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Linear codes of the symplectic geometry over finite fields of even characteristic

Implementing Organization

National Institute of Science Education and Research (NISER)
Principal Investigator
Dr. Binod Kumar Sahoo
National Institute Of Science Education And Research (NISER), Bhubaneswar, Odisha

Project Overview

Let f be a symplectic form (that is, a nondegenerate alternating bilinear form) on a vector space V of dimension 2n over a finite filed of even order q and let W(2n-1,q) be the corresponding symplectic geometry of rank n. Thus W(2n-1,q) is the point-line geometry whose points are all the points of the projective space PG(2n-1,q) of dimension 2n-1 (associated with $V$) and lines are those lines of PG(2n-1,q) which are totally isotropic with respect to f. In this project, we shall investigate the following linear codes associated with the symplectic geometry W(2n-1,q): (1) the code generated by the hyperbolic lines of W(2n-1,q) and its dual code, (2) the code generated by the lines of W(2n-1,q) and its dual code, and (3) the code generated by the elliptic quadrics of W(2n-1,q) and its dual code.

Source

Source
Science and Engineering Research Board (SERB), DST 2022-23
Funding Organization
Funding Organization
Science and Engineering Research Board (SERB), New Delhi
Quick Information
Area of Research
Mathematical Sciences
Start Date
2023
End Date
2026
Status
completed
Contact
bksahoo@niser.ac.in
Output
No. of Research Paper
00
Technologies (If Any)
00
No. of PhD Produced
00
Publications
00
No. of Patents
Filed : 00
Grant : 00
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