete (ACI 318-19) and commentary", 2019.]; these variables can also be evaluated with computational methods [99 A. D. M. Wahrhaftig and M. A. D. Silva, "Using computational fluid dynamics to improve the drag coefficient estimates for tall buildings under wind loading," Struct. Des. Tall Spec., vol. 27, no. 3, pp. 1–12, 2018, http://dx.doi.org/10.1002/tal.1442.
http://dx.doi.org/10.1002/tal.1442...
].

The effects of lateral loads are very important to the design of buildings. Those loads increases the horizontal displacements and, therefore, the internal forces. Franco and Vasconcelos [1010 M. Franco and A. C. Vasconcelos, "Practical assessment of second order effects in tall buildings", in Colloq. CEB-FIP MC90, Rio de Janeiro, RJ, Brazil, 1991, pp. 307-324.] discussed the criteria that structures may be classified as sway or non-sway, according to the increase of bending moments due to horizontal displacements. These displacements also must be considered correctly due to serviceability limit analysis and to an economic point of view. According to Algan [1111 B. B. Algan, "Drift and damage Consideration in earthquake resistance design of reinforced concrete buildings," PhD Thesis, Univ. Illinois, Illinois, 1982.], the relative displacement between storeys is also an important variable to be evaluated, because if interstorey ratio reaches the order of 0.5%, the repair cost may reach approximately half the price for the construction of new elements (partitions).

The increase of internal forces and displacements is called global second order effects. These effects must be considered in the structural design in order to evaluate the structural elements under maximum internal forces and to verify the displacements conditions.

There are several ways to consider the influence of global second order effects. NBR 6118 [1212 Associação Brasileira de Normas Técnicas, Projeto de Estruturas de Concreto – Procedimento, NBR 6118, 2023.] suggests nonlinear or simplified procedures to estimate those effects, as the P-Delta method or α instability parameter, respectively. The latter option verify the necessity of consider the global second order effects. Beck and König [1313 H. Beck and G. König, "Restraining forces in the analysis of tall buildings” in Symp. On Tall Buildings, Pergamon Press, Oxford, 1966, pp. 513-536. https://doi.org/10.1016/B978-0-08-011692-1.50029-8.
https://doi.org/10.1016/B978-0-08-011692...
] proposed the α instability parameter from the solution of an ordinary differential equation, using Bessel’s functions. Other way to estimate those effects is to utilise amplification factors, which take into account the increase of the internal forces due to second order effects [1212 Associação Brasileira de Normas Técnicas, Projeto de Estruturas de Concreto – Procedimento, NBR 6118, 2023.], [1313 H. Beck and G. König, "Restraining forces in the analysis of tall buildings” in Symp. On Tall Buildings, Pergamon Press, Oxford, 1966, pp. 513-536. https://doi.org/10.1016/B978-0-08-011692-1.50029-8.
https://doi.org/10.1016/B978-0-08-011692...
]. NBR 6118 [1212 Associação Brasileira de Normas Técnicas, Projeto de Estruturas de Concreto – Procedimento, NBR 6118, 2023.] suggests the use of the γz parameter, which was proposed by Franco and Vasconcelos [1010 M. Franco and A. C. Vasconcelos, "Practical assessment of second order effects in tall buildings", in Colloq. CEB-FIP MC90, Rio de Janeiro, RJ, Brazil, 1991, pp. 307-324.]. That parameter was deduced using an incremental-iterative process, so it is a simplified method, and allows the estimation of global second order effects using only a first order analysis. This method is recommended only for the range 1.10 <γz≤ 1.30 and achieves a good approximation for the global second order effects [1414 J. R. Bueno and D. D. Loriggio, "Analysis of second order effects: case study," Rev. IBRACON Estrut. Mater., vol. 9, no. 4, pp. 494–509, 2016, http://dx.doi.org/10.1590/S1983-41952016000400002.
http://dx.doi.org/10.1590/S1983-41952016...
], [1515 F. C. Freitas, L. A. R. Luchi, and W. G. Ferreira, "Global stability analysis of structures and actions to control their effects," Rev. IBRACON Estrut. Mater., vol. 9, no. 2, pp. 192–213, 2016, http://dx.doi.org/10.1590/S1983-41952016000200003.
http://dx.doi.org/10.1590/S1983-41952016...
].

Researches on sway analysis often propose improvements of existing parameters e.g., Ellwanger [1616 R. J. Ellwanger, "A variable limit for the instability parameter of wall-frame or core-frame bracing structures," Rev. IBRACON Estrut. Mater., vol. 5, no. 1, pp. 104–136, 2019, http://dx.doi.org/10.1590/S1983-41952012000100008.
http://dx.doi.org/10.1590/S1983-41952012...
] that adjusted the α instability parameter and Souza et al. [1717 T. P. Souza, R. G. S. Lima, R. N. Cunha, L. A. Mendes, and D. L. N. D. F. Amorim, "Amplification factor for simplified sway estimate by the γz coefficient," J. Braz. Soc. Mech. Sci., vol. 44, no. 12, pp. 582, 2022, http://dx.doi.org/10.1007/s40430-022-03891-3.
http://dx.doi.org/10.1007/s40430-022-038...
] that adjusted the γz coefficient by an amplification factor. Other ones propose new simplified parameters, such as Tekeli et al. [1818 H. Tekeli, E. Atimtay, and M. Turkmen, "A simplified method for determining sway in reinforced concrete dual buildings and design applications," Struct. Des. Tall Spec., vol. 22, no. 15, pp. 1156–1172, 2013, http://dx.doi.org/10.1002/tal.761.
http://dx.doi.org/10.1002/tal.761...
], Cunha et al. [1919 R. N. Cunha, L. A. Mendes, and D. L. N. D. F. Amorim, "Proposal of a simplified criterion to estimate second order global effects in reinforced concrete buildings," Rev. IBRACON Estrut. Mater., vol. 13, no. 2, pp. 200–211, 2020, http://dx.doi.org/10.1590/S1983-41952020000200002.
http://dx.doi.org/10.1590/S1983-41952020...
] and Andrade and Nóbrega [2020 R. B. Andrade and P. G. B. D. Nóbrega, "Second-order torsion effects in concrete buildings”, Rev. IBRACON Estrut. Mater., vol. 14, no. 1, pp. e14105, 2020. https://doi.org/10.1590/S1983-41952021000100005.
https://doi.org/10.1590/S1983-4195202100...
]. Several researchers study the α instability parameter, the γz coefficient as well as stability in general [21]21 K. A. Zalka, "A hand method for predicting the stability of regular buildings, using frequency measurements," Struct. Des. Tall Spec., vol. 12, no. 4, pp. 273–281, 2003, http://dx.doi.org/10.1002/tal.221.
http://dx.doi.org/10.1002/tal.221...
[36]36 O. C. Marques, L. A. Feitosa, K. V. Bicalho, and E. C. Alves, "Analysis of constructive effect and soil-structure interaction in tall building projects with shallow foundations on sandy soils," Rev. IBRACON Estrut. Mater., vol. 14, pp. e14103, 2020, http://dx.doi.org/10.1590/S1983-41952021000100003.
http://dx.doi.org/10.1590/S1983-41952021...
.

Therefore, the objective of this paper is to verify the quality of the criterion proposed by Cunha et al. [1919 R. N. Cunha, L. A. Mendes, and D. L. N. D. F. Amorim, "Proposal of a simplified criterion to estimate second order global effects in reinforced concrete buildings," Rev. IBRACON Estrut. Mater., vol. 13, no. 2, pp. 200–211, 2020, http://dx.doi.org/10.1590/S1983-41952020000200002.
http://dx.doi.org/10.1590/S1983-41952020...
] when analysing displacements of framed structures systems and internal forces of framed systems (resistance against lateral forces is formed only by beams and columns) and dual system structures (resistance against lateral forces is formed mostly by shear-walls). Note that the work presented by Cunha et al. [1919 R. N. Cunha, L. A. Mendes, and D. L. N. D. F. Amorim, "Proposal of a simplified criterion to estimate second order global effects in reinforced concrete buildings," Rev. IBRACON Estrut. Mater., vol. 13, no. 2, pp. 200–211, 2020, http://dx.doi.org/10.1590/S1983-41952020000200002.
http://dx.doi.org/10.1590/S1983-41952020...
] was published as an advance in the theme, but the results are limited to dual system structures and only assesses the horizontal displacement of the buildings. Now, the proposed formulation, which was developed with Galerkin’s method by weighted residuals, is applied to 21 framed system structures and 21 dual system structures on the software MASTAN2 [3737 W. McGuire, R. H. Gallagher, and R. D. Ziemian, Matrix Structural Analysis, 2nd ed., Lewisburg: Bucknell University, 2014.] to analyse displacements and internal forces.

2 SIMPLIFIED SWAY ANALYSIS BY THE ΓZ COEFFICIENT

The γz coefficient was proposed by Franco and Vasconcelos [1010 M. Franco and A. C. Vasconcelos, "Practical assessment of second order effects in tall buildings", in Colloq. CEB-FIP MC90, Rio de Janeiro, RJ, Brazil, 1991, pp. 307-324.] and it is presented in the Brazilian standard code [1212 Associação Brasileira de Normas Técnicas, Projeto de Estruturas de Concreto – Procedimento, NBR 6118, 2023.]. The application of this parameter allows a simplified sway analysis of reinforced concrete buildings, and the estimation of global second order effects of these structures. Note that this was an important advance in the field, since Franco and Vasconcelos [1010 M. Franco and A. C. Vasconcelos, "Practical assessment of second order effects in tall buildings", in Colloq. CEB-FIP MC90, Rio de Janeiro, RJ, Brazil, 1991, pp. 307-324.] stated: “The designer needs a simple method to decide whether a particular structure should be considered ‘sway’, without performing a second order analysis”. Despite the previous existence of the instability parameter α [1313 H. Beck and G. König, "Restraining forces in the analysis of tall buildings” in Symp. On Tall Buildings, Pergamon Press, Oxford, 1966, pp. 513-536. https://doi.org/10.1016/B978-0-08-011692-1.50029-8.
https://doi.org/10.1016/B978-0-08-011692...
], the γz coefficient is a clear improvement since it is calculated using the whole structure and it can be applied to estimate the global second order effects.

Consider that a building is represented by a simple vertical bar, whose length is L, and subjected to vertical and transversal uniform loads, equal to p and q, respectively (Figure 1). Moreover, consider that the bar properties have constant values: Young’s modulus E, cross section area S and inertia moment I.

Figure 1
Vertical bar.

It is possible to define the first (M1) and second order (M2) bending moments at the clamped end of the vertical bar. Then, the γz parameter definition is:

γ z = M 2 M 1 (1)

The second order bending moment may be calculated by the application of an incremental-iterative procedure, with n steps:

M 2 = M 1 + M 1 + M 2 + M 3 + + M n (2)

where ΔM is the increment of bending moments at each step of the incremental-iterative procedure.

Franco and Vasconcelos [1010 M. Franco and A. C. Vasconcelos, "Practical assessment of second order effects in tall buildings", in Colloq. CEB-FIP MC90, Rio de Janeiro, RJ, Brazil, 1991, pp. 307-324.] admit that the increment rate of the bending moments (r<1) is constant until convergence, which is achieved by a geometric progression, which n is a high number i.e. n:

r = M 1 M 1 = M 2 M 1 = M 3 M 2 = = M n M n - 1 < 1 (3)

Equation 2 may be rewritten by applying Equation 3:

M 2 = M 1 + M 1 + M 2 + M 3 + + M n = M 1 + r M 1 + r 2 M 1 + r 3 M 1 + + r n M 1 = 1 + r + r 2 + r 3 + + r n M 1 (4)

Equation 4 may be mathematically rearranged by multiplying it by (1-r):

( 1 - r ) M 2 = 1 - r n + 1 M 1 (5)

The convergence is only obtained with many steps i.e., nrn+10, therefore Equation 5 may be simplified:

M 2 = 1 ( 1 - r ) M 1 (6)

The γz coefficient can be defined by substituting Equations 6 and 3 in (1), as shown in Equation 7:

γ z = 1 1 - M 1 M 1 (7)

being M1the first increment of the nonlinear analysis, that can be calculated by a linear or first order analysis.

According to CEB/FIP [3838 Comité Euro-Internacional Du Béton, Final Draft (Bulletin D’Information, 203/204/205). Lausanne, Switzerland: Comité Euro-Internacional Du Béton, 1991.], if the second order bending moments are 10% higher than the first order bending moments, the structure can be defined as a sway building and global second order effects must be considered. The Brazilian Standard Code NBR 6118 [1212 Associação Brasileira de Normas Técnicas, Projeto de Estruturas de Concreto – Procedimento, NBR 6118, 2023.] defines a criteria based on the γz parameter: if its value are lower than 1.10, global second order effects can be neglected; if 1.10 < γz ≤ 1.30, global second order effects must be considered in the analysis and may be calculated by a first order analysis, by multiplying the lateral loads by 0.95 γz; for γz values higher than 1.30, NBR 6118 [1212 Associação Brasileira de Normas Técnicas, Projeto de Estruturas de Concreto – Procedimento, NBR 6118, 2023.] does not recommend this simplified analysis and the second order global effects must be considered by others procedures, as a nonlinear analysis.

3 GALERKIN’S METHOD BY WEIGHTED RESIDUALS

The weighted residuals are a set of methods that are applied to solve differential equations in their week form, using any function as potential solution. Each method differs from the others by the chosen weight function. The criterion proposed in this paper is based on the Galerkin’s method, by weighted residuals, since is a method that provides good results with simple equations.

3.1 Strong form

Consider a structure represented by a vertical bar, whose length is L, submitted to vertical and transversal loads equal to p and q, respectively (Figure 1). Moreover, consider that the bar has constant properties: Young’s modulus E, cross section area S and inertia moment I. Admitting that the axial stiffness (ES) of the bar is high, the axial field displacement can be described, according to Equation 8, as:

u x = - p L 2 2 E S 2 x L - x L 2 (8)

According to Powell [3939 G. H. Powell, "Theory of nonlinear elastic structures," J. Struct. Div., vol. ST12, pp. 2687–2701, 1969.], the bending moment field along the bar (M(x)), considering second order effects, may be described by:

M x = - E I d 2 v x d x 2 + E S d u x d x + 1 2 d v x d x 2 v x (9)

where EI is the flexural stiffness of the bar and vx is the horizontal displacement field.

The bending moment field are related to the transversal load: d2M/dx2=-q. Therefore, Equation 9 may be rewritten as:

- E I d 4 v x d x 4 + E S v x d 2 v x d x 2 2 + E S v x d v x d x d 3 v x d x 3 + 2 p d v x d x + 2 E S d v x d x 2 d v x d x 2 - p L 1 - x L 2 d 2 v x d x 2 + 1 2 E S d 2 v x d x 2 d v x d x 2 = - q (10)

Note that the differential equation depends only of v(x) and its derivatives. With the purpose of avoiding an iterative incremental procedure, the terms that depends more than once on vx and its derivatives, are eliminated of the equation:

- E I d 4 v x d x 4 + 2 p d v x d x - p L 1 - x L 2 d 2 v x d x 2 = - q (11)

The biggest advantage of that simplification is the viability for design procedures, as Equation 11 does not need an incremental procedure. However, as some of the terms were removed from the equation that governs the problem, the equation also lost accuracy. Therefore, there is need of a correction factor to adjust the solution and compensate for the removed terms. This procedure is presented in section 4.

3.2 Weak form

The week form of a problem may be written using its strong form. Thus, from Equation 11, it is possible to define the residual function R(x) (Equation 12). By definition, the residual function must be minimized along the problem domain to obtain accurate results.

0 H R x ω x d x = 0 ω x
R x = q - E I d 4 v x d x 4 + 2 p d v x d x - p L 1 - x L 2 d 2 v x d x 2 (12)

being ωx the weight function that must be continuous and homogeneous in the essential boundary conditions and v(x) must obey the boundary conditions of the problem.

The transversal displacement field may be approximated by any function. In this paper, consider that v(x) may be written, in indicial notation, as:

v x = α i ϕ i x i = 1 , , n (13)

being αi the constants to be determinate, ϕjx the adopted functions and n the number of terms adopted in the approximation.

It is possible to assume any functions for ωx. The Galerkin’s methods applied for weight residuals proposed that the weight function is defined as:

ω x = β j ϕ j x j = 1 , , n (14)

where βj are the constants of the ωx function and ϕjx are the same functions adopted for v(x).

Therefore, substituting Equations 13-14 in Equation 12, for any values of βj, it is possible to define the following system of linear equations:

K T α = F
K i j = 0 L E I 4 ϕ i x x 4 ϕ j x + 2 p ϕ i x x ϕ j x - p L 1 - x L 2 ϕ i x x 2 ϕ j x d x F j = 0 L q ϕ j x d x (15)

4 PROPOSED CRITERION

Cunha et al. [1919 R. N. Cunha, L. A. Mendes, and D. L. N. D. F. Amorim, "Proposal of a simplified criterion to estimate second order global effects in reinforced concrete buildings," Rev. IBRACON Estrut. Mater., vol. 13, no. 2, pp. 200–211, 2020, http://dx.doi.org/10.1590/S1983-41952020000200002.
http://dx.doi.org/10.1590/S1983-41952020...
] presented a criterion for dual system frames, inspired in the γz parameter, which was deduced by the ratio of the second order and first order bending moments (Equation 1). The proposed criterion continues the research initially developed by Cunha et al. [1919 R. N. Cunha, L. A. Mendes, and D. L. N. D. F. Amorim, "Proposal of a simplified criterion to estimate second order global effects in reinforced concrete buildings," Rev. IBRACON Estrut. Mater., vol. 13, no. 2, pp. 200–211, 2020, http://dx.doi.org/10.1590/S1983-41952020000200002.
http://dx.doi.org/10.1590/S1983-41952020...
], by using the same concepts, and for application on framed system structures, as presented in Equation 16:

ζ g = κ M 2 M 1 (16)

being ζg the proposed coefficient, M1 is the first order moment for a vertical bar (Figure 1), equal to qL2/2, M2 is the second order moment and κ is a parameter used to compensate the eliminated terms of Equation 10.

The Equation 15 was solved, adopting a complete fourth degree polynomial function as a potential solution for the approximation of the horizontal displacement field (v(x)). Based on the v(x) result and knowing that the bending moment field for the vertical bar (Figure 1) is defined by M=-EI(d2v(x))(dx2), it is possible to define the bending moment field along the vertical bar. Therefore, the second order bending moment at the base (x=0) is presented in Equation 17.

M 2 = - 108 E I q L 2 - 21 L 9 p 3 + 8215 E I L 6 p 2 - 638550 ( E I ) 2 L 3 p + 9147600 ( E I ) 3 259 L 12 p 4 - 140352 E I L 9 p 3 + 18993312 ( E I ) 2 L 6 p 2 - 632681280 ( E I ) 3 L 3 p + 1975881600 ( E I ) 4 (17)

The proposed criterion can be applied for any frame, where L is the height of the building, q and p are the sum of all horizontal and vertical loads, respectively, distributed along the height L and EI is the equivalent stiffness of the frame.

The ζg parameter is applied in a similar way to the γz, aiming to obtain the second order results (internal forces and displacements) in a simplified way. For practical applications, the first order lateral loads must be multiplied by ζg, then applying the new loads at the structure and solving a first order analysis to get the approximated second order results.

5 METHODOLOGY

The present paper measured the displacement and internal forces (normal force, shear force and bending moment) of 21 framed system structures and 21 dual system structures, with different values of the γz parameter. For the first group of frames it is also proposed an analytical equation for the κ, based on the displacement results, by using the software Past! [4040 Ø. Hammer, D. A. T. Harper, and P. D. Ryan, "Past: paleontological statistics software package for educaton and data anlysis," Palaeontol. Electronica, vol. 4, no. 1, pp. 1-9, 2001.], which is an education statistical software, that provides a wide range of tools and visualizations for data exploration and visualization. All the simulations were made on the software MASTAN2, which is an interactive structural analysis program that provides preprocessing, analysis, and postprocessing capabilities, similar to today's commercially available structural analysis software. The program's linear and nonlinear analysis routines are based on the theoretical and numerical formulations presented by McGuire et al. [3737 W. McGuire, R. H. Gallagher, and R. D. Ziemian, Matrix Structural Analysis, 2nd ed., Lewisburg: Bucknell University, 2014.]. Thus, for the second order analysis, it was used a prediction-correction algorithm [3737 W. McGuire, R. H. Gallagher, and R. D. Ziemian, Matrix Structural Analysis, 2nd ed., Lewisburg: Bucknell University, 2014.], which provides results with high accuracy. The physical nonlinearity of the reinforced concrete was considered in a simplified way, according to item 15.7.3 of NBR 6118 [1212 Associação Brasileira de Normas Técnicas, Projeto de Estruturas de Concreto – Procedimento, NBR 6118, 2023.], that suggests a reduction of the stiffness of the beams and columns in 60% and 20%, respectively. The frames were modelled according two different models: Type 1 (Figure 2a and Figure 3a) and Type 2 (Figure 2b and Figure 3b), being h the height of each story, adopted equal to 3 m. The properties of all the frames, the γz values and the parameters for the proposed model are presented in Table 1 and Table 2, for dual system and framed system structures, respectively, and the elasticity modulus was equal to 24 GPa. The sections of the structural elements were defined in order to have a set of different values for the γz parameter, even γz ≥ 1.30, and check the quality of the proposed model also for this condition.

Figure 2
Frames models: dual system structures.
Figure 3
Frames models: framed system structures.
Table 1
Dual system structures properties [1919 R. N. Cunha, L. A. Mendes, and D. L. N. D. F. Amorim, "Proposal of a simplified criterion to estimate second order global effects in reinforced concrete buildings," Rev. IBRACON Estrut. Mater., vol. 13, no. 2, pp. 200–211, 2020, http://dx.doi.org/10.1590/S1983-41952020000200002.
http://dx.doi.org/10.1590/S1983-41952020...
].
Table 2
Framed system structures properties.

The proposed procedure is applicable for any type of lateral loads, as wind or the equivalent static load for earthquakes. In this paper, wind loads were adopted accordingly to the Brazilian Standard Code NBR 6123 [22 Associação Brasileira de Normas Técnicas, Forças Devidas ao Vento em Edificações, NBR 6123, 1988.], considering basic velocity (V0) of 40 m/s, topography with slightly uneven terrain, on an urbanized area, with many residential or hotel buildings, which coefficients are shown in Equation 18:

S 1 = 1.0
S 2 = 0.6374 z 0.125 , i f L < 50 m 0.6156 z 0.135 , i f L 50 m
S 3 = 1.0 (18)

where z is the height of the analysed story.

For the sake of simplicity, the wind load calculated using the NBR 6123 [22 Associação Brasileira de Normas Técnicas, Forças Devidas ao Vento em Edificações, NBR 6123, 1988.] is given in Appendix A APPENDIX A – WIND LOADS The wind loads were calculated according to the NBR 6123 [2] recommendations, which are presented in Tables A1 and A2, for structures lower and higher than 50 m, respectively. If the storey is the last one of the structures, the wind load should be half of the presented value due to the wind influence area. Table A1 Wind loads for structures lower than 50 m. Storey Load (kN) Storey Load (kN) 1 36.00 9 65.15 2 43.41 10 67.03 3 48.43 11 68.78 4 52.34 12 70.42 5 55.59 13 71.95 6 58.40 14 73.41 7 60.88 15 74.79 8 63.11 16 76.10 Table A2 Wind loads for structures higher than 50 m. Storey Load (kN) Storey Load (kN) Storey Load (kN) Storey Load (kN) 1 35.40 9 61.31 17 71.88 25 79.16 2 42.10 10 62.95 18 72.92 26 79.94 3 46.59 11 64.47 19 73.91 27 80.69 4 50.06 12 65.89 20 74.86 28 81.43 5 52.94 13 67.22 21 75.78 29 82.15 6 55.40 14 68.48 22 76.67 7 57.58 15 69.67 23 77.52 8 59.54 16 70.80 24 78.35 .

The vertical loads were determined accordingly NBR 6120 [4141 Associação Brasileira de Normas Técnicas, Ações para o Cálculo de Estruturas de Edificações, NBR 6120, 2019.] for the occupation of offices and considering dead and live loads. The self-weight of the structural elements was also included in the analysis.

For the framed system structures, the simulations were performed with the aim to determine the best value of κ, in order to guarantee that the horizontal displacements obtained by the proposed procedure were closer to the reference ones, which were obtained with MASTAN2 by running a second order elastic analysis. All presented results were compared between the proposed procedure, the γz procedure and the MASTAN2 methods, being the latter adopted as reference. The displacement results were analysed in a qualitative (displacement field behaviour) and quantitative (statistic methods) way. The results of maximum displacement, maximum positive bending moment, maximum negative bending moment and maximum shear force (for the beams) and maximum bending moment (for the columns) were compared by using statistical tests. It was applied the percent bias (PBIAS), the mean absolute error (MAE) and the mean absolute percentage error (MAPE) tests (Equation 19-21) for a global characterization of samples.

P B I A S = i = 1 n y i - y ^ 1 i = 1 n y i (19)
M A E = 1 n i = 1 n y i - y ^ 1 (20)
M A P E = 1 n i = 1 n y i - y ^ 1 y i (21)

where yi is the reference value, y^1 is the simulated value and n is the sample size.

It was also verified the hypothesis of the average values of the analysed results being from the same population. Before running this mean test, it was verified the hypothesis of normal distribution of the samples (i.e., the normality of the samples), by Shapiro-Wilk test. If the p-values were higher than the level of significance, the homoscedasticity test (which tests the hypothesis of the samples have the same finite variance) were performed using the Bartlett’s test, otherwise, it was used the Levene’s test. If the p-values of both tests did not allow rejecting the null hypothesis, the t-test were performed to verify if the samples are from the same population. Otherwise, it was performed the Mann-Whitney test (for a detailed review of the statistical tests see [4242 D. C. Montgomery and G. C. Runger, Applied Statistics and Probability for Engineers, Hoboken, Nova Jersey, EUA: John Wiley & Sons, 2007.]). For all tests, it was adopted a level of significance of 5%.

Cunha et al. [1919 R. N. Cunha, L. A. Mendes, and D. L. N. D. F. Amorim, "Proposal of a simplified criterion to estimate second order global effects in reinforced concrete buildings," Rev. IBRACON Estrut. Mater., vol. 13, no. 2, pp. 200–211, 2020, http://dx.doi.org/10.1590/S1983-41952020000200002.
http://dx.doi.org/10.1590/S1983-41952020...
] evaluated previously the dual system structures in terms of displacements. The present paper also compared the values of internal forces for this structural system, similar to the framed system structures, added the maximum bending moment at the shear-wall. Also, it was performed the same statistical tests used for the framed system structures.

6 RESULTS AND DISCUSSIONS

6.1 Framed system structures

6.1.1 Nonlinear regression

Twenty-one framed system structures were solved by a first order analysis with the goal of define an equation that describes the behaviour of the κ coefficient, according to the value of M2/M1. It was chosen the best value of κ that leads to the closest fit of the Horizontal displacement vs. Storey of the frames to the reference results (MASTAN2 results). These Horizontal displacement vs. Storey curves are presented for all frames in Figure 4, with the values of κ and a direct comparison with the first order analysis, γz analysis and MASTAN2. The values of κ and M2/M1 are also presented in Table 1 and Table 2, for the dual system and framed structures, respectively. Based in the values for all framed structures (Table 2), it was performed a nonlinear regression, using the software Past! [4040 Ø. Hammer, D. A. T. Harper, and P. D. Ryan, "Past: paleontological statistics software package for educaton and data anlysis," Palaeontol. Electronica, vol. 4, no. 1, pp. 1-9, 2001.], which results is the Equation 22:

Figure 4
Horizontal displacements results.
κ F r a m e d = - 0.95743 + 1.9154 M 2 M 1 - 0.22608 (22)

The behaviour observed in proposed equation is quite similar to the one previously presented by Cunha et al. [1919 R. N. Cunha, L. A. Mendes, and D. L. N. D. F. Amorim, "Proposal of a simplified criterion to estimate second order global effects in reinforced concrete buildings," Rev. IBRACON Estrut. Mater., vol. 13, no. 2, pp. 200–211, 2020, http://dx.doi.org/10.1590/S1983-41952020000200002.
http://dx.doi.org/10.1590/S1983-41952020...
] for dual system structures (Equation 23).

κ D u a l = - 0.3864 + 1.3644 M 2 M 1 - 0.4205 (23)

To verify the quality of the adjust that Equation 22 provides, it was made the Nash-Sutcliffe coefficient [4343 J. E. Nash and J. V. Sutcliffe, "River flow forecasting through conceptual models part I – A discussion of principles," J. Hydrol. (Amst.), vol. 10, pp. 282–290, 1970.], according to the Equation 24:

N S E = 1 - t = 1 n ( κ p t - κ o t ) 2 t = 1 n ( κ o t - κ o A v g ) 2 (24)

where κpt is the predicted coefficient by Equation 22, κot is the observed coefficient and κoAvg is the average of the observed coefficients. The Nash-Sutcliffe coefficient determines the magnitude of the residual variance in relation to the observed data variance, which values are in the range -∞ < NSE ≤ 1. The unitary value means a perfect fit of the points to the model; NSE = 0 means that the values obtained by Equation 22 are as precise as the mean of the observed data; and NSE < 0 indicates that the mean of the observed data provides a better prediction than the Equation 22 [4343 J. E. Nash and J. V. Sutcliffe, "River flow forecasting through conceptual models part I – A discussion of principles," J. Hydrol. (Amst.), vol. 10, pp. 282–290, 1970.]. For the proposed model, the NSE efficiency coefficient was equal to 0.9901.

Many assumptions are made when a regression analysis is performed, as the normality of the errors (i.e., the sample follows a normal distribution) and that the random variables are uncorrelated [4242 D. C. Montgomery and G. C. Runger, Applied Statistics and Probability for Engineers, Hoboken, Nova Jersey, EUA: John Wiley & Sons, 2007.]. To check the normality hypothesis, the Shapiro-Wilk test was used on the residuals from the regression. The p-value for this test was equal to 0.65, higher than the level of significance. Therefore, it is not possible to reject the hypothesis that the sample follow a normal distribution and corroborate that the proposed model did not present inconsistences.

6.1.2 Displacement analysis

The Horizontal displacement vs. Storey curves of the structures (Figure 4) provide an initial supposition that the results obtained by the proposed criterion leads to better results along all structure, than the γz ones, compared to the MASTAN2. One way to verify this hypothesis is performing a series of statistical analysis. As the NBR 6118 [1212 Associação Brasileira de Normas Técnicas, Projeto de Estruturas de Concreto – Procedimento, NBR 6118, 2023.] indicates that the γz parameter only is recommended for the range 1.10 < γz ≤ 1.30, the analysis were made for two samples: all frames and the frames whose value of γz are in the recommended range. The basic statistics parameters and the PBIAS, MAE and MAPE results are presented in Table 3.

Table 3
Basic statistics of displacements.

The results presented in Table 3 shows that the γz model leads to values of displacement lower than the reference ones, while the proposed model, higher and closer displacements for the two samples analysed. The PBIAS parameter also indicates that the ζg model presents lowers absolute bias. The MAE e MAPE parameters indicate that the results of the proposed model are in favour of security and with errors lower than the γz model, in comparison to the second order results. The mean tests were also performed for the two samples, which results are presented in Table 4. Based on the p-values, it is not possible to reject the hypothesis of normal distribution of the models (normality). Moreover, it was also verified the hypothesis of homoscedasticity, which p-value increases for the range 1.10 < γz ≤ 1.30. The results of the t-test did not allow the rejection of the hypothesis that both models have means statistical equals to the reference values. Although, there is greater certainty in affirm that proposed model is more similar to the reference values, as shown by the p-values results. Therefore, it is possible to conclude that the proposed model leads to better results and in favour of security, in terms of displacement. This analysis is important to better conclusions for the serviceability limits analysis or interstorey drift ratio that may cause high increase in the repair costs [1111 B. B. Algan, "Drift and damage Consideration in earthquake resistance design of reinforced concrete buildings," PhD Thesis, Univ. Illinois, Illinois, 1982.].

Table 4
p-values of the statistical tests of displacements.

6.1.2 Internal forces analysis

In a sway analysis is also important to analyze the results in terms of internal forces. Then, the same tests made for the displacement were made for beams: positive bending moment, negative bending moment and shear force (Table 5 and Table 6) and for the columns: bending moments (Table 7 and Table 8).

Table 5
Basic statistics of internal forces for the beams.
Table 6
p-values of the statistical tests of internal forces for the beams.
Table 7
Basic statistics of bending moments for the columns.
Table 8
p-values of the statistical tests of bending moments for the columns.

The basic statistical parameters (Table 5) provide an initial idea about the behaviour of the internal forces. It is possible to note that, for all analysis, the results obtained by the proposed model (ζg) are closer to the reference ones (MASTAN2) than the γz model, even in the range recommended by the NBR 6118 [1212 Associação Brasileira de Normas Técnicas, Projeto de Estruturas de Concreto – Procedimento, NBR 6118, 2023.]. This conclusion can be reached by the mean and standard deviation or by the PBIAS, MAE and MAPE parameters, which errors with the γz model are, at least, twice the values of the proposed parameter. Moreover, it is not possible to reject the hypothesis of normal distribution and homoscedasticity of the models, for the two samples analysed, and it was possible to apply t test (Table6). The p-values did not allow to reject the hypothesis of both simplified models are equal to the reference one. However, as observed for the displacement results, the p-values for the proposed model are higher than the γz model and, therefore, there is a lower chance of committing an error in this affirmation.

The results for the bending moments in the columns of the framed structures indicates that the proposed model presents higher errors than the γz model, in comparison to the reference ones (Table 7). However, it is possible to note that the errors of the proposed model are positive i.e., the bending moments are in favour of the security, while the ones by the γz model are lowers (negative PBIAS). It is important to note that, for the range of 1.10 <γz≤ 1.30, the results obtained by the proposed model got an improvement, while the ones achieved by the γz model worsened. The same conclusion can be reached by the analysis of the mean tests (Table 8).

6.2 Dual system structures: internal forces analysis

Cunha et al. [1919 R. N. Cunha, L. A. Mendes, and D. L. N. D. F. Amorim, "Proposal of a simplified criterion to estimate second order global effects in reinforced concrete buildings," Rev. IBRACON Estrut. Mater., vol. 13, no. 2, pp. 200–211, 2020, http://dx.doi.org/10.1590/S1983-41952020000200002.
http://dx.doi.org/10.1590/S1983-41952020...
] previously studied dual system structures focusing on the displacement of the structures. These authors concluded that the results in terms of displacement of the proposed model was better than the ones by the γz model, similar to the conclusions reached for the framed system structures (section 6.1). This paper focuses on the analysis of the internal forces of the beams: positive bending moment, negative bending moment and shear force (Table 9 and Table 10) and of the columns: bending moments (Table 11 and Table 12) and of the shear-walls (Table 13 and Table 14).

Table 9
Basic statistics of internal forces for the beams.
Table 10
p-values of the statistical tests of internal forces for the beams.
Table 11
Basic statistics of bending moments for the columns.
Table 12
p-values of the statistical tests of bending moments for the columns.
Table 13
Basic statistics of bending moments for the shear-wall.
Table 14
p-values of the statistical tests of bending moments for the shear-wall.

Similar to the observed in the framed structures, the results obtained for the beams, applying the proposed model, are closer to the reference ones, in comparison to the ones achieved by the γz model. In terms of errors (Table 9), the internal forces obtained by the proposed model are, at least, almost three times lower than the ones by the γz model, even in the recommended range of this parameter. The mean test also corroborates this analysis, which p-values are near to 1.0 (perfect correlation between the samples).

The results for the columns are similar to that observed in the beams, which errors with the proposed parameter are quite lower than the γz model. The Brazilian normative parameter leads to internal forces lower than the reference values (PBIAS) and higher errors (MAE and MAPE) for all structures. For the recommended range of γz parameter, the results are better, although with higher errors, which may also be concluded by the p-values of the mean test. The p-value improved in the second sample (0.3143 to 0.8185), however lower than the value of the proposed parameter for all structures (0.8209), which achieved the value of 0.9988 for the range 1.10 < γz ≤ 1.30.

The results for the shear-walls are similar to that observed in the columns of the framed system structures. The proposed parameter leads to higher errors than the γz model, however, with values above the reference ones, while the γz model, lower. Moreover, for the recommend range of the γz parameter, the results by this model worsened, while the proposed model improved for all evaluated parameters, also observed by the p-values of the mean tests.

7 CONCLUSIONS

The present paper proposed a simplified method to estimate the global second order effects in reinforced concrete structures, especially the framed system ones, and made a review of the method for dual system structures. The procedure was deduced using Galerkin’s method by weighted residuals and has applicability similar to the γz parameter, proposed in the NBR 6118 [1212 Associação Brasileira de Normas Técnicas, Projeto de Estruturas de Concreto – Procedimento, NBR 6118, 2023.].

Twenty-one 21 framed system structures were evaluated to define an analytical equation for the ζg parameter, whose quality was verified by the Nash-Sutcliffe coefficient [4343 J. E. Nash and J. V. Sutcliffe, "River flow forecasting through conceptual models part I – A discussion of principles," J. Hydrol. (Amst.), vol. 10, pp. 282–290, 1970.] and obtained a quality of 0.9901, being 1.00 a perfect adjustment. The results of the structures using the proposed model and the γz model were compared to the reference values (MASTAN2) in terms of displacement and internal forces. The comparisons were made by using visual and statistical parameters (PBIAS, MAE, MAPE, normality, homoscedasticity, and mean test). Based on the analysed structures, the proposed model leads to responses closer to the reference values than the γz coefficient, even in the range recommended by the NBR 6118 [1212 Associação Brasileira de Normas Técnicas, Projeto de Estruturas de Concreto – Procedimento, NBR 6118, 2023.]. The results of PBIAS, MAE and MAPE for the proposed model reached values of, at least, half of the γz model. The normality of the samples was verified by using the Shapiro-Wilk Normality test and the Bartlet test for the homoscedasticity test, before applying the mean test. The results observed by the PBIAS, MAE and MAPE were corroborated by these tests, which p-values for the proposed model were higher than the ones for the γz model. Therefore, for the analysed examples, the proposed model is more similar to the reference values. This conclusion was made for displacement and internal forces in the beams. For the bending moments in the columns, the proposed model leads to results higher than the reference ones, in favour of security, which errors reduce when the analysed structures are in the 1.10 <γz≤ 1.30 range, while the γz coefficient leads to worst results.

The same analyses were made for the dual system structures, in terms of internal forces. The conclusions were similar to those observed for the framed system structures, which errors were quite lower for the proposed model, than the γz model, and the p-values, in certain cases, reaching values near to 1.0. These conclusions concern all internal forces of beams columns. For the internal forces in the shear-wall, it was observed a behaviour similar to the columns in the framed system, which the proposed model leads to higher values of bending moments, that reduces when analysed in the 1.10 <γz≤ 1.30 range, reaching to errors and p-values near to the γz model.

In sum, for the analysed examples, the proposed model is more accurate than the one that uses the γz coefficient. Moreover, the proposed model maintains its accuracy even when the γz coefficient range is violated in its upper limit (γz≤ 1.30). For future researches, it is recommended to verify the accuracy of the proposed model for three-dimensional structures. If these models were appropriately tested, it might be considered as another simplified method to assess the stability of buildings in a future update of the NBR 6118 [1212 Associação Brasileira de Normas Técnicas, Projeto de Estruturas de Concreto – Procedimento, NBR 6118, 2023.].

APPENDIX A – WIND LOADS

The wind loads were calculated according to the NBR 6123 [22 Associação Brasileira de Normas Técnicas, Forças Devidas ao Vento em Edificações, NBR 6123, 1988.] recommendations, which are presented in Tables A1 and A2, for structures lower and higher than 50 m, respectively. If the storey is the last one of the structures, the wind load should be half of the presented value due to the wind influence area.

Table A1 Wind loads for structures lower than 50 m.
Storey Load (kN) Storey Load (kN)
1 36.00 9 65.15
2 43.41 10 67.03
3 48.43 11 68.78
4 52.34 12 70.42
5 55.59 13 71.95
6 58.40 14 73.41
7 60.88 15 74.79
8 63.11 16 76.10
Table A2 Wind loads for structures higher than 50 m.
Storey Load (kN) Storey Load (kN) Storey Load (kN) Storey Load (kN)
1 35.40 9 61.31 17 71.88 25 79.16
2 42.10 10 62.95 18 72.92 26 79.94
3 46.59 11 64.47 19 73.91 27 80.69
4 50.06 12 65.89 20 74.86 28 81.43
5 52.94 13 67.22 21 75.78 29 82.15
6 55.40 14 68.48 22 76.67
7 57.58 15 69.67 23 77.52
8 59.54 16 70.80 24 78.35

ACKNOWLEDGEMENTS

The authors acknowledge the Laboratory of Mathematical Modelling in Civil Engineering (LAMEC) of the Federal University of Sergipe (UFS). The first author acknowledges CAPES (Coordenação de Aperfeiçoamento de Pessoal de Nível Superior) for the financial support of his D.Sc. studies.

  • Financial support: None.
  • Data Availability

    The data that support the findings of this study are available from the corresponding author, D. L. N. F. Amorim, upon reasonable request.
  • How to cite: R. N. Cunha, C. S. Vieira, R. S. Gomes, L. D. Silva, L. A. Mendes, and D. L. N. F. Amorim, “Global second order effects in reinforced concrete buildings: simplified criterion based on Galerkin’s method”, Rev. IBRACON Estrut. Mater., vol. 17, no. 6, e17603, 2024, https://doi.org/10.1590/S1983-41952024000600003

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Edited by

Editors: Mauro Real, Guilherme Aris Parsekian.

Data availability

The data that support the findings of this study are available from the corresponding author, D. L. N. F. Amorim, upon reasonable request.

Publication Dates

  • Publication in this collection
    26 Jan 2024
  • Date of issue
    2024

History

  • Received
    13 Oct 2023
  • Accepted
    13 Oct 2023
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