Let ${\displaystyle {\mathfrak {H}}\,}$  be a complex, separable Hilbert space, ${\displaystyle X}$  a locally compact space and ${\displaystyle d\nu }$  a measure on ${\displaystyle X}$ . For each ${\displaystyle x}$  in ${\displaystyle X}$ , denote ${\displaystyle |x\rangle }$  a vector in ${\displaystyle {\mathfrak {H}}}$ . Assume that this set of vectors possesses the following properties:

1. The mapping ${\displaystyle x\mapsto |x\rangle }$  is weakly continuous, i.e., for each vector ${\displaystyle |\psi \rangle }$  in ${\displaystyle {\mathfrak {H}}}$ , the function ${\displaystyle \Psi (x)=\langle x|\psi \rangle }$  is continuous (in the topology of ${\displaystyle X}$ ).
2. The resolution of the identity
   $${\displaystyle \int _{X}|x\rangle \langle x|\,d\nu (x)=I_{\mathfrak {H}}}$$

    
   holds in the weak sense on the Hilbert space ${\displaystyle {\mathfrak {H}}}$ , i.e., for any two vectors ${\displaystyle |\phi \rangle ,|\psi \rangle }$  in ${\displaystyle {\mathfrak {H}}}$ , the following equality holds:
   $${\displaystyle \int _{X}\langle \phi |x\rangle \langle x|\psi \rangle \,d\nu (x)=\langle \phi |\psi \rangle \,.}$$

    

A set of vectors ${\displaystyle |x\rangle }$  satisfying the two properties above is called a family of generalized coherent states. In order to recover the previous definition (given in the article Coherent state) of canonical or standard coherent states (CCS), it suffices to take ${\displaystyle X\equiv \mathbb {C} }$ , the complex plane and ${\textstyle d\nu (x)\equiv {\frac {1}{\pi }}d^{2}x.}$ 

Sometimes the resolution of the identity condition is replaced by a weaker condition, with the vectors ${\displaystyle |x\rangle }$  simply forming a total set^{[clarification needed]} in ${\displaystyle {\mathfrak {H}}\,}$  and the functions ${\displaystyle \Psi (x)=\langle x|\psi \rangle }$ , as ${\displaystyle |\psi \rangle }$  runs through ${\displaystyle {\mathfrak {H}}}$ , forming a reproducing kernel Hilbert space. The objective in both cases is to ensure that an arbitrary vector ${\displaystyle |\psi \rangle }$  be expressible as a linear (integral) combination of these vectors. Indeed, the resolution of the identity immediately implies that

These vectors ${\displaystyle \Psi }$  are square integrable, continuous functions on ${\displaystyle X}$  and satisfy the reproducing property

We present in this section some of the more commonly used types of coherent states, as illustrations of the general structure given above.

Nonlinear coherent states edit

A large class of generalizations of the CCS is obtained by a simple modification of their analytic structure. Let ${\displaystyle \varepsilon _{1}\leq \varepsilon _{2}\leq \dots \leq \varepsilon _{n}\leq \cdots }$  be an infinite sequence of positive numbers (${\displaystyle \varepsilon _{1}\neq 0}$ ). Define ${\displaystyle \varepsilon _{n}!=\varepsilon _{1}\varepsilon _{2}\ldots \varepsilon _{n}}$  and by convention set ${\displaystyle \varepsilon _{0}!=1}$ . In the same Fock space in which the CCS were described, we now define the related deformed or nonlinear coherent states by the expansion

${\displaystyle {\mathcal {D}}}$  being an open disc in the complex plane of radius ${\displaystyle L}$ , the radius of convergence of the series ${\textstyle \sum _{n=0}^{\infty }{\frac {\alpha ^{n}}{\sqrt {\varepsilon _{n}!}}}}$  (in the case of the CCS, ${\displaystyle L=\infty }$ .) The measure ${\displaystyle d\nu }$  is generically of the form ${\displaystyle d\theta \,d\lambda (r)}$  (for ${\displaystyle \alpha =re^{i\theta }}$ ), where ${\displaystyle d\lambda }$  is related to the ${\displaystyle \varepsilon _{n}!}$  through the moment condition.

Once again, we see that for an arbitrary vector ${\displaystyle |\phi \rangle }$  in the Fock space, the function ${\displaystyle \Phi (\alpha )=\langle \phi |\alpha \rangle }$  is of the form ${\displaystyle \Phi (\alpha )={\mathcal {N}}(\vert \alpha \vert ^{2})^{-{\frac {1}{2}}}f(\alpha )}$ , where ${\displaystyle f\,}$  is an analytic function on the domain ${\displaystyle {\mathcal {D}}}$ . The reproducing kernel associated to these coherent states is

Barut–Girardello coherent states edit

By analogy with the CCS case, one can define a generalized annihilation operator ${\displaystyle A}$  by its action on the vectors ${\displaystyle |\alpha \rangle }$ ,

Operators ${\displaystyle A}$  and ${\displaystyle A^{\dagger }}$  of the general type defined above are also known as ladder operators . When such operators appear as generators of representations of Lie algebras, the eigenvectors of ${\displaystyle A}$  are usually called Barut–Girardello coherent states.^[5] A typical example is obtained from the representations of the Lie algebra of SU(1,1) on the Fock space.

Gazeau–Klauder coherent states edit

A non-analytic extension of the above expression of the non-linear coherent states is often used to define generalized coherent states associated to physical Hamiltonians having pure point spectra. These coherent states, known as Gazeau–Klauder coherent states, are labelled by action-angle variables.^[6] Suppose that we are given the physical Hamiltonian ${\textstyle H=\sum _{n=0}^{\infty }E_{n}\left|n\right\rangle \left\langle n\right|}$ , with ${\displaystyle E_{0}=0}$ , i.e., it has the energy eigenvalues ${\displaystyle E_{n}}$  and eigenvectors ${\displaystyle |n\rangle }$ , which we assume to form an orthonormal basis for the Hilbert space of states ${\displaystyle {\mathfrak {H}}}$ . Let us write the eigenvalues as ${\displaystyle E_{n}=\omega \varepsilon _{n}}$  by introducing a sequence of dimensionless quantities ${\displaystyle \{\varepsilon _{n}\}}$  ordered as: ${\displaystyle 0=\varepsilon _{0}<\varepsilon _{1}<\varepsilon _{2}<\cdots }$ . Then, for all ${\displaystyle J\geq 0}$  and ${\displaystyle \gamma \in \mathbb {R} }$ , the Gazeau–Klauder coherent states are defined as

Actually the construction of Gazeau–Klauder CS can be extended to vector CS and to Hamiltonians with degenerate spectra, as shown by Ali and Bagarello.^[7]

Heat kernel coherent states edit

Another type of coherent state arises when considering a particle whose configuration space is the group manifold of a compact Lie group K. Hall introduced coherent states in which the usual Gaussian on Euclidean space is replaced by the heat kernel on K.^[8] The parameter space for the coherent states is the "complexification" of K; e.g., if K is SU(n) then the complexification is SL(n,C). These coherent states have a resolution of the identity that leads to a Segal-Bargmann space over the complexification. Hall's results were extended to compact symmetric spaces, including spheres, by Stenzel.^[9][10] The heat kernel coherent states, in the case ${\displaystyle K=\mathrm {SU} (2)}$ , have been applied in the theory of quantum gravity by Thiemann and his collaborators.^[11] Although there are two different Lie groups involved in the construction, the heat kernel coherent states are not of Perelomov type.

Gilmore and Perelomov, independently, realized that the construction of coherent states may sometimes be viewed as a group theoretical problem.^{[12][13][14][15][16][17]}

In order to see this, let us go back for a while to the case of CCS. There, indeed, the displacement operator ${\displaystyle D(\alpha )}$  is nothing but the representative in Fock space of an element of the Heisenberg group (also called the Weyl–Heisenberg group), whose Lie algebra is generated by ${\displaystyle X,\,P}$  and ${\displaystyle I}$ . However, before going on with the CCS, take first the general case.

Let ${\displaystyle G}$  be a locally compact group and suppose that it has a continuous, irreducible representation ${\displaystyle U}$  on a Hilbert space ${\displaystyle {\mathfrak {H}}}$  by unitary operators ${\displaystyle U(g),\;g\in G}$ . This representation is called square integrable if there exists a non-zero vector ${\displaystyle |\psi \rangle }$  in ${\displaystyle {\mathfrak {H}}}$  for which the integral

An example: wavelets edit

A typical example of the above construction is provided by the affine group of the line, ${\displaystyle G_{\text{Aff}}}$ . This is the group of all 2×2 matrices of the type,

This concept can be extended to two dimensions, the group ${\displaystyle G_{\text{Aff}}}$  being replaced by the so-called similitude group of the plane, which consists of plane translations, rotations and global dilations. The resulting 2D wavelets, and some generalizations of them, are widely used in image processing.^[20]

Gilmore–Perelomov coherent states edit

The construction of coherent states using group representations described above is not sufficient. Already it cannot yield the CCS, since these are not indexed by the elements of the Heisenberg group, but rather by points of the quotient of the latter by its center, that quotient being precisely ${\displaystyle \mathbb {R} ^{2}}$ . The key observation is that the center of the Heisenberg group leaves the vacuum vector ${\displaystyle |0\rangle }$  invariant, up to a phase. Generalizing this idea, Gilmore and Perelomov^{[12][13][14][15]} consider a locally compact group ${\displaystyle G}$  and a unitary irreducible representation ${\displaystyle U}$  of ${\displaystyle G}$  on the Hilbert space ${\displaystyle {\mathfrak {H}}}$ , not necessarily square integrable. Fix a vector ${\displaystyle |\psi \rangle }$  in ${\displaystyle {\mathfrak {H}}}$ , of unit norm, and denote by ${\displaystyle H}$  the subgroup of ${\displaystyle G}$  consisting of all elements ${\displaystyle h}$  that leave it invariant up to a phase, that is,

Gilmore–Perelomov coherent states have been generalized to quantum groups, but for this we refer to the literature.^{[21][22][23][24][25][26]}

The Perelomov construction can be used to define coherent states for any locally compact group. On the other hand, particularly in case of failure of the Gilmore–Perelomov construction, there exist other constructions of generalized coherent states, using group representations, which generalize the notion of square integrability to homogeneous spaces of the group.^[2][3]

Briefly, in this approach one starts with a unitary irreducible representation ${\displaystyle U}$  and attempts to find a vector ${\displaystyle |\psi \rangle }$ , a subgroup ${\displaystyle H}$  and a section ${\displaystyle \sigma :G/H\to G}$  such that

We now depart from the standard situation and present a general method of construction of coherent states, starting from a few observations on the structure of these objects as superpositions of eigenstates of some self-adjoint operator, as was the harmonic oscillator Hamiltonian for the standard CS. It is the essence of quantum mechanics that this superposition has a probabilistic flavor. As a matter of fact, we notice that the probabilistic structure of the canonical coherent states involves two probability distributions that underlie their construction. There are, in a sort of duality, a Poisson distribution ruling the probability of detecting ${\displaystyle n}$  excitations when the quantum system is in a coherent state ${\displaystyle |z\rangle }$ , and a gamma distribution on the set ${\displaystyle \mathbb {C} }$  of complex parameters, more exactly on the range ${\displaystyle \mathbb {R} ^{+}}$  of the square of the radial variable. The generalization follows that duality scheme. Let ${\displaystyle X}$  be a set of parameters equipped with a measure ${\displaystyle \mu }$  and its associated Hilbert space ${\displaystyle L^{2}(X,d\mu )}$  of complex-valued functions, square integrable with respect to ${\displaystyle \mu }$ . Let us choose in ${\displaystyle L^{2}(X,d\mu )}$  a finite or countable orthonormal set ${\displaystyle {\mathcal {O}}=\{\phi _{n}\,,\,n=0,1,\dots \}}$ :

• Coherent states
• Lieb conjecture
• Quantization