Abstract

The present work is concerned with dynamic characteristics of beam-stiffened rectangular plate by an improved Fourier series method (IFSM), including mobility characteristics, structural intensity, and transient response. The artificial coupling spring technology is introduced to establish the clamped or elastic connections at the interface between the plate and beams. According to IFSM, the displacement field of the plate and the stiffening beams are expressed as a combination of the Fourier cosine series and its auxiliary functions. Then, the Rayleigh–Ritz method is applied to solve the unknown Fourier coefficients, which determines the dynamic characteristics of the coupled structure. The Newmark method is adopted to obtain the transient response of the coupled structure, where the Rayleigh damping is taken into consideration. The rapid convergence of the current method is shown, and good agreement between the predicted results and FEM results is also revealed. On this basis, the effects of the factors related to the stiffening beam (including the length, orientations, and arrangement spacing of beams) and elastic parameters, as well as damping coefficients on the dynamic characteristics of the stiffened plate are investigated.

1. Introduction

The stiffened plate component can be regarded as a coupling structure that is composed of a plate and several beams. In practical engineering, the connection between the plate and beam does not only involve the classical coupling, but the elastic coupling is also frequently encountered. In addition, due to the complexity of the actual working conditions, the stiffened plates will be often subjected to the elastic boundary restrictions. A good understanding of the dynamics of the stiffened plate with general boundary restrains can provide direct benefits to the structural design of complex systems. However, there are only a few literatures on the dynamic analysis of the rectangular plate with some beams of arbitrary lengths and orientations. The current work is to present the dynamic analysis of the beam-stiffened rectangular plate with general boundary restraints.

In the past decades, many scholars have made a lot of efforts on free vibration characteristics of the stiffened plate. Mukherjee and Mukhopadhyay [1] presented the free vibration of the isoparametric stiffened plate element, which could accommodate irregular boundaries. Holopainen [2] proposed a new finite element model to consider free vibration of eccentrically stiffened plate. In this research, a plate with any number of arbitrarily oriented stiffeners was presented. Based on the Rayleigh–Ritz method, Liew et al. [3] and Lee and Ng [4] both investigated the free vibration of the stiffened plate with arbitrarily oriented stiffeners. The difference was that Liew studied the stiffened plate with various shapes, while Lee only examined the stiffened rectangular plate. A hierarchical finite element in conjunction with local trigonometric interpolation functions was employed by Barrette et al. [5] to investigate the vibration performances of the stiffened plate. Employing the differential quadrature technique, free vibration of plate with eccentric stiffeners was performed by Zeng and Bert [6]. And their theoretical solutions were in good agreement with the experimental results. Using the finite element method, Srivastava et al. [7] explored vibration of the stiffened plate subjected to partial edge loading. However, only the simply supported and clamped cases were considered in their research. On the basis of the first-order shear deformable theory, Peng et al. [8] used mesh-free Galerkin method to carry out the free vibration and stability analyses of the stiffened plate. On the framework of the assumed-modes method, low-frequency free vibration analysis of the thin rectangular plate with a few light stiffeners was made by Dozio and Ricciardi [9]. Based on the improved Fourier series method, Xu et al. [10] examined the free vibration of the beam-stiffened rectangular plate, where beams of arbitrary lengths and placement angles were taken into consideration. Three different modelling approaches were reported by Bhar et al. [11] to carry out the component-wise vibration analysis of the stiffened plate, and comparative studies between different models were also given. The static, free vibration and buckling analysis of the stiffened plate were carried out by Nguyen-Thoi et al. [12] using CS-FEM-DSG3. In Ref. [13], the CS-FEM-DSG3 method was also extended to analyze the static and free vibration of stiffened folded plates, where three-node triangular element was adopted. Four hierarchical models were developed by Bhaskar and Pydah [14] to obtain the natural frequencies of the isotropic and orthotropic stiffened plate with simply supported boundary condition. On the basis of the elastic approach, Pydah and Bhaskar [15] established an analytical model to investigate the statics and dynamics of the stiffened plate with simply supported case. Based on the assumed mode method, Cho et al. [16] investigated natural frequencies and modes of various opening stiffened panels under different boundary conditions, where the effect of the parameters of the rib on the frequency was checked. Then, he and other co-authors [17, 18] carried out the free vibration analysis of the stiffened panel with lumped mass and stiffness attachments, including rectangular plates without opening and with various opening shapes. Utilizing the NURBS based on isogeometric analysis approach, Qin et al. [19] examined the frequency characteristics of curved stiffened plate under in-plane loading. Considering a beam-stiffened plate, Yin et al. [20] examined its vibration transmission by applying the dynamic stiffness method, where the transmission mode was presented. Meanwhile, Damnjanović et al. [21] adopted the same approach to perform the free vibration analysis of the stiffened composite plate based on the high-order shear deformation theory, and the results were in good agreement with the available data and FEM results.

Through the abovementioned review of literatures, the predecessors have conducted in-depth research on the free vibration of the stiffened plate. Nevertheless, many scholars are not satisfied with research in the field of free vibration. Harik and Salamoun [22] applied an analytical strip method to examine bending deflection of the stiffened plate, where the type of load and the number of ribs were used to determine the number of strips. Transient response of the simply supported panel reinforced by stiffeners was predicted by Louca et al. [23] using the finite element technique, where the effect of boundary condition on transient response was considered. Sheikh and Mukhopadhyay [24] applied the spline finite strip method to analyze the linear and nonlinear transient vibration of the stiffened plate with arbitrary shapes, in which stiffeners had arbitrary orientation and eccentricity. Based on finite element analysis, Srivastava et al. [25] presented the dynamic instability of the stiffened plate, where both in-plane partial and concentrated loadings at the edge were examined. Xu et al. [26]. developed the structural intensity technique to analyze energy flow for the stiffened plate applied in the field of marine structures. Later, the same authors [27] investigated the structural intensity of the stiffened plate by means of the finite element method. In this research, they draw a conclusion that the energy flow of the whole structure was closely related to the natural frequency. Employing the harmonic compound strip method, Borković et al. [28] obtained the transient response of the beam-stiffened plate, where Bernoulli–Euler beam and Kirchhoff–Love thin plate were both applied. Combining the Mindlin plate theory and Timoshenko beam theory, Cho et al. [29] extended the assumed mode method to predict forced vibration of the stiffened plate and rectangular plate with various boundary restrains. Tian and Jie [30] carried out the research on the dynamic response of the finite ribbed plate under point force moment excitations, and he concluded that the input mobilities were affected by the distance between the excitation point and the beam. Then, he [31] performed the vibration response analysis and experiment of the stiffened plates subjected to the clamped support at edge. In 2018, he [32] introduced a double cosine integral transform technique to study the free vibration and forced response of the stiffened plate with free boundary restrains. Meanwhile, the energy flow of stiffened panels was reported by Cho et al. [33], where the structural intensity technique was applied. In order to efficiently solve the dynamic responses of the stiffened plate in wide frequency domain, Jia et al. [34] proposed a Composite B-spline Wavelet Elements Method (CBWEM) and verified the reliability of the method by comparison with experimental results. Applying the Mindlin plate and Timoshenko beam theory, Liu et al. [35] analyzed the dynamic power transmission characteristics of a finite stiffened plate with various classical cases, where the effects number and geometric dimensions on the stop band in the low-frequency domain were shown.

Through the review of the abovementioned literature, it can be found that the existing researches are limited to the dynamic of beam-stiffened plate with classical boundary conditions (like clamped, simply supported, and free). Only the free vibration analysis related to elastic boundary conditions and nonfixed connections between a plate and beams is carried out in Xu’s et al. [10] research. However, the investigations on the mobility characteristic, structural intensity, and transient response analysis of the stiffened plate subjected to the elastic boundary are still blank. In an attempt to fill this gap, the current work presents the dynamic analysis of the rectangular beam-reinforced plate with general boundary restraints, including classical and the elastic restraints as well as elastic coupling of beams and plate. IFSM is extended to construct displacement field of the beam-stiffened plate, which has proven to be a very effective method from existing research [10, 36–38]. The artificial spring technology is introduced to obtain general boundary conditions and various coupling connections between a plate and beams. Based on Xu’s et al. [10] research, the energy expressions of the coupling system is obtained, which can be solved by the Rayleigh–Ritz method. Transient response of the stiffened plate with classical or elastic boundary restrains is also calculated by the Newmark method. The consistency of the current data and FEM results is revealed. Also some novel numerical results with respect to the structural intensity, structural mobility, and transient response of the stiffened plate are also reported.

2. Theoretical Formulations

2.1. Descriptions of the Model

The geometry of a typical beam-stiffened plate and the coordinate system of the coupling structure are depicted in Figure 1. For the sake of illustration, only a thin plate reinforced by a beam with any lengths and angles is shown in Figure 1(a), where a, b, and h denote the length, width, and thickness of the plate, respectively. In addition, the primary coordinate system (o-x-y-z) is placed on the middle surface of the plate, where u, , and represent the midsurface displacements of the plate in the primary coordinate system, respectively. The width and height of the cross section for a stiffening beam are denoted by b_b and h_b, respectively, which is in the local coordinate system (o’-x’-y’-z’). Four types of boundary springs are used on each edge of the plate to obtain arbitrary boundary conditions, in which three types (, k_u, and ) of linear springs and one type of rotational spring () are included. For a thin plate, the clamped boundary condition will be obtained when the spring stiffness value of each side of the plate is infinity. Conversely, the free boundary is easily achieved when the stiffness value is 0. In current work, the stiffening beam and plate are described in separate systems. As shown in Figure 1(a), six sets of coupling springs are used to achieve the connection between the beam and plate, including three linear springs (k_pb1, k_pb2, and k_pb3) and three types of rotational springs (K_pb1, K_pb2, and K_pb3). By setting stiffness values of coupling springs, different coupling relationships between the beams and plate can be achieved, including various elastic coupling and clamped coupling. It should be noted that the coupling between two intersecting beams is ignored in this paper. From Figure 1(b), the orientation between the local coordinate system (o’-x’-y’-z’) attached to each beam and the primary coordinate system (o-x-y-z) is denoted by the symbol of when the length of the beam is expressed by L. And the coordinates of the starting end of the beam in the primary coordinate system are represented by (x₀, y₀).

(a)

(b)

(a)
(b)

Figure 1 

Schematic diagram of the coupling systems. (a) Geometry of rectangular plate reinforced by arbitrarily orientated beams. (b) Schematic of an arbitrarily placed beam.

2.2. Energy Functionals

In this study, both the in-plane displacement components (u, ) and the out-of-plane displacement component () of the plate are considered. Therefore, the total strain potential energy (V_p) of the plate is composed of the out-of-plane strain potential energy () and the in-plane strain potential energy (). Specifically, the expression of the total potential energy is as follows:in which

Similarly, the kinetic energy (T_p) expression of the plate can be written as

In equations (2)∼(4), is the bending stiffness of the plate and E_p, G_p, , , and represent Young’s modulus, extensional rigidity, Poisson’s ratio, mass density, and circular frequency, respectively [10].

Since the boundary conditions of the plate are realized by the artificial virtual spring technology, the elastic potential energy (V_sp) stored in the boundary springs here should be taken into the potential energy of plate. V_sp can be expressed as

In this paper, four degrees of freedom for a single beam are considered, which are two bending displacement components (wy b and wz b) in the y′ and z′ directions and the axial displacement component (u_b) and torsional displacement component () in the x’ direction. Therefore, the strain potential energy (V_bi) of ith beam can be written as

The kinetic energy of ith beam can be expressed as

In equations (6)∼(7), Dz bi and Dy bi are, respectively, the bending rigidity in the x’-z’ plane and x’-y’ plane when torsional is denoted by the symbol of J_bi. In addition, Young’s modulus, shear modulus, mass density, and cross-sectional area of ith beam are taken place of E_bi, G_bi, , and A_bi, respectively.

Since the stiffening beam and plate is connected by a coupling spring, the coupling potential (Vpb Ci) of the coupling spring needs to be considered in the coupling system. According to references [10, 39], its specific expression can be written as

It should be noted that six degrees of freedom between the beam and the plate are considered here. As shown in equation (8), three sets of linear springs (k_pb1, k_pb2, and k_pb3) are used for linear displacement constraints and three sets of rotational springs (K_pb1, K_pb2, and K_pb3) are used for angular displacement constraints. Besides, and are shown as follows

2.3. Displacement Function

In the present research, the admissible displacement functions of a plate and a beam are established by IFSM, which has been successfully applied to solve the vibration of beams [40, 41], plates [42, 43], and shells [44]. The improved Fourier series consists of main functions and auxiliary functions. For the auxiliary functions, theoretically, they may have infinite forms. Considering programming and computational efficiency, a set of sine functions is used as auxiliary functions. Hence, the displacement functions of the plate can be written as follows:in whichwhere , and M, N represent the number of truncations. Fourier coefficients of displacement functions for the plate are expressed by Au mn, a_ml, b_ln, Bv mn, c_ml, d_ln, Cw mn, e_mp, and f_pn (l = 1, 2; p = 1, 2, 3, 4), respectively.

Similarly, the displacement field functions of the ith beam can be obtained by IFSM as follows:where

In the above equations (14a)∼(15d), and M1 indicates the truncated number. D_mi, E_mi, F_mi, and G_mi represent the unknown coefficient of ith beam’s displacement functions.

2.4. Steady-State Vibration Solution

For the calculation of the steady-state response for the beam-stiffened plate under external excitation, it is necessary to consider the work done by the external force. In terms of the coupling structure shown in Figure 1(a), the Lagrange function (L) can be expressed as follows:in which the number of stiffening beams is denoted by N, i = 0 means unreinforced bare plate, and W_exc represents the work done by the external excitation force acting on the plate:

In the above equations (14a) and (14b), the external load distribution function on the plate is denoted by the symbols of f_u, , and . In the current research, is taken into consideration, which expresses the lateral load associated with out-of-plane displacement () of the plate. In particular, for external point excitation, is represented by the magnitude (F) of the point excitation force and the 2D delta function ():

Substituting equations (1)∼(8), (10), (13), and (17) into equation (16), linear equations in the matrix form are available by employing the Rayleigh–Ritz method:where the vector is composed of the unknown Fourier coefficient, denotes the external force vector, and the mass matrix and stiffness matrix of the coupled systems are displayed by M and K, where their elements are only related to the material properties, geometric dimensions, and boundary constraints of the beam-stiffened plate structure. And their expressions are presented as follows:

For the external excitation force with any frequency, the unknown series expansion coefficient related to displacement functions of the coupled structure can be directly calculated from equation (19). That is,

Substituting equation (22) into equation (10), the displacement response of plate reinforced by beams under some specific excitation will be obtained. And vibration speed can also be obtained by . Particularly, the complex Young’s modulus () is introduced in the current numerical solution process. is composed of Young’s modulus (E_p) and structural loss factor (), where is the imaginary unit.

The structure mobility can quantitatively describe the law of power flow in the structure. Therefore, understanding the admittance characteristics of the stiffened plate is of great significance for structural vibration control. The structure mobility can be calculated by the following equation:in which Y_nk represents the transfer mobility from point n to point k when V_k is utilized to express the velocity at point k. And the magnitude of the excitation force on point n is presented by F_n. The mobilities of the drive point n can be achieved by setting n = k.

The vibration energy of the structure can be described by the structural intensity vector, which helps the designers understand the energy distribution of the structure. The definition of structural intensity can be found in references [26, 37, 45]. In this paper, the structural intensity vector I (x, y) of any point in the stiffened plate can be obtained by vector superposition of the component I_x (x, y) along the x-axis and component I_y (x, y) along the y-axis. Their relationship is seen in the following equation:

In equation (24), the structural intensity at any point includes both bending vibration components and in-plane vibration components, as shown in equations (25a) and (25b):

In the above equations (25a) and (25b), the structural intensity components associated with structural bending vibrations in both directions arein which the symbol of () represents the conjugate of a complex number. And the transverse shear, bending moment, and torque in the two directions are, respectively,