The sum of squared logarithms inequality in arbitrary dimensions

Abstract

We prove the sum of squared logarithms inequality (SSLI) which states that for nonnegative vectors x, y ∈ Rn whose elementary symmetric polynomials satisfy ek(x) ek(y) (for 1 k < n) and en(x)=en(y), the inequality Σi ( xi)2 Σi ( yi)2 holds. Our proof of this inequality follows by a suitable extension to the complex plane. In particular, we show that the function f M⊂eq Cn R with f(z)=Σi( zi)2 has nonnegative partial derivatives with respect to the elementary symmetric polynomials of z. This property leads to our proof. We conclude by providing applications and wider connections of the SSLI.