Plumbing is a natural operation in Khovanov homology

Abstract

Given a connect sum of link diagrams, there is an isomorphism which decomposes unnormalized Khovanov chain groups for the product in terms of normalized chain groups for the factors; this isomorphism is straightforward to see on the level of chains. Similarly, any plumbing x*y of Kauffman states carries an isomorphism of the chain subgroups generated by the enhancements of x*y, x, y: \[ CR(x*y) (CR,p1(x) CR,p1(y))(CR,p0(x) CR,p0(y)). \] We apply this plumbing of chains to to prove that every homogeneously adequate state has enhancements X in distinct j-gradings whose A-traces (which we define) represent nonzero Khovanov homology classes over F2, and that this is also true over Z when all A-blocks' state surfaces are two-sided. We construct X explicitly.