Johnson's determinantal identity for contiguous minors of Toeplitz matrices, with an accretive extension

Abstract

Let A be an n× n real Toeplitz matrix satisfying A+A=2 Jn, where Jn is the all-ones matrix.If Ar(i,j) denotes the r× r contiguous submatrix of A consisting of rows i,i+1,…,i+r-1 and columns j,j+1,…,j+r-1, then for every n 2 one has An-1(1,2)+ An-1(2,1)=2 An-1(1,1). This confirms a conjecture of Charles R.~Johnson (2003). The proof combines a rank-one determinant expansion with Dodgson's condensation formula, and then invokes a polynomial-identity argument in the Toeplitz parameters: after obtaining an equality of squares in the integral domain Z[b1,…,bn-1], we factor it to deduce an identity up to sign and determine the sign by a suitable specialization.We also give an extension of the Bayat--Teimoori arithmetic--geometric mean identity: for every real accretive matrix A, one has the sharp inequality An-1(1,1)\ An-1(2,2) \ \ | An-1(1,2)+ An-1(2,1)2|, with equality whenever the symmetric part has rank one, i.e.\ A+A=α\,ww for some α∈ R and w∈ Rn\0\,recovering the Bayat--Teimoori equality as a special case.