The Infinite Lights out Problem and Symmetric Matrices over \(\mathbb{Z}_{2}\).

Goncalves, Daniel; Gongalves*, Cardoso

Abstract

References

Journal of Combinatorial Mathematics and Combinatorial Computing

Volume 103
Pages: 289-295

Research article

The Infinite Lights out Problem and Symmetric Matrices over \(\mathbb{Z}_{2}\).

^¹, ^¹

¹Departamento de Matematica – Universidade Federal de Santa Catarina Trindade – Floriandépolis – SC – 88.040-900 – Brazil.

Published: 28/05/2016

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Abstract

We show, using a hybrid analysis/linear algebra argument, that the diagonal vector of an infinite symmetric matrix over \(\mathbb{Z}_{2}\) is contained in the range of the matrix. We apply this result to an extension, to the countably infinite case, of the Lights Out problem.

Keywords: Infinite matrices, lights out, symmetric matrices, diagonal, range

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Journal of Combinatorial Mathematics and Combinatorial Computing

The Infinite Lights out Problem and Symmetric Matrices over \(\mathbb{Z}_{2}\).

Abstract

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