J
J. N. Reddy
Researcher at Texas A&M University
Publications - 956
Citations - 73270
J. N. Reddy is an academic researcher from Texas A&M University. The author has contributed to research in topics: Finite element method & Plate theory. The author has an hindex of 106, co-authored 926 publications receiving 66940 citations. Previous affiliations of J. N. Reddy include Instituto Superior Técnico & National University of Singapore.
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Journal ArticleDOI
Nonlinear theories of axisymmetric bending of functionally graded circular plates with modified couple stress
J. N. Reddy,Jessica L. Berry +1 more
TL;DR: In this paper, a microstructure-dependent nonlinear theory for axisymmetric bending of circular plates, which accounts for through-thickness power-law variation of a two-constituent material, is developed using the principle of virtual displacements.
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A Variational Approach to Three-Dimensional Elasticity Solutions of Laminated Composite Plates
M. Savoia,J. N. Reddy +1 more
TL;DR: In this article, the displacements in a laminated composite are represented as products of two sets of unknown functions, one of which is only a function of the thickness coordinate and the other is a function in the in-plane coordinates, and the minimization of the total potential energy is reduced to a sequence of iterative linear problems.
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Actively controllable topological phase transition in homogeneous piezoelectric rod system
TL;DR: By employing periodic electrical boundary conditions, an innovative method to generate actively tunable topologically protected interface mode in a "homogeneous" piezoelectric rod system is proposed in this article.
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Mesh-free radial basis function method for buckling analysis of non-uniformly loaded arbitrarily shaped shear deformable plates
K.M. Liew,X.L. Chen,J. N. Reddy +2 more
TL;DR: In this article, a mesh-free radial basis function (RBF) method is employed for the buckling analysis of non-uniformly loaded thick plates, where the field variables are approximated using a set of scattered nodes in the problem domain.
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General two-dimensional theory of laminated cylindrical shells
TL;DR: In this paper, Navier-type solutions of the linear theory are presented for simply supported boundary conditions, and the theory accounts for a desired degree of approximation of the displacements through the thickness, thus accounting for any discontinuities in their derivatives at the interface of laminae.