In mathematics, the ELSV formula, named after its four authors,, Michael Shapiro, Alek Vainshtein, is an equality between a Hurwitz number (counting ramified coverings of the sphere) and an integral over the moduli space of stable curves.
Several fundamental results in the intersection theory of moduli spaces of curves can be deduced from the ELSV formula, including the Witten conjecture, the Virasoro constraints, and the λg
-conjecture.
It is generalized by the Gopakumar–Mariño–Vafa formula.
Define the Hurwitz number
| h | |
| g;k1,...,kn |
as the number of ramified coverings of the complex projective line (Riemann sphere,
P1(\C))
k1,...,kn
1/|G|
The ELSV formula then reads
| h | |
| g;k1,...,kn |
=\dfrac{m!}{\#Aut(k1,\ldots,kn)}
| n | |
| \prod | |
| i=1 |
| |||||||
| ki! |
\int\overline{l{M
Here the notation is as follows:
g\ge0
n\ge1
k1,...,kn
\#\operatorname{Aut}(k1,\ldots,kn)
(k1,\ldots,kn);
m=\sumki+n+2g-2;
\overline{l{M}}g,n
The numbers
| h | |
| g;k1,...,kn |
in the left-hand side have a combinatorial definition and satisfy properties that can be proved combinatorially. Each of these properties translates into a statement on the integrals on the right-hand side of the ELSV formula .
The Hurwitz numbers
| h | |
| g;k1,...,kn |
also have a definition in purely algebraic terms. With K = k1 + ... + kn and m = K + n + 2g − 2, let τ1, ..., τm be transpositions in the symmetric group SK and σ a permutation with n numbered cycles of lengths k1, ..., kn. Then
(\tau1,...,\taum,\sigma)
is a transitive factorization of identity of type (k1, ..., kn) if the product
\tau1 … \taum\sigma
equals the identity permutation and the group generated by
\tau1,...,\taum
is transitive.
Definition.
| h | |
| g;k1,...,kn |
Example A. The number
hg;k
(\tau1,...,\tauk+2g-1)
hg;k
The equivalence between the two definitions of Hurwitz numbers (counting ramified coverings of the sphere, or counting transitive factorizations) is established by describing a ramified covering by its monodromy. More precisely: choose a base point on the sphere, number its preimages from 1 to K (this introduces a factor of K!, which explains the division by it), and consider the monodromies of the covering about the branch point. This leads to a transitive factorization.
The moduli space {\overline{l{M}}}g,n
is a smooth Deligne–Mumford stack of (complex) dimension 3g − 3 + n. (Heuristically this behaves much like complex manifold, except that integrals of characteristic classes that are integers for manifolds are rational numbers for Deligne–Mumford stacks.)
The Hodge bundle E is the rank g vector bundle over the moduli space
{\overline{l{M}}}g,n
λj=cj(E)\inH2j({\overline{l{M}}}g,n,Q).
We have
c(E*)=1-λ1+λ2- … +(-1)gλg.
The ψ-classes. Introduce line bundles
l{L}1,\ldots,l{L}n
{\overline{l{M}}}g,n
l{L}i
l{L}i
\psii=c1(l{L}i)\inH2({\overline{l{M}}}g,n,Q).
The integrand. The fraction
1/(1-ki\psii)
1+ki\psii+
| 2 | |
| k | |
| i |
| 2 | |
| \psi | |
| i |
+ …
The integral as a polynomial. It follows that the integral
\int\overline{l{M
is a symmetric polynomial in variables k1, ..., kn, whose monomials have degrees between 3g − 3 + n and 2g − 3 + n. The coefficient of the monomial
| d1 | |
| k | |
| 1 |
…
| dn | |
| k | |
| n |
\int\overline{l{M
where
j=3g-3+n-\sumdi.
Remark. The polynomiality of the numbers
| |||||
| m! |
| n | |
| \prod | |
| i=1 |
| ki! | ||||||
|
was first conjectured by I. P. Goulden and D. M. Jackson. No proof independent from the ELSV formula is known.
Example B. Let g = n = 1. Then
\int\overline{l{M
Let n = g = 1. To simplify the notation, denote k1 by k. We have m = K + n + 2g − 2 = k + 1.
According to Example B, the ELSV formula in this case reads
h1;k=(k+1)!
| kk | |
| k! |
\int\overline{l{M
On the other hand, according to Example A, the Hurwitz number h1, k equals 1/k times the number of ways to decompose a k-cycle in the symmetric group Sk into a product of k + 1 transpositions. In particular, h1, 1 = 0 (since there are no transpositions in S1), while h1, 2 = 1/2 (since there is a unique factorization of the transposition (1 2) in S2 into a product of three transpositions).
Plugging these two values into the ELSV formula we find
\int\overline{l{M
From which we deduce
h1;k=
| (k2-1)kk | |
| 24 |
.
The ELSV formula was announced by, but with an erroneous sign. proved it for k1 = ... = kn = 1 (with the corrected sign). proved the formula in full generality using the localization techniques. The proof announced by the four initial authors followed . Now that the space of stable maps to the projective line relative to a point has been constructed by, a proof can be obtained immediately by applying the virtual localization to this space.
, building on preceding work of several people, gave a unified way to deduce most known results in the intersection theory of
{\overline{l{M}}}g,n
Let
| l{M} | |
| g;k1,...,kn |
k1,...,kn
The branching morphism br or the Lyashko–Looijenga map assigns to
f\in
| l{M} | |
| g;k1,...,kn |
The branching morphism is of finite degree, but has infinite fibers. Our aim is now to compute its degree in two different ways.
The first way is to count the preimages of a generic point in the image. In other words, we count the ramified coverings of P1(C) with a branch point of type (k1, ..., kn) at ∞ and m more fixed simple branch points. This is precisely the Hurwitz number
| h | |
| g;k1,...,kn |
The second way to find the degree of br is to look at the preimage of the most degenerate point, namely, to put all m branch points together at 0 in C.
The preimage of this point in
| l{M} | |
| g;k1,...,kn |
\overline{l{M}}g,n
z\mapsto
| k1 | |
| z |
,...,z\mapsto
| kn | |
| z |
| l{M} | |
| g;k1,...,kn |
Thus the ELSV formula expresses the equality between two ways to compute the degree of the branching morphism.