Unlinking Theorem for Symmetric Quasi-convex Polynomials

Abstract

Let μn be the standard Gaussian measure on Rn and X be a random vector on Rn with the law μn. U-conjecture states that if f and g are two polynomials on Rn such that f(X) and g(X) are independent, then there exist an orthogonal transformation L on Rn and an integer k such that f L is a function of (x1,·s,xk) and g L is a function of (xk+1,·s,xn). In this case, f and g are said to be unlinked. In this note, we prove that two symmetric, quasi-convex polynomials f and g are unlinked if f(X) and g(X) are independent.