Kink-equivalence of matrices, spanning surfaces, 4-manifolds, and quadratic forms

Abstract

All checkerboard surfaces for a given knot in S3 are related by isotopy and "kinking" and "unkinking" moves, which change the surfaces' Goeritz matrices like this: G G [1]=[smallmatrix G&0\\ 0T&1 smallmatrix]. We call two symmetric integer matrices "kink-equivalent" if they are related by "kinking'' and "unkinking'' moves G G [1] and unimodular congruence. We prove constructively that every nonsingular symmetric integer matrix is kink-equivalent to a positive-definite matrix and to a negative-definite matrix, and we give bounds on the number of moves required. This has several implications, e.g. every knot in S3 is "alternating up to fake unkinking moves" and every simply connected, closed, topological 4-manifold with nonsingular intersection pairing has a positive blow-up that is homeomorphic to a negative blow-up of a positive-definite, simply connected, closed, topological 4-manifold.