Atoms meet symbols
Abstract
This paper introduces a novel framework for constructing invariants in G-equivariant birational geometry by unifying two recent approaches: the theory of atoms recently developed by Katzarkov, Kontsevich, Pantev, and Yu, and the theory of modular symbols due to Kontsevich, Tschinkel, and Pestun. We initiate the theory of Chen-Ruan atoms. Assuming the blowup formula for the quantum Chen-Ruan cohomology, we outline how to extend the theory of atoms to global quotient orbifolds and present some striking applications. In addition, we develop a separate class of purely geometric invariants for Z/2- and Z/3-actions on surfaces and threefolds. We provide many examples of non-G-linearizable G-actions on projective varieties treated with these new techniques.
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