On classification of toric surface codes of dimension seven

Naveed Hussain; Xue Luo; Stephen S.T. Yau; Mingyi Zhang; Huaiqing Zuo

doi:10.4310/CAG.2020.V28.N2.A3

On classification of toric surface codes of dimension seven

Naveed Hussain
, Xue Luo
, Stephen S.T. Yau
, Mingyi Zhang
, Huaiqing Zuo

Research output: Contribution to journal › Article › peer-review

2 Scopus citations

Abstract

In this paper, we give an almost complete classification of toric surface codes of dimension less than or equal to 7, according to monomially equivalence. This is a natural extension of our previous work [YZ], [LYZZ]. More pairs of monomially equivalent toric codes constructed from non-equivalent lattice polytopes are discovered. A new phenomenon appears, that is, the monomially non-equivalence of two toric codes CP(10)7and CP(19)7can be discerned on Fq, for all q ≥ 8, except q = 29. This sudden break seems to be strange and interesting. Moreover, the parameters, such as the numbers of codewords with different weights, depends on q heavily. More meticulous analyses have been made to have the possible distinct families of reducible polynomials.

Original language	English
Pages (from-to)	263-319
Number of pages	57
Journal	Communications in Analysis and Geometry
Volume	28
Issue number	2
DOIs	https://doi.org/10.4310/CAG.2020.V28.N2.A3
State	Published - 2020
Externally published	Yes

Bibliographical note

Publisher Copyright:
© 2020 International Press of Boston, Inc.. All rights reserved.

ASJC Scopus subject areas

Analysis
Statistics and Probability
Geometry and Topology
Statistics, Probability and Uncertainty

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title = "On classification of toric surface codes of dimension seven",

abstract = "In this paper, we give an almost complete classification of toric surface codes of dimension less than or equal to 7, according to monomially equivalence. This is a natural extension of our previous work [YZ], [LYZZ]. More pairs of monomially equivalent toric codes constructed from non-equivalent lattice polytopes are discovered. A new phenomenon appears, that is, the monomially non-equivalence of two toric codes CP(10)7and CP(19)7can be discerned on Fq, for all q ≥ 8, except q = 29. This sudden break seems to be strange and interesting. Moreover, the parameters, such as the numbers of codewords with different weights, depends on q heavily. More meticulous analyses have been made to have the possible distinct families of reducible polynomials.",

author = "Naveed Hussain and Xue Luo and Yau, \{Stephen S.T.\} and Mingyi Zhang and Huaiqing Zuo",

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T1 - On classification of toric surface codes of dimension seven

AU - Hussain, Naveed

AU - Luo, Xue

AU - Yau, Stephen S.T.

AU - Zhang, Mingyi

AU - Zuo, Huaiqing

PY - 2020

Y1 - 2020

N2 - In this paper, we give an almost complete classification of toric surface codes of dimension less than or equal to 7, according to monomially equivalence. This is a natural extension of our previous work [YZ], [LYZZ]. More pairs of monomially equivalent toric codes constructed from non-equivalent lattice polytopes are discovered. A new phenomenon appears, that is, the monomially non-equivalence of two toric codes CP(10)7and CP(19)7can be discerned on Fq, for all q ≥ 8, except q = 29. This sudden break seems to be strange and interesting. Moreover, the parameters, such as the numbers of codewords with different weights, depends on q heavily. More meticulous analyses have been made to have the possible distinct families of reducible polynomials.

AB - In this paper, we give an almost complete classification of toric surface codes of dimension less than or equal to 7, according to monomially equivalence. This is a natural extension of our previous work [YZ], [LYZZ]. More pairs of monomially equivalent toric codes constructed from non-equivalent lattice polytopes are discovered. A new phenomenon appears, that is, the monomially non-equivalence of two toric codes CP(10)7and CP(19)7can be discerned on Fq, for all q ≥ 8, except q = 29. This sudden break seems to be strange and interesting. Moreover, the parameters, such as the numbers of codewords with different weights, depends on q heavily. More meticulous analyses have been made to have the possible distinct families of reducible polynomials.

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EP - 319

JO - Communications in Analysis and Geometry

JF - Communications in Analysis and Geometry

IS - 2

ER -

On classification of toric surface codes of dimension seven

Abstract

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ASJC Scopus subject areas

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