Uq(gl(m|n)) bounds on the minimal genus of virtual links
Abstract
For links L ⊂ × [0,1], where is a closed orientable surface, we define a Uq(gl(1|1)) Reshetikhin-Turaev invariant with coefficients in Z[H1()]. This invariant turns out to be equivalent to an infinite cyclic version of the Carter-Silver-Williams (CSW) polynomial. The importance of the CSW polynomial is that half its symplectic rank gives strong lower bounds on the virtual genus. Recall that the virtual genus of a virtual link J is the smallest genus of all closed orientable surfaces on which J can be represented by a link diagram on . Here we generalize the CSW lower bound to all quantum supergroups Uq(gl(m|n)) with m,n>0. For (m,n)=(1,1), the Uq(gl(m|n)) bound is the same as the CSW bound. However, changing the value of the pair (m,n) can give lower bounds better than those available from other known methods. We compare the Uq(gl(m|n)) lower bounds to those coming from the CSW polynomial, the surface bracket, the arrow polynomial, hyperbolicity, and the Gordon-Litherland determinant test. As a first application, we show that the Seifert genus of homologically trivial knots in thickened surfaces is not additive under the connected sum operation of virtual knots. As a second application, we prove that the Jaeger-Kauffman-Saleur invariant of a virtual knot is always realizable as the Alexander polynomial of an infinite cyclic cover of a knot complement in some × [0,1], but is not always so on a surface of minimal genus. This is accomplished with a generalization of the Zh-construction, called the homotopy Zh-construction.
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