ON THE FALSITY OF EULER'S CONJECTURE ABOUT THE NON-EXISTENCE OF TWO ORTHOGONAL LATIN SQUARES OF ORDER 4t + 2
From MaRDI portal
Publication:3254324
DOI10.1073/pnas.45.5.734zbMath0085.00902OpenAlexW1998599437WikidataQ36429193 ScholiaQ36429193MaRDI QIDQ3254324
Publication date: 1959
Published in: Proceedings of the National Academy of Sciences (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1073/pnas.45.5.734
Related Items
Unnamed Item, A candidate for the ``Next Fermat Problem, An inner orthogonality of Hadamard matrices, On elementary, odd, semimagic and other classes of antilattices, The solution of a famous two-centuries-old problem the Leonhard Euler-Latin square conjecture, Quiz 1: What color was George Washington's white horse? The mathematical version, Pairs of MOLS of order ten satisfying non-trivial relations, Some comments on Latin squares and on Graeco-Latin squares, illustrated with postage stamps and old playing cards, Group divisible designs in MOLS of order ten, Gli spazi grafici, Orientable Hamilton Cycle Embeddings of Complete Tripartite Graphs I: Latin Square Constructions, Sets of mutually orthogonal Latin squares with ``like subsquares, Remarks on Sade's disproof of the Euler conjecture with an application to Latin squares orthogonal to their transpose, On the spectra of certain types of latin square, Euler and combinatorial calculus, Unnamed Item, Generalized Latin squares on the torus, Officers, playing cards, and sheep. On the history of Eulerian squares and of the design of experiments, Unbalanced Hadamard matrices and finite projective planes of even order, On the Construction of Sets of Mutually Orthogonal Latin Squares and the Falsity of a Conjecture of Euler, Concerning the number of mutually orthogonal latin squares, An explicit construction of orthogonal Latin squares of even order \(n\), \(n\geqq 10\), Embedding Orthogonal Partial Latin Squares
