On the Infinity Flavor of Heegaard Floer Homology and the Integral Cohomology Ring
Abstract
Ozsvath and Szabo construct a spectral sequence with E2 term *(H1(Y;Z)) Z[U,U-1] converging to HF∞(Y,s) for a torsion Spinc structure s. They conjecture that the differentials are completely determined by the integral triple cup product form via a proposed formula. In this paper, we prove that HF∞(Y,s) is in fact determined by the integral cohomology ring when s is torsion. Furthermore, for torsion Spinc structures, we give a complete calculation of HF∞ with mod 2 coefficients when b1 is 3 or 4.
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