Title of article :
On the formal power series algebras generated by a vector space and a linear functional
Author/Authors :
Khoddami ، A. R. Department of Pure Mathematics - Shahrood University of Technology
Abstract :
Let R be a vector space ( on C) and ϕ be an element of R lowast; (the dual space of R), the product r middot; s = ϕ(r)s converts R into an associative algebra that we denote it by Rϕ. We characterize the nilpotent, idempotent and the left and right zero divisor elements of Rϕ[[x]]. Also we show that the set of all nilpotent elements and also the set of all left zero divisor elements of Rϕ[[x]] are ideals of Rϕ[[x]].
Keywords :
Vector space , Formal power series algebra , Nilpotent , Idempotent , Algebraic homomorphism
Journal title :
Journal of Hyperstructures
Journal title :
Journal of Hyperstructures
