Comparative Analysis of Free Optical Vibration of Lamination Composite Optical Beams Using the Boubaker Polynomials Expansion Scheme and the Differential Quadrature Method

1 Department of Mathematics, Faculty of Science and Letters, Pamukkale University, 20020 Denizli, Turkey 2 Institut Supérieur des Etudes Technologiques de Radès, 2098 Tunis, Tunisia 3 Equipe de Physique des Dispositifs à Semiconducteurs, Faculté des Sciences de Tunis, Campus Universitaire, 2092 Tunis, Tunisia 4 Department of Mechanical Engineering, Pamukkale University, 20017 Denizli, Turkey 5 Department of Software Engineering, Faculty of Engineering, Gümüşhane University, 29100 Gümüşhane, Turkey 6 Department of Geomatic Engineering, Faculty of Engineering, Gümüşhane University, 29100 Gümüşhane, Turkey 7 Department of Mathematics, Quaid-i-Azam University, Islamabad 45320, Pakistan


Introduction
Free optical vibration of generally laminated beams has been of increasing interest in the last decades' literature [1][2][3][4][5][6][7][8][9][10][11][12].Vo et al. [1] investigated free vibration of axially loaded thin-walled composite beams with arbitrary lay-ups.The proposed model was based on equations of motion for flexural-torsional coupled vibration which were derived from the Hamilton's principle.In the same context, Li et al. [2] studied the free vibration and buckling behaviors of axially loaded laminated composite beams using the dynamic stiffness method.The model took into account influences of axial force, Poisson effect, axial deformation, shear deformation, and rotary inertia.Hu et al. [4] Karami et al. [5], and Malekzadeh et al. [6] proposed a differential quadrature element method (DQEM) by using Hamilton's principle for free vibration analysis of arbitrary nonuniform Timoshenko beams on elastic supports.
In this paper, a model on the vibration analysis of laminated composite beam has been developed and studied using two resolution protocols.For the beam used, it is assumed that Bernoulli-Euler hypothesis is valid.The results obtained by the two methods are compared.It has been concluded that all of the results are very close to each other.

Problem Formalization
The normal stress in jth layer of a composite laminated beam shown in Figure 1 can be written in the following way: According to Bernoulli-Euler hypotheses, the deformation at a certain distance from neutral plane is where ρ is the curvature of the beam.The relationship between normal stress and bending moment is given by or where h and b are the height and the width of the beam, N is the number of layer and z j is the distance between the outer face of jth layer, and the neutral plane.The relationship between the bending moment and the curvature can be written as follows: where E ef is the effective elasticity modulus and I yy is the cross-sectional inertia moment of the beam.Flexural motion of a linear elastic laminated composite beam without shear or rotary inertia effects is described by Bernoulli-Euler equation: As a solution of ( 6), it can be used a separation of variables solution for harmonic free vibration: where ω n is the frequency and W(x) is the mode shape function of the lateral deflection.Substitution of this solution into (6) eliminates the time dependency and yields the following characteristic value problem: where λ is the dimensionless frequency of the beam vibrations given by For a cantilever composite laminated beam shown in Figure 1, the boundary conditions at the two ends are due to the deflection and rotation both being zero at the clamped end, and due to the bending moment and shear force both vanishing at the free end.The analytical solution of (8) subjected to (10) and (11) yields the frequency equation: which may be found in the relevant literature [13].

DQM Solution
DQM method is carried out for the approximate solution of the characteristic value problem in (8) with the boundary conditions given by ( 10) and ( 11) by first discretizing the interval [0, L] such that 0 where N is the number of grid points.Application of the DQM to discrete the derivative in (8) leads to where A (4)  i j are the weighting coefficients of the fourthorder derivative which can be calculated using the explicit relations given by Shu [14].Note that we have two boundary conditions specified at both ends.These two conditions at the same point provoke a great challenge for the DQM, because we have only one quadrature equation at one point in the DQM, which prevents implementing the two boundary conditions.We use δ-point technique to eliminate the difficulties in implementing two conditions at a single boundary point (Figure 2).Following the same approach presented in [15], the boundary conditions at x = 0 can be discretized as Similarly, the boundary conditions at x = L can be discretized as The assembly of ( 13) through (15) yields the following set [14] of linear equations: where the subscripts b and d indicate the grid points used for writing the quadrature analog of boundary conditions and the governing differential equation, respectively.By matrix substructuring of ( 17), one has the following two equations: From the first part of ( 18), one obtains Back-substituting (19) into the second part of (18), one gets where [S] is of order (N − 4) × (N − 4) and given by Both the eigenvalues being the frequency squared values and the eigenvectors {W d } describing the mode shapes of the freely vibrating beam may be obtained simultaneously from the [S] matrix.
Figure 2: A one-dimensional quadrature grid with adjacent δpoints.

BPES Solution
The BPES [16][17][18][19][20][21][22][23] is applied to (8) through setting the expression where B 4k are the 4k-order Boubaker polynomials, x ∈ [0, L] is the normalized time, r k are B 4k minimal positive roots, N 0 is a prefixed integer, and λ k | k=1,...,N0 are unknown pondering real coefficients.Consequently, it comes for (8) that The related boundary conditions expressed through (10) and (12).The BPES protocol ensures their validity regardless main equation features.In fact, thanks to Boubaker polynomials first derivatives properties are Boundary conditions are inherently verified: The BPES solution is obtained through five steps: (i) Integrating, for a given value of N 0 , the whole expression given by ( 23) along the interval [0, L].
(v) Ranging the obtained frequencies.

Results and Discussion
Natural frequencies of the symmetric laminated composite cantilever beam have been estimated using the Boubaker Polynomials Expansion Scheme (PBES) and the Differential Quadrature Method (DQM), and for parameters values indicated in Table 1. Figure 3 presents the obtained values.
The results have been evaluated as quite close to each other.The natural frequency alteration as a direct result of the change in the stacking sequence causes resonance if the changed frequency becomes closer to the working frequency.Hence, selection of the stacking sequences in the laminated composite beams has to be outlined.

Conclusion
This work deals with two protocols for the calculation of natural frequency of the symmetric laminated composite cantilever beam.Calculations performed by means of Boubaker Polynomials Expansion Scheme PBES and Differential Quadrature Method DQM yielded coherent and similar results.All considered results have been seen to be in accordance with each other.Changes in the stacking sequence, which likely allow tailoring of the material to achieve desired natural frequencies and respective mode shapes without changing its geometry, are the subject of following studies.

Figure 3 :
Figure 3: Comparison of BPES and DQM frequencies for cross-ply laminated beam.

Table 1 :
Geometry and material properties of the composite materials.