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arxiv: 1707.01292 · v6 · pith:AFCIFUG6new · submitted 2017-07-05 · 🧮 math-ph · hep-th· math.AG· math.MP

A Physical Origin for Singular Support Conditions in Geometric Langlands Theory

classification 🧮 math-ph hep-thmath.AGmath.MP
keywords theorygaugegeometriclanglandscategoriessingularsupportarises
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We explain how the nilpotent singular support condition introduced into the geometric Langlands conjecture by Arinkin and Gaitsgory arises naturally from the point of view of N = 4 supersymmetric gauge theory. We define what it means in topological quantum field theory to restrict a category of boundary conditions to the full subcategory of objects compatible with a fixed choice of vacuum, both in functorial field theory and in the language of factorization algebras. For B-twisted N = 4 gauge theory with gauge group G, the moduli space of vacua is equivalent to h*/W , and the nilpotent singular support condition arises by restricting to the vacuum 0 in h*/W. We then investigate the categories obtained by restricting to points in larger strata, and conjecture that these categories are equivalent to the geometric Langlands categories with gauge symmetry broken to a Levi subgroup, and furthermore that by assembling such for the groups GL_n for all positive integers n one finds a hidden factorization structure for the geometric Langlands theory.

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