C
C.M.C. Roque
Researcher at University of Porto
Publications - 66
Citations - 4567
C.M.C. Roque is an academic researcher from University of Porto. The author has contributed to research in topics: Collocation method & Boundary value problem. The author has an hindex of 31, co-authored 65 publications receiving 4136 citations. Previous affiliations of C.M.C. Roque include University of Zaragoza & Faculdade de Engenharia da Universidade do Porto.
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Journal ArticleDOI
Static, free vibration and buckling analysis of isotropic and sandwich functionally graded plates using a quasi-3D higher-order shear deformation theory and a meshless technique
A. M. A. Neves,António Ferreira,Erasmo Carrera,Maria Cinefra,C.M.C. Roque,Renato Natal Jorge,Cristóvão M. Mota Soares +6 more
TL;DR: In this paper, a higher-order shear deformation theory for modeling functionally graded plates accounting for extensibility in the thickness direction is derived, and the explicit governing equations and boundary conditions are obtained using the principle of virtual displacements under Carrera's Unified Formulation.
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A quasi-3D sinusoidal shear deformation theory for the static and free vibration analysis of functionally graded plates
A. M. A. Neves,António Ferreira,Erasmo Carrera,Maria Cinefra,C.M.C. Roque,Renato Natal Jorge,Cristóvão M. Mota Soares +6 more
TL;DR: In this article, an original hyperbolic sine shear deformation theory for the bending and free vibration analysis of functionally graded plates is presented, which accounts for through-the-thickness deformations.
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Static analysis of functionally graded plates using third-order shear deformation theory and a meshless method
TL;DR: In this article, the effect of the aspect ratio of the plate and the volume fractions of the constituents on the centroidal deflection were scrutinized and the computed results were found to agree well with the solution of the problem.
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Natural frequencies of functionally graded plates by a meshless method
TL;DR: In this paper, the first and third-order shear deformation plate theories, the Mori-Tanaka technique, and approximate the trial solution with multiquadric radial basis functions to analyze free vibrations of functionally graded plates.
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Analysis of composite plates using higher-order shear deformation theory and a finite point formulation based on the multiquadric radial basis function method
TL;DR: In this article, the third-order theory of Reddy for composite laminated plates is discretized using a new type of meshless method, a finite point based on the multiquadric radial basis function method.