P´AL TYPE (0;1) INTERPOLATION ON THE ULTRASPHERICAL ABSCISSAS

1. R. SRIVASTAVA , 2. SUKRITI RAI

doi:10.8224/journaloi.v73i4.676

P´AL TYPE (0;1) INTERPOLATION ON THE ULTRASPHERICAL ABSCISSAS

लेखक

1. R. SRIVASTAVA , 2. SUKRITI RAI

##semicolon##

https://doi.org/10.8224/journaloi.v73i4.676

##semicolon##

P´al-type interpolation##common.commaListSeparator## Ultraspherical polynomials##common.commaListSeparator## Lagrange interpolation##common.commaListSeparator## Fundamental polynomials##common.commaListSeparator## Hermite-type boundary conditions##common.commaListSeparator## Explicit form##common.commaListSeparator## Order of convergence

सार

We study about the P´al-type interpolation on the roots of Ultraspherical polynomials along with the boundary (Hermite) conditions placed at the endpoints of the finite interval [-1,1], which gives a simultaneous approximation of a differentiable function and the function’s derivative. The order of convergence depends only on the smoothness of the function. In this paper, we study about interpolation on polynomials (along-with the Hermite boundary conditions) where the nodes are the zeroes of Ultraspherical polynomials) and) respectively. Here ) represents the Ultraspherical polynomial of degree n. Our focus is to find the existence, uniqueness, explicit representation, and order of convergence of the interpolatory polynomials.

##submission.downloads##

PDF (English)

प्रकाशित

2025-02-28

##submission.howToCite##

1. R. SRIVASTAVA , 2. SUKRITI RAI. (2025). P´AL TYPE (0;1) INTERPOLATION ON THE ULTRASPHERICAL ABSCISSAS. Journal of the Oriental Institute, ISSN:0030-5324 UGC CARE Group 1, 73(4), 1249–1259. https://doi.org/10.8224/journaloi.v73i4.676