On the extreme rays of the cone of 3× 3 quasiconvex quadratic forms: Extremal determinats vs extremal and polyconvex forms

Abstract

This work is concerned with the study of the extreme rays of the convex cone of 3× 3 quasiconvex quadratic forms (denoted by C3). We characterize quadratic forms f∈ C3, the determinant of the acoustic tensor of which is an extremal polynomial, and conjecture/discuss about other cases. We prove that in the case when the determinant of the acoustic tensor of a form f∈ C3 is an extremal polynomial other than a perfect square, then the form must itself be an extreme ray of C3; when the determinant is a perfect square, then the form is either an extreme ray of C3 or polyconvex; and finally, when the determinant is identically zero, then the form f must be polyconvex. The zero determinant case plays an important role in the proofs of the other two cases. We also make a conjecture on the extreme rays of C3, and discuss about weak and strong etremals of Cd for d≥ 3. where it turns out that several properties of C3 do not hold for Cd for d>3, and thus case d=3 is special. These results recover all previously known results (to our best knowledge) on examples of extreme points of C3 that were proved to be such. Our results also improve the ones proven by the first author and Milton [20].