| Status | 已發表Published |
| Semi-Classical Jacobi Polynomials | |
Min, C. ; Chen, Y.
| |
| 2021-11-18 | |
| Source Publication | Analysis and Mathematical Physics
 |
| ISSN | 1664-2368 |
| Pages | 1-25 |
| Abstract | We study orthogonal polynomials and Hankel determinants generated by a semi-classical Jacobi weight. By using the ladder operator technique, we derive a second-order non-linear difference equation satisfied by beta_n(t) the recurrence coefficients, and sub-leading coefficient p(n,t) of the monic orthogonal polynomials. |
| Keyword | Jacobi polynomials Hankel determinants |
| Language | 英語English |
| The Source to Article | PB_Publication |
| PUB ID | 62269 |
| Document Type | Journal article |
| Collection | DEPARTMENT OF MATHEMATICS |
| Corresponding Author | Min, C. |
| Recommended Citation GB/T 7714 | Min, C.,Chen, Y.. Semi-Classical Jacobi Polynomials[J]. Analysis and Mathematical Physics, 2021, 1-25. |
| APA | Min, C.., & Chen, Y. (2021). Semi-Classical Jacobi Polynomials. Analysis and Mathematical Physics, 1-25. |
| MLA | Min, C.,et al."Semi-Classical Jacobi Polynomials".Analysis and Mathematical Physics (2021):1-25. |
| Files in This Item: | There are no files associated with this item. | |||||
Items in the repository are protected by copyright, with all rights reserved, unless otherwise indicated.
Edit Comment