Partitions of V(n, q) into 2‐ and s‐Dimensional Subspaces

Seelinger, George F.; Sissokho, Papa A.; Spence, Lawrence E.; Eynden, Charles Vanden

doi:10.1002/jcd.21295

Cited by 6 publications

(5 citation statements)

References 11 publications

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“…More generally, we can conclude some non-existence results for vector space partitions, whose classification is an ongoing, very hard, major project, see e.g. [32,48,49,50,83,96]. To that end, we mention the following theorem.…”

Section: Relations To Other Combinatorial Objectsmentioning

confidence: 86%

On projective $q^r$-divisible codes

Heinlein,

Honold,

Kiermaier

et al. 2019

Preprint

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A projective linear code over F q is called ∆-divisible if all weights of its codewords are divisible by ∆. Especially, q r -divisible projective linear codes, where r is some integer, arise in many applications of collections of subspaces in F v q . One example are upper bounds on the cardinality of partial spreads. Here we survey the known results on the possible lengths of projective q r -divisible linear codes.

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Section: Relations To Other Combinatorial Objectsmentioning

confidence: 86%

On projective $q^r$-divisible codes

Heinlein,

Honold,

Kiermaier

et al. 2019

Preprint

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“…Nevertheless, the mentioned classification is an ongoing, very hard, major project, see e.g. [62,92,93,94,138,165]. Currently all feasible types of vector space partitions of PG( − 1, 2) with ≤ 7 are characterized [62].…”

Section: Vector Space Partitionsmentioning

confidence: 99%

Divisible Codes

Kurz¹

2021

Preprint

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A linear code over F with the Hamming metric is called Δ-divisible if the weights of all codewords are divisible by Δ. They have been introduced by Harold Ward a few decades ago [173]. Applications include subspace codes, partial spreads, vector space partitions, and distance optimal codes. The determination of the possible lengths of projective divisible codes is an interesting and comprehensive challenge.

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“…x y to exist. For a = 2 and b > 3, the problem of determining the partitions of V n q ( , ) of type b 2 x y was considered by Seelinger et al in a series of two papers [17,18]. In [17], they proved that the existence of subspace partitions of V n q ( , ) of type b 2 x y for a suitable range of solutions x y ( , ) implies the existence of subspace partitions of V n b q ( + , ) of type b 2 x y for almost all solutions x y ( , ).…”

Section: Introductionmentioning

confidence: 99%

“…For a = 2 and b > 3, the problem of determining the partitions of V n q ( , ) of type b 2 x y was considered by Seelinger et al in a series of two papers [17,18]. In [17], they proved that the existence of subspace partitions of V n q ( , ) of type b 2 x y for a suitable range of solutions x y ( , ) implies the existence of subspace partitions of V n b q ( + , ) of type b 2 x y for almost all solutions x y ( , ). In their follow-up paper [18], they focused on the case q = 2 and proved the existence of partitions of V n ( , 2) of type b 2 x y for almost all solutions x y ( , ) without any precondition.…”

Section: Introductionmentioning

confidence: 99%