A connection between random variables and latin k-cubes

Ruben Michel; Gadi Taubenfeld; Andrew Berman

doi:10.1016/0012-365X(94)00073-7

A connection between random variables and latin k-cubes

Ruben Michel
, Gadi Taubenfeld
, Andrew Berman

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

Abstract

The subject of latin squares is about 200 years old, and it abounds with many solved and unsolved problems. In this paper we establish an interconnection between latin k-cubes and random variables. When combined with the rich theory of latin k-cubes, this connection yields new results about independent random variables, which generalize and extend other recent results. Our results are applicable for the construction of efficient algorithms.

Original language	English
Pages (from-to)	313-320
Number of pages	8
Journal	Discrete Mathematics
Volume	146
Issue number	1-3
DOIs	https://doi.org/10.1016/0012-365X(94)00073-7
State	Published - 15 Nov 1995
Externally published	Yes

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10.1016/0012-365X(94)00073-7

Cite this

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title = "A connection between random variables and latin k-cubes",

abstract = "The subject of latin squares is about 200 years old, and it abounds with many solved and unsolved problems. In this paper we establish an interconnection between latin k-cubes and random variables. When combined with the rich theory of latin k-cubes, this connection yields new results about independent random variables, which generalize and extend other recent results. Our results are applicable for the construction of efficient algorithms.",

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N2 - The subject of latin squares is about 200 years old, and it abounds with many solved and unsolved problems. In this paper we establish an interconnection between latin k-cubes and random variables. When combined with the rich theory of latin k-cubes, this connection yields new results about independent random variables, which generalize and extend other recent results. Our results are applicable for the construction of efficient algorithms.

AB - The subject of latin squares is about 200 years old, and it abounds with many solved and unsolved problems. In this paper we establish an interconnection between latin k-cubes and random variables. When combined with the rich theory of latin k-cubes, this connection yields new results about independent random variables, which generalize and extend other recent results. Our results are applicable for the construction of efficient algorithms.

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A connection between random variables and latin k-cubes

Abstract

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