Asymptotic of Coulomb gas integral, Temperley-Lieb type algebras and pure partition functions

Abstract

In this supplementary note, we study the asymptotic behavior of several types of Coulomb gas integrals and construct the pure partition functions for multiple radial SLE() and general multiple chordal SLE() systems. For both radial and chordal cases, we prove the linear independence of the ground state solutions Jα(m,n)(x) to the null vector equations for irrational values of ∈ (0,8). In particular, we show that the ground state solutions J(m,n)α ∈ Bm,n, indexed by link patterns α with m screening charges, are linearly independent when is irrational. This is achieved by constructing, for each link pattern β, a dual functional lβ ∈ B*m,n such that the meander matrix of the corresponding Temperley-Lieb type algebra is given by Mαβ = lβ(J(m,n)α). The determinant of this matrix admits an explicit expression and is nonzero for irrational , establishing the desired linear independence. As a consequence, we construct the pure partition functions Zα(x) of the multiple SLE() systems for each link pattern α by multiplying the inverse of the meander matrix. This method can also be extended to the asymptotic analysis of the excited state solutions Kα in both radial and chordal cases.