Wave front
wave front set, of a generalized function (distribution) or hyperfunction
A conical set in the cotangent bundle to the manifold on which the generalized function or hyperfunction in question is given, which characterizes its singularities. A hyperfunction is a sum of formal boundary values of holomorphic functions. Two such sums are identified if they are equivalent in the sense of equivalence given by an analogue of Bogolyubov's "edge-of-the-wedge" theorem (cf. Bogolyubov theorem), in which, however, one in no sense assumes that the holomorphic functions in question have limits.
The wave front set of a hyperfunction is also often called the analytic wave front set or the singular support (the last term is more often used in a completely-different sense, when it denotes the complement to the set of some sort of regularity of the generalized function on the manifold itself, and not in the cotangent bundle). The concept of the wave front set lies behind micro-local analysis, which is a complex of ideas and methods using wave front sets and other related concepts and techniques (in particular, pseudo-differential operators and Fourier integral operators) for studying partial differential equations (mainly linear equations).
Let 
be a domain in 
and let 
, that is, 
is a generalized function on 
. Then the wave front set 
of 
is the closed conical subset of 
defined as follows: If 
, then 
means that there is a function 
, equal to 
in a neighbourhood of 
, and a conical neighbourhood 
of 
in 
, such that for every 
,
 |
where
 |
that is, 
is the Fourier transform of 
.
If 
is a manifold and 
is a generalized function on 
(or, more generally, a generalized section of a smooth vector bundle), then 
is defined in the same way as above (after transition to local coordinates). In this case 
turns out to be a well-defined conical subset of 
(the cotangent bundle without the zero section).
One introduces the canonical projection 
. Then
 | (1) |
where 
is the complement of the largest open subset of 
on which 
coincides with an infinitely-differentiable function. This relationship shows that 
is actually a finer characteristic of the singularities of 
than 
.
Let 
be a pseudo-differential operator of order 
on 
with principal symbol 
, and let 
be the set of its characteristic directions, that is,
 |
Then
 | (2) |
Here the first inclusion characterizes the pseudo-locality of 
, and the second is a far-reaching generalization of the theorem on the smoothness of solutions of elliptic equations with smooth coefficients.
If the principal symbol 
of 
is real-valued, then the following theorem on the propagation of singularities holds: If one is given a connected piece 
of a bicharacteristic (that is, a trajectory of the Hamiltonian vector field on 
with Hamiltonian 
) that does not intersect 
, then either 
or 
.
This theorem shows that the singularities of the solutions (that is, their wave front sets) of an equation 
with a smooth right-hand side 
propagate along the bicharacteristics of the principal symbol 
of 
(see [3], [4], [8], [11], [12], [16]).
The analytic wave front set 
for a generalized function 
can be defined in one of the following three equivalent (see [13]) ways (here, for simplicity, 
is a domain in 
):
1) 
if there are a neighbourhood 
of 
, open proper convex cones 
in 
and functions 
, holomorphic in 
, such that 
, 
, and 
, where 
is the cone dual to 
and 
is the boundary value of the holomorphic function 
for 
, 
, understood in the sense of weak convergence of generalized functions. This definition is also applicable to hyperfunctions if the boundary value is interpreted differently.
2) Let
 |
(a generalized Fourier transform); then 
if and only if for any function 
that is analytic in a neighbourhood of 
there are a conical neighbourhood 
of 
and positive constants 
such that
 |
3) 
if and only if there are a neighbourhood 
of 
in 
, a bounded sequence of generalized functions 
, 
with compact support, and a constant 
, such that 
in 
and
 |
There is an analogue of the property (1) for the analytic wave front:
 |
where 
is the complement of the largest set on which 
is real-analytic. There is an analogue of the property (2), where one can take for 
a differential operator with real-analytic coefficients or an analytic pseudo-differential operator (see [6], [9], [11], [15], [16]). For such an operator 
with a real principal symbol, a theorem on the propagation of the analytic wave front set holds, analogous to the theorem stated above for the ordinary wave front set (see [11]).
References
| [1] | M. Sato, "Hyperfunctions and partial differential equations" , Proc. 2nd Conf. Functional Anal. Related Topics , Tokyo Univ. Press (1969) pp. 91–94 |
| [2] | L. Hörmander, "Fourier integral operators I" Acta Math. , 127 (1971) pp. 79–183 |
| [3] | J.J. Duistermaat, L. Hörmander, "Fourier integral operators II" Acta Math. , 128 (1972) pp. 183–269 |
| [4] | J.J. Duistermaat, "Fourier integral operators" , Courant Inst. Math. (1973) |
| [5] | M.A. Shubin, "Pseudo-differential operators and spectral theory" , Springer (1983) (Translated from Russian) |
| [6] | F. Trèves, "Introduction to pseudo-differential and Fourier integral operators" , 1–2 , Plenum (1980) |
| [7] | M.E. Taylor, "Pseudo-differential operators" , Princeton Univ. Press (1981) |
| [8] | L. Nirenberg, "Lectures on linear partial differential equations" , Amer. Math. Soc. (1972) |
| [9] | M. Kashiwara, "Microfunctions and pseudo-differential equations" H. Komatsu (ed.) , Hyperfunctions and pseudodifferential equations. Proc. Conf. Katata, 1971 , Lect. notes in math. , 287 , Springer (1973) pp. 265–529 |
| [10] | P. Schapira, "Théorie des hyperfonctions" , Lect. notes in math. , 126 , Springer (1970) |
| [11] | J. Sjöstrand, "Singularités analytiques microlocales" , Univ. Paris-Sud (1982) ((Prepublication.)) |
| [12] | R. Lascar, "Propagation des singularités des solutions d'Aeequations pseudo-differentielles à caractéristiques de multiplicités variables" , Springer (1981) |
| [13] | J. Bony, "Equivalence des diverses notions de spectre singulier analytique" Sém. Goulaouic–Schwartz , III (1976–1977) |
| [14a] | J. Bros, D. Iagolnitzer, "Tuboides et structure analytique des distributions I. Tuboides et généralisation d'un théorème de Grauert" Sém. Goulaouic–Lions–Schwartz , 16 (1974) |
| [14b] | J. Bros, D. Iagolnitzer, "Tuboides et structure analytique des distributions II. Support essential et structure analytique des distributions" Sém. Goulaouic–Lions–Schwartz , 18 (1975) |
| [15] | L. Hörmander, "On the singularities of solutions of partial differential equations" Comm. Pure Appl. Math. , 23 (1970) pp. 329–358 |
| [16] | L.V. Hörmander, "The analysis of linear partial differential operators" , 1–4 , Springer (1983–1985) |
Comments
References
| [a1] | V. Guillemin, S. Sternberg, "Geometric asymptotics" , Amer. Math. Soc. (1977) |
| [a2] | V.I. Arnol'd, "Singularities of caustics and wave fronts" , Kluwer (1990) |
Wave front. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Wave_front&oldid=18893