English

The integral formalism and the generating function of grand confluent hypergeometric function

Mathematical Physics 2014-11-06 v9 math.MP

Abstract

Biconfluent Heun (BCH) function, a confluent form of Heun function, is the special case of Grand Confluent Hypergeometric (GCH) function: this has a regular singularity at x=0, and an irregular singularity at infinity of rank 2. In this paper I apply three term recurrence formula (3TRF) [arXiv:1303.0806] to the integral formalism of GCH function including all higher terms of A_n's and the generating function for the GCH polynomial which makes B_n term terminated. I show how to transform power series expansion in closed forms of GCH equation to its integral representation analytically. This paper is 10th out of 10 in series "Special functions and three term recurrence formula (3TRF)". See section 6 for all the papers in the series. The previous paper in the series describes the power series expansion in closed forms of GCH equation and its asymtotic behaviours. [arXiv:1303.0813]

Cite

@article{arxiv.1303.0819,
  title  = {The integral formalism and the generating function of grand confluent hypergeometric function},
  author = {Yoon Seok Choun},
  journal= {arXiv preprint arXiv:1303.0819},
  year   = {2014}
}

Comments

31 pages, final version. arXiv admin note: substantial text overlap with arXiv:1303.0813, arXiv:1303.0820, arXiv:1303.0873, arXiv:1303.0879, arXiv:1303.0876, arXiv:1310.7811, arXiv:1302.7309, arXiv:1303.0878

R2 v1 2026-06-21T23:36:25.464Z