Abstract:We study affine deformations of the cotangent groupoid \(T^*\mathcal G\rightrightarrows A^*\), governed by a one-form \(\gamma\in\Omega^1(\mathcal G^{(2)})\), and characterize the conditions on \(\gamma\) under which this construction is valid. We show that these deformations arise naturally from \(\mathbb S^1\)-central extensions of Lie groupoids via symplectic reduction, and identify the reduced symplectic form as a multiplicative magnetic form. In particular, for Kac-Moody extensions, this construction yields nontrivial deformations of quotient stacks and \(\mathbb S^1\)-gerbes.
From: Kaichuan Qi [view email]
[v1]
Sun, 21 Jun 2026 01:00:16 UTC (33 KB)
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