On the fractional Korn inequality in bounded domains: Counterexamples to the case ps<1

Abstract

The validity of Korn's first inequality in the fractional setting in bounded domains has been open. We resolve this problem by proving that in fact Korn's first inequality holds in the case ps>1 for fractional Ws,p0() Sobolev fields in open and bounded C1-regular domains ⊂ Rn. Also, in the case ps<1, for any open bounded C1 domain ⊂ Rn we construct counterexamples to the inequality, i.e., Korn's first inequality fails to hold in bounded domains. The proof of the inequality in the case ps>1 follows a standard compactness approach adopted in the classical case, combined with a Hardy inequality, and a recently proven Korn second inequality by Mengesha and Scott [Commun. Math. Sci., Vol. 20, N0. 2, 405--423, 2022]. The counterexamples constructed in the case ps<1 are interpolations of a constant affine rigid motion inside the domain away from the boundary, and of the zero field close to the boundary.