Abstract

The free vibration characteristics of steel-concrete composite continuous beams (SCCCBs) are analyzed based on the Euler–Bernoulli beam theory. A modified dynamic direct stiffness method has been developed, which can be used to analyze the SCCCBs with some lumped masses and elastic boundary conditions. The results obtained by the proposed method are exact due to the elimination of approximated displacement and force fields in derivation. The proposed method is verified by comparing its results with those obtained by ANSYS software and laboratory tests. Then, the influencing factors on the reduction of natural frequency are analyzed and discussed in detail using the proposed method. The results show that stronger interfacial interaction results in higher values of natural frequency as well as larger steel subbeam and thinner concrete slab. The smaller the natural frequency of the SCCCBs is, the more significant effect the interfacial interaction on the natural frequency is. The reduction of natural frequency is not affected by the different numbers of spans but the equal single-span length and various ratios of the side span to the main span but equal total length, but it is influenced by the extra single-span length and different ratios of the side span to the main span but equal main span length. And it is only affected by bending stiffness. Furthermore, the reasonable ratio of the side span to the main span is 0.9∼1.0.

1. Introduction

Due to the clear advantages of larger spans, higher load-bearing capacities, and more convenient construction, steel-concrete composite beams (SCCBs), especially the steel-concrete composite continuous beams (SCCCBs), are widely applied in railway bridges with the development of the high-speed railway. The SCCCBs are compared with a concrete slab in the compressive portion and a steel subbeam in the tensile portion and connected by shear studs which can transfer the shear force. Therefore, the overall mechanical performance of the SCCCBs depends not only on the material properties of steel subbeam and concrete slab but also, to a large extent, on the connection performance of shear studs. The interfacial shear slip will occur between the subcomponents owing to the flexibility of shear studs, which can reduce the natural frequencies of SCCCBs significantly. On the other hand, in practice, some lumped masses are usually attached to the SCCCBs (Figure 1), which makes the dynamic behaviors of SCCCBs more complex. Therefore, it is important to put forward a new method to analyze the dynamic performance of SCCCBs with some lumped masses.

Figure 1 

SCCCB longitudinal and cross-sectional views.

Research studies on the dynamic characteristics of SCCBs had been well conducted. Girhammar and Pan [1] derived the governing differential equations of motion and presented the exact and approximate solutions of SCCBs with four common boundary conditions, namely: case 1—clamped-free, case 2—pinned-pinned, case 3—clamped-pinned, and case 4—clamped-clamped. Afterward, exact dynamic and static analyses of SCCBs with consistent boundary conditions were conducted [2, 3]. The eigenmode length coefficients of eigenmode () were given as follows: and for case 1; for case 2; for case 3; for case 4. These are of great significance to approximately analyze the dynamic performance of SCCBs in practice. Wu et al. [4] and Grundberg et al. [5] derived the governing differential equations of motion for the SCCBs with axial force and proposed an approximate simple expression to predict the fundamental frequency. Huang and Su [6] gave the nondimensional key parameters that govern the fundamental frequency which were a composite connection parameter and a section combination parameter. Hou et al. [7] proposed a curvature mode measurement method to identify the shear studs damage of SCCBs. Čas et al. [8] proposed a three-dimensional mathematical model for analyzing the dynamic behaviors of SCCBs. It indicated that the deformations in transverse XZ and lateral XY planes are mutually independent. Sun et al. [9] proposed a finite element method, which can be used to analyze the SCCBs with variable bending stiffness in the x-direction. The above analyses were all based on the Euler–Bernoulli beam theory.

For analyzing the influence of rotary inertia and shear deformations, some researchers [10–14] used the Timoshenko beam theory to describe the dynamic performance of each subbeam. In particular, in the analysis models of Dilena and Morassi [13] and Nguyen et al. [14], two subbeams hypothetically did not have the same rotation and curvature. For the Timoshenko beam theory, Civalek et al. [15–17] and Laura and Gutierrez [18] proposed the differential quadrature (DQ) and harmonic differential quadrature (HDQ) and discrete singular convolution method (DSC), which is of great significance to the further dynamic research of SCCBs. Some researchers [19–24] applied higher-order beam theory (Reddy beam theory [19–21] and Kant beam theory [22–24]) to analyze the dynamic characteristics of SCCBs. But the amount of computation increased because there are too many unknown parameters in those models. The above analysis about the effect of rotary inertia (RI) and shear deformations (SD) on the dynamic behaviors of SCCBs showed that SD and RI could be ignored within about 3% error if only the first six eigenmodes were considered for simply supported SCCBs [11, 12]. Usually, the first three eigenmodes, particularly the first eigenmode, were the most important in practice. Therefore, the study in this paper was based on the Euler–Bernoulli beam theory.

All the above research articles are about the SCCBs. Up to now, research studies on the dynamic performance of SCCCBs are insufficient. Fang et al. [25] presented a simplified calculation model and developed the Mode Stiffness Matrix to investigate the dynamic characteristics of SCCCBs. Then, using this method, the influence of span ratios and shear connection stiffness on natural frequencies was analyzed based on two-span SCCCBs. The results indicated that the natural frequency reduction ratios were totally the same for two-span SCCBs with different span ratios but uniform shear connection stiffness. However, the research targets of Fang et al. [25] were just the two-span SCCCBs and the cross-sectional stiffness ratio was a constant value, which limited the general applicability of its conclusions. Wang et al. [26] proposed a numerically stable dynamic stiffness matrix method to calculate the higher-order frequencies of SCCCBs. This method was verified by comparing the field measurements of the dynamic responses of a real multispan continuous composite bridge. In summary, research studies on the influencing factors upon the natural frequencies of SCCCBs were insufficient. Therefore, further research studies were necessary for dynamic behaviors of SCCCBs.

The dynamic stiffness matrix method mentioned in [26] was a popular and favorable finite element method, which had recently been applied to analyze the dynamic performance of SCCBs and SCCCBs [26–29]. This method was theoretically exact and useful for that with variable bending stiffness along the x-direction, which had been confirmed in [29]. However, on the one hand, all the above research articles did not consider the lumped masses that are attached to the beam as shown in Figure 1. On the other hand, they proposed solutions of structures under seven common boundary conditions, but its applicability to structures with elastic boundary conditions was very restricted. Among other things, there was a lack of a simple, effective calculation approach to evaluate the natural frequencies of SCCCBs.

This paper is an extension of the dynamic stiffness matrix method proposed in [29]. The purpose of this paper is to present a modified dynamic stiffness matrix method to obtain the exact natural frequencies of SCCCBs with lumped masses and elastic boundary conditions based on the Euler–Bernoulli beam theory. Utilizing the proposed modified method, a number of influencing factors upon the natural frequencies of SCCCBs, namely, interfacial interaction, cross-sectional stiffness ratio, number of spans, single-span length, the ratio of the side span to the main span, and lumped masses, are analyzed and discussed in detail.

2. A Modified Dynamic Direct Stiffness Method

2.1. Basic Assumptions

All analyses in this paper are based on the Euler–Bernoulli beam theory, which ignores the shear deformation and moment of inertia. Only in-plane bending behaviors are taken into account, excluding torsion and out-of-plane bending behaviors. Also, the axial motion and damping are ignored. The two subbeams can relatively slip in the x-direction at the interface, but they cannot separate in the z-direction. And the initial cohesive force at the interface between subbeams is neglected. The above assumptions are consistent with those presented earlier by Sun et al. [29].

As shown in Figure 1, the research object is the steel-concrete composite beam with variable bending stiffness along the x-direction caused by the uneven distribution of shear studs. The lumped masses () usually attached to the beam in practical engineering are also considered. The shear studs between the concrete slab and steel beam are regarded as continuous and uniformly distributed in the range of , , and . The shear force at the steel-concrete interface per unit length () versus shear slip () relationship is linear elastic, i.e., , where (see Figure 1) is a constant slip modulus.

2.2. Differential Equations of Motion

If we ignore the lumped masses () and consider the free-body microelements of SCCCBs as shown in Figure 2, the governing equation of motion can be written as follows [29]:where is the algebraic sum of the bending stiffness of the two subbeam sections around the centroid axis of the whole cross section which can be called the slip stiffness. , , , and are Young’s modulus and the cross-sectional area of concrete slab and steel subbeam, respectively. and are the slip angle and the vertical displacement, respectively. is the algebraic sum of the bending stiffness around the respective centroid axis of subbeams which can be called the bending stiffness. is the linear meter weight that can be assumed to be a constant. and are the moment of inertia due to the bending of each subbeam. is the distance between the centroid axis of the subbeams.

Figure 2 

Analysis model of the SCCCB microelements.

Substituting equation (2) into equation (1) gives the differential equation of governing motion for the SCCCB without lumped masses as follows [29]:where , , and . is the bending rigidity of the SCCCBs when there is no slip at the interface, i.e., . It can be seen from equation (3) that there are two important parameters, namely, the composite parameter in relation to the partial interaction and the nondimensional section combination parameter in relation to the cross-sectional stiffness ratio, which makes the motion differential equations of SCCCBs different from that corresponding to the elementary beam theory.

Based on the research of Sun et al. [29], and included in equations (1)∼(3) can be decoupled using the method of separating variables as the following form.where and are the mode functions, respectively. are the structural natural frequencies, and is the initial phase.

In addition, we can obtain the solution of equation (3).where the real constant can be obtained by the boundary conditions which lead to the natural frequencies and mode shapes.

2.3. A Modified 6-DOF Dynamic Stiffness Element

Figure 3 shows an SCCCB element with two lumped masses at both ends. We can see that there are six displacement boundary conditions, namely, vertical displacement (), bending angle (), and slip angle (). The bending angle () is the same for the concrete slab and steel subbeam. The slip angle () is caused by a couple of axial forces ( and ) acting on the neutral axis of the two subbeams. There are also six force boundary conditions at both ends of the element corresponding to the six displacement boundary conditions, which are shear force (), the algebraic sum of the subbeam moment (), and slip moment ().

Figure 3 

Six boundary conditions of the SCCCB element.

Considering the lumped masses ( and ) at both ends of the element, the six force boundary conditions can be expressed as follows, because the moment of inertia is ignored as described in the basic assumptions.

Combining equations (1) and (2) yields the relationship between the mode shape function of slip angle () and that of vertical displacement ():

Hence, the displacement boundary conditions, namely, vertical displacement (), bending angle (), and slip angle (), can be expressed in the following form by using equations (5) and (7).where , , , , , , , , , , , , , , , , , , , , , , , , , , , and . () can be found in Appendix.

Similarly, the six force boundary conditions at both ends, namely, shear force (), the algebraic sum of the subbeam moment (), and slip moment (), can be expressed aswhere , , , , , , , , , , , , , , , , , , , , , , , , , , , , , and . and () can be found in Appendix.

Combining equations (8) and (9) yields the element dynamic stiffness matrix, i.e., K_e, as follows:

When analyzing the natural frequency of the SCCCBs, the overall dynamic stiffness matrix, i.e., , can be assumed in a similar process as the static direct stiffness method.

The elastic boundary conditions as shown in Figure 1 can be written as follows:

There are three typical boundary conditions usually considered: simply supported (S), free (F), and clamped (C). For the single-span SCCBs, four different boundary conditions at both ends, namely, S-S, C-F, C-S, and C-C, are usually used in the project, which can be written as follows based on equation (12):where is the support position along the x-direction.

For the SCCCBs, the boundary conditions can be expressed as follows:where is the support position along the x-direction.

The solving process of natural frequencies can be conveniently carried out as follows: Step 1. Substituting the boundary conditions into equation (11) and removing the row and column with the displacement of zero in give a new global dynamic stiffness matrix . Step 2. Assume the natural frequency . Step 3. Substitute into , and make determinant equal zero. Step 4. If the determinant is not equal to zero, then adjust and repeat steps 2∼3.

3. Results and Discussions

3.1. Verification of the Proposed Method

3.1.1. Example 1: Experimental Verification

This section focuses on the verification of the proposed method by a two-span SCCCB in the laboratory. The natural frequencies obtained by the proposed method were compared with those by ANSYS software and laboratory tests. Therefore, the proposed method was verified.

I-section is used as a test beam as shown in Figure 4. A concrete slab with 100 mm in height and 1200 mm in width is adopted. The density and elasticity are selected to be and , respectively. The density and elasticity of steel subbeam are and , respectively. The shear connector has a height of 80 mm and a diameter of 16 mm. The span length is .

Figure 4 

Beam geometry and dimensions (mm).

The fundamental frequencies of the test SCCCBs obtained by the proposed method, the ANSYS software, and the test in the laboratory are listed in Table 1. The experimental setup is shown in Figure 5(a). In the ANSYS Finite Element Analysis (FEA) model (see Figure 5(c)), the concrete slab is simulated using the SOLID65 element, the steel subbeam with the SHELL63 element, and the shear connector using the COMBIN39 element.

Figure 5 

The beam under experimental testing and FEA modeling. (a) The test beam. (b) Test result (21.56 Hz). (c) FEA model. (d) FEA result.

The shear-slip curve of the shear connector can be defined as follows:where is the ultimate load of the shear connector, the coefficients and were determined experimentally [30], is the slip displacement, is the cross section of the shear connector, and are Young's modulus and the compressive strength of the concrete slab, respectively, and is the ultimate tensile strength of the shear connector.

Hence, the shear connector stiffness can be obtained using the secant of the shear-slip curve at [7, 29, 31] as shown in Figure 6. is 2246.7 MPa from 0 to 1050 mm and 11350 mm to 12400 mm, 1001.8 MPa from 1050 mm to 5350 mm and 7050 mm to 11350 mm, and 2353.0 MPa from 5350 mm to 7050 mm.

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(b)

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Figure 6 

The shear-slip curve of a single stud (Q-s).

Table 1 shows that the eigenfrequencies of the test SCCCBs. The results show that for the first-order frequency, the results obtained by the proposed method agree well with those obtained by laboratory testing and ANSYS. In Table 1, the relative errors to the test result are within 2%. However, for the second-order frequency, the errors of the proposed method relative to the test results are 11.3%. These errors can be attributed to the following reasons: neglecting the effect of shear deformation, longitudinal uneven arrangement of the shear connectors, division of the structural units, and measurement errors. In a word, the modified dynamic direct stiffness method can be used to analyze the dynamic characteristics of the SCCCBs with variable bending stiffness along the x-direction. And it is meaningful to further study the effect of shear deformations on the eigenfrequency of SCCCBs. It is worth mentioning that the research on those aspects is in the works.

3.1.2. Example 2: Numerical Example

In this section, three numerical models are applied to verify the proposed method. The cross-section dimensions and material properties of the beam are shown in Figure 7. The three models are as follows: Case 1: a simply supported SCCB, , which are present in the published papers [6] Case 2: a two-span SCCCB, (5% of the weight of the beam) Case 3: a two-span SCCCB, (10% of the weight of the beam)

Figure 7 

Cross-section dimensions and material properties (mm).

In the ANSYS FEA model (see Figure 8) of example 2, the upper and lower subbeams are all simulated using the SOLID65 element, and the shear connector using the COMBIN39 element.

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(b)

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Figure 8 

FEA model of example 2. (a) Case 1. (b) Case 2 and Case 3.

Table 2 shows that the fundamental frequencies obtained by analytical solution, the proposed method in this paper, and ANSYS FEA are all about the same for simply supported SCCB with different shear connector stiffness. The maximum relative error between the proposed method and ANSYS FEA is just 1.0%, which can be concluded that the results obtained by ANSYS FEA can be used as a reference to verify the proposed method.

Table 3 shows that the two results obtained by the proposed method and ANSYS FEA are basically the same, and the maximum relative error is just 0.92% for Case 2 and Case 3. The main reason is that the shear deformation and moment of inertia are ignored in the proposed method. In short, the modified dynamic direct stiffness method proposed in this paper can be used to analyze the dynamic behaviors of SCCCBs with some lumped masses.

3.2. Analysis of Influencing Factors

This section focuses on the analysis and discussion of the influencing factors: interfacial interaction, cross-sectional stiffness ratio, number of spans, single-span length, and the ratio of the side span to the main span on the natural frequencies of the SCCCBs by using the proposed method based on the numerical model as shown in Figure 7.

Equation (3) shows that two key parameters ( and) make the motion differential equations of SCCCBs differ from those corresponding to the elementary beam theory. Therefore, they can be used as evaluation indexes of two influencing factors: interfacial interaction and cross-sectional stiffness ratio. In engineering practice, has a wide range of variations. When (), the motion differential equations can degenerate into that corresponding to the elementary beam theory. In contrast, when (), the SCCCB degenerates into two independent subbeams. The values of , usually, range from 0.7 to 5.0 for typical steel-concrete composite beams [6, 29]. In addition, a higher value of corresponds to a thicker concrete slab and smaller steel subbeam and vice versa.

The fundamental frequency ratios () calculated by equation (11) are used to evaluate the fundamental frequency reduction of SCCCB, where is the fundamental frequency of the steel-concrete partial interaction composite beams (PCBs, is finite) and is that of the steel-concrete full interaction composite beam (FCBs, is infinite).

3.2.1. Interfacial Interaction and Cross-Sectional Stiffness Ratio

The fundamental frequencies of SCCCBs with a span of (three spans each with ) are attained by equation (11). Hence, the influence of interfacial interaction () and cross-sectional stiffness ratio () on is presented in Figure 9.

Figure 9 

of SCCCB with different and .

Figure 9 shows that the fundamental frequencies of PCBs are all smaller than those of FCBs owing to the contribution of the flexible shear studs. However, when (), the value of equals 1. This indicates that the partial interaction between the concrete slab and steel subbeam reduces the fundamental frequencies of SCCCBs.

For a constant value of , the value of decreases steeply even when changes slightly at a small level. However, it keeps a steady value at the large level. When , the cut-off point is ; it, gradually, drops with the decrease of .

For a nonzero constant value of , the values show a nonlinear growth with the decrease of ; smaller values lead to a larger growth trend. This behavior indicates a weaker influence of interfacial interaction. Ultimately, the values of approach 1 which reveals that the dynamic behaviors of SCCCB with a thin concrete slab and large steel subbeam approach those corresponding to the elementary beam theory with the gradual decrease of .

3.2.2. Number of Spans and Single-Span Length

Figure 10 shows the values of of SCCCB with different span numbers and single-span length considering that the value of equals 2.0. In analyzing the influence of spans’ number (), the spans are (n = 1∼5), whereas in that of the single-span length, (), the spans are (L = 4.0∼8.0).

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Figure 10 

Values of of SCCCBs with different numbers of spans and single-span length. (a) The number of spans. (b) The single-span length.

For the SCCCBs with different numbers of spans but equal to the single-span length, Figure 10(a) clarifies that the values of are basically the same as the fundamental frequencies. It is the same as the general continuous beams. decreases with the increase of and maintains stable values when is larger than 20. This refers to the fact that if the fundamental frequencies of SCCCBs are basically equal, the interfacial interaction influence is the same entirely.

For the nonzero constant value of , the values of obviously increase with the increase of the single-span length as shown in Figure 10(b). Larger single-span length results in lower fundamental frequencies of SCCCBs. It indicates that smaller natural frequency leads to more influence of interfacial interaction.

3.2.3. Ratio of the Side Span to the Main Span

The values of of SCCCBs with different ratios of the side span to the main span, () and considering are analyzed as shown in Figure 11. As shown in Figure 11(a), the total length of the beam equals 12.0 m, and the spans are distributed based on values: when , when , when , when , when, and when . As shown in Figure 11(b), the length of the main span equals 8.0 m, and the spans are distributed based on values: when, when , when , when , when, and when .