Your search keyword '"Kantorovich operators"' showing total 99 results

1. New Kantorovich-type Szász–Mirakjan Operators.

Author

Mahmudov, Nazim I. and Kara, Mustafa

Abstract

In this paper, we present a Kantorovich-type Szász–Mirakjan operators. Initially, we establish the recurrence relationship for the moments of these operators and provide the central moments up to the fourth degree. Subsequently, we analyze the local approximation properties of these operators using Peetre’s K-function. We investigate the rate of convergence, by utilizing the ordinary modulus of continuity and Lipschitz-type maximal functions. Additionally, we prove weighted approximation theorems and Voronoskaja-type theorems specific to these new operators. Following this, we introduce bivariate extension of these operators and investigate some approximation properties. Lastly, we include several numerical illustrative examples. [ABSTRACT FROM AUTHOR]

Published

2024

2. Approximation by operators Involving Δh-Gould-Hopper Appell polynomials.

Author

YILMAZ, Bilge Zehra SERGİ and İÇÖZ, Gürhan

Subjects

*POLYNOMIALS, *LINEAR operators

Abstract

The present paper deals with the approximation properties of the linear positive operators, including Δh -Gould-Hopper Appell polynomials. We investigate some theorems for convergence of the operators and their approximation degrees with the help of the classical approach, Peetre's K-functional, Lipschitz class and Voronovskajatype theorem. In the last section of the paper, we introduce the Kantorovich form of the operators and examine the approximation degree. [ABSTRACT FROM AUTHOR]

Published

2024

3. Kantorovich Version of Vector-Valued Shepard Operators.

Author

Duman, Oktay, Della Vecchia, Biancamaria, and Erkus-Duman, Esra

Subjects

*INTEGRABLE functions

Abstract

In the present work, in order to approximate integrable vector-valued functions, we study the Kantorovich version of vector-valued Shepard operators. We also display some applications supporting our results by using parametric plots of a surface and a space curve. Finally, we also investigate how nonnegative regular (matrix) summability methods affect the approximation. [ABSTRACT FROM AUTHOR]

Published

2024

4. Korovkin Approximation of Set-Valued Integrable Functions

Author

Campiti, Michele, Candela, Anna Maria, editor, Cappelletti Montano, Mirella, editor, and Mangino, Elisabetta, editor

Published

2023

5. REVISITING KANTOROVICH OPERATORS IN LEBESGUE SPACES.

Author

OBIE, MAXIMILLIAN VENTURA, TAEBENU, ERICK ANGGA, GUNADI, REINHART, and HAKIM, DENNY IVANAL

Subjects

BERNSTEIN polynomials, INTEGRABLE functions, CONTINUOUS functions, LINEAR operators, INTERPOLATION

Abstract

According to the Weierstrass Approximation Theorem, any continuous function on the closed and bounded interval can be approximated by polynomials. A constructive proof of this theorem uses the so-called Bernstein polynomials. For the approximation of integrable functions, we may consider Kantorovich operators as certain modifications for Bernstein polynomials. In this paper, we investigate the behaviour of Kantorovich operators in Lebesgue spaces. We first give an alternative proof of the uniform boundedness of Kantorovich operators in Lebesgue spaces by using the Riesz-Thorin Interpolation Theorem. In addition, we examine the convergence of Kantorovich operators in the space of essentially bounded functions. We also give an example related to the rate of convergence of Kantorovich operators in a subspace of Lebesgue spaces. [ABSTRACT FROM AUTHOR]

Published

2023

6. On the convergence of Kantorovich operators in Morrey spaces.

Author

Arsana, Mu’afa Purwa, Gunadi, Reinhart, Hakim, Denny Ivanal, and Sawano, Yoshihiro

Abstract

In this paper, we investigate Kantorovich operators on Morrey spaces. We first recall the main tool in the proof of the uniform boundedness of Kantorovich operators in Morrey spaces, namely a pointwise estimate of Kantorovich operators by the Hardy–Littlewood maximal operator. We also investigate the convergence of Kantorovich operators in Morrey spaces under weaker assumptions that is also true for the endpoint case. In addition, we obtain the rate of convergence of Kantorovich operators in Morrey spaces under the condition of Hölder continuity. Our result can be applicable to the function spaces in a recent result by Zeren, Ismailov and Karacam. [ABSTRACT FROM AUTHOR]

Published

2023

7. Kantorovich Version of Vector-Valued Shepard Operators

Author

Oktay Duman, Biancamaria Della Vecchia, and Esra Erkus-Duman

Subjects

multivariate approximation, approximation of vector-valued functions, Shepard operators, Kantorovich operators, matrix summability methods, Cesàro summability, Mathematics, QA1-939

Abstract

In the present work, in order to approximate integrable vector-valued functions, we study the Kantorovich version of vector-valued Shepard operators. We also display some applications supporting our results by using parametric plots of a surface and a space curve. Finally, we also investigate how nonnegative regular (matrix) summability methods affect the approximation.

Published

2024

8. Sparse Grid Approximation in Weighted Wiener Spaces.

Author

Kolomoitsev, Yurii, Lomako, Tetiana, and Tikhonov, Sergey

Abstract

We study approximation properties of multivariate periodic functions from weighted Wiener spaces by sparse grid methods constructed with the help of quasi-interpolation operators. The class of such operators includes classical interpolation and sampling operators, Kantorovich-type operators, scaling expansions associated with wavelet constructions, and others. We obtain the rate of convergence of the corresponding sparse grid methods in weighted Wiener norms as well as analogues of the Littlewood–Paley-type characterizations in terms of families of quasi-interpolation operators. [ABSTRACT FROM AUTHOR]

Published

2023

9. Higher order Kantorovich-type Szász–Mirakjan operators

Author

Pembe Sabancigil, Mustafa Kara, and Nazim I. Mahmudov

Subjects

Modulus of continuity, Higher order approximation, Szász–Mirakjan operators, Kantorovich operators, Voronovskaja-type theorem, Mathematics, QA1-939

Abstract

Abstract In this paper, we define new higher order Kantorovich-type Szász–Mirakjan operators, we give some approximation properties of these operators in terms of various moduli of continuity. We prove a local approximation theorem, a Korovkin-type theorem, and a Voronovskaja-type theorem. We also prove weighted approximation theorems for these new operators.

Published

2022

10. Multidimensional Kantorovich modifications of exponential sampling series.

Author

Acar, Tuncer, Kursun, Sadettin, and Turgay, Metin

Subjects

LOGARITHMIC functions, CONTINUOUS functions, MEAN value theorems

Abstract

This paper is devoted to construction of multidimensional Kantorovich modifications of exponential sampling series, which allows to approximate suitable measurable functions by considering their mean values on just one section of the function involved. Approximation behaviour of newly constructed operators is investigated at continuity points for log-uniformly continuous functions. The rate of convergence of the series is presented for the same functions by means of logarithmic modulus of continuity. A Voronovskaja type theorem is also presented by means of Mellin derivatives. [ABSTRACT FROM AUTHOR]

Published

2023

11. VORONOVSKAJA-TYPE QUANTITATIVE DIFFERENCE ESTIMATES OF POSITIVE LINEAR OPERATORS WITH DIFFERENT BASIS FUNCTIONS.

Author

ANJALI and GUPTA, VIJAY

Subjects

*LINEAR operators, *DIFFERENTIAL equations, *BOUNDARY value problems, *HOMOMORPHISMS, *KANTOROVICH method

Abstract

The present article is an extension of work and provides Voronovskaja-type quantitative estimate for the difference of positive linear operators with different fundamental functions. We also present the applications of such results using Bernstein operators, Bernstein-Kantorovich operators, Bernstein-Durrmeyer operators, Generalized-Bernstein operators based on Pólya distribution and its Durrmeyer and Kantorovich-type modifications. We use Mathematica software to direct massive computations. [ABSTRACT FROM AUTHOR]

Published

2023

12. Approximation by Generalized Baskakov Kantorovich Operators of Arbitrary Order.

Author

Mishra, Nav Shakti and Deo, Naokant

Subjects

*EXPONENTIAL functions, *CONTINUITY

Abstract

This article addresses an improved Kantorovich form of the Baskakov type operators using arbitrary sequences. These operators preserve exponential functions of the form a - x , a > 1 and approximate functions with arbitrary order, i.e., one can achieve significantly better approximation by appropriate choices of sequences. We first prove an important lemma which further helps us to establish certain direct results, including quantitative type asymptotic formula and a Voronovskaya type theorem. We also provide estimation of error using usual modulus of continuity. Furthermore, the results are validated via some convergence and error estimation graphs proving the better approximation of the proposed operator. [ABSTRACT FROM AUTHOR]

Published

2022

13. Q-Analogue of Generalized Bernstein–Kantorovich Operators

Author

Pratap, Ram, Deo, Naokant, Deo, Naokant, editor, Gupta, Vijay, editor, Acu, Ana Maria, editor, and Agrawal, P. N., editor

Published

2020

14. Higher order Kantorovich-type Szász–Mirakjan operators.

Author

Sabancigil, Pembe, Kara, Mustafa, and Mahmudov, Nazim I.

Subjects

*CONTINUITY

Abstract

In this paper, we define new higher order Kantorovich-type Szász–Mirakjan operators, we give some approximation properties of these operators in terms of various moduli of continuity. We prove a local approximation theorem, a Korovkin-type theorem, and a Voronovskaja-type theorem. We also prove weighted approximation theorems for these new operators. [ABSTRACT FROM AUTHOR]

Published

2022

15. Generalized Kantorovich forms of exponential sampling series.

Author

Aral, Ali, Acar, Tuncer, and Kursun, Sadettin

Abstract

In this paper, we introduce a new family of operators by generalizing Kantorovich type of exponential sampling series by replacing integral means over exponentially spaced intervals with its more general analogue, Mellin Gauss Weierstrass singular integrals. Pointwise convergence of the family of operators is presented and a quantitative form of the convergence using a logarithmic modulus of continuity is given. Moreover, considering locally regular functions, an asymptotic formula in the sense of Voronovskaja is obtained. By introducing a new modulus of continuity for functions belonging to logarithmic weighted space of functions, a rate of convergence is obtained. Some examples of kernels satisfying the obtained results are presented. [ABSTRACT FROM AUTHOR]

Published

2022

16. APPROXIMATION BY GENERALIZED SZÁSZ--MIRAKJAN--KANTOROVICH TYPE OPERATORS.

Author

Qasim, Mohd, Mursaleen, M., Abbas, Zaheer, and Khan, Asif

Abstract

We construct Kantorovich variant of generalized Szász-Mirakjan operators whose construction depends on a continuously differentiable, increasing and unbounded function τ. For these new operators we give weighted approximation, Voronovskaya type theorem, quantitative estimates for the local approximation. [ABSTRACT FROM AUTHOR]

Published

2022

17. QUANTITATIVE VORONOVSKAYA TYPE RESULTS FOR A SEQUENCE OF STANCU TYPE OPERATORS.

Author

AGRAWAL, P. N., ACU, ANA MARIA, and BHARDWAJ, NEHA

Subjects

KANTOROVICH method, POLYNOMIALS, ARITHMETIC mean, LINEAR equations, INTEGRAL inequalities

Abstract

In this paper, we give some approximation properties of a sequence of operators defined by Stancu [21]. Its quantitative Voronovskaya type results are obtained with the aid of the second moduli of continuity. In order to study non-multiplicativity of these operators some Gruss-Voronovskaya type theorems are established. [ABSTRACT FROM AUTHOR]

Published

2021

18. Approximation by modified Kantorovich–Stancu operators

Author

Adonia-Augustina Opriş

Subjects

Stancu operators, Kantorovich operators, Stancu–Kantorovich operators, Voronovskaja-type theorem, Mathematics, QA1-939

Abstract

Abstract In the present paper, we study a new kind of Kantorovich–Stancu type operators. For this modified form, we discuss a uniform convergence estimate. Some Voronovskaja-type theorems are given.

Published

2018

19. A Nice Representation for a Link Between Bernstein-Durrmeyer and Kantorovich Operators

Author

Heilmann, Margareta, Raşa, Ioan, Chen, Phoebe, Series editor, Du, Xiaoyong, Series editor, Filipe, Joaquim, Series editor, Kara, Orhun, Series editor, Kotenko, Igor, Series editor, Liu, Ting, Series editor, Sivalingam, Krishna M., Series editor, Washio, Takashi, Series editor, Giri, Debasis, editor, Mohapatra, Ram N., editor, Begehr, Heinrich, editor, and Obaidat, Mohammad S., editor

Published

2017

20. Perturbed Bernstein-type operators.

Author

Acu, Ana-Maria and Gonska, Heiner

Abstract

The present paper deals with modifications of Bernstein, Kantorovich, Durrmeyer and genuine Bernstein–Durrmeyer operators. Some previous results are improved in this study. Direct estimates for these operators by means of the first and second modulus of continuity are given. Also the asymptotic formulas for the new operators are proved. [ABSTRACT FROM AUTHOR]

Published

2020

21. Approximation properties of λ-Kantorovich operators

Author

Ana-Maria Acu, Nesibe Manav, and Daniel Florin Sofonea

Subjects

Kantorovich operators, Bernstein operator, Voronovskaja theorem, Rate of convergence, Mathematics, QA1-939

Abstract

Abstract In the present paper, we study a new type of Bernstein operators depending on the parameter λ∈[−1,1] $\lambda\in[-1,1]$. The Kantorovich modification of these sequences of linear positive operators will be considered. A quantitative Voronovskaja type theorem by means of Ditzian–Totik modulus of smoothness is proved. Also, a Grüss–Voronovskaja type theorem for λ-Kantorovich operators is provided. Some numerical examples which show the relevance of the results are given.

Published

2018

22. Estimates for the differences of positive linear operators and their derivatives.

Author

Acu, Ana-Maria and Raşa, Ioan

Subjects

*POSITIVE operators, *JACOBI operators, *ESTIMATES, *DIFFERENCE operators, *LINEAR operators

Abstract

The present paper deals with the estimate of the differences of certain positive linear operators and their derivatives. Oxur approach involves operators defined on bounded intervals, as Bernstein operators, Kantorovich operators, genuine Bernstein-Durrmeyer operators, and Durrmeyer operators with Jacobi weights. The estimates in quantitative form are given in terms of the first modulus of continuity. In order to analyze the theoretical results in the last section, we consider some numerical examples. [ABSTRACT FROM AUTHOR]

Published

2020

23. A New Class of Kantorovich-Type Operators.

Author

INDREA, ADRIAN D., INDREA, ANAMARIA M., and POP, OVIDIU T.

Subjects

KANTOROVICH method, APPROXIMATION theory, FIXED point theory, BERNSTEIN polynomials, MATHEMATICAL analysis

Abstract

The purpose of the paper called "A new class of Kantorovich-type operators", as the title says, is to introduce a new class of Kantorovich-type operators with the property that the test functions e1 and e2 are reproduced. Furthermore, in our approach, an asymptotic type convergence theorem, a Voronovskaja type theorem and two error approximation theorems are given. As a conclusion, we make a comparison between the classical Kantorovich operators and the new class of Kantorovich - type operators. [ABSTRACT FROM AUTHOR]

Published

2020

24. α-Bernstein–Kantorovich operators.

Author

Deo, Naokant and Pratap, Ram

Abstract

In this paper we proposed the Kantorovich form of α -Bernstein operators introduced by Chen et al. (Math Anal Appl 450:244–261, 2017). We give some auxiliary properties and study the direct local approximation theorem, Voronovskaya type asymptotic and function of bounded variation for α -Bernstein–Kantorovich operators. [ABSTRACT FROM AUTHOR]

Published

2020

25. Voronovskaja-Type Quantitative Results for Differences of Positive Linear Operators

Author

Ana Maria Acu, Gülen Başcanbaz-Tunca, and Ioan Raşa

Subjects

positive linear operators, Voronovskaja-type result, Bernstein operators, Kantorovich operators, Mathematics, QA1-939

Abstract

We consider positive linear operators having the same fundamental functions and different functionals in front of them. For differences involving such operators, we obtain Voronovskaja-type quantitative results. Applications illustrating the theoretical aspects are presented.

Published

2021

26. On New Classes of Stancu-Kantorovich-Type Operators

Author

Bianca Ioana Vasian, Ștefan Lucian Garoiu, and Cristina Maria Păcurar

Subjects

Stancu operators, Kantorovich operators, Stancu–Kantorovich operators, King-type operators, approximation by positive linear operators, Mathematics, QA1-939

Abstract

The present paper introduces new classes of Stancu–Kantorovich operators constructed in the King sense. For these classes of operators, we establish some convergence results, error estimations theorems and graphical properties of approximation for the classes considered, namely, operators that preserve the test functions e0(x)=1 and e1(x)=x, e0(x)=1 and e2(x)=x2, as well as e1(x)=x and e2(x)=x2. The class of operators that preserve the test functions e1(x)=x and e2(x)=x2 is a genuine generalization of the class introduced by Indrea et al. in their paper “A New Class of Kantorovich-Type Operators”, published in Constr. Math. Anal.

Published

2021

27. Approximation properties of λ‐Bernstein‐Kantorovich operators with shifted knots.

Author

Rahman, Shagufta, Mursaleen, Mohammad, and Acu, Ana Maria

Subjects

*GENERALIZATION, *KNOT theory, *PROPERTY

Abstract

In the present article, Kantorovich variant of λ‐Bernstein operators with shifted knots are introduced. The advantage of using shifted knot is that one can do approximation on [0,1] as well as on its subinterval. In addition, it adds flexibility to operators for approximation. Some basic results for approximation as well as rate of convergence of the introduced operators are established. The rth order generalization of the operator is also discussed. Further for comparisons, some graphics and error estimation tables are presented using MATLAB. [ABSTRACT FROM AUTHOR]

Published

2019

28. Uniform boundedness of Kantorovich operators in Morrey spaces.

Author

Burenkov, Victor, Ghorbanalizadeh, Arash, and Sawano, Yoshihiro

Subjects

KANTOROVICH method, CAUCHY sequences, HOMEOMORPHISMS, HAUSDORFF spaces, PROBABILITY theory

Abstract

In this paper, the Kantorovich operators Kn,n∈N are shown to be uniformly bounded in Morrey spaces on the closed interval [0, 1]. Also an upper estimate is obtained for the difference Kn(f)-f for functions f of regularity of order 1 measured in Morrey spaces. One of the key tools is the pointwise inequality for the Kantorovich operators and the Hardy-Littlewood maximal operator, which is of interest on its own and can be applied to other problems related to the Kantorovich operators. [ABSTRACT FROM AUTHOR]

Published

2018

29. Some estimations of summation-integral-type operators.

Author

Mishra, Vishnu Narayan and Yadav, Rishikesh

Subjects

*INTEGRAL operators, *KANTOROVICH method, *BERNSTEIN polynomials, *APPROXIMATION theory, *INTEGRABLE functions

Abstract

In this paper, the Szász-Mirakjan-Kantorovich type operators are studied with the help of direct result and weighted approximation properties. Some basic lemmas, theorems are given and proved, at last, we discuss the rate of convergence and a comparison takes place with the Szász-Mirakjan-Kantorovich operators by graphical representations. [ABSTRACT FROM AUTHOR]

Published

2018

30. The Kantorovich variant of an operator defined by D. D. Stancu.

Author

Kajla, Arun

Subjects

*KANTOROVICH method, *PARAMETER estimation, *LIPSCHITZ spaces, *STOCHASTIC convergence, *APPROXIMATION theory

Abstract

In this note we introduce Kantorovich variant of the operators considered by Stancu (1998) based on two nonnegative parameters. Here, we prove an approximation theorem with the help of Bohman–Korovkin’s principle and find the estimate of the rate of convergence by means of modulus of smoothness and Lipschitz type function for these operators. In the last section of the paper, we show the convergence of the operators by illustrative graphics in Mathematica to certain functions. [ABSTRACT FROM AUTHOR]

Published

2018

31. Approximation to integrable functions by modified complex Shepard operators

Author

Della Vecchia B., Duman, Oktay, Della Vecchia B., and Duman, Oktay

Abstract

In this paper, we introduce the Kantorovich version of complex Shepard operators in order to approximate functions whose pth powers are integrable on the unit square. We also give an application which explains why we need such operators. Furthermore, we study the effects of some regular summability methods on this Lp-approximation. © 2022 Elsevier Inc., The authors would like to thank the referee for providing insightful comments and reading the manuscript carefully.

Published

2022

32. Approximation to integrable functions by modified complex Shepard operators

Author

Duman, Oktay, Della Vecchia B., Duman, Oktay, and Della Vecchia B.

Abstract

In this paper, we introduce the Kantorovich version of complex Shepard operators in order to approximate functions whose pth powers are integrable on the unit square. We also give an application which explains why we need such operators. Furthermore, we study the effects of some regular summability methods on this Lp-approximation. © 2022 Elsevier Inc., The authors would like to thank the referee for providing insightful comments and reading the manuscript carefully.

Published

2022

33. On approximation properties of generalized Lupas type operators based on Polya distribution with Pochhammer k-symbol

Author

Ali Olgun, Rabia Aktaş, Övgü Gürel Yılmaz, Fatma Taşdelen Yeşildal, RTEÜ, Fen - Edebiyat Fakültesi, Matematik Bölümü, and Yılmaz, Övgü Güre

Subjects

Statistics and Probability, Matematik, Pure mathematics, Algebra and Number Theory, Distribution (number theory), Lupas operators, Bernstein operators, Type (model theory), Voronovskaja type theorem, 26A16, 41A10, 41A25, 41A36, Functional Analysis (math.FA), Polya distribution, Modulus of continuity, FOS: Mathematics, Pochhammer k-symbol, Geometry and Topology, Kantorovich operators, Bernstein operators,Stancu operators,Lupas operators,Kantorovich operators,Polya distribution,modulus of continuity,Lipschitz class,Voronovskaja type theorem,Pochhammer k-symbol, Lipschitz class, Stancu operators, Mathematics, Analysis

Abstract

In our present investigation, we are concerned with the Kantorovich variant of Lupa��-Stancu operators based on Polya distribution with Pochhammer $k$-symbol. We briefly give some basic properties of the generalized operators and by making use of these results, we investigate convergence properties of the studied operators. Furthermore, the rate of convergence of these operators is obtained and Voronovskaja type theorem for the pointwise approximation is established. Then we construct bivariate generalization of the operators and we discuss some convergence properties. Finally, taking into account some illustrative graphics, we conclude our study with the comparison of the rate of convergence between our operators and other operators which are mentioned in the paper.

Published

2022

34. Approximation to Integrable Functions by Modified Complex Shepard Operators

Author

Oktay Duman and Biancamaria Della Vecchia

Subjects

Shepard operators, Applied Mathematics, Matrix summabiliy methods, Kantorovich operators, Approximation in the complex plane, Analysis, Cesaro summability

Published

2022

35. Quantitative estimates for a certain bivariate Chlodowsky-Szasz-Kantorovich type operators.

Author

İSPİR, NURHAYAT and BÜYÜKYAZICI, İBRAHIM

Subjects

*QUANTITATIVE research, *BIVARIATE analysis, *MULTIVARIATE analysis, *KANTOROVICH method, *FUNCTIONAL analysis

Abstract

In this paper, we introduce a bivariate Kantorovich variant of the combination of Chlodowsky and Szasz type operators and study local approximation properties of these operators. We estimate the approximation order in terms of Peetre's K-functional and partial moduli of continuity. We also give some numerical error estimates and illustrations. [ABSTRACT FROM AUTHOR]

Published

2016

36. Stancu–Kantorovich operators based on inverse Pólya–Eggenberger distribution.

Author

Deo, Naokant, Dhamija, Minakshi, and Miclăuş, Dan

Subjects

*KANTOROVICH method, *OPERATOR theory, *INVERSE functions, *DISTRIBUTION (Probability theory), *APPROXIMATION theory, *STOCHASTIC convergence

Abstract

The purpose of this paper is to investigate approximation properties of Stancu–Kantorovich operators based on inverse Pólya–Eggenberger distribution. For these new operators we establish some approximation properties including uniform convergence, asymptotic formula and degree of approximation. [ABSTRACT FROM AUTHOR]

Published

2016

37. Voronovskaja-Type Quantitative Results for Differences of Positive Linear Operators

Author

Ioan Raşa, Gülen Başcanbaz-Tunca, and Ana Maria Acu

Subjects

Pure mathematics, Physics and Astronomy (miscellaneous), General Mathematics, Linear operators, Voronovskaja-type result, Bernstein operators, Type (model theory), Chemistry (miscellaneous), Computer Science (miscellaneous), QA1-939, Kantorovich operators, Mathematics, positive linear operators, Front (military)

Abstract

We consider positive linear operators having the same fundamental functions and different functionals in front of them. For differences involving such operators, we obtain Voronovskaja-type quantitative results. Applications illustrating the theoretical aspects are presented.

Published

2021

38. On New Classes of Stancu-Kantorovich-Type Operators

Author

Cristina Maria Păcurar, Bianca Ioana Vasian, and Ștefan Lucian Garoiu

Subjects

Discrete mathematics, Class (set theory), Generalization, General Mathematics, 010102 general mathematics, 010103 numerical & computational mathematics, Type (model theory), 01 natural sciences, Stancu–Kantorovich operators, Convergence (routing), approximation by positive linear operators, Computer Science (miscellaneous), QA1-939, Kantorovich operators, 0101 mathematics, Engineering (miscellaneous), Stancu operators, King-type operators, Mathematics

Abstract

The present paper introduces new classes of Stancu–Kantorovich operators constructed in the King sense. For these classes of operators, we establish some convergence results, error estimations theorems and graphical properties of approximation for the classes considered, namely, operators that preserve the test functions e0(x)=1 and e1(x)=x, e0(x)=1 and e2(x)=x2, as well as e1(x)=x and e2(x)=x2. The class of operators that preserve the test functions e1(x)=x and e2(x)=x2 is a genuine generalization of the class introduced by Indrea et al. in their paper “A New Class of Kantorovich-Type Operators”, published in Constr. Math. Anal.

Published

2021

39. Rate of convergence of Lupas Kantorovich operators based on Polya distribution.

Author

Ispir, Nurhayat, Agrawal, Purshottam Narain, and Kajla, Arun

Subjects

*STOCHASTIC convergence, *KANTOROVICH method, *DISTRIBUTION (Probability theory), *DERIVATIVES (Mathematics), *CONTINUOUS functions, *FUNCTIONS of bounded variation

Abstract

In the present paper, we consider the Kantorovich modification of Lupas operators based on Polya distribution. We estimate the rate of convergence for absolutely continuous functions having a derivative coinciding a.e. with a function of bounded variation. [ABSTRACT FROM AUTHOR]

Published

2015

40. Approximation by Kantorovich-type max-min operators and its applications.

Author

Gökçer, Türkan Yeliz and Aslan, İsmail

Subjects

*IMAGE processing, *FUZZY logic

Published

2022

41. Some general Kantorovich type operators

Author

Petru I. Braica and Ovidiu T. Pop

Subjects

Kantorovich operators, approximation and convergence theorem, Voronovskaja-type theorem, Mathematics, QA1-939

Abstract

A general class of linear and positive operators of Kantorovich-type is constructed. The operators of this type which preserve exactly two test functions from the set \(\{e_0, e_1, e_2\}\) are determined and their approximation properties and convergence theorems are studied.

Published

2012

42. Approximation properties of λ-Kantorovich operators

Author

Daniel Florin Sofonea, Nesibe Manav, and Ana Maria Acu

Subjects

Pure mathematics, Bernstein operator, Modulus of smoothness, Research, Applied Mathematics, lcsh:Mathematics, 010102 general mathematics, Type (model theory), Rate of convergence, Lambda, lcsh:QA1-939, 01 natural sciences, 010101 applied mathematics, Voronovskaja theorem, 41A10, Discrete Mathematics and Combinatorics, Kantorovich operators, 0101 mathematics, 41A25, 41A36, Analysis, Mathematics

Abstract

In the present paper, we study a new type of Bernstein operators depending on the parameter \documentclass[12pt]{minimal} \usepackage{amsmath} \usepackage{wasysym} \usepackage{amsfonts} \usepackage{amssymb} \usepackage{amsbsy} \usepackage{mathrsfs} \usepackage{upgreek} \setlength{\oddsidemargin}{-69pt} \begin{document}$\lambda\in[-1,1]$\end{document}λ∈[−1,1]. The Kantorovich modification of these sequences of linear positive operators will be considered. A quantitative Voronovskaja type theorem by means of Ditzian–Totik modulus of smoothness is proved. Also, a Grüss–Voronovskaja type theorem for λ-Kantorovich operators is provided. Some numerical examples which show the relevance of the results are given.

Published

2018

43. The Kantorovich form of some extensions for the Szász-Mirakjan operators

Author

Dan Bărbosu, Ovidiu T. Pop, and Dan Miclăuş

Subjects

Szász-Mirakjan operators, Kantorovich operators, Bohman-Korovkin theorem, modulus of continuity, Shisha-Mond theorem, degree of approximation, Mathematics, QA1-939

Abstract

Recently, C. Mortici defined a class of linear and positive operators depending on a certain function \(\varphi\). These operators generalize the well known Szász-Mirakjan operators. A convergence theorem for the defined sequence by the mentioned operators was given.Other interesting approximation properties of these generalized Szász-Mirakjan operators and also their bivariate form were obtained by D. Bărbosu, O. T. Pop and D. Miclăuș.In the present paper we are dealing with the Kantorovich form of the generalized Szász-Mirakjan operators. We construct the Kantorovich associated operators and then we establish a convergence theorem for the defined operators. The degree of approximation is expressed in terms of the modulus of continuity. Next, we construct the bivariate and respectively the GBS corresponding operators and we establish some of their approximation properties.

Published

2010

44. Approximation by quasi-interpolation operators and Smolyak's algorithm.

Author

Kolomoitsev, Yurii

Subjects

*SMOOTHNESS of functions, *BESOV spaces, *KERNEL functions, *PERIODIC functions, *ALGORITHMS

Abstract

We study approximation of multivariate periodic functions from Besov and Triebel–Lizorkin spaces of dominating mixed smoothness by the Smolyak algorithm constructed using a special class of quasi-interpolation operators of Kantorovich-type. These operators are defined similar to the classical sampling operators by replacing samples with the average values of a function on small intervals (or more generally with sampled values of a convolution of a given function with an appropriate kernel). In this paper, we estimate the rate of convergence of the corresponding Smolyak algorithm in the L q -norm for functions from the Besov spaces B p , θ s (T d) and the Triebel–Lizorkin spaces F p , θ s (T d) for all s > 0 and admissible 1 ≤ p , θ ≤ ∞ as well as provide analogues of the Littlewood–Paley-type characterizations of these spaces in terms of families of quasi-interpolation operators. [ABSTRACT FROM AUTHOR]

Published

2022

45. Approximation by Means of Kantorovich-Stancu Type Operators.

Author

Sucu, Sezgin and Ibikli, Ertan

Subjects

*KANTOROVICH method, *APPROXIMATION theory, *GENERALIZATION, *POLYNOMIALS, *STOCHASTIC convergence, *LEBESGUE measure, *CONTINUOUS functions

Abstract

The purpose of this article is to give a Kantorovich generalization of Stancu type polynomials. We obtain convergence properties of our operators in the continuous function space and Lebesgue spaces. Furthermore, we get the order of approximation with the help of modulus of continuity and give a numerical example for approximation. [ABSTRACT FROM AUTHOR]

Published

2013

46. About a general property for a class of linear positive operators and applications

Author

Ovidiu T. Pop

Subjects

linear positive operators, Bernstein operators, Durrmeyer operators, Kantorovich operators, Bleimann, Butzer and Hahn operators, Mathematics, QA1-939

Abstract

In this paper we demonstrate a general property for a class of linear positive operators. By particularization, we obtain the convergence and the evaluation for the rate of convergence in term of the first modulus of smoothness for the Bernstein operators, Durrmeyer operators, Kantorovich operators and Bleimann, Butzer and Hahn operators.

Published

2005

47. The generalization of Voronovskaja's theorem for a class of linear and positive operators

Author

Ovidiu T. Pop

Subjects

Bernstein operators, Bernstein-Schurer operators, Bernstein-Stancu operators, Kantorovich operators, Durrmeyer operators, Voronovskaja's theorem, Mathematics, QA1-939

Abstract

In this paper we generalize Voronovskaja's theorem for a class of linear and positive operators, and then, through particular cases, we obtain statements verified by the Bernstein, Schurer, Stancu, Kantorovich and Durrmeyer operators.

Published

2005

48. Approximation in variation by the Kantorovich operators.

Author

Kivinukk, Andi and Metsmägi, Tarmo

Subjects

*CONTINUOUS functions, *APPROXIMATION theory, *STOCHASTIC convergence, *VARIATIONAL principles, *KANTOROVICH method, *APPROXIMATION algorithms

Abstract

We discuss the rate of approximation of the Kantorovich operators. The rate of approximation is given with respect to the variation seminorm. [ABSTRACT FROM AUTHOR]

Published

2011

49. Stancu-Kantorovich Type Operators.

Author

Pop, Ovidiu T. and Bărbosu, Dan

Subjects

*KANTOROVICH method, *OPERATOR theory, *FUNCTIONAL analysis, *OPERATOR algebras, *MATHEMATICS

Abstract

In this paper, we study the Kantorovich form of Stancu operators. As particular cases, we obtain similar properties for the Kantorovich form for Bernstein, Schurer and Schurer-Stancu operators. [ABSTRACT FROM AUTHOR]

Published

2009

50. A Kantorovich variant of a generalized Bernstein operators

Author

Praveen Agarwal, Serkan Araci, Arun Kajla, and HKÜ, İktisadi, İdari ve Sosyal Bilimler Fakültesi, İktisat Bölümü

Subjects

Global approximation, rate of convergence, modulus of continuity, A-statistical convergence, Kantorovich operators, Computational Mathematics, Rate of convergence, General Mathematics, Computational Mechanics, Applied mathematics, Modulus of continuity, Computer Science Applications, Mathematics, A statistical convergence

Abstract

In this note we present a Kantorovich variant of the operators proposed by [X. Y. Chen, J. Q. Tan, Z. Liu, J. Xie, J. Math. Anal. Appl., 450 (2017), 244-261] based on non-negative parameters. Here, we prove an approximation theorem with the help of Bohman-Korovkin's principle and study the estimate of the rate of approximation by using the modulus of smoothness and Lipschitz type function for these operators. Also, we establish Voronovskaja type theorem and Korovkin type A-statistical approximation theorem of these operators.

Published

2019