Banach algebra

In mathematics, especially functional analysis, a Banach algebra, named after Stefan Banach, is an associative algebra ${\displaystyle A}$ over the

induced by the norm. The norm is required to satisfy

This ensures that the multiplication operation is

.

A Banach algebra is called unital if it has an identity element for the multiplication whose norm is ${\displaystyle 1,}$ and commutative if its multiplication is

. Any Banach algebra ${\displaystyle A}$ (whether it has an identity element or not) can be embedded isometrically into a unital Banach algebra ${\displaystyle A_{e}}$ so as to form a of ${\displaystyle A_{e}}$. Often one assumes a priori that the algebra under consideration is unital: for one can develop much of the theory by considering ${\displaystyle A_{e}}$ and then applying the outcome in the original algebra. However, this is not the case all the time. For example, one cannot define all the in a Banach algebra without identity.

The theory of real Banach algebras can be very different from the theory of complex Banach algebras. For example, the spectrum of an element of a nontrivial complex Banach algebra can never be empty, whereas in a real Banach algebra it could be empty for some elements.

Banach algebras can also be defined over fields of ${\displaystyle p}$-adic numbers. This is part of ${\displaystyle p}$-adic analysis.

Examples

The prototypical example of a Banach algebra is ${\displaystyle C_{0}(X)}$, the space of (complex-valued) continuous functions, defined on a

${\displaystyle X}$, that vanish at infinity. ${\displaystyle C_{0}(X)}$ is unital if and only if ${\displaystyle X}$ is , ${\displaystyle C_{0}(X)}$ is in fact a C*-algebra. More generally, every C*-algebra is a Banach algebra by definition.

• The set of real (or complex) numbers is a Banach algebra with norm given by the absolute value.
• The set of all real or complex ${\displaystyle n}$-by-${\displaystyle n}$
  unital Banach algebra if we equip it with a sub-multiplicative matrix norm
  .
• Take the Banach space ${\displaystyle \mathbb {R} ^{n}}$ (or ${\displaystyle \mathbb {C} ^{n}}$) with norm ${\displaystyle \|x\|=\max _{}|x_{i}|}$ and define multiplication componentwise: ${\displaystyle \left(x_{1},\ldots ,x_{n}\right)\left(y_{1},\ldots ,y_{n}\right)=\left(x_{1}y_{1},\ldots ,x_{n}y_{n}\right).}$
• The quaternions form a 4-dimensional real Banach algebra, with the norm being given by the absolute value of quaternions.
• The algebra of all bounded real- or complex-valued functions defined on some set (with pointwise multiplication and the
  supremum
  norm) is a unital Banach algebra.
• The algebra of all bounded
  continuous real- or complex-valued functions on some locally compact space
  (again with pointwise operations and supremum norm) is a Banach algebra.
• The algebra of all
  linear
  operators on a Banach space ${\displaystyle E}$ (with functional composition as multiplication and the operator norm as norm) is a unital Banach algebra. The set of all compact operators on ${\displaystyle E}$ is a Banach algebra and closed ideal. It is without identity if ${\displaystyle \dim E=\infty .}$^[1]
• If ${\displaystyle G}$ is a
  locally compact Hausdorff topological group
  and ${\displaystyle \mu }$ is its Haar measure, then the Banach space ${\displaystyle L^{1}(G)}$ of all ${\displaystyle \mu }$-integrable functions on ${\displaystyle G}$ becomes a Banach algebra under the convolution ${\displaystyle xy(g)=\int x(h)y\left(h^{-1}g\right)d\mu (h)}$ for ${\displaystyle x,y\in L^{1}(G).}$^[2]
• Uniform algebra: A Banach algebra that is a subalgebra of the complex algebra ${\displaystyle C(X)}$ with the supremum norm and that contains the constants and separates the points of ${\displaystyle X}$ (which must be a compact Hausdorff space).
• Natural Banach function algebra: A uniform algebra all of whose characters are evaluations at points of ${\displaystyle X.}$
• C*-algebra: A Banach algebra that is a closed *-subalgebra of the algebra of bounded operators on some Hilbert space.
• Measure algebra: A Banach algebra consisting of all Radon measures on some locally compact group, where the product of two measures is given by convolution of measures.^[2]
• The algebra of the quaternions ${\displaystyle \mathbb {H} }$ is a real Banach algebra, but it is not a complex algebra (and hence not a complex Banach algebra) for the simple reason that the center of the quaternions is the real numbers, which cannot contain a copy of the complex numbers.
• An affinoid algebra is a certain kind of Banach algebra over a nonarchimedean field. Affinoid algebras are the basic building blocks in rigid analytic geometry.

Properties

Several

also holds for two commuting elements of a Banach algebra.

The set of

If a Banach algebra has unit ${\displaystyle \mathbf {1} ,}$ then ${\displaystyle \mathbf {1} }$ cannot be a

commutator

; that is, ${\displaystyle xy-yx\neq \mathbf {1} }$  for any ${\displaystyle x,y\in A.}$ This is because ${\displaystyle xy}$ and ${\displaystyle yx}$ have the same spectrum except possibly ${\displaystyle 0.}$

The various algebras of functions given in the examples above have very different properties from standard examples of algebras such as the reals. For example:

• Every real Banach algebra that is a division algebra is isomorphic to the reals, the complexes, or the quaternions. Hence, the only complex Banach algebra that is a division algebra is the complexes. (This is known as the Gelfand–Mazur theorem.)
• Every unital real Banach algebra with no zero divisors, and in which every principal ideal is closed, is isomorphic to the reals, the complexes, or the quaternions.^[4]
• Every commutative real unital Noetherian Banach algebra with no zero divisors is isomorphic to the real or complex numbers.
• Every commutative real unital Noetherian Banach algebra (possibly having zero divisors) is finite-dimensional.
• Permanently singular elements in Banach algebras are topological divisors of zero, that is, considering extensions ${\displaystyle B}$ of Banach algebras ${\displaystyle A}$ some elements that are singular in the given algebra ${\displaystyle A}$ have a multiplicative inverse element in a Banach algebra extension ${\displaystyle B.}$ Topological divisors of zero in ${\displaystyle A}$ are permanently singular in any Banach extension ${\displaystyle B}$ of ${\displaystyle A.}$

Spectral theory

Unital Banach algebras over the complex field provide a general setting to develop spectral theory. The spectrum of an element ${\displaystyle x\in A,}$ denoted by ${\displaystyle \sigma (x)}$, consists of all those complex scalars ${\displaystyle \lambda }$ such that ${\displaystyle x-\lambda \mathbf {1} }$ is not invertible in ${\displaystyle A.}$ The spectrum of any element ${\displaystyle x}$ is a closed subset of the closed disc in ${\displaystyle \mathbb {C} }$ with radius ${\displaystyle \|x\|}$ and center ${\displaystyle 0,}$ and thus is compact. Moreover, the spectrum ${\displaystyle \sigma (x)}$ of an element ${\displaystyle x}$ is

formula:

$${\displaystyle \sup\{|\lambda |:\lambda \in \sigma (x)\}=\lim _{n\to \infty }\|x^{n}\|^{1/n}.}$$

Given ${\displaystyle x\in A,}$ the holomorphic functional calculus allows to define ${\displaystyle f(x)\in A}$ for any function ${\displaystyle f}$ holomorphic in a neighborhood of ${\displaystyle \sigma (x).}$ Furthermore, the spectral mapping theorem holds:^[5]

When the Banach algebra ${\displaystyle A}$ is the algebra ${\displaystyle L(X)}$ of bounded linear operators on a complex Banach space ${\displaystyle X}$ (for example, the algebra of square matrices), the notion of the spectrum in ${\displaystyle A}$ coincides with the usual one in operator theory. For ${\displaystyle f\in C(X)}$ (with a compact Hausdorff space ${\displaystyle X}$), one sees that:

The norm of a normal element ${\displaystyle x}$ of a C*-algebra coincides with its spectral radius. This generalizes an analogous fact for normal operators.

Let ${\displaystyle A}$ be a complex unital Banach algebra in which every non-zero element ${\displaystyle x}$ is invertible (a division algebra). For every ${\displaystyle a\in A,}$ there is ${\displaystyle \lambda \in \mathbb {C} }$ such that ${\displaystyle a-\lambda \mathbf {1} }$ is not invertible (because the spectrum of ${\displaystyle a}$ is not empty) hence ${\displaystyle a=\lambda \mathbf {1} :}$ this algebra ${\displaystyle A}$ is naturally isomorphic to ${\displaystyle \mathbb {C} }$ (the complex case of the Gelfand–Mazur theorem).

Ideals and characters

Let ${\displaystyle A}$ be a unital commutative Banach algebra over ${\displaystyle \mathbb {C} .}$ Since ${\displaystyle A}$ is then a commutative ring with unit, every non-invertible element of ${\displaystyle A}$ belongs to some maximal ideal of ${\displaystyle A.}$ Since a maximal ideal ${\displaystyle {\mathfrak {m}}}$ in ${\displaystyle A}$ is closed, ${\displaystyle A/{\mathfrak {m}}}$ is a Banach algebra that is a field, and it follows from the Gelfand–Mazur theorem that there is a bijection between the set of all maximal ideals of ${\displaystyle A}$ and the set ${\displaystyle \Delta (A)}$ of all nonzero homomorphisms from ${\displaystyle A}$ to ${\displaystyle \mathbb {C} .}$ The set ${\displaystyle \Delta (A)}$ is called the "

" or "character space" of ${\displaystyle A,}$ and its members "characters".

A character ${\displaystyle \chi }$ is a linear functional on ${\displaystyle A}$ that is at the same time multiplicative, ${\displaystyle \chi (ab)=\chi (a)\chi (b),}$ and satisfies ${\displaystyle \chi (\mathbf {1} )=1.}$ Every character is automatically continuous from ${\displaystyle A}$ to ${\displaystyle \mathbb {C} ,}$ since the kernel of a character is a maximal ideal, which is closed. Moreover, the norm (that is, operator norm) of a character is one. Equipped with the topology of pointwise convergence on ${\displaystyle A}$ (that is, the topology induced by the weak-* topology of ${\displaystyle A^{*}}$), the character space, ${\displaystyle \Delta (A),}$ is a Hausdorff compact space.

For any ${\displaystyle x\in A,}$

where ${\displaystyle {\hat {x}}}$ is the Gelfand representation of ${\displaystyle x}$ defined as follows: ${\displaystyle {\hat {x}}}$ is the continuous function from ${\displaystyle \Delta (A)}$ to ${\displaystyle \mathbb {C} }$ given by ${\displaystyle {\hat {x}}(\chi )=\chi (x).}$ The spectrum of ${\displaystyle {\hat {x}},}$ in the formula above, is the spectrum as element of the algebra ${\displaystyle C(\Delta (A))}$ of complex continuous functions on the compact space ${\displaystyle \Delta (A).}$ Explicitly,

As an algebra, a unital commutative Banach algebra is semisimple (that is, its Jacobson radical is zero) if and only if its Gelfand representation has trivial kernel. An important example of such an algebra is a commutative C*-algebra. In fact, when ${\displaystyle A}$ is a commutative unital C*-algebra, the Gelfand representation is then an isometric *-isomorphism between ${\displaystyle A}$ and ${\displaystyle C(\Delta (A)).}$^[a]

Banach *-algebras

A Banach *-algebra ${\displaystyle A}$ is a Banach algebra over the field of complex numbers, together with a map ${\displaystyle {}^{*}:A\to A}$ that has the following properties:

1. ${\displaystyle \left(x^{*}\right)^{*}=x}$ for all ${\displaystyle x\in A}$ (so the map is an involution).
2. ${\displaystyle (x+y)^{*}=x^{*}+y^{*}}$ for all ${\displaystyle x,y\in A.}$
3. ${\displaystyle (\lambda x)^{*}={\bar {\lambda }}x^{*}}$ for every ${\displaystyle \lambda \in \mathbb {C} }$ and every ${\displaystyle x\in A;}$ here, ${\displaystyle {\bar {\lambda }}}$ denotes the complex conjugate of ${\displaystyle \lambda .}$
4. ${\displaystyle (xy)^{*}=y^{*}x^{*}}$ for all ${\displaystyle x,y\in A.}$

In other words, a Banach *-algebra is a Banach algebra over ${\displaystyle \mathbb {C} }$ that is also a *-algebra.

In most natural examples, one also has that the involution is isometric, that is,

Some authors include this isometric property in the definition of a Banach *-algebra.

A Banach *-algebra satisfying ${\displaystyle \|x^{*}x\|=\|x^{*}\|\|x\|}$ is a C*-algebra.

See also

• Approximate identity – more abstractlyPages displaying wikidata descriptions as a fallback
• Kaplansky's conjecture
   – Numerous conjectures by mathematician Irving KaplanskyPages displaying short descriptions of redirect targets
• Operator algebra – Branch of functional analysis
• Shilov boundary

Notes

References

• ISBN 0-521-38729-9
  .
• ISBN 0-387-06386-2
  .
• ISBN 0-387-97245-5
  .
• Dales, H. G.; Aeina, P.; Eschmeier, J; Laursen, K.;
  ISBN 0-521-53584-0
  .
• Mosak, R. D. (1975). Banach algebras. Chicago Lectures in Mathematics. University of Chicago Press).
  ISBN 0-226-54203-3
  .
• ISSN 0938-0396
  .