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This article is cited in 61 scientific papers (total in 61 papers)
Rankin-Cohen brackets and the Hopf algebra of transverse geometry
A. Connesa, H. Moscovicib a Collège de France
b Ohio State University
Abstract:
We settle in this paper a question left open in our paper “Modular Hecke algebras and their Hopf symmetry”, by showing how to extend the Rankin–Cohen brackets from modular forms to modular Hecke algebras. More generally, our procedure yields such brackets on any associative algebra endowed with an action of the Hopf algebra of transverse geometry in codimension one, such that the derivation corresponding to the Schwarzian derivative is inner. Moreover, we show in full generality that these Rankin–Cohen brackets give rise to associative deformations.
Key words and phrases:
Rankin–Cohen brackets, modular Hecke algebras, Hopf symmetry, inner Schwarzian cocycle, quadratic differential, transverse fundamental class, Rankin–Cohen deformations of algebras.
Received: April 27, 2003
Citation:
A. Connes, H. Moscovici, “Rankin-Cohen brackets and the Hopf algebra of transverse geometry”, Mosc. Math. J., 4:1 (2004), 111–130
Linking options:
https://www.mathnet.ru/eng/mmj144 https://www.mathnet.ru/eng/mmj/v4/i1/p111
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Abstract page: | 499 | References: | 110 |
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