In mathematics, an element of a Banach algebra is called a topological divisor of zero if there exists a sequence of elements of such that
The sequence converges to the zero element, but
The sequence does not converge to the zero element.
If such a sequence exists, then one may assume that for all .
If is not commutative, then is called a "left" topological divisor of zero, and one may define "right" topological divisors of zero similarly.
Examplesedit
If has a unit element, then the invertible elements of form an open subset of , while the non-invertible elements are the complementary closed subset. Any point on the boundary between these two sets is both a left and right topological divisor of zero.
An operator on a Banach space , which is injective, not surjective, but whose image is dense in , is a left topological divisor of zero.
Generalizationedit
The notion of a topological divisor of zero may be generalized to any topological algebra. If the algebra in question is not first-countable, one must substitute nets for the sequences used in the definition.
topological, divisor, zero, mathematics, element, displaystyle, banach, algebra, displaystyle, called, topological, divisor, zero, there, exists, sequence, displaystyle, elements, displaystyle, such, that, sequence, displaystyle, converges, zero, element, sequ. In mathematics an element z displaystyle z of a Banach algebra A displaystyle A is called a topological divisor of zero if there exists a sequence x1 x2 x3 displaystyle x 1 x 2 x 3 of elements of A displaystyle A such that The sequence zxn displaystyle zx n converges to the zero element but The sequence xn displaystyle x n does not converge to the zero element If such a sequence exists then one may assume that xn 1 displaystyle left Vert x n right 1 for all n displaystyle n If A displaystyle A is not commutative then z displaystyle z is called a left topological divisor of zero and one may define right topological divisors of zero similarly Examples editIf A displaystyle A nbsp has a unit element then the invertible elements of A displaystyle A nbsp form an open subset of A displaystyle A nbsp while the non invertible elements are the complementary closed subset Any point on the boundary between these two sets is both a left and right topological divisor of zero In particular any quasinilpotent element is a topological divisor of zero e g the Volterra operator An operator on a Banach space X displaystyle X nbsp which is injective not surjective but whose image is dense in X displaystyle X nbsp is a left topological divisor of zero Generalization editThe notion of a topological divisor of zero may be generalized to any topological algebra If the algebra in question is not first countable one must substitute nets for the sequences used in the definition This article does not cite any sources Please help improve this article by adding citations to reliable sources Unsourced material may be challenged and removed Find sources Topological divisor of zero news newspapers books scholar JSTOR January 2011 Learn how and when to remove this template message Retrieved from https en wikipedia org w index php title Topological divisor of zero amp oldid 1051277237, wikipedia, wiki, book, books, library,
