In mathematics, and more specifically in abstract algebra, a *-algebra (or involutive algebra; read as "star-algebra") is a mathematical structure consisting of two involutive rings R and A, where R is commutative and A has the structure of an associative algebra over R. Involutive algebras generalize the idea of a number system equipped with conjugation, for example the complex numbers and complex conjugation, matrices over the complex numbers and conjugate transpose, and linear operators over a Hilbert space and Hermitian adjoints. However, it may happen that an algebra admits no involution.^[a]

Look up * or star in Wiktionary, the free dictionary.

In mathematics, a *-ring is a ring with a map * : A → A that is an antiautomorphism and an involution.

More precisely, * is required to satisfy the following properties:^[1]

• (x + y)* = x* + y*
• (x y)* = y* x*
• 1* = 1
• (x*)* = x

for all x, y in A.

This is also called an involutive ring, involutory ring, and ring with involution. The third axiom is implied by the second and fourth axioms, making it redundant.

Elements such that x* = x are called self-adjoint.^[2]

Archetypical examples of a *-ring are fields of complex numbers and algebraic numbers with complex conjugation as the involution. One can define a sesquilinear form over any *-ring.

Also, one can define *-versions of algebraic objects, such as ideal and subring, with the requirement to be *-invariant: x ∈ I ⇒ x* ∈ I and so on.

*-rings are unrelated to star semirings in the theory of computation.

A *-algebra A is a *-ring,^[b] with involution * that is an associative algebra over a commutative *-ring R with involution ′, such that (r x)* = r′ x*  ∀r ∈ R, x ∈ A.^[3]

The base *-ring R is often the complex numbers (with ′ acting as complex conjugation).

It follows from the axioms that * on A is conjugate-linear in R, meaning

(λ x + μ y)* = λ′ x* + μ′ y*

for λ, μ ∈ R, x, y ∈ A.

A *-homomorphism f : A → B is an algebra homomorphism that is compatible with the involutions of A and B, i.e.,

• f(a*) = f(a)* for all a in A.^[2]

The *-operation on a *-ring is analogous to complex conjugation on the complex numbers. The *-operation on a *-algebra is analogous to taking adjoints in complex matrix algebras.

The * involution is a unary operation written with a postfixed star glyph centered above or near the mean line:

x ↦ x*, or

x ↦ x^∗ (TeX: x^*),

but not as "x∗"; see the asterisk article for details.

• Any commutative ring becomes a *-ring with the trivial (identical) involution.
• The most familiar example of a *-ring and a *-algebra over reals is the field of complex numbers C where * is just complex conjugation.
• More generally, a field extension made by adjunction of a square root (such as the imaginary unit √−1) is a *-algebra over the original field, considered as a trivially-*-ring. The * flips the sign of that square root.
• A quadratic integer ring (for some D) is a commutative *-ring with the * defined in the similar way; quadratic fields are *-algebras over appropriate quadratic integer rings.
• Quaternions, split-complex numbers, dual numbers, and possibly other hypercomplex number systems form *-rings (with their built-in conjugation operation) and *-algebras over reals (where * is trivial). None of the three is a complex algebra.
• Hurwitz quaternions form a non-commutative *-ring with the quaternion conjugation.
• The matrix algebra of n × n matrices over R with * given by the transposition.
• The matrix algebra of n × n matrices over C with * given by the conjugate transpose.
• Its generalization, the Hermitian adjoint in the algebra of bounded linear operators on a Hilbert space also defines a *-algebra.
• The polynomial ring R[x] over a commutative trivially-*-ring R is a *-algebra over R with P *(x) = P (−x).
• If (A, +, ×, *) is simultaneously a *-ring, an algebra over a ring R (commutative), and (r x)* = r (x*)  ∀r ∈ R, x ∈ A, then A is a *-algebra over R (where * is trivial).
  • As a partial case, any *-ring is a *-algebra over integers.
• Any commutative *-ring is a *-algebra over itself and, more generally, over any its *-subring.
• For a commutative *-ring R, its quotient by any its *-ideal is a *-algebra over R.
  • For example, any commutative trivially-*-ring is a *-algebra over its dual numbers ring, a *-ring with non-trivial *, because the quotient by ε = 0 makes the original ring.
  • The same about a commutative ring K and its polynomial ring K[x]: the quotient by x = 0 restores K.
• In Hecke algebra, an involution is important to the Kazhdan–Lusztig polynomial.
• The endomorphism ring of an elliptic curve becomes a *-algebra over the integers, where the involution is given by taking the dual isogeny. A similar construction works for abelian varieties with a polarization, in which case it is called the Rosati involution (see Milne's lecture notes on abelian varieties).

Involutive Hopf algebras are important examples of *-algebras (with the additional structure of a compatible comultiplication); the most familiar example being:

• The group Hopf algebra: a group ring, with involution given by g ↦ g⁻¹.

Not every algebra admits an involution:

Regard the 2×2 matrices over the complex numbers. Consider the following subalgebra: $${\displaystyle {\mathcal {A)):=\left\((\begin{pmatrix}a&b\\0&0\end{pmatrix)):a,b\in \mathbb {C} \right\))$$

Any nontrivial antiautomorphism necessarily has the form:^[4] $${\displaystyle \varphi _{z}\left[{\begin{pmatrix}1&0\\0&0\end{pmatrix))\right]={\begin{pmatrix}1&z\\0&0\end{pmatrix))\quad \varphi _{z}\left[{\begin{pmatrix}0&1\\0&0\end{pmatrix))\right]={\begin{pmatrix}0&0\\0&0\end{pmatrix))}$$ for any complex number ${\displaystyle z\in \mathbb {C} }$.

It follows that any nontrivial antiautomorphism fails to be involutive: $${\displaystyle \varphi _{z}^{2}\left[{\begin{pmatrix}0&1\\0&0\end{pmatrix))\right]={\begin{pmatrix}0&0\\0&0\end{pmatrix))\neq {\begin{pmatrix}0&1\\0&0\end{pmatrix))}$$

Concluding that the subalgebra admits no involution.

Many properties of the transpose hold for general *-algebras:

• The Hermitian elements form a Jordan algebra;
• The skew Hermitian elements form a Lie algebra;
• If 2 is invertible in the *-ring, then the operators ⁠1/2⁠(1 + *) and ⁠1/2⁠(1 − *) are orthogonal idempotents,^[2] called symmetrizing and anti-symmetrizing, so the algebra decomposes as a direct sum of modules (vector spaces if the *-ring is a field) of symmetric and anti-symmetric (Hermitian and skew Hermitian) elements. These spaces do not, generally, form associative algebras, because the idempotents are operators, not elements of the algebra.

Given a *-ring, there is also the map −* : x ↦ −x*. It does not define a *-ring structure (unless the characteristic is 2, in which case −* is identical to the original *), as 1 ↦ −1, neither is it antimultiplicative, but it satisfies the other axioms (linear, involution) and hence is quite similar to *-algebra where x ↦ x*.

Elements fixed by this map (i.e., such that a = −a*) are called skew Hermitian.

For the complex numbers with complex conjugation, the real numbers are the Hermitian elements, and the imaginary numbers are the skew Hermitian.

• Semigroup with involution
• B*-algebra
• C*-algebra
• Dagger category
• von Neumann algebra
• Baer ring
• Operator algebra
• Conjugate (algebra)
• Cayley–Dickson construction
• Composition algebra