Grid diagrams and Manolescu's unoriented skein exact triangle for knot Floer homology
Abstract
We re-derive Manolescu's unoriented skein exact triangle for knot Floer homology over F2 combinatorially using grid diagrams, and extend it to the case with Z coefficients by sign refinements. Iteration of the triangle gives a cube of resolutions that converges to the knot Floer homology of an oriented link. Finally, we re-establish the homological sigma-thinness of quasi-alternating links.
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