Paths and partitions: combinatorial descriptions of the parafermionic states

TL;DR

This paper reviews and unifies various combinatorial representations of states in Z_k parafermionic conformal field theories, providing a pedagogical and combinatorial foundation for understanding their structure.

Contribution

It offers a comprehensive, elementary exposition of four different combinatorial bases and their relations, linking them to conformal field theory applications.

Findings

Unified combinatorial descriptions of parafermionic states

Bijective relations between different path and partition representations

Foundations for studying more complex theories and minimal models

Abstract

The Z_k parafermionic conformal field theories, despite the relative complexity of their modes algebra, offer the simplest context for the study of the bases of states and their different combinatorial representations. Three bases are known. The classic one is given by strings of the fundamental parafermionic operators whose sequences of modes are in correspondence with restricted partitions with parts at distance k-1 differing at least by 2. Another basis is expressed in terms of the ordered modes of the k-1 different parafermionic fields, which are in correspondence with the so-called multiple partitions. Both types of partitions have a natural (Bressoud) path representation. Finally, a third basis, formulated in terms of different paths, is inherited from the solution of the restricted solid-on-solid model of Andrews-Baxter-Forrester. The aim of this work is to review, in a unified and pedagogical exposition, these four different combinatorial representations of the states of the Z_k parafermionic models. The first part of this article presents the different paths and partitions and their bijective relations; it is purely combinatorial, self-contained and elementary; it can be read independently of the conformal-field-theory applications. The second part links this combinatorial analysis with the bases of states of the Z_k parafermionic theories. With the prototypical example of the parafermionic models worked out in detail, this analysis contributes to fix some foundations for the combinatorial study of more complicated theories. Indeed, as we briefly indicate in ending, generalized versions of both the Bressoud and the Andrews-Baxter-Forrester paths emerge naturally in the description of the minimal models.