Improved effective estimates of P\'olya's Theorem for quadratic forms

Abstract

Following de Loera and Santos, the P\'olya exponent of a n-ary real form (i.e. a homogeneous polynomial in n variables with real coefficients) f is the infimum of the upward closed set of nonnegative integers m such that (x1 + ·s + xn)m f strictly has positive coefficients. By a theorem of P\'olya, a form assumes only positive values over the standard (n - 1)-simplex in Euclidean n-space if and only if its P\'olya exponent is finite. In this note, we compute an upper bound of the P\'olya exponent of a quadratic form f that assumes only positive values over the standard simplex. Our bound improves a previous upper bound due to de Klerk, Laurent and Parrilo. For example, for the binary quadratic form f = λ2 x12 - 2 λ x1 x2 + x22, which assumes only positive values over the standard 1-simplex whenever 0 < 1 < λ, our upper bound of its P\'olya's exponent is O(1/λ) times that of de Klerk, Laurent and Parrilo's as λ tends to infinity.