In functional analysis, a branch of mathematics, the Baskakov operators are generalizations of Bernstein polynomials, Szász–Mirakyan operators, and… (More)

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2013

2013

- Paul Sablonnière
- 2013

Baskakov operators and their inverses can be expressed as linear differential operators on polynomials. Recurrence relations are… (More)

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2013

2013

- Vishnu Narayan Mishra, Prashantkumar Patel
- Numerical Algorithms
- 2013

In this paper, we are dealing with q analogue of Durrmeyer type modified the Baskakov operators with two parameter α and β, which… (More)

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2011

2011

Approximation and Shape Preserving Properties of the Truncated Baskakov Operator of Max-product Kind

Starting from the study of the Shepard nonlinear operator of maxprod type in [2], [3], in the recent monograph [4], Open Problem… (More)

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2010

2010

This paper is a study of the degree of approximation by the linear combinations of the derivatives of certain Durrmeyer type… (More)

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2008

2008

- Zbigniew Walczak, Vijay Gupta
- Applied Mathematics and Computation
- 2008

In the present paper, we estimate the rate of convergence on functions of polynomial type for some variant of the Baskakov… (More)

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2007

2007

- Nurhayat Ispir
- Mathematical and Computer Modelling
- 2007

We consider the operators introduced in [V. Gupta, N. Ispir, On the Bezier variant of generalized Kantorovich type Balazs… (More)

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2007

2007

- Naokant Deo
- 2007

In the present paper, we obtain a quantitative result and asymp-totic approximation of sufficiently smooth functions by Baskakov… (More)

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2006

2006

- Vijay Gupta, M. K. Gupta
- 2006

In the present paper, we study a certain integral modification of the well known Baskakov operators with the weight function of… (More)

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2004

2004

- Vijay Gupta, Ulrich Abel
- Int. J. Math. Mathematical Sciences
- 2004

is the Baskakov basis function. Note that (1.1) is well defined, for n ≥ r +2, provided that f(t) = O(tr ) as t → ∞. The… (More)

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2002

2002

by replacing the discrete value f(k/n) by the integral (n−1)∫∞ 0 pn,k(t)f (t)dt in order to approximate Lebesgue integrable… (More)

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