Higher string functions, higher-level Appell functions, and the logarithmic sl(2)k/u(1) CFT model

Abstract

We generalize the string functions Cn,r(tau) associated with the coset sl(2)k/u(1) to higher string functions An,r(tau) and Bn,r(tau) associated with the coset W(k)/u(1) of the W-algebra of the logarithmically extended sl(2)k conformal field model with positive integer k. The higher string functions occur in decomposing W(k) characters with respect to level-k theta and Appell functions and their derivatives (the characters are neither quasiperiodic nor holomorphic, and therefore cannot decompose with respect to only theta-functions). The decomposition coefficients, to be considered ``logarithmic parafermionic characters,'' are given by An,r(tau), Bn,r(tau), Cn,r(tau), and by the triplet W(p)-algebra characters of the (p=k+2,1) logarithmic model. We study the properties of An,r and Bn,r, which nontrivially generalize those of the classic string functions Cn,r, and evaluate the modular group representation generated from An,r(tau) and Bn,r(tau); its structure inherits some features of modular transformations of the higher-level Appell functions and the associated transcendental function Phi.