Approximate identity

In mathematics, particularly in functional analysis and ring theory, an approximate identity is a net in a Banach algebra or ring (generally without an identity) that acts as a substitute for an identity element.

Definition

A right approximate identity in a Banach algebra A is a net such that for every element a of A, Similarly, a left approximate identity in a Banach algebra A is a net such that for every element a of A, An approximate identity is a net which is both a right approximate identity and a left approximate identity.

C*-algebras

For C*-algebras, a right (or left) approximate identity consisting of self-adjoint elements is the same as an approximate identity. The net of all positive elements in A of norm 1 with its natural order is an approximate identity for any C*-algebra. This is called the canonical approximate identity of a C*-algebra. Approximate identities are not unique. For example, for compact operators acting on a Hilbert space, the net consisting of finite rank projections would be another approximate identity.

If an approximate identity is a sequence, we call it a sequential approximate identity and a C*-algebra with a sequential approximate identity is called σ-unital. Every separable C*-algebra is σ-unital, though the converse is false. A commutative C*-algebra is σ-unital if and only if its spectrum is σ-compact. In general, a C*-algebra A is σ-unital if and only if A contains a strictly positive element, i.e. there exists h in A+ such that the hereditary C*-subalgebra generated by h is A.

One sometimes considers approximate identities consisting of specific types of elements. For example, a C*-algebra has real rank zero if and only if every hereditary C*-subalgebra has an approximate identity consisting of projections. This was known as property (HP) in earlier literature.

Convolution algebras

An approximate identity in a convolution algebra plays the same role as a sequence of function approximations to the Dirac delta function (which is the identity element for convolution). For example, the Fejér kernels of Fourier series theory give rise to an approximate identity.

Rings

In ring theory, an approximate identity is defined in a similar way, except that the ring is given the discrete topology so that a=aeλ for some λ.

A module over a ring with approximate identity is called non-degenerate if for every m in the module there is some λ with m=meλ.

gollark: It's weird how people call "being some distance from people" social distancing even though it's actually being physically separate; social distancing would be demoting all your friends to acquaintances and doing small talk and such.
gollark: In a safely distanced way.
gollark: Infiltrate your local BT headquarters?
gollark: ++search youtube ubq323
gollark: They can just learn to not do that.

See also

This article is issued from Wikipedia. The text is licensed under Creative Commons - Attribution - Sharealike. Additional terms may apply for the media files.