Two-variable polynomial invariants of virtual knots arising from flat virtual knot invariants

Abstract

We introduce two sequences of two-variable polynomials \ LnK (t, )\n=1∞ and \ FnK (t, )\n=1∞, expressed in terms of index value of a crossing and n-dwrithe value of a virtual knot K, where t and are variables. Basing on the fact that n-dwrithe is a flat virtual knot invariant we prove that LnK and FnK are virtual knot invariants containing Kauffman affine index polynomial as a particular case. Using LnK we give sufficient conditions when virtual knot does not admit cosmetic crossing change.