Terry S. Griggs, Thomas A. McCourt, Jozef Siran
Published 2019-11-13Version 1
It is proved that for any prescribed orientation of the triples of either a Steiner triple system or a Latin square of odd order, there exists an embedding in an orientable surface with the triples forming triangular faces and one extra large face.
Comments: arXiv admin note: text overlap with arXiv:1904.02919
Cycle switching in Steiner triple systems of order 19
Latin squares and their defining sets
Latin Squares whose transversals share many entries
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