Derived algebraic geometry of 2d lattice Yang-Mills theory
Abstract
A derived algebraic geometric study of classical GLn-Yang-Mills theory on the 2-dimensional square lattice Z2 is presented. The derived critical locus of the Wilson action is described and its local data supported in rectangular subsets V =[a,b]× [c,d]⊂eq Z2 with both sides of length ≥ 2 is extracted. A locally constant dg-category-valued prefactorization algebra on Z2 is constructed from the dg-categories of quasi-coherent complexes on the derived stacks of local data.
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