Title of article
Formal power series, operator calculus, and duality on Lie algebras Original Research Article
Author/Authors
Philip Feinsilver ، نويسنده , , René Schott، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 1998
Pages
15
From page
157
To page
171
Abstract
This paper presents an operator calculus approach to computing with non-commutative variables. First, we recall the product formulation of formal exponential series. Then we show how to formulate canonical boson calculus on formal series. This calculus is used to represent the action of a Lie algebra on its universal enveloping algebra. As applications, Hamiltonʹs equations for a general Hamiltonian, given as a formal series, are found using a double-dual representation, and a formulation of the exponential of the adjoint representation is given. With these techniques one can represent the Volterra product acting on the enveloping algebra. We illustrate with a three-step nilpotent Lie algebra.
Journal title
Discrete Mathematics
Serial Year
1998
Journal title
Discrete Mathematics
Record number
951376
Link To Document