Bin Gui, Hao Zhang. (2024). Analytic Conformal Blocks of C2-cofinite Vertex Operator Algebras II: Convergence of Sewing and Higher Genus Pseudo-q-traces. arXiv:2411.07707v1.
This paper aims to prove the convergence of Segal's sewing of conformal blocks associated with C2-cofinite vertex operator algebras in arbitrary genus, a crucial step towards establishing a sewing-factorization theorem for such algebras. This theorem has significant implications for understanding the modular invariance property and the associativity of intertwining operators in conformal field theory.
The authors employ techniques from complex analysis, algebraic geometry, and the representation theory of vertex operator algebras. They utilize the concept of "Virasoro uniformization," which involves deforming conformal blocks using non-autonomous meromorphic vector fields, to establish the convergence of sewing. They also introduce the notion of "Lie derivatives in sheaves of VOAs" to analyze the connections on sheaves of conformal blocks.
The convergence of Segal's sewing and the recovery of pseudo-q-traces from this process provide a deeper understanding of the structure and properties of conformal blocks associated with C2-cofinite vertex operator algebras. These results pave the way for proving the sewing-factorization theorem, which has profound implications for the study of modular invariance and the associativity of intertwining operators in conformal field theory.
This research significantly advances the mathematical foundations of conformal field theory, particularly in the context of C2-cofinite vertex operator algebras. The results have important implications for understanding the representation theory of these algebras and their applications in various areas of theoretical physics, including string theory and condensed matter physics.
The paper focuses on the convergence aspect of the sewing-factorization theorem. Future research will focus on proving the remaining part of the theorem, which states that the sewing construction establishes an isomorphism between spaces of conformal blocks before and after sewing. Further investigation is also needed to explore the full implications of these results for specific C2-cofinite vertex operator algebras and their applications in physics.
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