Mathematical Analysis I: Approximation Theory ICRAPAM 2018, New Delhi, India, October 23-25 /: ICRAPAM 2018, New Delhi, India, October 23-25. (2020)
- Record Type:
- Book
- Title:
- Mathematical Analysis I: Approximation Theory ICRAPAM 2018, New Delhi, India, October 23-25 /: ICRAPAM 2018, New Delhi, India, October 23-25. (2020)
- Main Title:
- Mathematical Analysis I: Approximation Theory ICRAPAM 2018, New Delhi, India, October 23-25
- Further Information:
- Note: Edited by Naokant Deo, Vijay Gupta, Ana Maria Acu, P. N. Agrawal.
- Editors:
- Deo, Naokant
Gupta, Vijay
Acu, Ana Maria
Agrawal, P. N - Contents:
- A. J. Lopez-Moreno, Expressions, Localization Results and Voronovskaja Formulas for Generalized Durrmeyer Type Operators.- P. N. Agrawal and A. Kumar, Lupas Kantorovich Type Operators for Functions of Two Variables.- S. Pandey, S. R. Verma and S. Dixit, Bernstein Polynomials Multi Wavelets Operational Matrix for Solution of Differential Equation.- V. Gupta, Convergence Estimates of Certain Exponential Type Operators.- N. Bhardwaj, A Better Error Estimation on Generalized Positive Linear Operators Based on PED and IPED.- R. Pratap and N. Deo, Approximation by α-Bernstein–Kantrovich Operator.- A. A. Maria and V. A. Radu, Approximation by Certain Operators Linking the α-Bernstein and the Genuine α-Bernstein–Durrmeyer Operators.- M. Heilmann and I. Rasa, Note on a Proof for the Representation of the k-th Order Kantorovich Modification of Linking Baskakov Type Operators.- R. Chauhan and P. N. Agrawal, Degree of Approximation by Generalized Boolean Sum of λ-Bernstein Operators.- M. Dhamija, Durrmeyer Modification of Lupas Type Baskakov Operators Based on IPED.- F. Ozsarac, A. Aral and H. Karsli, On Bernstein–Chlodowsky Type Operators Preserving Exponential Functions.- A.-D. Filip and V. A. Radu, Iterative Approximation of Common Fixed Points in Kasahara Spaces.- V. Sihag and Dinesh, Vinod, Fixed Point Theorem in Fuzzy Metric Space Via α-Series Contraction.- A. A. Aserkar and M. P. Gandhi, The Unique Common Fixed-Point Theorem for Four Mappings Satisfying Common Limit in theA. J. Lopez-Moreno, Expressions, Localization Results and Voronovskaja Formulas for Generalized Durrmeyer Type Operators.- P. N. Agrawal and A. Kumar, Lupas Kantorovich Type Operators for Functions of Two Variables.- S. Pandey, S. R. Verma and S. Dixit, Bernstein Polynomials Multi Wavelets Operational Matrix for Solution of Differential Equation.- V. Gupta, Convergence Estimates of Certain Exponential Type Operators.- N. Bhardwaj, A Better Error Estimation on Generalized Positive Linear Operators Based on PED and IPED.- R. Pratap and N. Deo, Approximation by α-Bernstein–Kantrovich Operator.- A. A. Maria and V. A. Radu, Approximation by Certain Operators Linking the α-Bernstein and the Genuine α-Bernstein–Durrmeyer Operators.- M. Heilmann and I. Rasa, Note on a Proof for the Representation of the k-th Order Kantorovich Modification of Linking Baskakov Type Operators.- R. Chauhan and P. N. Agrawal, Degree of Approximation by Generalized Boolean Sum of λ-Bernstein Operators.- M. Dhamija, Durrmeyer Modification of Lupas Type Baskakov Operators Based on IPED.- F. Ozsarac, A. Aral and H. Karsli, On Bernstein–Chlodowsky Type Operators Preserving Exponential Functions.- A.-D. Filip and V. A. Radu, Iterative Approximation of Common Fixed Points in Kasahara Spaces.- V. Sihag and Dinesh, Vinod, Fixed Point Theorem in Fuzzy Metric Space Via α-Series Contraction.- A. A. Aserkar and M. P. Gandhi, The Unique Common Fixed-Point Theorem for Four Mappings Satisfying Common Limit in the Range.- S. Gandhi, Radius Estimates for Three Leaf Function and Convex Combination of Starlike Functions.- S. Anand, S. Kumar and V. Ravichandran: Starlikeness Associated with Admissible Functions.- M. Mundalia and S. S. Kumar, Coefficient Bounds for a Unified Class of Holomorphic Functions.- N. K. Jain and S. Yadav, Bohr Radius for Certain Analytic Functions.- V. Kumar, S. Kumar and V. Ravichandran, Third Hankel Determinant for Certain Classes of Analytic Functions.- R. Haloi and M. Sen, μ-Statistical Convergence of Sequences in Probabilistic n-Normed Spaces.- S. Shah and T. Das, Recent Advances in Distributional Chaos Theory.- A. K. Verma and S. Kumar, Lacunary Statistical Convergence of Order α for Generalized Difference Sequences and Summability through Modulus Function.- Ritika, Convergence of Three Step Iterative Process for Generalized Asymptotically Quasi-Non expansive Mappings in CAT(0) Spaces. … (more)
- Publisher Details:
- Singapore : Springer Singapore Imprint: Springer
- Publication Date:
- 2020
- Extent:
- 1 online resource (XI, 261 pages), 10 illustrations, 5 illustrations in color
- Subjects:
- 515.724
Operator theory
Approximation theory
Functional analysis
Sequences (Mathematics) - Languages:
- English
- ISBNs:
- 9789811511530
9811511535 - Access Rights:
- Legal Deposit; Only available on premises controlled by the deposit library and to one user at any one time; The Legal Deposit Libraries (Non-Print Works) Regulations (UK).
- Access Usage:
- Restricted: Printing from this resource is governed by The Legal Deposit Libraries (Non-Print Works) Regulations (UK) and UK copyright law currently in force.
- View Content:
- Available online (eLD content is only available in our Reading Rooms) ↗
- Physical Locations:
- British Library HMNTS - ELD.DS.491800
- Ingest File:
- 03_054.xml