Homotopy type of circle graph complexes motivated by extreme Khovanov homology

Abstract: It was proven in [GMS] that the extreme Khovanov homology of a link diagram is isomorphic to the reduced (co)homology of the independence simplicial complex obtained from a bipartite circle graph constructed from the diagram. In this paper we conjecture that this simplicial complex is always homotopy equivalent to a wedge of spheres. In particular, its homotopy type, if not contractible, would be a link invariant and it would imply that the extreme Khovanov homology of any link diagram does not contain torsion… Show more

“…, n − 1, such that X 0 is contractible, Y i is a wedge of spheres and X n = X . In [PS18] it was conjectured that |X D | is homotopy equivalent to a wedge of spheres for any diagram D. If this were true, then Remark 7.6 would imply that the cone length of Tot M D is bounded above by the maximum of the following numbers:…”

“…On the other hand, the Khovanov spectrum of a link in its maximal extreme quantum grading is Spanier-Whitehead dual to that of its mirror image in minimal grading. This construction was exploded in [PS18] to make explicit computations of the Khovanov spectrum in (maximal) extreme quantum grading.…”

“…In [PS18] the second author conjectured (and proved for several cases) that the extreme Khovanov spectrum is always a wedge of spheres. If this conjecture were true, then the above decomposition would give an upper bound for the cone length of the spectrum X j almax D (Remark 7.8).…”

“…9 Following [PS18], given two vertices v and w in a graph, we say that v dominates w if the adjacent vertices to w are also adjacent to v.…”

Extreme Khovanov spectra

“…, n − 1, such that X 0 is contractible, Y i is a wedge of spheres and X n = X . In [PS18] it was conjectured that |X D | is homotopy equivalent to a wedge of spheres for any diagram D. If this were true, then Remark 7.6 would imply that the cone length of Tot M D is bounded above by the maximum of the following numbers:…”

“…On the other hand, the Khovanov spectrum of a link in its maximal extreme quantum grading is Spanier-Whitehead dual to that of its mirror image in minimal grading. This construction was exploded in [PS18] to make explicit computations of the Khovanov spectrum in (maximal) extreme quantum grading.…”

“…In [PS18] the second author conjectured (and proved for several cases) that the extreme Khovanov spectrum is always a wedge of spheres. If this conjecture were true, then the above decomposition would give an upper bound for the cone length of the spectrum X j almax D (Remark 7.8).…”

“…9 Following [PS18], given two vertices v and w in a graph, we say that v dominates w if the adjacent vertices to w are also adjacent to v.…”

Extreme Khovanov spectra

“…Following[10], given two vertices v and w in a graph, we say that v dominates w if the adjacent vertices to w are also adjacent to v.…”

Almost-extreme Khovanov spectra

Knot Theory: From Fox 3-Colorings of Links to Yang–Baxter Homology and Khovanov Homology