On Scaling Properties for Two-State Problems and for a Singularly Perturbed T3 Structure

Abstract

In this article we study quantitative rigidity properties for the compatible and incompatible two-state problems for suitable classes of A-free operators and for a singularly perturbed T3-structure for the divergence operator. In particular, in the compatible setting of the two-state problem we prove that all homogeneous, first order, linear operators with affine boundary data which enforce oscillations yield the typical ε23-lower scaling bounds. As observed in CC15 for higher order operators this may no longer be the case. Revisiting the example from CC15, we show that this is reflected in the structure of the associated symbols and that this can be exploited for a new Fourier based proof of the lower scaling bound. Moreover, building on RT22, GN04, PP04, we discuss the scaling behaviour of a T3 structure for the divergence operator. We prove that as in RT22 this yields a non-algebraic scaling law.