Manisha Shukla - Academia.edu (original) (raw)
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Université des Sciences et Technologies de Lille (Lille-1)
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Papers by Manisha Shukla
WEIGHTED PAL-TYPE INTERPOLATION ON THE UNIT CIRCLE 1 Swarnima Bahadur and 2 Manisha Shukla Depart... more WEIGHTED PAL-TYPE INTERPOLATION ON THE UNIT CIRCLE 1 Swarnima Bahadur and 2 Manisha Shukla Department of Mathematics and Astronomy University of Lucknow, Lucknow 226007, Uttar Pradesh, India _________________________________________________________________________________________ Abstract: In this paper, we consider explicit forms and convergence of Paltype (0;1) interpolation on two disjoint set of nodes, which are obtained by projecting vertically the zeros of the and
Asian Journal of Mathematics and Applications, 2014
In this paper, we consider Hermite interpolation on the nodes , which are obtained by vertically ... more In this paper, we consider Hermite interpolation on the nodes , which are obtained by vertically projected zeros of the (1-x 2 )Pn(x) on the unit circle, where Pn(x) stands for Jacobi polynomial . We obtain the explicit forms and establish a convergence theorem for the interpolatory polynomial.
Advances in Inequalities and Applications, Oct 27, 2013
In this paper, we study the convergence of Hermite interpolation polynomials on the nodes obtaine... more In this paper, we study the convergence of Hermite interpolation polynomials on the nodes obtained by projecting vertically the zeros of 1 − x 2 P (α,β) n (x), where P (α,β) n (x) stands for the Jacobi polynomial.
Journal of Advances in Mathematics, Jun 22, 2014
In this paper, we consider explicit representations and convergence of Hermite- Lagrange Interpol... more In this paper, we consider explicit representations and convergence of Hermite- Lagrange Interpolation on two disjoint sets of nodes, which are obtained by projecting vertically the zeros of 1 x2P(;) n (x) and P(;)0 n (x) on the unit circle respectively, where P(;) n (x) stands for Jacobi polynomials.
WEIGHTED PAL-TYPE INTERPOLATION ON THE UNIT CIRCLE 1 Swarnima Bahadur and 2 Manisha Shukla Depart... more WEIGHTED PAL-TYPE INTERPOLATION ON THE UNIT CIRCLE 1 Swarnima Bahadur and 2 Manisha Shukla Department of Mathematics and Astronomy University of Lucknow, Lucknow 226007, Uttar Pradesh, India _________________________________________________________________________________________ Abstract: In this paper, we consider explicit forms and convergence of Paltype (0;1) interpolation on two disjoint set of nodes, which are obtained by projecting vertically the zeros of the and
Asian Journal of Mathematics and Applications, 2014
In this paper, we consider Hermite interpolation on the nodes , which are obtained by vertically ... more In this paper, we consider Hermite interpolation on the nodes , which are obtained by vertically projected zeros of the (1-x 2 )Pn(x) on the unit circle, where Pn(x) stands for Jacobi polynomial . We obtain the explicit forms and establish a convergence theorem for the interpolatory polynomial.
Advances in Inequalities and Applications, Oct 27, 2013
In this paper, we study the convergence of Hermite interpolation polynomials on the nodes obtaine... more In this paper, we study the convergence of Hermite interpolation polynomials on the nodes obtained by projecting vertically the zeros of 1 − x 2 P (α,β) n (x), where P (α,β) n (x) stands for the Jacobi polynomial.
Journal of Advances in Mathematics, Jun 22, 2014
In this paper, we consider explicit representations and convergence of Hermite- Lagrange Interpol... more In this paper, we consider explicit representations and convergence of Hermite- Lagrange Interpolation on two disjoint sets of nodes, which are obtained by projecting vertically the zeros of 1 x2P(;) n (x) and P(;)0 n (x) on the unit circle respectively, where P(;) n (x) stands for Jacobi polynomials.