Exceptional scattered sequences

11/21/2022

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The concept of scattered polynomials is generalized to those of exceptional scattered sequences which are shown to be the natural algebraic counterpart of 𝔽_q^n-linear MRD codes. The first infinite family in the first nontrivial case is also provided and equivalence issues are considered. As a byproduct, a new infinite family of MRD codes is obtained.

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Exceptional scattered sequences

An infinite family of linear codes supporting 4-designs

On the equivalence issue of a class of 2-dimensional linear Maximum Rank Distance codes

On a family of linear MRD codes with parameters [8×8,16,7]_q

Linear codes of 2-designs associated with subcodes of the ternary generalized Reed-Muller codes

Number Theoretical Locally Recoverable Codes

On sequences associated to the invariant theory of rank two simple Lie algebras

An Infinite, Converging, Sequence of Brocard Porisms

Exceptional scattered sequences

Related Research

An infinite family of linear codes supporting 4-designs

On the equivalence issue of a class of 2-dimensional linear Maximum Rank Distance codes

On a family of linear MRD codes with parameters [8×8,16,7]_q

Linear codes of 2-designs associated with subcodes of the ternary generalized Reed-Muller codes

Number Theoretical Locally Recoverable Codes

On sequences associated to the invariant theory of rank two simple Lie algebras

An Infinite, Converging, Sequence of Brocard Porisms