Certificate for Orthogonal Equivalence of Real Polynomials by Polynomial-Weighted Principal Component Analysis

Abstract

Suppose that f(x) ∈ R[x1,…, xn] and g(x) ∈ R[x1,…, xn] are two real polynomials of degree d in n variables. If the polynomials f and g are the same up to orthogonal symmetry a natural question is then what element of the orthogonal group induces the orthogonal symmetry; i.e. to find the element R∈ O(n) such that f(Rx)=g(x). One may directly solve this problem by constructing a nonlinear system of equations induced by the relation f(Rx)=g(x) along with the identities of the orthogonal group however this approach becomes quite computationally expensive for larger values of n and d. To give an alternative and significantly more scalable solution to this problem, we introduce the concept of Polynomial-Weighted Principal Component Analysis (PW-PCA). We in particular show how PW-PCA can be effectively computed and how these techniques can be used to obtain a certificate of orthogonal equivalence, that is we find the R∈ O(n) such that f(Rx)=g(x).