Regularity for a geometrically nonlinear flat Cosserat micropolar membrane shell with curvature

Abstract

We consider the rigorously derived thin shell membrane -limit of a three-dimensional isotropic geometrically nonlinear Cosserat micropolar model and deduce full interior regularity of both the midsurface deformation m:ω⊂ R2 R3 and the orthogonal microrotation tensor field R:ω⊂ R2 SO(3). The only further structural assumption is that the curvature energy depends solely on the uni-constant isotropic Dirichlet type energy term |DR|2. We use Rivi\`ere's regularity techniques of harmonic map type systems for our system which couples harmonic maps to SO(3) with a linear equation for m. The additional coupling term in the harmonic map equation is of critical integrability and can only be handled because of its special structure.

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