Self-adjoint operator: Difference between revisions
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The self-adjointness of an operator entails that it has some special properties. Some of these properties include: | The self-adjointness of an operator entails that it has some special properties. Some of these properties include: | ||
1. The [[eigenvalue|eigenvalues]] of a self-adjoint operator are real. As a special well-known case, all eigenvalues of a real symmetric | 1. The [[eigenvalue|eigenvalues]] of a self-adjoint operator are real. As a special well-known case, all eigenvalues of a real symmetric matrix and a complex Hermitian matrix are real. | ||
2. By the von Neumann’s [[spectral theorem]], any self-adjoint operator ''X'' (not necessarily bounded) can be represented as | 2. By the von Neumann’s [[spectral theorem]], any self-adjoint operator ''X'' (not necessarily bounded) can be represented as | ||
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X=\int_{-\infty}^{\infty} x E^X(dx), | X=\int_{-\infty}^{\infty} x E^X(dx), | ||
</math> | </math> | ||
where <math>\scriptstyle E^X</math> is the associated [[spectral measure]] of X (a spectral measure is a Hilbert space projection operator-valued [[measure]]) | where <math>\scriptstyle E^X</math> is the associated [[spectral measure]] of X (in particular, a spectral measure is a Hilbert space projection operator-valued [[measure]]) | ||
3. By [[Stone’s Theorem]], for any self-adjoint operator ''X'' the one parameter unitary [[group]] <math>\scriptstyle U=\{U_t\}_{t \in \mathbb{R}}</math> defined by <math>\scriptstyle U_t=\int_{-\infty}^{\infty} e^{-itx}\, E^X(dx)</math>, where <math>\scriptstyle E^X</math> is the spectral measure of ''X'', satisfies: | 3. By [[Stone’s Theorem]], for any self-adjoint operator ''X'' the one parameter unitary [[group]] <math>\scriptstyle U=\{U_t\}_{t \in \mathbb{R}}</math> defined by <math>\scriptstyle U_t=\int_{-\infty}^{\infty} e^{-itx}\, E^X(dx)</math>, where <math>\scriptstyle E^X</math> is the spectral measure of ''X'', satisfies: | ||
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==Examples of self-adjoint operators== | ==Examples of self-adjoint operators== | ||
As mentioned above, a simple instance of a self-adjoint operator is a [[Hermitian matrix]]. | |||
For a more advanced example consider the complex Hilbert space <math>\scriptstyle L^2(\mathbb{R};\mathbb{C})</math> of all complex-valued square integrable functions on <math>\scriptstyle \mathbb{R}</math> with the complex inner product <math>\scriptstyle \langle f,g\rangle=\int_{-\infty}^{\infty}f(x)\overline{g(x)}\,dx</math>, and the dense subspace <math>\scriptstyle C^{\infty}_0(\mathbb{R};\mathbb{C}) </math> of <math>\scriptstyle L^2(\mathbb{R};\mathbb{C})</math> of all infinitely differentiable complex-valued functions with [[compact support]] on <math>\scriptstyle \mathbb{R}</math>. Define the operators ''Q'', ''P'' on <math>\scriptstyle C^{\infty}_0(\mathbb{R};\mathbb{C}) </math> as: | |||
:<math> | :<math> | ||
Q(f)(x)= xf(x) \quad \forall f \in C^{\infty}_0(\mathbb{R};\mathbb{C}) | Q(f)(x)= xf(x) \quad \forall f \in C^{\infty}_0(\mathbb{R};\mathbb{C}) | ||
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==Further reading== | ==Further reading== | ||
#K. Yosida, ''Functional Analysis'' (6 ed.), ser. Classics in Mathematics, Berlin, Heidelberg, New York: Springer-Verlag, 1980. | #K. Yosida, ''Functional Analysis'' (6 ed.), ser. Classics in Mathematics, Berlin, Heidelberg, New York: Springer-Verlag, 1980. | ||
#K. Parthasarathy, ''An Introduction to Quantum Stochastic Calculus'', ser. Monographs in Mathematics, Basel, Boston, Berlin: Birkhauser Verlag, 1992. | #K. Parthasarathy, ''An Introduction to Quantum Stochastic Calculus'', ser. Monographs in Mathematics, Basel, Boston, Berlin: Birkhauser Verlag, 1992.[[Category:Suggestion Bot Tag]] |
Latest revision as of 16:01, 16 October 2024
In mathematics, a self-adjoint operator is a densely defined linear operator mapping a complex Hilbert space onto itself and which is invariant under the unary operation of taking the adjoint. That is, if A is an operator with a domain which is a dense subspace of a complex Hilbert space H then it is self-adjoint if , where denotes the adjoint operator of A. Note that the adjoint of any densely defined linear operator is always well-defined (in fact, the denseness of the domain of an operator is necessary for the existence of its adjoint) and two operators A and B are said to be equal if they have a common domain and their values coincide on that domain.
On an infinite dimensional Hilbert space, a self-adjoint operator can be thought of as the analogy of a real symmetric matrix (i.e., a matrix which is its own transpose) or a Hermitian matrix in (i.e., a matrix which is its own Hermitian transpose) when these matrices are viewed as (bounded) linear operators on and , respectively.
Special properties of a self-adjoint operator
The self-adjointness of an operator entails that it has some special properties. Some of these properties include:
1. The eigenvalues of a self-adjoint operator are real. As a special well-known case, all eigenvalues of a real symmetric matrix and a complex Hermitian matrix are real.
2. By the von Neumann’s spectral theorem, any self-adjoint operator X (not necessarily bounded) can be represented as
where is the associated spectral measure of X (in particular, a spectral measure is a Hilbert space projection operator-valued measure)
3. By Stone’s Theorem, for any self-adjoint operator X the one parameter unitary group defined by , where is the spectral measure of X, satisfies:
for all u in the domain of X. One says that the operator -iX is the generator of the group U and writes: .
Examples of self-adjoint operators
As mentioned above, a simple instance of a self-adjoint operator is a Hermitian matrix.
For a more advanced example consider the complex Hilbert space of all complex-valued square integrable functions on with the complex inner product , and the dense subspace of of all infinitely differentiable complex-valued functions with compact support on . Define the operators Q, P on as:
and
where is the real valued Planck's constant. Then Q and P are self-adjoint operators satisfying the commutation relation on , where I denotes the identity operator. In quantum mechanics, the pair Q and P is known as the Schrödinger representation, on the Hilbert space , of canonical conjugate position and momentum operators q and p satisfying the canonical commutation relation (CCR) .
Further reading
- K. Yosida, Functional Analysis (6 ed.), ser. Classics in Mathematics, Berlin, Heidelberg, New York: Springer-Verlag, 1980.
- K. Parthasarathy, An Introduction to Quantum Stochastic Calculus, ser. Monographs in Mathematics, Basel, Boston, Berlin: Birkhauser Verlag, 1992.