Resonance, linear syzygies, Chen groups, and the Bernstein-Gelfand-Gelfand correspondence
Abstract
If is a complex hyperplane arrangement, with complement X, we show that the Chen ranks of G=π1(X) are equal to the graded Betti numbers of the linear strand in a minimal, free resolution of the cohomology ring A=H*(X,), viewed as a module over the exterior algebra E on : θk(G) = TorEk-1(A,)k, where is a field of characteristic 0, and k 2. The Chen ranks conjecture asserts that, for k sufficiently large, θk(G) =(k-1) Σr 1 hr r+k-1k, where hr is the number of r-dimensional components of the projective resonance variety R1(). Our earlier work on the resolution of A over E and the above equality yield a proof of the conjecture for graphic arrangements. Using results on the geometry of R1() and a localization argument, we establish the conjectured lower bound for the Chen ranks of an arbitrary arrangement . Finally, we show that there is a polynomial P(t) of degree equal to the dimension of R1(), such that θk(G) = P(k), for k sufficiently large.
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