Covering Finite Fields with Cosets of Subspaces
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Abstract If V is a vector space over a finite field F, the minimum number of cosets of k-dimensional subspaces of V required to cover the nonzero points of V is established. This is done by first regarding V as a field extension of F and then associating with each coset L of a subspace of V a polynomial whose roots are the points of L. A covering with cosets is then equivalent to a product of such polynomials having the minimal polynomial satisfied by all nonzero points of V as a factor.
[1] R. V. Randow. Introduction to the Theory of Matroids , 1975 .
[2] Norman Biggs,et al. ON THE FOUNDATIONS OF COMBINATORIAL THEORY: COMBINATORIAL GEOMETRIES , 1972 .
[3] W. T. Tutte. Introduction to the theory of matroids , 1971 .
[4] O. Ore. Contributions to the theory of finite fields , 1934 .
[5] O. Ore. On a special class of polynomials , 1933 .