Zweier I - Convergent Sequence Spaces and Their Properties

Vakeel Ahmad Khan, Ayhan Esi, Khalid Ebadullah, Nazneen Khan  © by the authors

ISBN: 978-1-940366-42-5
Published: April 27, 2016
Pages: 131
Paperback: $85
Publisher: Science Publishing Group
Publication Status: Published
About This Book

This book will be very useful to postgraduates students and for those who are doing research work or intend to work in the areas of classical and the modern sequence space theory.

The concept of ideal converegence as a generalization of statistical convergence , and any concept involving ideal convergence plays a vital role not in the pure mathematics but also in other branches of science involving mathematics, especially in information theory , computer science , biological science. dynamical systems, geographic information systems, population modeling and motion planning in robotics.

The main aim of this book is to study Zweier I - Convergent Sequence Spaces. We have also discussed the topological properties, algebraic properties and inclusion relations on these new Zweier I - Convergent Sequence Spaces.

Author Introduction

Dr. Vakeel Ahmad Khan, Ph.D., is Senior Assistant Professor of Mathematics at Aligarh Muslim University, Aligarh , India. A vigorous researcher in the area of Sequence Spaces. Dr. Khan has published a number of research papers in reputed national and international journals, including Journal of Indian Mathematical Society, Numerical Functional analysis and Optimization (Taylor's and Francis),Information Sciences(Elsevier), Applied Mathematics - A Journal of Chinese Universities and Springer - Verlag(CHINA), Rendiconti del Circolo Matematico di Palermo Springer - Verlag(ITALY), Journal of Mathematics and Applications (POLAND), Acta Math. Univ. Comenianae (Bratislava, Slovak Republic), Kyungpook Mathematical Journal (KOREA), Vietnam Journal of Mathematics (VIETNAM), Studia Mathematica (POLAND), Thai Journal of mathematics (THAILAND), Southeast Asian Bull. Math (CHINA), Mathematicki Vesnik (SERBIA), Applied Sciences (ROMANIA).

Professor Ayhan Esi was born in Istanbul, Turkey, on March 5, 1965. Ayhan Esi got his B.Sc. from Inonu University in 1987 and M. Sc. and Ph.D. degree in pure mathematics from Elazig University, Turkey in 1990 and 1995, respectively. His research interests include Summability Theory, Sequences and Series in Analysis and Functional Analysis. In 2000, Esi was appointed to Education Faculty in Gaziantep University. In 2002, Esi was appointed as the head of Department of Mathematics in Science and Art Faculty in Adiyaman of the Inonu University. In 2006, Esi joined the Department of Mathematics of Adiyaman University. He is married and has 2 children.

Dr. Khalid Ebadullah, Ph.D., Post - Doctoral Fellow (National Board of Higher Mathematics (NBHM), Department of Atomic Energy (DAE), Goverment of India, INDIA ), Department of Mathematics, Aligarh Muslim University, Aligarh, India. The fields of interest of Dr Ebadulllah are sequence spaces. He has published a number of research papers in reputed national and international journals.

Dr. Nazneen Khan, Department of Mathematics, Aligarh Muslim University, Aligarh, India. She is currently working in the same field of functional analysis and sequence spaces, especially double sequences. She has also published research articles in various national and international journals.

Sections
  • Front Matter

    Published: April 27, 2016

  • 1 Basic Definitions and Notations

    Published: April 27, 2016

  • 2 Zweier I-Convergent Sequence Spaces

    Published: April 27, 2016

  • 3 On Paranorm Zweier I-Convergent Sequence Spaces

    Published: April 27, 2016

  • 4 Zweier I-Convergent Sequence Spaces Defined by Orlicz Function

    Published: April 27, 2016

  • 5 On Some Zweier I-Convergent Sequence Spaces Defined by a Modulus Function

    Published: April 27, 2016

  • 6 Zweier I-Convergent Sequence Spaces Defined by a Sequence of Modulii

    Published: April 27, 2016

  • 7 On Certain Class of Zweier I-Convergent Sequence Spaces

    Published: April 27, 2016

  • 8 Zweier I-Convergent Double Sequence Spaces

    Published: April 27, 2016

  • 9 Zweier I-Convergent Double Sequence Spaces Defined by a Modulus Function

    Published: April 27, 2016

  • 10 Zweier I-Convergent Double Sequence Spaces Defined by Orlicz Function

    Published: April 27, 2016

  • Back Matter

    Published: April 27, 2016