Chaining multiplications in finite fields with Chudnovsky-type algorithms and tensor rank of the \(k\)-multiplication
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Publication:6108715
DOI10.1007/978-3-031-19685-0_1OpenAlexW4307197976MaRDI QIDQ6108715
Robert Rolland, Stéphane Ballet
Publication date: 26 July 2023
Published in: Algebraic Informatics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/978-3-031-19685-0_1
Cites Work
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- Algebraic function fields and codes
- On the existence of non-special divisors of degree \(g\) and \(g-1\) in algebraic function fields over \(\mathbb{F}_2\)
- Tower of algebraic function fields with maximal Hasse-Witt invariant and tensor rank of multiplication in any extension of \(\mathbb{F}_2\) and \(\mathbb{F}_3\)
- Trisymmetric multiplication formulae in finite fields
- Lectures on the theory of algebraic functions of one variable
- Families of curves over finite fields
- On the existence of dimension zero divisors in algebraic function fields defined over Fq
- On tame towers over finite fields
- On the tensor rank of multiplication in finite extensions of finite fields and related issues in algebraic geometry
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