부산대학교 도서관

We introduce a class of sigma models in two spacetime dimensions which are parameterized by an interaction function of one real variable. In addition to the physical group-valued field $g$, these models include an auxiliary vector field $v_\alpha$ which mediates interactions in a prescribed way. We prove that every model in this family is weakly integrable, in the sense that the classical equations of motion are equivalent to flatness of a Lax connection for any value of a spectral parameter. We also show that these models are strongly integrable, in the sense that the Poisson bracket of the Lax connection takes the Maillet form, which guarantees the existence of an infinite set of conserved charges in involution. This class of theories includes the principal chiral model (PCM) and all deformations of the PCM by functions of the energy-momentum tensor, such as $T \overline{T}$ and root-$T \overline{T}$.
Comment: 6 pages, LaTeX; v3: minor typos corrected