Muller Functional Calculus on Lie Groups (1998) [sharethefiles com]


Doc. Math. J. DMV 679
Functional Calculus on Lie Groups
and Wave Propagation

Detlef Muller
1. Introduction
Consider a "sum of squares" operator
k
X
2
(1.1) L = ; Xj + Xk+1
j=1
on a smooth manifold M of dimension d, where X1 : : : Xk+1 are smooth, real
vector elds on M satisfying the following bracket condition: X1 : : : Xk+1 , to-
gether with the iterated commutators [Xj [Xj [: : : [Xj`; Xj` ] : : : ]]], span the
1 2 1
tangent space of M at every point of M. If k = d, then L might for example be
a Laplace-Beltrami operator. If k < d, then L is not elliptic, but, according to a
celebrated theorem of L. H
ormander [14], it is still hypoelliptic. Operators of this
type arize in various contexts, for instance in higher dimensional complex analysis
1
(see e.g. [32]). Assume in addition that L is essentially selfadjoint on C0 (M)
with respect to some volume element dx. Then the closure of L, again denoted
R
1
by L, admits a spectral resolution L = dE on L2(M), and any function
0
1
m 2 L (R+ ) gives rise to an L2-bounded operator
Z
1
m(L) := m( ) dE :
0
An important question is then under which additional conditions on the spectral
multiplier m the operator m(L) extends from L2 \ Lp(M) to an Lp-bounded op-
erator, for a given p = 2. If so, m is called an Lp-multiplier for L, and we write
6
m 2 Mp(L):
Since, without additional properties of M and L, there is little hope in nding
answers to this questions, we shall assume that M is a connected Lie group G,
with right-invariant Haar measure dx, and that X1 : : : Xk are left-invariant vector
elds which generate the Lie algebra g of G. Moreover, for simplicity, we shall
assume Xk+1 = 0 so that L is a so-called sub-Laplacian. The choice of a right-
invariant Haar measure and left-invariant vector elds ensures that the formal
t
transposed X of X 2 g is given by ;X, so that, by a straight-forward extension
of a well-known theorem by E. Nelson and F. Stinespring, L is selfadjoint.
Documenta Mathematica Extra Volume ICM 1998 II 679{689

680 Detlef Muller
The objective of the talk will be to survey some of the relevant developments
concerning this question, and moreover to link it to questions concerning estimates
for the associated wave equation, more precisely the following Cauchy-problem:
@2
( + L) u(x t) =0 on G R
@t2
(1.2)
@u
u(x 0) = f(x) (x 0) = 0
@t
p
whose solution is given by u( t) = cos(t L)f.
P
2
d @
The classical model case is the Laplacian L = ; = ; on Rd . Since,
j=1 @x2
j
on Rd , the spectral decomposition of the Laplacian is induced by the the Fourier
transformation, m(L) is here a Fourier multiplier operator
\ ^
m(L)f( ) = ( )f( )
with a radial Fourier multiplier ( ) = m(j j2), and a su cient condition for m to
be an Lp-multiplier for ; follows from a well-known Fourier multiplier theorem
going back to J. Marcinkiewicz, S. Mikhlin and L. H
ormander (see [18][13]):
1
Fix a non-trivial cut-o function 2 C0 (R) supported in the interval [1 2],
and de ne for > 0
kmksloc := sup j j m(r )j jH
r>0
where H = H (R) denotes the Sobolev-space of order . Thus, k mk < 1,
sloc
if m is locally in H , uniformly on every scale. Notice also that, up to equivalence,
k k is independent of the choice of the cut-o function :
sloc
"MMH-Theorem". Suppose that k mk < 1 for some > d=2. Then m 2
sloc
Mp(; ) for every p 2]1 1[. Moreover, m(; ) is of weak-type (1,1).
This result is sharp with respect to the critical degree of smoothness d=2 for the
multiplier for p = 1 for 1 < p < 1, less restrictive conditions follow by suitable
interpolation with the trivial L2-estimate (see [16], [27]).
The proof of this theorem is based on the following weighted L2- estimate,
which can be deduced from Plancherel's theorem: Let Km 2 S0(Rd ) be such that
d
Km = , so that m(L)f = f Km: Then, for m supported in ]0 1],
Z
2 2
(1.3) j (1 + j xj ) Km(x)j dx Cj j mj j :
H
d
R
Now, if G is an arbitrary Lie group, then it has been shown by Y. Guivarc'h and
J. Jenkins (see e.g. [35]) that G is either of polynomial growth, or of exponential
growth, in the following sense: Fix a compact neighborhood U of the identity
element e in G. Then G has polynomial growth, if there exists a constant c > 0
such that jUnj cnc for every n 2 N where jAj denotes the Haar measure of a
Borel subset A of G. In that case, it is known that there is in fact an integer Q
and C > 0 such that
; 1
(1.4) C nQ j Unj CnQ for every n 1:
Documenta Mathematica Extra Volume ICM 1998 II 679{689
Functional Calculus on Lie Groups 681
G is said to have exponential growth, if
(1.5) j Unj Ce n for every n 1
for some > 0 C > 0. In this case, there does in fact also hold a similar estimate
from above.
Clearly, Euclidean groups are of polynomial growth, and, more generally, the
same is true for nilpotent groups.
From an analytic point of view, there is a strong di erence between both types
of groups: Whereas groups of polynomial growth are spaces of homogeneous type
in the sense of R. Coifman and G. Weiss (compare [32]), so that standard methods
from the Calder on-Zygmund theory of singular integrals do apply, this is not true of
groups of exponential growth. I shall mainly concentrate on groups of polynomial
growth, and only brie y report on some phenomena discovered in the recent study
of a few examples of groups of exponential growth.
2. Polynomial volume growth
Beginning with some early work by A. Hulanicki and E.M. Stein, various analogous
of the MMH-Theorem for groups of polynomial growth have been proved in the
course of the past two decades. A main objective of these works byvarious authors,
among them L. De Michele, G. Mauceri, J. Jenkins, M. Christ, S. Meda, A. Sikora
and G. Alexopoulos (see e.g. [1], also for further references), was the quest for
the sharp critical exponent of smoothness in the corresponding theorems on such
groups, which is in fact not concluded yet.
Let us look at the important special case of a strati ed Lie group G, whose Lie
algebra g admits a decomposition into subspaces
g = g1 gp
such that [gi gk ] gi+k for all i k, and where g1 generates g as a Lie algebra. We
then form L in (1.1) from a basis X1 : : : Xk of g1 , with Xk+1 =0: Such a group
is clearly nilpotent and admits a one-parameter group of automorphisms f gr>0,
r
called dilations, given by := rjIdgj : Then L is homogeneous of degree 2 with
r
gj
respect to these dilations, and the bi-invariant Haar measure transforms under r
as follows:
(2.1) (dx) = rQdx
r
where
p
X
Q := j dim g
j
j=1
is the so-called homogeneous dimension of G. It agrees with the growth exponent Q
in (1.4). Notice that for groups which are nilpotent of step p> 1, the homogeneous
dimension is greater than the Euclidean dimension d = dim G only for abelian
groups, both are the same. The following theorem is due to M. Christ ([5], see
also [17]):
Documenta Mathematica Extra Volume ICM 1998 II 679{689

682 Detlef Muller
Theorem 1. If G is a strati ed Lie group of homogeneous dimension Q, and if
kmk < 1 for some > Q=2, then m(L) is bounded o n Lp(G) for 1 < p< 1,
sloc
and of weak type (1,1).
1
If m 2 L (R+ ), then, by left{invariance and the Schwartz kernel theorem,
it is easy to see that m(L) is a convolution operator m(L)f = f Km =
R
; 1
f(y)Km(y )dy where a priori the convolution kernel Km is a tempered dis-
G
tribution. We also write Km = m(L) . The main problem in proving Theorem 1
e
is to draw information on Km, namely to show that Km is a Calder on-Zygmund
kernel, from relatively abstract information on the multiplier m. This is usually
;tL
done by appealing to estimates for the heat kernels pt = e t > 0, by some
e
method of subordination. In fact, through work by D. Jerison and A. Sanchez-
Calle for the case of strati ed groups, and N. Varopoulos and his collaborators for
more general Lie groups [35], one knows that pt, say on a strati ed group, satis es
estimates of the following form:
d(x e)2
;
;Q=2
4(1+")t
(2.2) pt(x) C"t e
which are essentially optimal. Here, d denotes the so-called optimal control
or Carnot{Carath eodory distance associated to the H
ormander system of vector
elds X1 : : : Xk (see [35]), de ned as follows: An absolutely continuous path
: [0 1] ! G is called admissible, if
k
X
_ (t) = aj(t)Xj( (t)) for a.e. t 2 [0 1]:
j=1
1
1=2
R P
The length of is then given by j j := aj(t)2 dt and the associated
j
0
distance function is de ned by d(x y) := inffj j : is admissible, and (0) =
x (1) = yg where inf := 1. H
ormander's bracket condition ensures that
d(x y) < 1 for every x y 2 G.
Observe that in (2.1) and (2.2), in comparizon to the classical case G = Rd ,
the homogeneous dimension Q takes over the role of the Euclidian dimension d.
Because of this fact, which is an outgrowth of the homogeneity of L with respect to
the automorphic dilations, the condition > Q=2 in Theorem 1 appeared natural
and was expected to be sharp. The following result, which was found in joint work
with E.M. Stein [25], and independently also by W. Hebisch [11], came therefore
as a surprise:
Fix n 2 N and let Hn denote the Heisenberg group of Euclidean dimension
d =2n+1, for which the group law, expressed in coordinates (x y u) 2 Rn Rn R,
is
0 0 1
(x y u) (x y u0) =(x + x0 y + y0 u + u0 + (x y0 ; x0 y))
2
where x y denotes the Euclidean inner product. A basis of the Lie algebra of Hn
is then given by the left-invariant vector elds
Documenta Mathematica Extra Volume ICM 1998 II 679{689
Functional Calculus on Lie Groups 683
@ @ @ @ @
1 1
U = Xj = ; yj Yj = + xj j =1 : : : n:
@u @xj 2 @u @yj 2 @u
The only nontrivial commutation relations among these elements are the Heisen-
berg relations [Xj Yj] = U j = 1 : : : n: The corresponding sub-Laplacian
n
P(X
2
L := ; + Yj2) is then homogeneous with respect to the automorphic dila-
j
j=1
tions (x u) := (rx r2 u) and the homogeneous dimension is Q =2n +2.
r
Theorem 2. For the sub-Laplacian L on Hn , the statement in Theorem 1 remains
valid under the weaker condition > d=2 instead of > Q=2.
Even though the proofs in [11] and [25] are somewhat di erent in nature, both
drawheavily on the fact that the Heisenberg group has a large group of symmetries.
The approach in [25] rests on the following estimate which, surprisingly, is better
then what the Euclidean analogue (1.3) would predict:
Let m 2 H3=2 be supported in the interval ]0 1]. Moreover let a " homogeneous
4 4
norm" on Hn be given by j(x y u)j := (jxj + jyj + u2)1=4, so that in particular
j gj = rjgj for every g 2 Hn and r > 0. Then
r
Z
2 2
j(1 + jgj)2Km(g)j dg Cj j mj j :
H3=2
H
n
For extensions of these results to groups of "Heisenberg type" and
"Marcinkiewicz-type" multiplier theorems, see [21],[22].
It is an open questions whether Theorem 1 does hold under the weaker condition
> d=2 for arbitrary groups of polynomial growth.
3. Subordination under the wave equation
and the case of the Heisenberg group
It does not seem possible to derive Theorem 2 from estimates for heat kernels
alone. Some approaches to multiplier theorems on polynomially growing groups
also make use of information on the associated wave equation (1.2), namely the
nite propagation speed for these waves (see.eg. [1]), an idea apparently going
back to M. Taylor (see e.g. [34]). However, also these approaches do not yield the
sharp result in Theorem 2.
In this section we shall show how, on the other hand, stronger information on
wave propagation, namely sharp Sobolev estimates for solutions to (1.2), might
in fact lead to sharp multiplier theorems for such groups. For the case of the
Heisenberg group, such estimates have been established very recently in joint work
with E.M. Stein [26].
Consider the Cauchy problem (1.2). It is natural here to introduce Sobolev
norms of the form
j jfj j := j j (1 + L) =2fj j :
Lp
Lp
Documenta Mathematica Extra Volume ICM 1998 II 679{689

684 Detlef Muller
Estimates for u( t), for xed time t, in terms of Sobolev norms of the initial datum
p
f, then reduce essentially to corresponding estimates for the operator eit L. For
p = 2, this operator is unitary, hence bounded on L2(G), but for p = 2 this
6
operator will lead to some loss of regularity.
For the classical case of the Laplacian on Rd , such estimates have been estab-
lished by A. Miyachi [19] and J. Peral [28]. Extensions to the setting of Fourier
integral operators, and in particular to elliptic Laplacians, have been given by
A. Seeger, C. Sogge and E.M. Stein [29].
However, for non-elliptic sub-Laplacians, the methods in the latter article, which
p
rely on a representation of eit L as a Fourier integral operator, break down {
p
already the rst step, namely to identify L as a pseudodi erential operator in a
"good" symbol class, fails.
Nevertheless, making use of the detailed representation theory of Hn , and
in particular of some explicit formulas for certain projection operators due to
R. Strichartz, the following analogue of Miyachi-Peral's result has been proved in
[26]:
Theorem 3. Let L denote the sub-Laplacian on the Heisenberg group, and let
1 1
p 2 [1 1]. Then, for > (d ; 1) ; , o ne has
p 2
p
p p
j jei Lfj j Cp j j(1 + L) =2fj j :
L L
By a simple scaling argument, based on the homogeneity of L, one obtains the
following estimate for arbitrary time t (we concentrate here on the most important
case p = 1):
p
(3.1) j jeit Lfj j C(1 + jtj ) j j (1 + L) =2fj j if > (d ; 1)=2:
L1 L1
The multiplier theorem in Theorem 2 can be deduced from this result by means
of the following principle, respectively variants of it:
Subordination principle. Assume that L is a sub-Laplacian on a Lie group G
satisfying (3. 1) for some > 0 and every t 2 R. Let > +1=2. Then there is
a constant C > 0, such that for any multiplier ' 2 H (R) supported in [1 2] the
corresponding convolution kernel K' is in L1(G), and
j jK'j j Cj j'j j :
L1 (G) H ( R)
Proof. Observe rst that (1 + L);" 2 L1 (G) for any " > 0. This follows from
e
the formula
Z Z
1 1
1 1
(1 + L);" = t"; 1e;t(1+L) dt = t"; 1 e;tpt dt
e e
;(") ;(")
0 0
and the fact that the heat kernel pt is a probability measure on G.
Write
2
'( ) = ( )(1 + ); with > =2
Documenta Mathematica Extra Volume ICM 1998 II 679{689
Functional Calculus on Lie Groups 685
and put k := (1 + L); 2 L1(G).
e
Then j j j j 'j j'j j , and
H H
Z
1
p
p p
K' = ( L)((1 + L); ) = ( L)k = ^(t)eit Lk dt:
e
;1
Estimate (3.1) then implies
Z
1
j jK'j j j ^(t)j (1 + jtj) j j (1 + L) =2kj j dt:
L1 L1
;1
But, (1 + L) =2k = (1 + L) =2; 2 L1 , hence, by H inequality and
older's
e
Plancherel's theorem,
Z Z
1 1
2 ;
j jK'j j C( j ^(t)(1 + jtj) j dt)1=2 ( (1 + jtj )2( )dt)1=2 C0 j j j j :
L1 H
;1 ;1
Q.E.D.
d;1 1 d
In case of the Heisenberg group, it su ces to choose > + = in
2 2 2
this subordination principle. This is just the required regularity of the multi-
plier in Theorem 2, and one can in fact deduce Theorem 2 from Theorem 3 by
a re nement of the above subordination principle and standard arguments from
Calder on-Zygmund theory.
In view of the above considerations, it would be desirable to extend Theorem
3 to larger classes of polynomially growing groups. I do have some hope that
such extensions may be achievable by linking the estimates more directly to the
underlying geometry through methods from geometrical optics.
4. Exponential volume growth
Comparatively little is yet known in the case of groups with exponential volume
growth, even if one deals with full Laplacians.
There are basically two, partially complementary, multiplier theorems of general
nature available in this context, both requiring the multiplier to be holomorphic
in some neighborhood of the L2-spectrum of L for p =2.
6
The rst, applying to multipliers of so-called Laplace transform type, is due to
E. M. Stein [31] and is based on the theory of heat di usion semigroups and
Littlewood-Paley-Stein theory. The second, initiated by M. Taylor (see e.g. [34]),
applies to Laplace-Beltrami operators on Riemannian manifolds with "bounded
geometry" and lower bound on the Ricci curvature, and makes use of the nite
propagation speed of waves on these manifolds.
Let us say that a sub-Laplacian L is of holomorphic Lp-type , if there exist a
point in the L2-spectrum and an open neighborhood U of in C, such that
0 0
every multiplier m 2 Mp(L) extends holomorphically to U.
It is well-known that Riemannian symmetric spaces of the non-compact type
are of holomorphic Lp-type for p =2, see e.g. [7], [34].
6
Documenta Mathematica Extra Volume ICM 1998 II 679{689

686 Detlef Muller
In contrast, we say that L admits a di erentiable Lp-functional calculus, if there
k
is some integer k 2 N such that C0 (R+ ) Mp(L):
In 1991 W. Hebisch [10] showed that certain distinguished Laplacians L on a
particular class of solvable Lie groups G with exponential volume growth, namely
the "Iwasawa AN components" of complex semisimple Lie groups, do admit a
di erentiable L1 - functional calculus, and not only this: m lies in M1 (L) if and
only if m 2 M1 (; ), where denotes the Laplacian on the Euclidian space of
the same dimension as G. For variants and extensions of these results, see e.g. [9],
[12].
This surprising result does, however, not extend to arbitrary solvable Lie groups,
as has recently been shown in joint work with M. Christ [6]. Consider the following
group G1 , whose Lie algebra g1 has a basis T X Y U such that the only non-trivial
commutation relations are
[T X] = X [T Y] = ;Y [X Y] = U
and the associated Laplacian L = ;(T2 + X2 + Y2 + U2):
G1 is a semidirect product of the Heisenberg group H1 with R (analogues do
exist also for higher dimensional Heisenberg groups). Then L is of holomorphic
Lp-type for every p =2:
6
As has been proved by H. Leptin and D. Poguntke [15], G1 is in fact the lowest
dimensional solvable Lie group whose group algebra L1(G) is non-symmetric, and
the existence of di erentiable Lp- functional calculi for Laplacians on Lie groups
seems to be related to the symmetry of the corresponding group algebras.
The few results known so far raise two major questions: Suppose G is a, say,
solvable Lie group of exponential growth, and let L be a sub-Laplacian on G.
Under which conditions is L of holomorphic Lp-type for p = 2, respectively, when
6
does it admit di erentiable Lp- functional calculi? In the latter case, do theorems
of MMH-type hold? The last question would require a good understanding of the
integral kernels m(L) "at in nity", and is still completely open.
e
5. Local smoothing for the wave equation
Let us turn back to the Laplacian L = ; on Rd . Then m(L) corresponds to the
2
radial Fourier multiplier ! m(j j ). For such radial multipliers and 1 < p< 1,
7
p = 2, better Lp-estimates can be proved than those obtained from interpolating
6
the MMH-estimate with the trivial L2-estimate, by making use of the curvature of
the sphere j j =1. Let us look at the important model case of the Bochner-Riesz
multipliers
m ( ) := (1 ; ) +:
By interpolation, the MMH-Theorem implies
1 1
(5.1) m 2 Mp(; ) if > (d ; 1) j ; j :
p 2
However, the famous Bochner-Riesz-conjecture states that
1 1 1
(5.1) m 2 Mp(; ) if > max (d j ; j ; 0):
p 2 2
Documenta Mathematica Extra Volume ICM 1998 II 679{689
Functional Calculus on Lie Groups 687
2d
Put pd := . The conjecture reduces to proving that m 2 Mpd (; ) for every
d;1
d; 1
> 0, whereas (5.1) requires > for the critical exponent p = pd .
2d
In two dimensions, the conjecture has been proved by L. Carleson and P. Sjolin

[3] by means of a more general theorem on oscillatory integral operators (for a
variant of their proof by L.H
ormander, and another approach due to C. Fe erman
and A. Cordoba, see e.g. [32]). In higher dimensions, only partial results are
known hitherto, see e.g. [2], [36].
The Bochner-Riesz-conjecture is again linked to the wave equation via the
stronger local smoothing conjecture, due to C. Sogge, according to which the solu-
tion u(x t) to the Cauchy problem (1.2) for the wave equation satis es space-time
estimates
pd pd
(5.3) j juj j d C"j j (1 ; )"fj j d)
L ( R [ 1 2]) L (R
for all " > 0, again with pd =2d=(d ; 1).
This conjecture is still open even in two dimensions for interesting partial
results, see e.g. [30], [20].
It is known that the validity of the local smoothing conjecture would imply that
of other outstanding conjectures in Fourier analysis, like the "restriction conjec-
ture" or the "Kakeya conjecture".
A common theme underlying all these conjectures is the interplay between
curvature properties (here, the curvature of the Euclidian sphere) and Fourier
analysis. For a comprehensive account of the state of these conjectures and the
correlations between them, see [33].
Let me nish by describing a recent joint result with A. Seeger [24] concerning
the local smoothing conjecture.
Introduce polar coordinates x = r , r > 0 2 Sd;1, where Sd; 1 denotes the
unit sphere in Rd : Correspondingly, de ne mixed norms
Z Z
p=2
1
2 ;1
j jfj j p(R+ L2 d;1 := ( jf(r )j d rd dr)1=p:
L (S ))
d;1
0 S
;
Moreover, denote by L the Laplace-Beltrami-operator on the sphere Sd 1.
Theorem 4. If u is the solution of the Cauchy problem (1. 2), and if 2 p< pd,
then
j juj j p( R+ [1 2] L2( Sd;1 Cp " j j(1 ; L )"fj j p( R+ L2 ( Sd;1
L )) L ))
for all " > 0.
The mixed norm of u in this estimate has to be taken with respect to the
variables (r t ): Slightly sharper endpoint estimates will be contained in [24].
For the case of radial initial data f, endpoint results for p = pd had been obtained
before in [23], [8].
The proof of Theorem 4 makes use of the development of f(r ) with respect to
into spherical harmonics and the corresponding Plancherel theorem on the sphere,
p
and some explicit formulas for the integral kernel of cos t ; in polar coordinates,
Documenta Mathematica Extra Volume ICM 1998 II 679{689

688 Detlef Muller
obtainable through the Hankel inversion formula (see [4]). The integral kernel is
decomposed into suitable dyadic pieces which, after applying suitable coordinate
changes and re-scalings, nally can be estimated by means of the following vector-
valued variant of Carleson-Sj theorem for oscillatory integral operators [24],
olin's
whose proof does not simply follow from an extension of one of the existing proofs
for the scalar valued case:
1

Vector-valued Carleson-Sjolin theorem. Let 2 C (R2 R) be a
1
smooth, real phase function and a 2 C0 (R2 R) be a compactly supported ampli-
tude. Consider the oscillatory integral operator T given by
Z
T f(z) := ei ( z y)a(z y)f(y) dy:
00 00
z1 y z2 y
Suppose that the Carleson-Sj determinant det does not
olin
000 000
z1 yy z2 yy
vanish on the support of a (it is in this condition where some curvature condi-
tion is hidden). Assume that 2 p 4, and put
=2;1=p
(log(2+ ))1
wp( ) := :
=2
(1+ )1
Then
X X
; 1=2
1=2 2
2 2
jT j fjj C wp(j j ) fj
j
p( p(
L R2) L R)
j j
for every sequence o f functions fj 2 Lp(R) and every sequence of real numbers .
j
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Detlef M
uller
Christian-Albrechts Universit Kiel
at
Mathematische Seminar
Ludewig-Meyn Str. 4
24098 Kiel, Germany
mueller@math.uni-kiel.de
Documenta Mathematica Extra Volume ICM 1998 II 679{689
690
Documenta Mathematica Extra Volume ICM 1 998 II


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