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Main Author: Cheng, Wanli
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2412.03929
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author Cheng, Wanli
author_facet Cheng, Wanli
contents In the fields of non-commutative geometry and string theory, quantum tori appear in different mathematical and physical contexts. Therefore, quantized theta functions defined on quantum tori are also studied (Yu. I. Manin, A. Schwartz; note that a comparison between the two definitions of quantum theta is still an open problem). One important application of classical theta functions is in soliton theory. Certain soliton equations, including the KdV equation, have algebro-geometric solutions that are given by theta functions (we refer to F. Gesztesy and H. Holden), and as such belong to an "integrable hierarchy." While quantized integrability is a very active and complicated subject, in this work we take a different, naive approach. We conduct an experiment: using a definition of differentiation on quantum tori (M. Rieffel), we ask whether the quantum theta function satisfies non-linear PDE. The experiment is successful on the 2-torus and for the KdV equation. This opens the way to future investigations, such as the quest for a compatible hierarchy satisfied by quantum theta, and a consistent definition of complete integrability.
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spellingShingle KdV Equation for Theta Functions on Non-commutative Tori
Cheng, Wanli
Mathematical Physics
Algebraic Geometry
In the fields of non-commutative geometry and string theory, quantum tori appear in different mathematical and physical contexts. Therefore, quantized theta functions defined on quantum tori are also studied (Yu. I. Manin, A. Schwartz; note that a comparison between the two definitions of quantum theta is still an open problem). One important application of classical theta functions is in soliton theory. Certain soliton equations, including the KdV equation, have algebro-geometric solutions that are given by theta functions (we refer to F. Gesztesy and H. Holden), and as such belong to an "integrable hierarchy." While quantized integrability is a very active and complicated subject, in this work we take a different, naive approach. We conduct an experiment: using a definition of differentiation on quantum tori (M. Rieffel), we ask whether the quantum theta function satisfies non-linear PDE. The experiment is successful on the 2-torus and for the KdV equation. This opens the way to future investigations, such as the quest for a compatible hierarchy satisfied by quantum theta, and a consistent definition of complete integrability.
title KdV Equation for Theta Functions on Non-commutative Tori
topic Mathematical Physics
Algebraic Geometry
url https://arxiv.org/abs/2412.03929