English

Special functions, integral equations and Riemann-Hilbert problem

Complex Variables 2016-03-18 v1

Abstract

We consider a pair of special functions, uβu_\beta and vβv_\beta, defined respectively as the solutions to the integral equations \begin{equation*} u(x)=1+\int^\infty_0 \frac {K(t) u(t) dt}{t+x} ~~\mbox{and}~~v(x)=1-\int^\infty_0 \frac{ K(t) v(t) dt}{t+x},~~x\in [0, \infty), \end{equation*} where K(t)=1πexp(tβsinπβ2)sin(tβcosπβ2)K(t)= \frac {1} \pi \exp \left (- t^\beta \sin\frac {\pi\beta} 2\right )\sin \left ( t^\beta\cos\frac{\pi\beta} 2 \right ) for β(0,1)\beta\in (0, 1). In this note, we establish the existence and uniqueness of uβu_\beta and vβv_\beta which are bounded and continuous in [0,+)[0, +\infty). Also, we show that a solution to a model Riemann-Hilbert problem in Kriecherbauer and McLaughlin [Int. Math. Res. Not., 1999] can be constructed explicitly in terms of these functions. A preliminary asymptotic study is carried out on the Stokes phenomena of these functions by making use of their connection formulas. Several open questions are also proposed for a thorough investigation of the analytic and asymptotic properties of the functions uβu_\beta and vβv_\beta, and a related new special function GβG_\beta.

Keywords

Cite

@article{arxiv.1603.05357,
  title  = {Special functions, integral equations and Riemann-Hilbert problem},
  author = {R. Wong and Yu-Qiu Zhao},
  journal= {arXiv preprint arXiv:1603.05357},
  year   = {2016}
}

Comments

14 pages, 1 figure

R2 v1 2026-06-22T13:12:52.173Z