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.
Papers
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ON p-VERSION HIERARCHICAL INTERPOLATION FUNCTIONS FOR HIGHER-ORDER CONTINUITY FINITE ELEMENT MODELS
TL;DR: With this approach of constructing interpolations it is indeed possible to generate finite element interpolation functions with inter-element continuity in agreement with the strong solutions, which eliminate the need for the weak forms of differential equations.
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Finite‐element analysis of fluid flow and heat transfer for staggered bundles of cylinders in cross flow
TL;DR: In this article, the Navier-Stokes equations and the energy equation governing steady laminar incompressible flow are solved by a penalty finite-element model for flow across finite depth, five-row deep, staggered bundles of cylinders.
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Nonlinear finite element analysis of laminated composite shells with actuating layers
TL;DR: In this paper, a nonlinear finite element analysis of laminated composite shell structures with smart material laminae is presented, where a negative velocity feedback control is used with a constant control gain.
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A three-dimensional nonlinear analysis of cross-ply rectangular composite plates
T. Kuppusamy,J. N. Reddy +1 more
TL;DR: In this paper, the results of a three-dimensional, geometrically nonlinear, finite-element analysis of the bending of cross-ply laminated anisotropic composite plates are presented.
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Least-squares finite element formulation for shear-deformable shells
J. P. Pontaza,J. N. Reddy +1 more
TL;DR: In this paper, a least-squares based finite element formulation for numerical analysis of shear-deformable shell structures is presented, which is obtained by minimizing the least square functional defined as the sum of the squares of the shell equilibrium equations residuals measured in suitable norms of Hilbert spaces.