Lie structures of the group of Sheffer operators
Abstract
Let be an (LB)-space over F= R or C, and let ' be the dual space of~. We study the set S() of Sheffer operators acting in polynomials on '. We prove that S() is a group for the usual product of operators. We equip S() with a natural topology which makes S() into an infinite-dimensional manifold with a global parametrization. We show that S() is an infinite-dimensional, regular Lie group, and provide an explicit description of the Lie algebra of S(), including an explicit form of the Lie bracket on it. Our main results are new even in the one-dimensional case, =F. Furthermore, our results lead to improved understanding of the Lie algebra of the Riordan group, cf.\ Cheon, Luz\'on, Mor\'on, Prieto-Martinez, Adv. Math. 319 (2017) 522--566.
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