Completing partial latin squares with 2 filled rows and 3 filled columns

Göransson, Herman

January 2020

The set PLS(a, b; n) is the set of all partial latin squares of order n with a completed rows, b completed columns and all other cells empty. We identify reductions of partial latin squares in PLS(2, 3; n) by using permutations described by filled rows and intersections of filled rows and columns. We find that all partial latin squares in PLS(2, 3;n), where n is sufficiently large, can be completed if such a reduction can be completed. We also show that all partial latin squares in PLS(2, 3; n) where the intersection of filled rows and columns form a latin rectangle have completions for n ≥ 8.

Graph theory

Partial latin squares

Discrete Mathematics

Diskret matematik

Completing partial Latin squares with one filled row, column and symbol

Casselgren, Carl Johan, Häggkvist, Roland

January 2013

Let P be an n×n partial Latin square every non-empty cell of which lies in a fixed row r, a fixed column c or contains a fixed symbol s. Assume further that s is the symbol of cell (r,c) in P. We prove that P is completable to a Latin square if n≥8 and n is divisible by 4, or n≤7 and n∉{3,4,5}. Moreover, we present a polynomial algorithm for the completion of such a partial Latin square.

Latin square

Partial Latin square

Completing partial Latin squares

MATHEMATICS

MATEMATIK