Isabelle Shankar: An SOS counterexample to an inequality of symmetric functions
Abstract
t is known that differences of symmetric functions corresponding to various bases are nonnegative on the nonnegative orthant exactly when the partitions defining them are comparable in dominance order. The only exception is the case of homogeneous symmetric functions where it is only known that dominance of the partitions implies nonnegativity of the corresponding difference of symmetric functions. It was conjectured by Cuttler, Greene, and Skandera in 2011 that the converse also holds, as in the cases of the monomial, elementary, power-sum, and Schur bases. I will derive a counterexample using the theory of sum of squares relaxations
and thus show that homogeneous symmetric functions break the pattern.