Duality and a Canonical Sheaf in Periodic Riemann Functions

Abstract

Let f Z2 Z be a Riemann function whose weight W is a perfect matching. Then there is a family of sheaves of k-vector spaces \MW, d\ d∈ Z2 on a five-point topological that models f in that f( d)=b0(MW, d) and that b1(MW, d)= f K( d- K) for any K∈ Z2. Hence a Riemann-Roch formula for f is equivalent to an Euler characteristic computation of MW, d. If f and W are r-periodic, then the sheaves MW, d become Or-modules of finite type for a natural sheaf of rings O=Or. We show that in this case there is a ``canonical O-module'' ω=ωW and a pairing for i=0,1, Hi(MW, 0 F) × Ext1-i(F,MW L, K) H1(ω) k that is perfect when L= K+ 1 and F is a certain type of line bundle or a certain type of skyscraper sheaf. In particular when F is a line bundle, we realize the above formula for b1(MW, d) as a duality theorem akin to Serre duality. We show that canonical O-module ωW is a rather exceptional element in a family of tensor products of two modules MOM', where M and M' vary over Or-modules of the form MW', d. This article doesn't assume any background in sheaf theory; rather we describe all our sheaves as a ``diagrams of vector spaces,'' where each diagram is essentially a sheaf of vector spaces on a fixed topological space of five points.

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