Mock Seifert matrices and unoriented algebraic concordance

Abstract

A mock Seifert matrix is an integral square matrix representing the Gordon-Litherland form of a pair (K,F), where K is a knot in a thickened surface and F is an unoriented spanning surface for K. Using these matrices, we introduce a new notion of unoriented algebraic concordance, as well as a new group denoted m G Z and called the unoriented algebraic concordance group. This group is abelian and infinitely generated. There is a surjection λ v C m G Z, where v C denotes the virtual knot concordance group. Mock Seifert matrices can also be used to define new invariants, such as the mock Alexander polynomial and mock Levine-Tristram signatures. These invariants are applied to questions about virtual knot concordance, crosscap numbers, and Seifert genus for knots in thickened surfaces. For example, we show that m G Z contains a copy of Z∞ ( Z/2)∞ ( Z/4)∞.