On the homology theory for the chromatic polynomials
Abstract
In 10.2140/agt.2005.5.1365, Rong and Helme-Guizon defined a categorification for the chromatic polynomial PG(x) of graphs G, i.e. a homology theory H*(G) whose Euler characteristic equals PG(x). In this paper, we showed that the rational homoology H*(G;Q) is supported in two lines, and develop an analogy of Lee's theory for Khovanov homology. In particular, we develop a new homology theory HLee(G), and showed that there is a spectral sequence whose E2 -term is isomorphic to H*(G) converges to HLee(G).
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