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Cobordism maps in Khovanov homology and singular instanton homology I

Hayato Imori, Taketo Sano, Kouki Sato, Masaki Taniguchi

Abstract

Khovanov homology and singular instanton knot Floer homology are both functorial with respect to link cobordisms. Although the two theories are related by a spectral sequence, direct correspondence between the cobordism maps has not been rigorously established. In this paper, we define a cobordism map on the instanton cube complex as a filtered chain map, and prove that it recovers the cobordism maps both in Khovanov homology and singular instanton theory. In a sequel paper, we further extend this cobordism map to immersed cobordisms.

Cobordism maps in Khovanov homology and singular instanton homology I

Abstract

Khovanov homology and singular instanton knot Floer homology are both functorial with respect to link cobordisms. Although the two theories are related by a spectral sequence, direct correspondence between the cobordism maps has not been rigorously established. In this paper, we define a cobordism map on the instanton cube complex as a filtered chain map, and prove that it recovers the cobordism maps both in Khovanov homology and singular instanton theory. In a sequel paper, we further extend this cobordism map to immersed cobordisms.