Smooth wavelet approximations of truncated Legendre polynomials via the Jacobi theta function
- ECU Author/Contributor (non-ECU co-authors, if there are any, appear on document)
- David W,Randriampiry,Njinasoa,Spurr,Michael J. Pravica (Creator)
- Institution
- East Carolina University (ECU )
- Web Site: http://www.ecu.edu/lib/
Abstract: The family of nth order q-Legendre polynomials are introduced. They are shown to be obtainable from the Jacobi theta function and to satisfy recursion relations and multiplicatively advanced differential equations (MADEs) that are analogues of the recursion relations and ODEs satisfied by the nth degree Legendre polynomials. The nth order q-Legendre polynomials are shown to have vanishing kth moments for 0...4;kAdditional Information
- Publication
- Other
- Language: English
- Date: 2014
| Title | Location & Link | Type of Relationship |
| Smooth wavelet approximations of truncated Legendre polynomials via the Jacobi theta function | http://hdl.handle.net/10342/8284 | The described resource references, cites, or otherwise points to the related resource. |