English

Random Partitions and the Quantum Benjamin-Ono Hierarchy

Mathematical Physics 2017-08-16 v3 Combinatorics math.MP Probability Representation Theory Exactly Solvable and Integrable Systems

Abstract

We derive exact and asymptotic results for random partitions from general results in the semi-classical analysis of coherent states applied to the classical periodic Benjamin-Ono equation at critical regularity s=1/2s= -1/2. We find classical dFv(cε)dF_{\star |v} (c| \overline{\varepsilon}) and quantum dF^ηNS(c,ε)Ψd\hat{F}^{\eta_{NS}}( c | \hbar, \overline{\varepsilon})|_{\Psi} conserved densities for this system with dispersion coefficient ε\overline{\varepsilon} extending Nazarov-Sklyanin (2013). For quantum stationary states, this conserved density is dFλ(cε2,ε1)dF_{\lambda}(c | \varepsilon_2, \varepsilon_1) the Rayleigh measure of the profile of a partition λ\lambda of anisotropy (ε2,ε1)C2(\varepsilon_2, \varepsilon_1) \in \mathbb{C}^2 for =ε1ε2\hbar = - \varepsilon_1 \varepsilon_2, ε=ε1+ε2\overline{\varepsilon}= \varepsilon_1 + \varepsilon_2 invariant under ε2ε1\varepsilon_2 \longleftrightarrow \varepsilon_1. As Jack polynomials are the quantum stationary states and Stanley's Cauchy kernel (1989) is the reproducing kernel, the random values of the quantum periodic Benjamin-Ono hierarchy in a coherent state Υv()\Upsilon_v ( \cdot | \hbar) are a "Jack measure" on partitions, a dispersive generalization of Okounkov's Schur measures (1999). By our general results for coherent states, we have concentration on a limit shape as 0\hbar \rightarrow 0, the classical conserved density at vv, and quantum fluctuations are an explicit Gaussian field. Our results follow from an enumerative asymptotic expansion in \hbar and ε\overline{\varepsilon} of joint cumulants over new combinatorial objects we call "ribbon paths". Our results reflect the fact that at fixed >0\hbar>0 the weight defining Fock space is already a fractional Brownian motion of variance \hbar and Hurst index (s)12dimT=+1212=0.(-s) - \tfrac{1}{2} \dim \mathbb{T} = + \tfrac{1}{2} - \tfrac{1}{2} = 0.

Keywords

Cite

@article{arxiv.1508.03063,
  title  = {Random Partitions and the Quantum Benjamin-Ono Hierarchy},
  author = {Alexander Moll},
  journal= {arXiv preprint arXiv:1508.03063},
  year   = {2017}
}

Comments

version 3: (i) identified meaning of results as semi-classical and dispersionless limits (ii) concentration of measure and Gaussian fluctuations generalized to coherent states in Hermitian affine spaces without assuming integrability (iii) clarified exposition of auxiliary spectral theory of Lax operators version 2: modified introduction, references added, estimates improved

R2 v1 2026-06-22T10:32:32.403Z