K
Kumbakonam R. Rajagopal
Researcher at Texas A&M University
Publications - 688
Citations - 25779
Kumbakonam R. Rajagopal is an academic researcher from Texas A&M University. The author has contributed to research in topics: Constitutive equation & Viscoelasticity. The author has an hindex of 77, co-authored 659 publications receiving 23443 citations. Previous affiliations of Kumbakonam R. Rajagopal include Kent State University & University of Wisconsin-Madison.
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On a new class of electro-elastic bodies.II. Boundary value problems
TL;DR: In this article, a new theoretical framework was presented to describe the response of electro-elastic bodies, and the constitutive theory that was developed consists of two implicit co-occurrences.
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Gibbs free energy based representation formula within the context of implicit constitutive relations for elastic solids
TL;DR: In this paper, the authors derived a representation formula for a class of solids described by implicit constitutive relations between the Cauchy stress tensor and the Hencky strain tensor.
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Modeling Gum Metal and other newly developed titanium alloys within a new class of constitutive relations for elastic bodies
TL;DR: In this paper, a power-law relationship was proposed to describe the uniaxial response of several metallic alloys, and the model that is being considered fits experimental data exceedingly well.
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Diffusion of a fluid through an anisotropically chemically reacting thermoelastic body within the context of mixture theory
TL;DR: In this article, a mixture theory approach is used to analyze the change in response characteristics of an anisotropic, non-linear viscoelastic fluid diffusing through a finitely deforming thermoelastic body of arbitrary symmetry wherein the fluid chemically reacts with the solid.
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Unsteady flows of fluids with pressure dependent viscosity
TL;DR: In this article, the authors considered the unsteady flows of fluids with pressure dependent viscosities when the effect of gravity has to be taken into account and obtained explicit exact solutions for two initial-boundary value problems, namely modified Stokes first and second problems.