论文信息 - Critical sets in nets and latin squares

Critical sets in nets and latin squares

Abstract The concept of a critical set in a latin square is extended to the more general setting of nets. A lower bound is given for the size of a critical set in a group-based net. In the case of a general net of degree 3 and order n ( n ⩾5), it is shown that the size of a critical set is bounded below by n +1. In the proof of this result, a special embedding of a latin square of order m into a suitable latin square of order n is established for every n >2 m .

T. P. McDonough | V. C. Mavron | J. A. Cooper

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