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On holomorphic reflexivity conditions for complex Lie groups

Published online by Cambridge University Press:  30 September 2021

O. Yu. Aristov*
Affiliation:
Obninsk, Russia ([email protected])

Abstract

We consider Akbarov's holomorphic version of the non-commutative Pontryagin duality for a complex Lie group. We prove, under the assumption that $G$ is a Stein group with finitely many components, that (1) the topological Hopf algebra of holomorphic functions on $G$ is holomorphically reflexive if and only if $G$ is linear; (2) the dual cocommutative topological Hopf algebra of exponential analytic functional on $G$ is holomorphically reflexive. We give a counterexample, which shows that the first criterion cannot be extended to the case of infinitely many components. Nevertheless, we conjecture that, in general, the question can be solved in terms of the Banach-algebra linearity of $G$.

Type
Research Article
Copyright
Copyright © The Author(s), 2021. Published by Cambridge University Press on Behalf of The Edinburgh Mathematical Society

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References

Akbarov, S. S., Holomorphic functions of exponential type and duality for Stein groups with algebraic connected component of identity, (Russian) Fundam. Prikl. Mat. 14(1) (2008), 3178. English transl. J. Math. Sci., 162:4 (2009), 459–586.Google Scholar
Akbarov, S. S., Continuous and smooth envelopes of topological algebras. Part 1, English Transl. J. Math. Sci. (N. Y.) 227(5) (2017), 531668. (Russian), Functional analysis, Itogi Nauki i Tekhniki. Ser. Sovrem. Mat. Pril. Temat. Obz., 129, VINITI, Moscow, 2017, 3–133.CrossRefGoogle Scholar
Aristov, O. Yu., Holomorphically finitely generated Hopf algebras and quantum Lie groups, arXiv:2006.12175Google Scholar
Aristov, O. Yu., Holomorphic functions of exponential type on connected complex Lie groups, J. Lie Theory 29(4) (2019), 10451070. arXiv:1903.08080.Google Scholar
Aristov, O. Yu., Arens-Michael envelopes of nilpotent Lie algebras, functions of exponential type, and homological epimorphisms, Tr. Mosk. Mat. Obs. 81(1) (2020), 117136. MCCME, M., Trans. Moscow Math. Soc. (2020), 97–114, arXiv:1810.13213.Google Scholar
Blackadar, B., Operator algebras. theory of $C^{*}$-algebras and von Neumann Algebras, Encyclopaedia of Mathematical Sciences, Vol. 122 (Springer, 2006).10.1007/3-540-28517-2CrossRefGoogle Scholar
Bogachev, V. I. and Smolyanov, O. G., Topological vector spaces and their applications (Moscow-Izhevsk, 2012). English transl.: (Springer 2017).Google Scholar
Bonneau, P., Flato, M., Gerstenhaber, M. and Pinczon, G., The hidden group structure of quantum groups: strong duality, rigidity and preferred deformations, Comm. Math. Phys. 161 (1994), 125156.CrossRefGoogle Scholar
Dales, H. G., Banach algebras and automatic continuity. London mathematical society monographs. New Series, Vol. 24 (Oxford Science Publications, The Clarendon Press, Oxford University Press, New York, 2000).Google Scholar
Forster, O., Zur Theorie der Steinschen Algebren und Moduln, Math. Z. 97 (1967), 376405.CrossRefGoogle Scholar
Hilgert, J. and Neeb, K.-H., Structure and geometry of Lie groups (Springer, New York, 2012).CrossRefGoogle Scholar
Litvinov, G. V, Group representations in locally convex spaces, and topological group algebras, Trudy Sem. Vektor. Tenzor. Anal. 16 (1972), 267349. (Russian) English transl.: Selecta Math. Soviet. (Birkhäuser Publ.) 7(2) (1988), 101–182.Google Scholar
Litvinov, G. L., Dual topological algebras and topological Hopf algebras, Trudy Sem. Vektor. Tenzor. Anal. 18 (1978), 372375. English transl.: Selecta Math. Soviet. (Birkhäuser Publ.) 10(4) (1991), 339–343.Google Scholar
Nica, B., Linear groups – Malcev's theorem and Selberg's lemma, arXiv:1306.2385.Google Scholar
Palmer, T. W., Banach algebras and the general theory of *-algebras: Vol. I, algebras and banach algebras (Cambridge University Press, Cambridge, 1994).CrossRefGoogle Scholar
Pirkovskii, A. Yu., Stably flat completions of universal enveloping algebras, Dissertat. Math. (Rozprawy Math.) 441 (2006), 160.Google Scholar
Pirkovskii, A. Yu., Arens-Michael envelopes, homological epimorphisms, and relatively quasi-free algebras, Tr. Mosk. Mat. Obs. 69 (2008), 34125. (Russian) English transl.: Trans. Moscow Math. Soc. (2008), 27–104.Google Scholar
Pirkovskii, A. Yu., Holomorphically finitely generated algebras, J. Noncommut. Geom. 9 (2015), 215264.CrossRefGoogle Scholar
Varopoulos, N. T., Distance distortion on Lie groups, in Random walks and discrete potential theory (M. Picardello and W. Woess, Eds.) (Cambridge University Press, Cambridge, 1999).Google Scholar
Vogt, D., The tensor algebra of power series spaces, Studia Math. 193 (2009), 189202.CrossRefGoogle Scholar
Ya. Helemskii, A., Banach and polynormed algebras: general theory, representations, homology, (Nauka (Russian), Moscow, 1989). English transl. (Oxford University Press, 1993).Google Scholar