Title of article
On a theory of nonlocal elasticity of bi-Helmholtz type and some applications
Author/Authors
Markus Lazar ، نويسنده , , Arnold M. Kosevich and Gerard A. Maugin، نويسنده , , Elias C. Aifantis، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2006
Pages
18
From page
1404
To page
1421
Abstract
A theory of nonlocal elasticity of bi-Helmholtz type is studied. We employ Eringen s model of nonlocal elasticity,
with bi-Helmholtz type kernels, to study dispersion relations, screw and edge dislocations. The nonlocal kernels are
derived analytically as Green functions of partial differential equations of fourth order. This continuum model of nonlocal
elasticity involves two material length scales which may be derived from atomistics. The new nonlocal kernels are
nonsingular in one-, two- and three-dimensions. Furthermore, the nonlocal elasticity of bi-Helmholtz type improves the
one of Helmholtz type by predicting a dispersion relationship with zero group velocity at the end of the first Brillouin
zone. New solutions for the stresses and strain energy of screw and edge dislocations are found.
Keywords
Nonlocal elasticity , Dislocations
Journal title
International Journal of Solids and Structures
Serial Year
2006
Journal title
International Journal of Solids and Structures
Record number
448443
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