Adjoint (operator theory): Difference between revisions

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In [[mathematics]], the adjoint of an [[operator theory|operator]] is a generalization, to linear operators on [[complex number|complex]] [[Hilbert space|Hilbert spaces]], of the notion of the Hermitian conjugate of a complex matrix.
In [[mathematics]], the '''adjoint''' of an [[operator theory|operator]] is a generalization of the notion of the Hermitian conjugate  of a complex [[matrix]] to linear operators on [[complex number|complex]] [[Hilbert space|Hilbert spaces]]. In this article the adjoint of a linear operator ''M'' will be indicated by ''M''<sup>&lowast;</sup>, as is common in mathematics. In physics the notation ''M''<sup>&dagger;</sup> is more usual.
 
==Main idea==
==Main idea==
Consider a complex <math>\scriptstyle n \times n</math> matrix ''M''. Apart from being an array of complex numbers, ''M'' can also be viewed as a linear map or operator from <math>\scriptstyle\mathbb{C}^n</math> to itself. In order to generalize the idea of the Hermitian conjugate of a complex matrix to linear operators on more general complex Hilbert spaces, it is necessary to be able to characterize the Hermitian conjugate as an operator. The crucial observation here is the following: For any complex matrix ''M'', its Hermitian tranpose, denoted by <math>\scriptstyle M^*</math>, is the unique linear operator on <math>\scriptstyle\mathbb{C}^n</math> satisfying:
Consider a complex ''n''&times;''n'' matrix ''M''. Apart from being an array of complex numbers, ''M'' can also be viewed as a linear map or operator from <sup>''n''</sup> to itself. In order to generalize the idea of the Hermitian conjugate of a complex matrix to linear operators on more general complex Hilbert spaces, it is necessary to be able to characterize the Hermitian conjugate as an operator. The crucial observation here is the following: for any complex matrix ''M'', its Hermitian tranpose, denoted by ''M''<sup>&lowast;</sup>, is the unique linear operator on <sup>''n''</sup> satisfying:


:<math>
:<math>
Line 9: Line 8:
</math>
</math>


This suggests that the "Hermitian conjugate" or, as it is more commonly known, the ''adjoint'' of a linear operator ''T'' on an arbitrary complex Hilbert space ''H'' (with inner product <math>\scriptstyle \langle \cdot,\cdot \rangle_H</math>) could be defined generally as an operator ''T<sup>*</sup>'' on ''H'' satisfying:
This suggests that the "Hermitian conjugate" or, as it is more commonly known in mathematics, the ''adjoint'' of a linear operator ''T'' on an arbitrary complex Hilbert space ''H''with inner product &lang; &sdot;, &sdot; &rang;<sub>''H''</sub>could be defined generally as an operator ''T''<sup>&lowast;</sup> on ''H'' satisfying the so-called "turn-over rule":


:<math>
:<math>
\langle Tx,y\rangle_H=\langle x,T^* y\rangle_H \quad \forall x,y \in H. \quad (1)  
\langle Tx,y\rangle_H=\langle x,T^* y\rangle_H \qquad \forall x,y \in H. \qquad\qquad\qquad\qquad (1)  
</math>
</math>


It turns out that this idea is ''almost'' correct. It is correct and ''T<sup>*</sup>'' exists and is unique if ''T'' is a [[bounded operator]] on ''H'', but additional care has to be taken on infinite dimensional Hilbert spaces since operators on such spaces can be unbounded and there may not exist an operator ''T<sup>*</sup>'' satisfying (1).
It turns out that this idea is ''almost'' correct. It is correct and a unique ''T''<sup>&lowast;</sup> exists, if ''T'' is a [[bounded operator]] on ''H'', but additional care has to be taken on infinite dimensional Hilbert spaces since operators on such spaces can be unbounded and there may not exist an operator ''T''<sup>&lowast;</sup> satisfying (1).


==Existence of the adjoint==
==Existence of the adjoint==
Suppose that ''T'' is a [[denseness|densely]] defined operator on ''H'' with domain ''D(T)''. Consider the vector space <math>\scriptstyle K(T)=\{ v \in H \mid \mathop{\sup}_{u \in D(T)}|\langle Tu,v\rangle_H| < \infty \}</math>. Since ''T'' has a dense domain in ''H'' and <math>\scriptstyle f_v(u)=\langle Tu,v\rangle_H</math> is a continuous functional on ''D(T)'' for any <math>v \in K(T)</math>, ''f'' can be extended to be a unique continuous linear functional on <math>\scriptstyle \tilde f_v</math> on ''H''. By the [[Riesz representation theorem]] there is a unique element <math>\scriptstyle v^* \in H</math> such that <math>\scriptstyle \tilde f_v(u)=\langle u,v^*\rangle_H </math> for all ''u'' in ''H''. A linear operator <math>T^*</math> with domain ''D(T<sup>*</sup>) = K(T)'' may now be defined as the map  
Suppose that ''T'' is a [[denseness|densely]] defined operator on ''H'' with domain ''D(T)''. Consider the vector space  
:<math>
K(T)=\{\; v \in H \;\mid\\underset{u \in D(T)}{\sup} |\langle Tu,v\rangle_H| < \infty \;\},
</math>
that is, the space consists of all vectors ''v'' of which the supremum of the absolute value of &lang;''Tu'', ''v'' &rang;<sub>''H''</sub> is finite. Since ''T'' has a dense domain in ''H'' and <math> f_v(u)\equiv \langle Tu,v\rangle_H</math> is a continuous linear functional on ''D(T)'' for any ''v'' &isin; ''K''(''T''), ''f<sub>v</sub>'' can be extended to a unique continuous linear functional <math>\tilde f_v</math> on ''H''. By the [[Riesz representation theorem]] there is a unique element ''v''<sup>&lowast;</sup> &isin; ''H''
such that  
:<math>  
\tilde f_v(u)=\langle u,v^*\rangle_H \quad\forall u \in H.
</math>
A linear operator ''T''<sup>&lowast;</sup> with domain ''D(T<sup>&lowast;</sup>) = K(T)'' may now be defined as the map  
:<math>
:<math>
T^*v = v^* \quad \forall v \in D(T).  
T^*v = v^* \quad \forall v \in D(T).  
</math>
</math>
By construction, the operator <math>\scriptstyle T^*</math> satisfies:
By construction, the operator ''T''<sup>&lowast;</sup> satisfies:
:<math>
:<math>
\langle Tx,y\rangle_H=\langle x,T^* y\rangle_H \quad \forall x \in D(T),\,\forall y \in D(T^*). \quad (2)
\langle Tx,y\rangle_H=\langle x,T^* y\rangle_H \qquad \forall x \in D(T),\quad\forall y \in D(T^*). \qquad\qquad\qquad\qquad (2)
</math>   
</math>   


When ''T'' is a bounded operator (hence ''D(T) = H'') then it can be shown, again using the Riesz representation theorem, that ''T<sup>*</sup>'' is the ''unique'' bounded linear operator satisfying (2).  
When ''T'' is a bounded operator (hence ''D(T) = H'') then it can be shown, again using the Riesz representation theorem, that ''T''<sup>&lowast;</sup> is the ''unique'' bounded linear operator satisfying equation (2).
 


==Formal definition of the adjoint of an operator==
==Formal definition of the adjoint of an operator==
Let ''T'' be an operator on a Hilbert space ''H'' with dense domain ''D(T)''. Then the adjoint ''T<sup>*</sup>'' of ''T'' is an operator with domain
Let ''T'' be an operator on a Hilbert space ''H'' with dense domain ''D(T)''. Then the adjoint ''T''<sup>&lowast;</sup> of ''T'' is an operator with domain
<math>\scriptstyle D(T^*)=\{ v \in H \mid \mathop{\sup}_{u \in D(T)}|\langle Tu,v\rangle_H| < \infty \}</math> defined as the map  
:<math>
D(T^*)=\{\; v \in H \mid \underset{u \in D(T)}{\sup} |\langle Tu,v\rangle_H| < \infty \;\}
</math>  
defined as the map  
:<math>
:<math>
T^*v = v^* \quad \forall v \in D(T^*),  
T^*v = v^* \quad \forall v \in D(T^*),  
</math>
</math>
where for each ''v'' in ''D(T<sup>*</sup>)'', ''v<sup>*</sup>'' is the unique element of ''H'' such that <math>\scriptstyle \langle u,v^* \rangle =\langle Tu,v\rangle_H</math> for all ''u'' in ''D(T)''. Additionally, if ''T'' is a bounded operator then ''T<sup>*</sup>'' is the unique bounded operator satisfying  
where for each ''v'' in ''D''(T''<sup>&lowast;</sup>), ''v''<sup>&lowast;</sup> is the unique element of ''H'' such that  
:<math>  
\langle u,v^* \rangle =\langle Tu,v\rangle_H \quad \forall u \in D(T).  
</math>
Additionally, if ''T'' is a bounded operator then ''T''<sup>&lowast;</sup> is the unique bounded operator satisfying  
:<math>
:<math>
\langle Tx,y\rangle_H=\langle x,T^* y\rangle_H \quad \forall x,y \in H.   
\langle Tx,y\rangle_H=\langle x,T^* y\rangle_H \quad \forall x,y \in H.   
</math>
</math>


==Further reading==
==Property==
#K. Yosida, ''Functional Analysis'' (6 ed.), ser. Classics in Mathematics, Berlin, Heidelberg, New York: Springer-Verlag, 1980.
Consider two linear operators ''S'' and ''T'' on ''H''  with overlapping domains. For convenience we assume  ''D(T)'' = ''D(S)'' and ''D''(''T''<sup>&lowast;</sup>) = ''D''(''S''<sup>&lowast;</sup>). Then
#K. Parthasarathy, ''An Introduction to Quantum Stochastic Calculus'', ser. Monographs in Mathematics, Basel, Boston, Berlin: Birkhauser Verlag, 1992.
:<math>
\langle\; a T S\, u,\; v\;\rangle_H = \langle\; u,\; (a T S)^*\, v\; \rangle_H =  \langle\; u,\; \overline{a}S^* T^*\, v\;\rangle_H, \quad a\in \mathbb{C}.
</math>
===Proof===
The fact that the complex conjugate of the complex number ''a'' appears is due to the property of the inner product on complex Hilbert space. The fact that the multiplication order of the operators reverts under the turnover rule follows thus
:<math>
\langle T S(u), v\rangle_H  = \langle T u', v\rangle_H  = \langle  u', T^*(v)\rangle_H 
= \langle u', v'\rangle_H =  \langle S(u), v'\rangle_H 
= \langle u, S^*v' \rangle_H  = \langle u, S^*\,T^* (v)\rangle_H,  
</math>
with
:<math>
u' \equiv S(u), \quad v' \equiv T^*(v).
</math>[[Category:Suggestion Bot Tag]]

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In mathematics, the adjoint of an operator is a generalization of the notion of the Hermitian conjugate of a complex matrix to linear operators on complex Hilbert spaces. In this article the adjoint of a linear operator M will be indicated by M, as is common in mathematics. In physics the notation M is more usual.

Main idea

Consider a complex n×n matrix M. Apart from being an array of complex numbers, M can also be viewed as a linear map or operator from ℂn to itself. In order to generalize the idea of the Hermitian conjugate of a complex matrix to linear operators on more general complex Hilbert spaces, it is necessary to be able to characterize the Hermitian conjugate as an operator. The crucial observation here is the following: for any complex matrix M, its Hermitian tranpose, denoted by M, is the unique linear operator on ℂn satisfying:

This suggests that the "Hermitian conjugate" or, as it is more commonly known in mathematics, the adjoint of a linear operator T on an arbitrary complex Hilbert space H, with inner product ⟨ ⋅, ⋅ ⟩H, could be defined generally as an operator T on H satisfying the so-called "turn-over rule":

It turns out that this idea is almost correct. It is correct and a unique T exists, if T is a bounded operator on H, but additional care has to be taken on infinite dimensional Hilbert spaces since operators on such spaces can be unbounded and there may not exist an operator T satisfying (1).

Existence of the adjoint

Suppose that T is a densely defined operator on H with domain D(T). Consider the vector space

that is, the space consists of all vectors v of which the supremum of the absolute value of ⟨Tu, vH is finite. Since T has a dense domain in H and is a continuous linear functional on D(T) for any vK(T), fv can be extended to a unique continuous linear functional on H. By the Riesz representation theorem there is a unique element vH such that

A linear operator T with domain D(T) = K(T) may now be defined as the map

By construction, the operator T satisfies:

When T is a bounded operator (hence D(T) = H) then it can be shown, again using the Riesz representation theorem, that T is the unique bounded linear operator satisfying equation (2).

Formal definition of the adjoint of an operator

Let T be an operator on a Hilbert space H with dense domain D(T). Then the adjoint T of T is an operator with domain

defined as the map

where for each v in D(T), v is the unique element of H such that

Additionally, if T is a bounded operator then T is the unique bounded operator satisfying

Property

Consider two linear operators S and T on H with overlapping domains. For convenience we assume D(T) = D(S) and D(T) = D(S). Then

Proof

The fact that the complex conjugate of the complex number a appears is due to the property of the inner product on complex Hilbert space. The fact that the multiplication order of the operators reverts under the turnover rule follows thus

with