1. Introduction
In this paper, we consider
with the Euclidean inner product 〈·, ·〉 and norm
. For
, let
σα be the reflection in the hyperplane
orthogonal to
α:
()
A finite set is called a root system, if and for all . We assume that it is normalized by |α|2 = 2 for all . For a root system , the reflections σα, , generate a finite group G. The Coxeter group G is a subgroup of the orthogonal group O(d). All reflections in G correspond to suitable pairs of roots. For a given , we fix the positive subsystem . Then for each either or .
Let be a multiplicity function on (a function which is constant on the orbits under the action of G). As an abbreviation, we introduce the index .
Throughout this paper, we will assume that k(α) ≥ 0 for all . Moreover, let wk denote the weight function , for all , which is G-invariant and homogeneous of degree 2γ.
Let
ck be the Mehta-type constant given by
. We denote by
μk the measure on
given by d
μk(
y)≔
ckwk(
y)d
y, by
Lp(
μk), 1 ≤
p ≤
∞, the space of measurable functions
f on
, such that
()
and by
the subspace of
Lp(
μk) consisting of radial functions.
For
f ∈
L1(
μk) the Dunkl transform of
f is defined (see [
1]) by
()
where
Ek(−
ix,
y) denotes the Dunkl kernel. (For more details see the next section.)
Many uncertainty principles have already been proved for the Dunkl transform
, namely, by Rösler [
2] and Shimeno [
3] who established the Heisenberg-type uncertainty inequality for this transform, by showing that for
f ∈
L2(
μk),
()
Recently, the author [
4–
7] proved general forms of the Heisenberg-type inequality for the Dunkl transform
.
The Dunkl translation operators
τx,
, [
8] are defined on
L2(
μk) by
()
Let
. The Dunkl-Wigner transform
Vg is the mapping defined for
f ∈
L2(
μk) by
()
where
()
This transform is studied in [
9,
10] where the author established some applications (Plancherel formula, inversion formula, Calderón’s reproducing formula, extremal function, etc.).
In this paper we use formula (
4); we prove uncertainty principle intervening
and
Vg of magnitudes
a,
b ≥ 1; that is, for every
f ∈
L2(
μk),
()
Next, we prove a Heisenberg-type uncertainty principle for the Dunkl-Wigner transform
Vg of magnitude
s > 0; that is, there exists a constant
c(
k,
s) > 0 such that, for
f ∈
L2(
μk),
()
Finally, we prove a local uncertainty principle for the Dunkl-Wigner transform
Vg; that is, there exists a constant
b(
k,
s) > 0 such that, for
f ∈
L2(
μk) and for measurable subset
E of
such that 0 <
μk ⊗
μk(
E) <
∞,
()
where
χE is the indicator function of the set
E.
In the classical case, the Fourier-Wigner transforms are studied by Weyl [11] and Wong [12]. In the Bessel-Kingman hypergroups, these operators are studied by Dachraoui [13].
This paper is organized as follows. In Section 2, we recall some properties of the Dunkl-Wigner transform Vg. In Section 3, we prove a Heisenberg-type uncertainty principle for the Dunkl-Wigner transform Vg of magnitude s > 0; and we deduce a local uncertainty principle for this transform.
2. The Dunkl-Wigner Transform
The Dunkl operators
,
j = 1, …,
d, on
associated with the finite reflection group
G and multiplicity function
k are given, for a function
f of class
C1 on
, by
()
For
, the initial value problem
,
j = 1, …,
d, with
u(0,
y) = 1 admits a unique analytic solution on
, which will be denoted by
Ek(
x,
y) and called Dunkl kernel [
14,
15]. This kernel has a unique analytic extension to
(see [
16]). The Dunkl kernel has the Laplace-type representation [
17]
()
where
and
Γx is a probability measure on
, such that
. In our case,
()
The Dunkl kernel gives rise to an integral transform, which is called Dunkl transform on
, and was introduced by Dunkl in [
1], where already many basic properties were established. Dunkl’s results were completed and extended later by de Jeu [
15]. The Dunkl transform of a function
f in
L1(
μk) is defined by
()
We notice that
agrees with the Fourier transform
that is given by
()
The Dunkl transform of a function
which is radial is again radial and could be computed via the associated Fourier-Bessel transform
(see [
18], Proposition
4); that is,
()
where
f(
x) =
F(|
x|) and
()
Here
jγ is the spherical Bessel function (see [
19]).
Some of the properties of Dunkl transform are collected below (see [1, 15]).
Theorem 1. (i) L1 − L∞-Boundedness. For all f ∈ L1(μk), , and
()
(ii) Inversion Theorem. Let
f ∈
L1(
μk), such that
. Then
()
(iii) Plancherel Theorem. The Dunkl transform
extends uniquely to an isometric isomorphism of
L2(
μk) onto itself. In particular, one has
()
(iv) Parseval Theorem. For
f,
g ∈
L2(
μk), one has
()
The Dunkl transform
allows us to define a generalized translation operators on
L2(
μk) by setting
()
It is the definition of Thangavelu and Xu given in [
8]. It plays the role of the ordinary translation
τxf =
f(
x + ·) in
, since the Euclidean Fourier transform satisfies
. Note that, from (
13) and Theorem
1(iii), relation (
22) makes sense, and
, for all
f ∈
L2(
μk).
Rösler [
20] introduced the Dunkl translation operators for radial functions. If
f are radial functions,
f(
x) =
F(|
x|), then
()
where
Γx is the representing measure given by (
12).
This formula allows us to establish the following results [8, 21].
Proposition 2. (i) For all p ∈ [1,2] and for all , the Dunkl translation is a bounded operator, and for , one has
()
(ii) Let
. Then, for all
, one has
()
The Dunkl convolution product ∗
k of two functions
f and
g in
L2(
μk) is defined by
()
We notice that ∗
k generalizes the convolution ∗ that is given by
()
Proposition 2 allows us to establish the following properties for the Dunkl convolution on (see [8]).
Proposition 3. (i) Assume that p ∈ [1,2] and q, r ∈ [1, ∞] such that 1/p + 1/q = 1 + 1/r. Then the map (f, g) → f∗kg extends to a continuous map from to Lr(μk), and
()
(ii) For all
and
g ∈
L2(
μk), one has
()
(iii) Let
and
g ∈
L2(
μk). Then
f∗
kg belongs to
L2(
μk) if and only if
belongs to
L2(
μk), and
()
(iv) Let
and
g ∈
L2(
μk). Then
()
where both sides are finite or infinite.
Let
and
. The modulation of
g by
y is the function
gk,y defined by
()
Thus,
()
Let
. The Fourier-Wigner transform associated with the Dunkl operators is the mapping
Vg defined for
f ∈
L2(
μk) by
()
In the following we recall some properties of the Dunkl-Wigner transform (Plancherel formula, inversion formula, reproducing inversion formula of Calderón’s type, etc.).
Proposition 4 (see [10].)Let . Then
Theorem 5 (see [10].)Let be a nonzero function. Then one has the following.
- (i)
Plancherel formula: for every f ∈ L2(μk), one has
()
- (ii)
Parseval formula: for every f, h ∈ L2(μk), one has
()
- (iii)
Inversion formula: for all f ∈ L1∩L2(μk) such that , one has
()
Theorem 6 (Calderón’s reproducing inversion formula; see [10]). Let , −∞ < aj < bj < ∞, and let be a nonzero function, such that . Then, for f ∈ L2(μk), the function fΔ given by
()
belongs to
L2(
μk) and satisfies
()
3. Uncertainty Principles for the Mapping Vg
In this section we establish Heisenberg-type uncertainty principle for the Dunkl-Wigner transform Vg. We begin by the following theorem.
Theorem 7. Let be a nonzero function. Then, for f ∈ L2(μk), one has
()
Proof. Let f ∈ L2(μk). Assume that . Inequality (4) leads to
()
Integrating with respect to d
μk(
y) and using the Schwarz inequality, we get
()
But by Proposition
4(ii), Fubini-Tonelli’s theorem, (
16), Proposition
2(ii), and Theorem
1(iii), we have
()
This yields the result and completes the proof of the theorem.
Theorem 8. Let be a nonzero function and s ≥ 1. Then, for f ∈ L2(μk), one has
()
Proof. Let s ≥ 1 and let f ∈ L2(μk), f ≠ 0, such that . Then, for s > 1, we have
()
where
s′ is defined as usual by 1/
s + 1/
s′ = 1. By Hölder’s inequality we get
()
Thus, for all
s ≥ 1, we have
()
with equality if
s = 1. In the same manner and using Theorem
1(iii), we have, for
s ≥ 1,
()
with equality if
s = 1. By (
48) and (
49), for all
s ≥ 1, we have
()
with equality if
s = 1. Applying Theorem
7, we obtain
()
which completes the proof of the theorem.
From (48) and (49) we deduce the following remark.
Remark 9. Let be a nonzero function and a, b ≥ 1. Then, for f ∈ L2(μk), we have
()
For
λ > 0, we define the dilation of
f ∈
L2(
μk) by
()
Then
()
()
Let us now turn to establishing Heisenberg-type uncertainty principle for the Dunkl-Wigner transform Vg of magnitude s > 0. Thus, we consider the following lemma.
Lemma 10. Let λ > 0 and let be a nonzero function. Then, for f ∈ L2(μk), one has
()
Proof. From Proposition 4(ii), we have
()
But by (
55) we have
()
Thus,
()
which gives the result.
Theorem 11 (Heisenberg-type uncertainty principle for Vg). Let s > 0. Then there exists a constant c(k, s) > 0 such that, for all f ∈ L2(μk) and , one has
()
Proof. Let s, r0 > 0 and , where |(x, y)| = (|x|2 + |y|2) 1/2. Fix r0 such that . We write
()
But from Hölder’s inequality and Proposition
4(iii) we have
()
Therefore, by Theorem
5(i),
()
Using the fact that |(
x,
y)|
s = (|
x|
2+|
y|
2)
s/2 ≤ 2
s/2(|
x|
s+|
y|
s) we deduce that
()
where
()
Replacing
f and
g by
fλ and
gλ, respectively, in the previous inequality, we obtain by Lemma
10 and by a suitable change of variables
()
By setting
in the right-hand side of the previous inequality we obtain the desired result.
We will now prove a local uncertainty principle for the Dunkl-Wigner transform Vg, which extends the result of Faris [22].
Theorem 12 (local uncertainty principle for Vg). Let s > 0. Then there exists a constant b(k, s) > 0 such that, for all f ∈ L2(μk) and and for all measurable subset E of such that 0 < μk ⊗ μk(E) < ∞, one has
()
Proof. Let s > 0 and let E be a measurable subset of such that 0 < μk ⊗ μk(E) < ∞. From Hölder’s inequality and Proposition 4(iii) we have
()
From (
63) there exists
b(
k,
s) > 0 such that
()
Therefore we obtain the desired result.
Competing Interests
The author declares that there is no conflict of interests regarding the publication of this paper.
