On the Modified Bessel Functions of the First Kind - dotepsilon- On Barrelling for a Material in Finite Elasticity
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On the Modified Bessel Functions of the First Kind - dotepsilon- On Barrelling for a Material in Finite Elasticity
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1983
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A. On the modified Bessel functions of the first kind: We consider the functions v (t) t I (t) / I + 1 (t) where I are the modified Bessel functions of the first kind of order 0. We prove that v is strictly monotone and strictly convex on R+. These results have application in finite elasticity. B. On barrelling for a material in finite elasticity: In this paper we investigate the question of stability for a solid circular cylinder, composed of a particular homogeneous isotropic (compressible) nonlinearly elastic material, that is subjected to compressive end forces in the direction of its axis (so as to give fixed axial displacements at the ends).
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Simpson, Henry C.; Spector, Scott J.. (1983). On the Modified Bessel Functions of the First Kind - dotepsilon- On Barrelling for a Material in Finite Elasticity. Retrieved from the University Digital Conservancy, https://hdl.handle.net/11299/3852.
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