Motivated by a linear nonlocal model of elasticity, this work establishes fractional
analogues of Korn’s first and second inequalities for vector fields in fractional
Sobolev spaces defined over a bounded domain. The validity of the inequalities
require no additional boundary condition, extending existing fractional Korn’s
inequalities that are only applicable for Sobolev vector fields satisfying zero
Dirichlet boundary conditions. The domain of definition is required to have a
-boundary
or, more generally, a Lipschitz boundary with small Lipschitz constant. We
conjecture that the inequalities remain valid for vector fields defined over any
Lipschitz domain. We support this claim by presenting a proof of the inequalities for
vector fields defined over planar convex domains.
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