nLab H-star-algebra

Redirected from "H-star algebras".

Context

Algebra

Operator algebra

Noncommutative geometry

Definition
Properties

Classifying Frobenius Algebras

Related concepts
References

Definition

An $H^*$ -algebra is a (not necessarily unital) Banach algebra $A$ that is simultaneously a Hilbert space $(A, \langle \cdot, \cdot \rangle_A)$ with a compatible star-algebra structure, namely with an anti-linear involution $\dagger \colon A \to A$ such that

\langle a b, c \rangle_A = \langle b, a^{\dagger} c \rangle_A = \langle a , c b^{\dagger} \rangle_A \,, \;\;\; \text{for all}\; a,b,c \in A.

(Ambrose 1945 Def. 1.2)

Definition

An $H^\ast$ -algebra $A$ (Def. ) is called proper if

The only element $a \in A$ such that $a \cdot (-)$ is the zero map $A \to A$ is $a = 0$ .

or equivalently

The only element $a \in A$ such that $(-) \cdot a$ is the zero map $A \to A$ is $a = 0$ .

(Ambrose 1945 Def. 2.1)

Properties

Classifying Frobenius Algebras

Frobenius structures in the category of finite-dimensional Hilbert spaces can be classified via $H^*$ -algebras.

Theorem

A monoid $(A, \mu, \eta)$ internal to $\mathrm{FdHilb}$ is a symmetric dagger Frobenius monoid if and only if it is a finite-dimensional proper $H^*$ -algebra (Def. ), where the the involution is defined by sending an element $a \in A$ to

(cf. Abramsky & Heunen 2012)

Related concepts

$C^\ast$ -algebra

References

The original article:

Warren Ambrose: Structure Theorems for a special class of Banach Algebras, Transactions of the American Mathematical Society 57 (1945) 364–386 [doi:10.2307/1990182, jstor:1990182, pdf]

Discussion in relation to Frobenius algebra-structures on finite-dimensional Hilbert spaces:

Samson Abramsky, Chris Heunen: $H^\ast$ -algebras and nonunital Frobenius algebras: first steps in infinite-dimensional categorical quantum mechanics, in Clifford Lectures, AMS Proceedings of Symposia in Applied Mathematics 71 (2012) 1–24 [arXiv:1011.6123]
Chris Heunen, Jamie Vicary: Categories for Quantum Theory, Oxford University Press (2019) [ISBN:9780198739616]

based on:

Chris Heunen, Jamie Vicary, Lectures on categorical quantum mechanics (2012) [pdf, pdf]

Last revised on May 3, 2026 at 16:18:18. See the history of this page for a list of all contributions to it.

nLab H-star-algebra

Context

Algebra

Group theory

Ring theory

Module theory

Gebras

Operator algebra

Concepts

Theorems

States and observables

Operator algebra

Local QFT

Perturbative QFT

Noncommutative geometry

Topology

Smooth and Riemannian geometry

Algebraic geometry

Homotopy theory

Relation to physics

Contents

Definition

Definition

Definition

Properties

Classifying Frobenius Algebras

Theorem

Related concepts

References