Quasiconvex relaxation of planar Biot-type energies and the role of determinant constraints

Abstract

We derive the quasiconvex relaxation of the Biot-type energy density DT D-I22 for planar mappings 2 R2 in two different scenarios. First, we consider the case D∈GL+(2), in which the energy can be expressed as the squared Euclidean distance dist2(D,SO(2)) to the special orthogonal group SO(2). We then allow for planar mappings with arbitrary D∈R2× 2; in the context of solid mechanics, this lack of determinant constraints on the deformation gradient would allow for self-interpenetration of matter. We demonstrate that the two resulting relaxations do not coincide and compare the analytical findings to numerical results for different relaxation approaches, including a rank-one sequential lamination algorithm, trust-region FEM calculations of representative microstructures and physics-informed neural networks.