Sharp inequalities for coherent states and their optimizers

1 Introduction and main results

Coherent states appear in various areas of pure and applied mathematics, including mathematical physics, signal and image processing, and semiclassical and microlocal analysis. Some background can be found, for instance, in [33,39,40]. Here, we are interested in sharp functional inequalities for coherent state transforms.

To motivate the questions we are interested in, let us recall Wehrl’s conjecture [44] and its resolution by Lieb [23]. Following Schrödinger, Bargmann, Segal, Glauber, Klauder, and others, we consider a certain family of normalized Gaussian functions ψ p , q ∈ L 2 ( R ) , parametrized by p , q ∈ R . Explicitly,

where ℏ > 0 is a fixed constant. For a nonnegative operator ρ in L 2 ( R ) with Tr ρ = 1 , one considers the function

known as the Husimi function, the covariant symbol, or the lower symbol. Thus, to a quantum state ρ in L 2 ( R ) , one associates a function defined on the classical phase space R 2 . Wehrl [44] was interested in the entropy-like quantity

showed that it is positive, and conjectured that its minimum value occurs when ρ = ∣ ψ p 0 , q 0 ⟩ ⟨ ψ p 0 , q 0 ∣ for some p 0 , q 0 ∈ R . That this is indeed the case was shown in a celebrated article by Lieb [23]. Lieb’s proof was based on the sharp forms of the Young and the Hausdorff-Young inequalities and showed more generally that, for power functions Φ ( s ) = s r with r ⩾ 1 , the quantity

is maximal for ρ as above. The result for Φ ( s ) = s ln s then follows by differentiating at r = 1 , noting that the value for Φ ( s ) = s is a constant independent of ρ .

In [10], Carlen gave an alternative proof of Lieb’s result, both for Φ ( s ) = s r , r ⩾ 1 , and Φ ( s ) = s ln s , and characterized the cases of equality. He also extended the result to Φ ( s ) = − s r with 0 < r < 1 , again including a characterization of cases of equality. Carlen’s proof is based on the logarithmic Sobolev inequality and an identity for analytic functions. For yet another proof in the logarithmic case, see [27]. For an interesting recent generalization of Lieb’s result, see [13].

In [24], Lieb and Solovej extended the earlier results and showed what they called the generalized Wehrl conjecture. Namely, for any convex function Φ on [ 0 , 1 ] , the quantity (1) is maximal if ρ = ∣ ψ p 0 , q 0 ⟩ ⟨ ψ p 0 , q 0 ∣ for some p 0 , q 0 ∈ R . The Lieb-Solovej proof proceeds by a limiting argument, based on sharp inequalities for SU(2) coherent states discussed below. Because of the limiting process, it does not provide a characterization of the cases of equality. Carlen’s analysis is based on differentiating the power function Φ ( s ) = s r with respect to the exponent r and using the logarithmic Sobolev inequality for the resulting quantity. We do not know how to adopt this method to deal with general convex functions Φ .

Our first main result in this article gives an alternative proof of the theorem of Lieb and Solovej and includes a new characterization of the cases of equality.

Note that the value of the double integral with ψ = e i θ ψ p 0 , q 0 does not depend on p 0 , q 0 ∈ R , θ ∈ R / 2 π Z . It may or may not be finite, depending on Φ . For finiteness, it is necessary that lim s → 0 + Φ ( s ) = 0 .

Under a slightly stronger assumption on Φ , we can extend the characterization of cases of equality to density matrices.

Coherent states are often closely related to representations of an underlying Lie group. The coherent states discussed so far are related to the Heisenberg group. In his article, containing the proof of Wehrl’s conjecture, Lieb conjectured that the analog of Wehrl’s conjecture also holds for Bloch coherent states, that is, for a family of coherent states related to SU(2). After some partial results in [9,38], this conjecture was finally solved by Lieb and Solovej in [24]; see also [25] for a partially alternate proof. Again, they prove a generalized version of Lieb’s conjecture involving general convex functions Φ . However, they employ a limiting argument, and therefore, their article does not characterize the cases of equality. Our second main result settles this open question by showing that, indeed, equality is only attained by rank one projections onto a coherent state.

Let us be more specific. As is well known (see, e.g., [19, Chapter II] and [41, Section VIII.4]), the nontrivial irreducible representations of SU(2) are labeled by J ∈ 1 2 N , where 2 J + 1 is the dimension of the representation and N = { 1 , 2 , 3 , … } . Let ℋ be a ( 2 J + 1 ) -dimensional representation space. Then, there are operators S 1 , S 2 , and S 3 on ℋ satisfying [ S 1 , S 2 ] = i S 3 and cyclically, representing the generators of SU(2). For any ω = ( ω 1 , ω 2 , ω 3 ) ∈ S 2 ⊂ R 3 , the operator ω ⋅ S = ω 1 S 1 + ω 2 S 2 + ω 3 S 3 has minimal eigenvalue − J , and this eigenvalue is nondegenerate. We choose ψ ω ∈ ℋ as a corresponding normalized eigenvector. It is unique up to a phase, but since we are only interested in the state ∣ ψ ω ⟩ ⟨ ψ ω ∣ , this choice of the phase is irrelevant for us. This defines the Bloch coherent states. (We follow here the convention in [33]; other definitions are based on the maximal eigenvalue + J , but this leads to the same family of coherent states, just interchanging ω and − ω .)

Note that the value of the integral with ψ = e i θ ψ ω 0 does not depend on ω 0 ∈ S 2 , θ ∈ R / 2 π Z . Since Φ is bounded, the supremum in the theorem is always finite, in contrast to the situation of Theorem 1.

Our third main result concerns coherent states for certain representations of SU(1, 1). After initial results in [3,6,26], the analog of Wehrl’s conjecture was recently settled by Kulikov in [20], again for general convex functions Φ . (In fact, slightly less than convexity is required in [20].) Kulikov [20, Remark 4.3] also characterized optimizers in the case where Φ is strictly convex. We extend this to the case where Φ is not linear.

All nontrivial representations of SU(1, 1) are infinite-dimensional. Its nontrivial irreducible unitary representations consist of discrete, principal, and complementary series, as well as limits of the discrete series; see, e.g., [19, Chapters II and XVI; also (2.20)]. Here, we are only interested in one of the two discrete series. The results for the other one can be deduced from the results below by applying complex conjugation at the appropriate places.

Following the notation in [5], the discrete series representation under consideration is labeled by K ∈ 1 2 N ⧹ { 1 2 } = { 1 , 3 2 , 2 , … } . Let ℋ be a corresponding representation space. The generators of the Lie algebra of SU(1, 1) give rise to operators K 0 , K 1 , and K 2 in ℋ satisfying

Moreover, one has

where K is the number labeling the representations. (There are also representations of SU(1, 1) corresponding to K = 1 2 , called limits of the discrete series, but their coherent state transforms are in some sense degenerate; see Section 4.4. We also briefly discuss the case of arbitrary real K > 1 2 after Corollary 7.)

For any ( n 0 , n 1 , n 2 ) ∈ R 3 with n 0 2 − n 1 2 − n 2 2 = 1 and n 0 > 0 , the operator n 0 K 0 − n 1 K 1 − n 2 K 2 has minimal eigenvalue K and this eigenvalue is simple. Therefore, we can choose a corresponding normalized eigenvector (which is unique up to a phase). It is convenient to label this vector not by ( n 0 , n 1 , n 2 ) but rather by z ∈ D , the open unit disk in C , using the parametrization

In this way, we obtain a family of vectors ψ z , z ∈ D , giving rise to coherent states for a discrete series representation of SU(1, 1).

In what follows, we denote by d A ( z ) = d x d y the two-dimensional Lebesgue measure on C .

Note that the value of the integral with ψ = e i θ ψ z 0 does not depend on z 0 ∈ D , θ ∈ R / 2 π Z . It may or may not be finite, depending on Φ . For finiteness, it is necessary that lim s → 0 + Φ ( s ) = 0 .

Theorem 6 proves the uniqueness part of a conjecture of Lieb and Solovej [26, Conjecture 5.2]. As we mentioned before, the inequality part is due to Kulikov [20].

For every real K > 1 2 , there is an irreducible representation of the Lie algebra generated by K 0 , K 1 , and K 2 satisfying the above relations. For K ∉ 1 2 N , such a representation does not come from the Lie group SU(1, 1) – recall that this group is not simply connected. However, it comes from a representation of the covering group of SU(1, 1) [32], and we could prove sharp inequalities for the corresponding coherent states. From an analytic point of view, this would lead to the same problem as coherent states for the affine group, which we discuss next.

The affine group (in one space dimension), also known as the ( a X + b ) -group, has two nontrivial irreducible unitary representations [2,12]. Again, we focus on a single one since the results for the other one can be obtained by appropriate complex conjugations. What distinguishes the affine group from the above cases of the Heisenberg group, SU(2), and SU(1, 1) is that different choices of an extremal weight vector lead to inequivalent coherent state transforms.

We fix a parameter β > 1 2 , emphasizing that this parameter does not label the representation, but rather the choice of the extremal weight vector. We consider the following family of normalized functions ψ a , b ∈ L 2 ( R + ) , R + = ( 0 , ∞ ) , parametrized by a ∈ R + , b ∈ R ,

(Here, we follow the convention in [12]. What we call β is called α − 1 2 in [26], and they do not normalize ψ a , b in L 2 ( R + ) but choose a different, natural normalization.)

Note that the value of the double integral with ψ = e i θ ψ a 0 , b 0 does not depend on a 0 ∈ R + , b 0 ∈ R , and θ ∈ R / 2 π Z . It may or may not be finite, depending on Φ . For finiteness, it is necessary that lim s → 0 + Φ ( s ) = 0 .

Theorem 8 settles the equality part of a conjecture of Lieb and Solovej [26, Conjecture 3.1]. For strictly convex Φ , it had been settled earlier in [20, Remark 4.3]. Clearly, the assumption that Φ is not linear is optimal, because otherwise the supremum is attained for any ψ ∈ L 2 ( R + ) .

We note that Theorem 8 has a version for β = 1 2 ; see Remark 20.

This concludes the description of our main results, but we would like to draw the reader’s attention also to Sections 3 and 5 where we prove, respectively, sharp reverse Hölder inequalities for analytic functions, thereby settling a conjecture of Bodmann [9], and optimal Faber-Krahn-type inequalities for coherent state transforms.

The method that we will be using is that from a recent, beautiful article by Kulikov [20]. He developed this method to solve the Lieb-Solovej conjectures for SU(1, 1) and the affine group. Here, we show that it can be adapted to deal with the Heisenberg and the SU(2) cases. We also push the characterization of optimizers a bit further than in [20], thus leading to the optimal results in Theorems 1, 4, 6, and 8.

Kulikov’s article in turn seems to be inspired by an equally beautiful recent article by Nicola and Tilli [29]. They were the first, as far as we know, to use the isoperimetric inequality in connection with the coherent state transform to obtain optimal functional inequalities. (Talenti [43] used a closely related method for comparison theorems for solutions of PDEs.) Kulikov proved his results by instead using the isoperimetric inequality in hyperbolic space, and we will prove Theorem 4 by using that on the sphere. While it is tempting to try to use the same method for more general groups, an obstacle will have to be overcome (see Section 4.6).

Nicola and Tilli proved Faber-Krahn-type inequalities for the Heisenberg coherent states. We will show that their main result (at least without the characterization of the cases of equality) follows from Theorem 1, and we will use this idea to prove analogs of their results for coherent states based on SU(2), SU(1, 1), and the affine group (see Section 5). For further developments started by [29], see, for instance, [18,30,35].

After this article was submitted for publication, we learned that Kulikov et al. had independently obtained similar results with similar techniques. These results have appeared in preprint form [21].

Thanks are due to Eric Carlen, Elliott Lieb, and Jan Philip Solovej for many discussions on the topics of this article.

It is my pleasure to dedicate this article to David Jerison on the occasion of his 70th birthday. His articles have been an inspiration for me, those on sharp inequalities [17] and others. I am particularly indebted to him for his remarks in the fall of 2008, which indirectly were a great motivation for work that eventually led to [14].

2 Inequalities for analytic functions

The main ingredient behind the results in the previous section are sharp inequalities for analytic functions and the characterization of their optimizers, which we discuss in this section.