A magic determinant formula for symmetric polynomials of eigenvalues

Abstract

Symmetric polynomials of the roots of a polynomial can be written as polynomials of the coefficients, and by applying this to the characteristic polynomial we can write a symmetric polynomial of the eigenvalues ai of an n× n matrix A as a polynomial of the entries of the matrix. We give a magic formula for this: symbolically substitute a A in the symmetric polynomial and replace multiplication by . For instance, for a 2×2 matrix A with eigenvalues a1,a2, align* a1 a22 +a12 a2 & =(A1, A22)+ (A12, A2) align* where Aik is the i-th column of Ak. One may also take negative powers, allowing us to calculate: align* a1a2-1+a1-1a2 & =(A1,A2-1)+(A1-1,A2) align* The magic method also works for multivariate symmetric polynomials of the eigenvalues of a set of commuting matrices, e.g. for 2×2 matrices A and B with eigenvalues a1,a2 and b1,b2, align* a1 b1 a22 + a12a2b2 & = (AB1,A22) + (A12,AB2) align*