Lax structure and tau function for large BKP hierarchy

TL;DR

This paper explores the Lax structure and tau function of the large BKP hierarchy, revealing its connections to Toda hierarchies and providing new insights into its bilinear equations and tau function relations.

Contribution

It derives the Lax and bilinear structures of the large BKP hierarchy and links it to Toda hierarchies through Miura transformations, offering new understanding of tau function relations.

Findings

Large BKP hierarchy can be derived from fermionic BKP via bosonization.

Established relations between large BKP tau function and Toda tau functions.

Identified bilinear equations satisfied by tau functions of the hierarchy.

Abstract

In this paper, we mainly investigate Lax structure and tau function for the large BKP hierarchy, which is also known as Toda hierarchy of B type, or Hirota--Ohta--coupled KP hierarchy, or Pfaff lattice. Firstly, the large BKP hierarchy can be derived from fermionic BKP hierarchy by using a special bosonization, which is presented in the form of bilinear equation. Then from bilinear equation, the corresponding Lax equation is given, where in particular the relation of flow generator with Lax operator is obtained. Also starting from Lax equation, the corresponding bilinear equation and existence of tau function are discussed. After that, large BKP hierarchy is viewed as sub--hierarchy of modified Toda (mToda) hierarchy, also called two--component first modified KP hierarchy. Finally by using two basic Miura transformations from mToda to Toda, we understand two typical relations between large BKP tau function $\tau_n(\mathbf{t})$ and Toda tau function $\tau_n^{\rm Toda}(\mathbf{t},-\mathbf{t})$, that is, $\tau_n^{{\rm Toda}}(\mathbf{t},-{\mathbf{t}})=\tau_n(\mathbf{t})\tau_{n-1}(\mathbf{t})$ and $\tau_n^{{\rm Toda}}(\mathbf{t},-{\mathbf{t}})=\tau_n^2(\mathbf{t})$. Further we find $\big(\tau_n(\mathbf{t})\tau_{n-1}(\mathbf{t}),\tau_n^2(\mathbf{t})\big)$ satisfies bilinear equation of mToda hierarchy.