Charles Laywine Subsquares in Orthogonal Latin Squares as Subspaces in Affine Geometries: A Generalization of an Equivalence of Bose. [Citation Graph (0, 0)][DBLP] Des. Codes Cryptography, 1993, v:3, n:1, pp:21-28 [Journal]

Charles Laywine A derivation of an affine plane of order 4 from a triangle-free 3-colored K_{16}. [Citation Graph (0, 0)][DBLP] Discrete Mathematics, 2001, v:235, n:1-3, pp:165-171 [Journal]

Charles Laywine, Gary L. Mullen Generalizations of Bose's Equivalence between Complete Sets of Mutually Orthogonal Latin Squares and Affine Planes. [Citation Graph (0, 0)][DBLP] J. Comb. Theory, Ser. A, 1992, v:61, n:1, pp:13-35 [Journal]

Charles Laywine An Expression for the Number of Equivalence Classes of Latin Squares under Row and Column Permutations. [Citation Graph (0, 0)][DBLP] J. Comb. Theory, Ser. A, 1981, v:30, n:3, pp:317-320 [Journal]

Charles Laywine A counter-example to a conjecture relating complete sets of frequency squares and affine geometries. [Citation Graph (0, 0)][DBLP] Discrete Mathematics, 1993, v:122, n:1-3, pp:255-262 [Journal]

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