Reflection groups and cones of sums of squares

Abstract

We consider cones of real forms which are sums of squares forms and invariant by a (finite) reflection group. We show how the representation theory of these groups allows to use the symmetry inherent in these cones to give more efficient descriptions. We focus especially on the An, Bn, and Dn case where we use so called higher Specht polynomials to give a uniform description of these cones. These descriptions allow us, for example, to study the connection of these cones to non-negative forms. In particular, we give a new proof of a result by Harris who showed that every non-negative ternary even symmetric octic form is a sum of squares.