Hecke operator
Let 
be the vector space of (entire) modular forms of weight 
, see Modular form or [a1]. Then the Hecke operator 
is defined for 
by
 | (a1) |
where 
, the upper half-plane. One (easily) proves that 
if 
.
If 
, 
, is the Fourier expansion of 
, then
 |
with
 |
Note that
 |
so that, in particular, the 
commute.
The discriminant form
 |
where 
is the Ramanujan function, is a simultaneous eigenfunction of all 
.
Formula (a1) can be regarded as coming from an operation on lattices in the complex plane, 
, where the sum is over all sublattices of 
of index 
. This geometric definition, [a4], makes (a1) easier to understand.
There are Hecke operators in much more general settings, e.g. for suitable subgroups of the modular group 
. A quite abstract group setting follows, [a6].
Let 
be a group and 
a subgroup. Another subgroup 
is commensurable with 
if 
is of finite index in both 
and 
. Let 
. This is a subgroup of 
that contains 
.
Now, let 
be the 
-module of all formal sums 
, i.e. the free Abelian group on the double cosets of 
in 
. There is an associative multiplication on 
, defined as follows. Let 
, 
. Then the product 
is clearly a (disjoint) union of double cosets. It gives a product 
, provided multiplicities are taken into account. More precisely, let 
, 
. Then
 |
 |
Now, let 
. Then 
. (The restriction of the 
to 
is needed to keep things, e.g. the sets 
, 
, finite.)
Let 
be a subset of 
containing 
and multiplicatively closed. Then one defines 
as the submodule of 
spanned by the 
for 
. This gives a subring of 
. Finally, one defines 
, the Hecke algebra of 
as 
.
In many situations the double cosets 
act on forms, functions, etc., which gives Hecke operators. See [a5] for an example in the case of double cosets with respect to the principal congruence subgroup
 |
 |
which gives rise to the (usual) Hecke operators for modular forms.
In [a6] this setting is used to define Hecke operators for the case of adelic groups.
Modular forms turn up all over mathematics and physics and, hence, so do the Hecke operators. See the references for a variety of uses of them.
References
| [a1] | T.M. Apostol, "Modular functions and Dirichlet series in number theory" , Springer (1976) pp. 120ff |
| [a2] | N. Hurt, "Quantum chaos and mesoscopic systems" , Kluwer Acad. Publ. (1997) pp. 101; 163ff |
| [a3] | M.I. Knopp, "Modular functions in analytic number theory" , Markham Publ. (1970) |
| [a4] | A. Ogg, "Modular forms and Dirichlet series" , Benjamin (1969) pp. Chap. II |
| [a5] | R.A. Rankin, "Modular forms and functions" , Cambridge Univ. Press (1977) pp. Chap. 9 |
| [a6] | G. Shimura, "Euler products and Eisenstein series" , Amer. Math. Soc. (1997) pp. Sect. 11 |
| [a7] | A.B. Venkov, "Spectral theory of automorphic functions" , Kluwer Acad. Publ. (1990) pp. 34; 59 |
| [a8] | D. Bump, "Automorphic forms and representations" , Cambridge Univ. Press (1997) |
| [a9] | N.E. Hurt, "Exponential sums and coding theory. A review" Acta Applic. Math. , 46 (1997) pp. 49–91 |
Hecke operator. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Hecke_operator&oldid=13264