Stokes Multipliers , Spectral Determinants and T - Q relations ∗

0 Stokes Multipliers , Spectral Determinants and T - Q relations ∗

Recently, a remarkable correspondence has been unveiled between a certain class of ordinary linear differential equations (ODE) and integrable models. In the first part of the report, we survey the results concerning the 2nd order differential equations , the Schrödinger equation with a polynomial potential. We will observe that fundamental objects in the study of the solvable models, e.g., Bax...

On the relation between Stokes multipliers and the T-Q systems of conformal field theory

The vacuum expectation values of the so-called Q-operators of certain integrable quantum field theories have recently been identified with spectral determinants of particular Schrödinger operators. In this paper we extend the correspondence to the T-operators, finding that their vacuum expectation values also have an interpretation as spectral determinants. As byproducts we give a simple proof ...

Functional Relations in Stokes Multipliers and Solvable Models related to Uq ( A ( 1 ) n )

Recently, Dorey and Tateo have investigated functional relations among Stokes multipliers for a Schrödinger equation (second order differential equation) with a polynomial potential term in view of solvable models. Here we extend their studies to a restricted case of n + 1−th order linear differential equations. ∗e-mail: [email protected]

Functional relations in Stokes multipliers - Fun with x 6 + αx 2 potential -

Lexicographical ordering by spectral moments of trees with a given bipartition

 Lexicographic ordering by spectral moments ($S$-order) among all trees is discussed in this‎ ‎paper‎. ‎For two given positive integers $p$ and $q$ with $pleqslant q$‎, ‎we denote $mathscr{T}_n^{p‎, ‎q}={T‎: ‎T$ is a tree of order $n$ with a $(p‎, ‎q)$-bipartition}‎. Furthermore, ‎the last four trees‎, ‎in the $S$-order‎, ‎among $mathscr{T}_n^{p‎, ‎q},(4leqslant pleqslant q)$ are characterized‎.