Department of Mathematics | Indian Institute Of Technology Madras , Chennai

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Dr.Uma V

Associate Professor

044 - [22]-57 [46]-26

vuma

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KCB 628

Algebraic Topology, Algebraic Geometry

to email  add  username@iitm.ac.in'

  1. K-theory of Springer Varieties

    Author: Parameswaran Sankaran and V.Uma

    Journal: Tohoku Mathematical Journal

    Volume: 77 (1)

    Year: 2025

  2. Equivariant K-theory of flag Bott manifolds of general Lie type

    Author: Bidhan Paul and V. Uma

    Journal: Math. Nachrichten

    Year: 2024

  3. Equivariant K-theory of Springer Varieties

    Author: V. Uma

    Journal: Topology and its Applications

    Volume: 342

    Page: 108784

    Year: 2024

  4. $K$-theory of flag Bott manifolds

    Author: Bidhan Paul and V.Uma

    Journal: Forum Mathematicum

    Volume: 36 (3)

    Page: 621-639

    DOI: https://doi.org/10.1515/forum-2023-0074

    Year: 2024

  5. Equivariant Grothendieck ring of complete symmetric varieties of minimal rank

    Author: V. Uma

    Journal: Manuscripta Mathematica

    Volume: 173 (Issue 3-4)

    Page: 1099-1121

    DOI: 10.1007/s00229-023-01495-2

    Year: 2023

  6. $K$-theory of regular compactification bundles

    Author: V. Uma

    Journal: Math. Nachrichten

    Volume: 295

    Page: 1013-1034

    Year: 2022

  7. Equivariant $K$-theory of toric orbifolds

    Author: Soumen Sarkar and V. Uma

    Journal: J. Math. Soc. Japan

    Volume: 73

    Page: 735--752

    DOI: 10.2969/jmsj/83548354

    Year: 2021

  8. $K$-theory of toric hyperK\"{a}hler varieties,

    Author: V.Uma

    Journal: Indian Journal of Pure and Applied Mathematics

    Volume: 51

    Page: 1-10

    DOI: 10.1007/s13226-019-0377-9

    Year: 2020

  9. Cohomology of torus manifold bundles

    Author: Jyoti Dasgupta, Bivas Khan, V. Uma

    Journal: Mathematica Slovaca

    Volume: 69

    Page: 685-698

    DOI: 10.1515/ms-2017-0257

    Year: 2019

  10. Equivariant $K$-theory of quasitoric manifolds

    Author: Jyoti Dasgupta, Bivas Khan and V.Uma

    Journal: Proc. Indian Acad. Sci. (Math. Sci.

    Volume: 129:72

    Year: 2019

  11. Results on the topology of generalized real Bott manifolds

    Author: Raisa Dsouza and V. Uma

    Journal: Osaka Journal of Mathematics

    Volume: 56

    Page: 441-458

    Year: 2019

  12. Equivariant $K$-theory of group compactifications:further developments

    Author: V. Uma

    Journal: Izvestiya Mathematics

    Volume: 80

    Page: 417-441

    Year: 2016

  13. The Algebraic Cobordism Ring of Toric Varieties

    Author: Amalendu Krishna and Vikraman Uma

    Journal: International Mathematics Research Notices

    Volume: 23

    Page: 5426-5464

    Year: 2013

  14. Equivariant K-theory of flag varieties revisited and related results

    Author: V. Uma

    Journal: Colloqium Mathematicum

    Volume: 132

    Page: 151-175

    Year: 2013

  15. Equivariant K-theory of compactifications of algebraic groups

    Author: V. Uma

    Journal: Transformation Groups

    Volume: 12

    Page: 371-406

    Year: 2007

  16. K-theory of quasi-toric manifolds

    Author: P. Sankaran and V. Uma

    Journal: Osaka J. Math.

    Volume: 44

    Page: 71-89

    Year: 2007

  17. On the fundamental group of real toric varieties

    Author: V. Uma

    Journal: Proc. Ind. Acad. Sci. (Math. Sci.)

    Volume: 114

    Page: 15--31

    Year: 2004

  18. Cohomology of toric bundles

    Author: P. Sankaran and V.Uma

    Journal: Comment. Math. Helv.

    Volume: 78

    Page: 540-554

    Year: 2003