Projective Nested Cartesian Codes

Carvalho, Cícero; Neumann, Víctor; López, Hiram H.

doi:10.1007/s00574-016-0010-z

Cited by 28 publications

(34 citation statements)

References 14 publications

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“…As an application, Corollary 4.9 will be used to study the minimum distance of projective nested cartesian codes [3] over a set X . In this case t i is a zero-divisor of S/I(X ) for i = 1, .…”

Section: The Minimum Distance Function Of a Graded Idealmentioning

confidence: 99%

“…Projective nested cartesian codes were introduced and studied in [3] (see Definition 6.1). This type of evaluation codes generalize the classical projective Reed-Muller codes [21].…”

Section: Introductionmentioning

confidence: 99%

“…al. found a Gröbner basis for I(X ) whose initial ideal is L, and obtained formulas for the regularity and the degree of the coordinate ring S/I(X ) [3] (Proposition 6.3).…”

Section: Introductionmentioning

confidence: 99%

“…They showed the conjecture when the A i 's are subfields of F q , and essentially showed that their conjecture can be reduced to: Conjecture 6.4. (Carvalho, Lopez-Neumann, and López [3]…”

Section: Introductionmentioning

confidence: 99%

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Minimum distance functions of graded ideals and Reed–Muller-type codes

Martinez-Bernal

Pitones

Villarreal

2017

Journal of Pure and Applied Algebra

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We introduce and study the minimum distance function of a graded ideal in a polynomial ring with coefficients in a field, and show that it generalizes the minimum distance of projective Reed-Muller-type codes over finite fields. This gives an algebraic formulation of the minimum distance of a projective Reed-Muller-type code in terms of the algebraic invariants and structure of the underlying vanishing ideal. Then we give a method, based on Gröbner bases and Hilbert functions, to find lower bounds for the minimum distance of certain Reed-Mullertype codes. Finally we show explicit upper bounds for the number of zeros of polynomials in a projective nested cartesian set and give some support to a conjecture of Carvalho, Lopez-Neumann and López.We call δ I the minimum distance function of I. If I is a prime ideal, then F d = ∅ for all d ≥ 0 and δ I (d) = deg(S/I). We show that δ I generalizes the minimum distance function of projective Reed-Muller-type codes over finite fields (Theorem 4.7). This abstract algebraic formulation of the minimum distance gives a new tool to study these type of linear codes.

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Section: The Minimum Distance Function Of a Graded Idealmentioning

confidence: 99%

“…Projective nested cartesian codes were introduced and studied in [3] (see Definition 6.1). This type of evaluation codes generalize the classical projective Reed-Muller codes [21].…”

Section: Introductionmentioning

confidence: 99%

“…al. found a Gröbner basis for I(X ) whose initial ideal is L, and obtained formulas for the regularity and the degree of the coordinate ring S/I(X ) [3] (Proposition 6.3).…”

Section: Introductionmentioning

confidence: 99%

“…They showed the conjecture when the A i 's are subfields of F q , and essentially showed that their conjecture can be reduced to: Conjecture 6.4. (Carvalho, Lopez-Neumann, and López [3]…”

Section: Introductionmentioning

confidence: 99%

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Minimum distance functions of graded ideals and Reed–Muller-type codes

Martinez-Bernal

Pitones

Villarreal

2017

Journal of Pure and Applied Algebra

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“…The Reed-Muller-type codes and their parameters have been studied extensively. If X is a subset of a projective space P s´1 over a finite field K " F q , and C X pdq is the corresponding Reed-Muller-type code (Definition 2.5), several cases have been described [1], [3], [7], [8], [9], [10], [11], [12], [14], [15], [19], [21], [25], [26], [27], [28], [29], [30], [31]:…”

Section: Introductionmentioning

confidence: 99%

Generalized minimum distance functions

et al. 2018

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Hypersurfaces in Weighted Projective Spaces Over Finite Fields with Applications to Coding Theory

Aubry

Castryck

Ghorpade

et al. 2017

Association for Women in Mathematics Series

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We consider the question of determining the maximum number of F qrational points that can lie on a hypersurface of a given degree in a weighted projective space over the finite field F q , or in other words, the maximum number of zeros that a weighted homogeneous polynomial of a given degree can have in the corresponding weighted projective space over F q . In the case of classical projective spaces, this question has been answered by J.-P. Serre. In the case of weighted projective spaces, we give some conjectures and partial results. Applications to coding theory are included and an appendix providing a brief compendium of results about weighted projective spaces is also included.

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Projective Nested Cartesian Codes

Cited by 28 publications

References 14 publications

Minimum distance functions of graded ideals and Reed–Muller-type codes

Minimum distance functions of graded ideals and Reed–Muller-type codes

Generalized minimum distance functions

Hypersurfaces in Weighted Projective Spaces Over Finite Fields with Applications to Coding Theory

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