Education
M.Sc. University of Calcutta, India
Ph.D. Indian Statistical Institute, India
Research Interests
- Geometry of Banach Spaces
- Convexity theory of Banach Spaces
- Operator Theory
- P-adic Functional Analysis
Publications
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S. Basu S. Seal, 鈥 Small diameter properties in ideals of Banach Spaces 鈥 Journal of Convex Analysis Volume 30 (2023) J Math Archive link, https://doi.org/10.48550/arXiv.2109.04963, 2022.
- S. Basu S. Seal, 鈥淪mall Combination of Slices, Dentability and Stability Results Of Small Diameter Properties In Banach Spaces鈥, Journal of Mathematical Analysis and Applications, Volume (507), https://doi.org/10.1016/j.jmaa.2021.125793, 2022.
- S. Basu, S. Som, L. K. Dey,鈥淔arthest Point Problem and Partial Statistical Continuity in Normed Linear Spaces鈥, Quaestiones Mathematicae , Volume (44), No.4, https://doi.org/10.2989/16073606.2021.1886193, 2021.
- S. Basu S. Seal, ``Two aspects of small diameter properties", Operator and Matrix Theory Function Spaces and Applications, Springer Nature, 2024.
- S. Basu. B. Guerrero S. Seal and J. M. V. Yeguas, ``Non-rough norms in operator spaces",Mediterranean Journal of Mathematics Volume 20 No.6 ,2023.
- S. Basu, 鈥淥n Ball dentable property in Banach Spaces鈥 Mathematical Analysis and its Applications in Modeling (ICMAAM 2018, Springer Proceedings in Mathematics and Statistics, Volume (302), pages 144鈥149, https://link.springer.com/conference/icmaam, 2020.
- S. Basu, A. I. Singh, 鈥淟inear Hahn Banach Type Extension Operators in Banach Algebras of Operators鈥, Mathematical Proceedings of the Royal Irish Academy Volume (119A) No.1, pages 7鈥25, https://doi.org/10.3318/pria.2019.119.02, 2019.
- S. Basu, 鈥淥n Schatten Class Operators in p-adic Hilbert Spaces鈥 Contemp. Math, AMS, Volume (704), pages 37鈥48, https://doi.org/10.1090/conm/704, 2018.
- S. Basu, 鈥淥n Span of Small Combination of Slices Point in Banach Spaces鈥 Contemp. Math, AMS, Volume (687), pages 45鈥53, 2017.
- S. Basu, T. S. S. R. K. Rao,鈥淥n Small Combination of Slices in Banach Spaces鈥, Extracta Mathematcae, Volume (31) No.1, pages 1鈥10, https://publicaciones.unex.es/index.php/EM/article/view/2605-5686.31.1.1 2016.
- S. Basu T. Gill, V. Steadman, Z. Zachary, 鈥淥n Natural adjoint operators in Banach Spaces鈥, Proceedings of American Mathematical Society, Vol ume (132), pgs 1429-1434, https://www.jstor.org/stable/4097221, 2004.
- S. Basu, T. Diagana, F. Ramarosan, 鈥淥n P-adic Hilbert Schimdt Operators鈥 , Journal of Analysis and Applications, Volume (2),No. 3 (2004) , pages 173鈥188, http://sasip.net/jaa-index.html, MR 2092641(2005e: 47153).
- P. Bandyopadhaya, P. Basu S. Dutta, B. L. Lin, 鈥淰ery non-constrained subspaces of Banach Spaces鈥, Extracta Mathematicae, Volume (18) , No. 2, pages 161鈥185, https://www.eweb.unex.es/eweb/extracta/Vol-18-2/18a2Band.pdf, 2003.
- S. Basu, 鈥淭he Ball Generated Property in Operator Spaces鈥, Indagtiones Mathematicae, N. S. 13 (2), pages 169鈥175, https://doi.org/10.1016/S0019-3577(02)80002-7, 2002.
- P. Bandyopadhaya, S. Basu, 鈥淥n Nicely Smooth Banach Spaces鈥, Extracta Mathematicae, Volume(16), No. 1, pages 27鈥45, 2001.
- P. Bandyopadhaya, S. Basu, 鈥淥n a New Asymptotic Norming Property鈥 , Indagotiones Mathematicae, NS 10, No.1, pages 15鈥23, https://doi.org/10.1016/S0019-3577(99)80002-0, 1999.
- S. Basu, T. S. S. R. K. Rao, 鈥淪ome Stability Results for Asymptotic Norming Properties in Banach Spaces鈥 , Colloquium Mathematicum, Volume, (75), pages 271鈥284, 1998.
- S. Basu , L. K . Dey S. Seal, S. Som, 鈥淔arthest Point Problem for I-M Compact Sets鈥, arXiv:2008.08491 [math.FA], (In preparation), 2021.
Additional Information
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