Kirby belts, categorified projectors, and the skein lasagna module of S2×S2

Abstract

We interpret Manolescu-Neithalath's cabled Khovanov homology formula for computing Morrison-Walker-Wedrich's KhR2 skein lasagna module as a homotopy colimit (mapping telescope) in a completion of the category of complexes over Bar-Natan's cobordism category. Using categorified projectors, we compute the KhR2 skein lasagna modules of (manifold, boundary link) pairs (S2 × B2, β), where β is a geometrically essential boundary link, identifying a relationship between the lasagna module and the Rozansky projector appearing in the Rozansky-Willis invariant for nullhomologous links in S2 × S1. As an application, we show that the KhR2 skein lasagna module of S2 × S2 is trivial, confirming a conjecture of Manolescu.