Lp-versions of generalized Korn inequalities for incompatible tensor fields in arbitrary dimensions with p-integrable exterior derivative

Abstract

For n2 and 1<p<∞ we prove an Lp-version of the generalized Korn-type inequality for incompatible, p-integrable tensor fields P: Rn× n having p-integrable generalized Curl and generalized vanishing tangential trace P\,τl=0 on ∂ , denoting by \τl\l=1,…, n-1 a moving tangent frame on ∂, more precisely we have: \| P \|Lp(,Rn× n)≤ c\,(\| sym P\|Lp(,Rn × n) + \|Curl P \|Lp(,(so(n))n) ), where the generalized Curl is given by (Curl)ijk :=∂i Pkj-∂j Pki and c=c(n,p,)>0.