Solving Topological 2D Quantum Gravity Using Ward Identities
نویسنده
چکیده
A topological procedure for computing correlation functions for any (1, q) model is presented. Our procedure can be used to compute any correlation function on the sphere as well as some correlation functions at higher genus. We derive new and simpler recursion relations that extend previously known results based on W constraints. In addition, we compute an effective contact algebra with multiple contacts that extends Verlindes’ algebra. Computational techniques based on the KdV approach are developed and used to compute the same correlation functions. A simple and elegant proof of the puncture equation derived directly from the KdV equations is included. We hope that this approach can lead to a deeper understanding of D = 1 quantum gravity and non-critical string theory. October, 1992 1E-mail: [email protected] 2E-mail: [email protected]
منابع مشابه
On Equivalence of Topological and Quantum 2d Gravity
We demonstrate the equivalence of Virasoro constraints imposed on continuum limit of partition function of Hermitean 1-matrix model and the Ward identities of Kontsevich’s model. Since the first model describes ordinary d = 2 quantum gravity, while the second one is supposed to coincide with Witten’s topological gravity, the result provides a strong implication that the two models are indeed th...
متن کاملTwo Dimensional Kodaira-Spencer Theory and Three Dimensional Chern-Simons Gravity
Motivated by the six-dimensional formulation of Kodaira-Spencer theory for CalabiYau threefolds, we formulate a two-dimensional version and argue that this is the relevant field theory for the target space of local topological B-model with a geometry based on a Riemann surface. We show that the Ward identities of this quantum theory is equivalent to recursion relations recently proposed by Eyna...
متن کاملComments on BRST quantization of strings
The BRST quantization of strings is revisited and the derivation of the path integral measure for scattering amplitudes is streamlined. Gauge invariances due to zero modes in the ghost sector are taken into account by using the Batalin-Vilkovisky formalism. This involves promoting the moduli of Riemann surfaces to quantum mechanical variables on which BRST transformations act. The familiar ghos...
متن کاملWard Identities of Liouville Gravity coupled to Minimal Conformal Matter
The Ward identities of the Liouville gravity coupled to the minimal conformal matter are investigated. We introduce the pseudo-null fields and the generalized equations of motion, which are classified into series of the Liouville charges. These series have something to do with the W and Virasoro constraints. The pseudo-null fields have non-trivial contributions at the boundaries of the moduli s...
متن کاملGribov problem, contact terms and Čech-De Rham cohomology in 2D topological gravity
ABSTRACT We point out that averages of equivariant observables of 2D topological gravity are not globally defined forms on moduli space, when one uses the functional measure corresponding to the formulation of the theory as a 2D superconformal model. This is shown to be a consequence of the existence of the Gribov horizon and of the dependence of the observables on derivatives of the super-ghos...
متن کامل