Birkhoff–James Orthogonality and Geometry of Operator Spaces: Infosys Science Foundation Series
Autor Arpita Mal, Kallol Paul, Debmalya Sainen Limba Engleză Hardback – 20 feb 2024
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Specificații
ISBN-13: 9789819971107
ISBN-10: 9819971101
Ilustrații: XIII, 251 p. 13 illus., 4 illus. in color.
Dimensiuni: 155 x 235 mm
Greutate: 0.55 kg
Ediția:1st ed. 2024
Editura: Springer Nature Singapore
Colecția Springer
Seriile Infosys Science Foundation Series, Infosys Science Foundation Series in Mathematical Sciences
Locul publicării:Singapore, Singapore
ISBN-10: 9819971101
Ilustrații: XIII, 251 p. 13 illus., 4 illus. in color.
Dimensiuni: 155 x 235 mm
Greutate: 0.55 kg
Ediția:1st ed. 2024
Editura: Springer Nature Singapore
Colecția Springer
Seriile Infosys Science Foundation Series, Infosys Science Foundation Series in Mathematical Sciences
Locul publicării:Singapore, Singapore
Cuprins
1 Notations and Terminologies.- 2 Basic theory of B-J orthogonality in Banach space.- 3 Operator norm attainment.- 4 B-J orthogonality of operators.- 5 Approximate B-J orthogonality.- 6 Smoothness and k−smoothness of operators.- 7 Symmetry of the B-J orthogonality.- 8 Extreme contractions.
Notă biografică
Arpita Mal is an Inspire Faculty Fellow at the Department of Mathematics, Indian Institute of Science, Bengaluru, under the mentorship of Prof. Apoorva Khare. Dr. Mal completed one year of postdoctoral research with SERB National Post-Doctoral fellowship at the same department, under the same mentor. She was also awarded an NBHM postdoctoral fellowship. She completed her Ph.D. at Jadavpur University, Kolkata, under the supervision of Prof. Kallol Paul in 2021. Dr. Mal is Recipient of a Gold Medal for securing the first-class-first position at M.Sc. from Jadavpur University. With 25 research articles in different international journals of high reputation, her research interest includes the geometry of Banach space and operator space.
Debmalya Sain is an Assistant Professor at the Department of Mathematics and Computing, Indian Institute of Information Technology Raichur, Karnataka, India. An alumnus of Ramakrishna Mission Vidyapith, Purulia, he completed his Ph.D. degree in 2015 under the guidance of Prof. Kallol Paul. A recipient of multiple Gold Medals in his undergraduate and postgraduate studies, Dr. Sain stood first-class-first in both his B.Sc. and M.Sc. examinations at Jadavpur University, Kolkata. He completed multiple post-doctoral fellowships at the Indian Institute of Science, Bengaluru, under the mentorship of Prof. Gadadhar Misra and Prof. Apoorva Khare. He has also received many international grants and awards, including the prestigious Maria Zambrano grant to pursue his research at the Universidad de Granada, Spain, under the guidance of Prof. Miguel Martin. Dr. Sain has authored more than 75 articles in various reputed international journals. Apart from acting as a referee and reviewer for many international journals, he is an invited member of the editorial board of the Advances in Operator Theory journal, published by Birkhauser.
Textul de pe ultima copertă
This book provides an insight into the geometric aspects of the spaces of operators studied by using the notion of Birkhoff–James orthogonality. It studies the norm attainment set of an operator and its properties, the notion of which plays a very important role in the characterization of B-J orthogonality of operators. The structure of the norm attainment set is studied for Hilbert space operators and is yet to be understood completely for operators between Banach spaces. The book explores the interrelation between B-J orthogonality in the ground space and in the space of operators in its fullest generality. The book further explores the concept of approximate B-J orthogonality and investigated its geometry both in the ground space as well as in the space of operators. It highlights important geometric properties like smoothness and k-smoothness of bounded linear operators, extreme contractions and symmetricity of bounded linear operators defined between Hilbert spaces as well as Banach spaces.
Caracteristici
Analyzes the norm structure through algebraic approaches with geometric visualization Focuses on topics in geometry of operator spaces through Birkhoff–James orthogonality Covers a vast area of geometric notions in the space of bounded linear operators