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In
algebraic geometry Algebraic geometry is a branch of mathematics, classically studying zeros of multivariate polynomials. Modern algebraic geometry is based on the use of abstract algebraic techniques, mainly from commutative algebra, for solving geometrical ...
, the Witten conjecture is a conjecture about
intersection number In mathematics, and especially in algebraic geometry, the intersection number generalizes the intuitive notion of counting the number of times two curves intersect to higher dimensions, multiple (more than 2) curves, and accounting properly for ta ...
s of stable classes on the
moduli space of curves In algebraic geometry, a moduli space of (algebraic) curves is a geometric space (typically a scheme or an algebraic stack) whose points represent isomorphism classes of algebraic curves. It is thus a special case of a moduli space. Depending ...
, introduced by
Edward Witten Edward Witten (born August 26, 1951) is an American mathematical and theoretical physicist. He is a Professor Emeritus in the School of Natural Sciences at the Institute for Advanced Study in Princeton. Witten is a researcher in string theory, q ...
in the paper , and generalized in . Witten's original conjecture was proved by
Maxim Kontsevich Maxim Lvovich Kontsevich (russian: Макси́м Льво́вич Конце́вич, ; born 25 August 1964) is a Russian and French mathematician and mathematical physicist. He is a professor at the Institut des Hautes Études Scientifiques an ...
in the paper . Witten's motivation for the conjecture was that two different models of 2-dimensional
quantum gravity Quantum gravity (QG) is a field of theoretical physics that seeks to describe gravity according to the principles of quantum mechanics; it deals with environments in which neither gravitational nor quantum effects can be ignored, such as in the vi ...
should have the same partition function. The partition function for one of these models can be described in terms of intersection numbers on the
moduli stack In mathematics, in particular algebraic geometry, a moduli space is a geometric space (usually a scheme or an algebraic stack) whose points represent algebro-geometric objects of some fixed kind, or isomorphism classes of such objects. Such space ...
of
algebraic curve In mathematics, an affine algebraic plane curve is the zero set of a polynomial in two variables. A projective algebraic plane curve is the zero set in a projective plane of a homogeneous polynomial in three variables. An affine algebraic plane c ...
s, and the partition function for the other is the logarithm of the τ-function of the
KdV hierarchy In mathematics, the KdV hierarchy is an infinite sequence of partial differential equations which starts with the Korteweg–de Vries equation. Details Let T be translation operator defined on real valued functions as T(g)(x)=g(x+1). Let \mathc ...
. Identifying these partition functions gives Witten's conjecture that a certain generating function formed from intersection numbers should satisfy the differential equations of the KdV hierarchy.


Statement

Suppose that ''M''''g'',''n'' is the moduli stack of compact Riemann surfaces of genus ''g'' with ''n'' distinct marked points ''x''1,...,''x''''n'', and ''g'',''n'' is its Deligne–Mumford compactification. There are ''n'' line bundles ''L''''i'' on ''g'',''n'', whose fiber at a point of the moduli stack is given by the cotangent space of a Riemann surface at the marked point ''x''''i''. The intersection index 〈τ''d''1, ..., τ''d''''n''〉 is the intersection index of Π ''c''1(''L''''i'')''d''''i'' on ''g'',''n'' where Σ''d''''i'' = dim''g'',''n'' = 3''g'' – 3 + ''n'', and 0 if no such ''g'' exists, where ''c''1 is the first
Chern class In mathematics, in particular in algebraic topology, differential geometry and algebraic geometry, the Chern classes are characteristic classes associated with complex vector bundles. They have since found applications in physics, Calabi–Yau ma ...
of a line bundle. Witten's generating function :F(t_0,t_1,\ldots) = \sum\langle\tau_0^\tau_1^\cdots\rangle\prod_ \frac =\frac+ \frac + \frac + \frac+ \frac + \cdots encodes all the intersection indices as its coefficients. Witten's conjecture states that the partition function ''Z'' = exp ''F'' is a τ-function for the
KdV hierarchy In mathematics, the KdV hierarchy is an infinite sequence of partial differential equations which starts with the Korteweg–de Vries equation. Details Let T be translation operator defined on real valued functions as T(g)(x)=g(x+1). Let \mathc ...
, in other words it satisfies a certain series of partial differential equations corresponding to the basis \ of the
Virasoro algebra In mathematics, the Virasoro algebra (named after the physicist Miguel Ángel Virasoro) is a complex Lie algebra and the unique central extension of the Witt algebra. It is widely used in two-dimensional conformal field theory and in string the ...
.


Proof

Kontsevich used a combinatorial description of the moduli spaces in terms of ribbon graphs to show that :\sum_\langle \tau_,\ldots,\tau_\rangle \prod_ \frac =\sum_\frac\prod_\frac Here the sum on the right is over the set ''G''''g'',''n'' of ribbon graphs ''X'' of compact Riemann surfaces of genus ''g'' with ''n'' marked points. The set of edges ''e'' and points of ''X'' are denoted by ''X'' 0 and ''X''1. The function λ is thought of as a function from the marked points to the reals, and extended to edges of the ribbon graph by setting λ of an edge equal to the sum of λ at the two marked points corresponding to each side of the edge. By Feynman diagram techniques, this implies that ''F''(''t''0,...) is an asymptotic expansion of : \log\int \exp(i \text X^3/6)d\mu as Λ lends to infinity, where Λ and Χ are positive definite ''N'' by ''N'' hermitian matrices, and ''t''''i'' is given by : t_i = \frac and the probability measure μ on the positive definite hermitian matrices is given by : d\mu =c_\Lambda\exp(-\text X^2\Lambda/2)dX where ''c''Λ is a normalizing constant. This measure has the property that :\int X_X_d\mu = \delta_\delta_\frac which implies that its expansion in terms of Feynman diagrams is the expression for ''F'' in terms of ribbon graphs. From this he deduced that exp F is a τ-function for the KdV hierarchy, thus proving Witten's conjecture.


Generalizations

The Witten conjecture is a special case of a more general relation between
integrable systems In mathematics, integrability is a property of certain dynamical systems. While there are several distinct formal definitions, informally speaking, an integrable system is a dynamical system with sufficiently many conserved quantities, or first i ...
of Hamiltonian PDEs and the geometry of certain families of 2D topological field theories (axiomatized in the form of the so-called cohomological field theories by Kontsevich and Manin), which was explored and studied systematically by B. Dubrovin and Y. Zhang, A. Givental, C. Teleman and others. The
Virasoro conjecture In algebraic geometry, the Virasoro conjecture states that a certain generating function encoding Gromov–Witten invariants of a smooth projective variety is fixed by an action of half of the Virasoro algebra. The Virasoro conjecture is named af ...
is a generalization of the Witten conjecture.


References

* * * * * * {{Algebraic curves navbox Moduli theory Algebraic geometry Conjectures that have been proved