Multi-exponential models of (1+1)-dimensional dilaton gravity and Toda-Liouville integrable models

TL;DR

This paper explores multi-exponential two-dimensional dilaton gravity models, focusing on integrable Toda-Liouville systems, their solutions, and implications for static states, cosmologies, and reductions of higher-dimensional theories.

Contribution

It provides a detailed analysis of Toda-Liouville integrable models within 2D dilaton gravity, including constraints, solutions, and their physical interpretations.

Findings

Identified parameter constraints for integrability.

Derived wave-like solutions describing nonlinear gravitational waves.

Proposed simplified analytic structures for solutions in reduced models.

Abstract

The general properties of a class of two-dimensional dilaton gravity (DG) theories with multi-exponential potentials are studied and a subclass of these theories, in which the equations of motion reduce to Toda and Liouville equations, is treated in detail. A combination of parameters of the equations should satisfy a certain constraint that is identified and solved for the general model. It follows that in DG the integrable Toda equations, generally, cannot appear without accompanying Liouville equations. The most difficult problem in the two-dimensional Toda-Liouville DG is to solve the energy-momentum constraints. We discuss this problem using the simplest examples and identify the main obstacles to finding its analytic solution. Then we consider a subclass of integrable two-dimensional theories, in which scalar matter satisfy the Toda equations while the two-dimensional metric is trivial. We also show how the wave-like solutions of the general Toda-Liouville systems can be simply derived. In DG, these solutions describe nonlinear waves coupled to gravity as well as static states and cosmologies. For the static states and cosmologies we propose and study a more general one-dimensional Toda-Liouville model typically emerging in one-dimensional reductions of higher-dimensional gravity and supergravity theories. A special attention is paid to making the analytic structure of the solutions of the Toda equations as simple and transparent as possible, with the aim to gain a better understanding of realistic theories reduced to dimensions 1+1 and 1+0 or 0+1.