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

Within a first-order framework, we comprehensively examine the role played by boundary conditions in the canonical formulation of a completely general two-dimensional gravity model. Our analysis particularly elucidates the perennial themes of mass and energy. The gravity models for which our argumen

Renormalized 1IN expansion in both high-and low-temperature phases as well as of the critical theory of three-dimensional supersyrmnetric generalized non-linear sigma-models is constructed and scaling laws for tile Green's functions near the critical point with only two independent critical exponent

## Abstract A conformal invariant asymptotic expansion approach is used to solve the (3+1)‐dimensional non‐linear Schrödinger (NLS) equation. Some new (3+1)‐dimensional integrable models under the condition that they are conformal invariant and possess Painlevé property are obtained. These Painlevé