Partitions of finite vector spaces into subspaces

El-Zanati, Saad I.; Seelinger, George F.; Sissokho, Papa A.; Spence, Lawrence E.; Eynden, Charles Vanden

doi:10.1002/jcd.20167

Cited by 25 publications

(29 citation statements)

References 8 publications

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“…In [5], when q = 2 and n = dim(V ) ≤ 7, we found all solutions to the Diophantine equation (1) with n 1 > · · · > n k for which there exists a partition of V (Heden [8] had settled the n = 6 case in 1986). In [6], we showed that if n > 2, and x and y are nonnegative integers satisfying x(2 3 − 1) + y(2 2 − 1) = 2 n − 1, then there exists a partition of V n (2) …”

Section: Lemma 13 (Bumentioning

confidence: 96%

On vector space partitions and uniformly resolvable designs

Blinco

El-Zanati

Seelinger

et al. 2008

Des. Codes Cryptogr.

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Let V n (q) denote a vector space of dimension n over the field with q elements. A set P of subspaces of V n (q) is a partition of V n (q) if every nonzero vector in V n (q) is contained in exactly one subspace in P. A uniformly resolvable design is a pairwise balanced design whose blocks can be resolved in such a way that all blocks in a given parallel class have the same size. A partition of V n (q) containing a i subspaces of dimension n i for 1 ≤ i ≤ k induces a uniformly resolvable design on q n points with a i parallel classes with block size q n i , 1 ≤ i ≤ k, and also corresponds to a factorization of the complete graph K q n into a i K q n i -factors, 1 ≤ i ≤ k. We present some sufficient and some necessary conditions for the existence of certain vector space partitions. For the partitions that are shown to exist, we give the corresponding uniformly resolvable designs. We also show that there exist uniformly resolvable designs on q n points where corresponding partitions of V n (q) do not exist.

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Section: Lemma 13 (Bumentioning

confidence: 96%

On vector space partitions and uniformly resolvable designs

Blinco

El-Zanati

Seelinger

et al. 2008

Des. Codes Cryptogr.

Self Cite

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“…Heden [11] gave lower bounds for the number of subspaces of least dimension in a given partition of V (n, q). The 4 6 3 21 2 6 -partition of V (8,2) in Example 17 shows that the bound in Theorem 1 (iii) from [11] is tight.…”

Section: Proof Of Theoremmentioning

confidence: 87%

“…(8,2) with (a, b, c) = (13,6,6). We then show in Section C that there is no 4 13 3 6 2 6 -partition of V (8,2).…”

Section: Introductionmentioning

confidence: 97%

“…. 1 a 1 -partitions of V (n, q) for n ≤ 7 and q = 2 (see [5]), and the 3 a 2 b -partitions of V (n, 2) for all n ≥ 2 (see [6]). …”

Section: Introductionmentioning

confidence: 99%

“…For instance, the partitions in this article establish the tightness of bounds, obtained by Heden [11] (see Remark 20). Moreover, the constructions of vector space partitions of V (n, q) for small n provide base cases for recursive constructions with larger values of n (see [6,9]). This is similar to the situation in t-(v, k, ) designs where the designs with small parameters provide the building blocks for recursive constructions (e.g.…”

Section: Introductionmentioning

confidence: 99%

See 2 more Smart Citations

Partitions of the 8‐dimensional vector space over GF(2)

El-Zanati

Heden

Seelinger

et al. 2010

J of Combinatorial Designs

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Let V = V(n,q) denote the vector space of dimension n over GF(q). A set of subspaces of V is called a partition of V if every nonzero vector in V is contained in exactly one subspace of V. Given a partition P of V with exactly a i subspaces of dimension i for 1 ≤ i ≤ n, we have n i=1 a i (q i −1) = q n −1, and we call the n-tuple (a n , a n-1 ,...,a 1 ) the type of P. In this article we identify all 8-tuples (a 8 , a 7 ,...,a 2 , 0) that are the types of partitions of V(8,2). q

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

Seelinger¹,

Sissokho²,

Spence³

et al. 2012

J of Combinatorial Designs

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Let V=V(n,q) denote a vector space of dimension n over the field with q elements. A set scriptP of subspaces of V is a (vector space) partition of V if every nonzero element of V is contained in exactly one subspace in scriptP. Suppose that scriptP is a partition of V with xi subspaces of dimension di for 1≤i≤k. Then we call d1x1...dkxk the type of the partition scriptP. Which possible types correspond to actual partitions is in general an open question. We prove that for any odd integer s≥3 and for any integer n≥2s, the existence of partitions of V(n,q) across a suitable range of types sx2y guarantees the existence of partitions of V(n+js,q) of essentially all the types sx2y for any integer j≥1. We then apply this result to construct new classes of partitions of V. © 2012 Wiley Periodicals, Inc. J. Combin. Designs 20: 467‐482, 2012

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Partitions of finite vector spaces into subspaces

Cited by 25 publications

References 8 publications

On vector space partitions and uniformly resolvable designs

On vector space partitions and uniformly resolvable designs

Partitions of the 8‐dimensional vector space over GF(2)

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

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