Abstract
To a presentation of an oriented link as the closure of a braid we assign a complex of bigraded vector spaces. The Euler characteristic of this complex (and of its triplygraded cohomology groups) is the HOMFLYPT polynomial of the link. We show that the dimension of each cohomology group is a link invariant. © 2008 Geometry & Topology.
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APA
Khovanov, M., & Rozansky, L. (2008). Matrix factorizations and link homology II. Geometry and Topology, 12(3), 1387–1425. https://doi.org/10.2140/gt.2008.12.1387
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