On derivation of Euler-Lagrange Equations for incompressible energy-minimizers

Abstract

We prove that any distribution q satisfying the equation ∇ q= f for some tensor f=(fij), fij∈ hr(U) (1≤ r<∞) -the local Hardy space, q is in hr, and is locally represented by the sum of singular integrals of fij with Calder\'on-Zygmund kernel. As a consequence, we prove the existence and the local representation of the hydrostatic pressure p (modulo constant) associated with incompressible elastic energy-minimizing deformation u satisfying |∇ u|2, | cof∇ u|2∈ h1. We also derive the system of Euler-Lagrange equations for incompressible local minimizers u that are in the space K1,3 loc; partially resolving a long standing problem. For H\"older continuous pressure p, we obtain partial regularity of area-preserving minimizers.