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Completing partial latin squares with one nonempty row, column, and symbol
The Electronic Journal of Combinatorics, Vol.23(2), P2.23
Marshall Digital Scholar
Abstract
Let r,c,s ∈{1,2,…,n} and let PP be a partial latin square of order n in which each nonempty cell lies in row r, column c, or contains symbol s. We show that if n ∉ {3, 4, 5} and row r, column c, and symbol s can be completed in P, then a completion of P exists. As a consequence, this proves a conjecture made by Casselgren and Häggkvist. Furthermore, we show exactly when row r, column c, and symbol s can be completed.
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Details
- Title
- Completing partial latin squares with one nonempty row, column, and symbol
- Publication Details
- The Electronic Journal of Combinatorics, Vol.23(2), P2.23
- Resource Type
- Other
- Publisher
- Marshall Digital Scholar
- Copyright
- © Electronic Journal of Combinatorics
- Identifiers
- 99380182189806600
- Academic Unit
- Hal Marcus College of Science and Engineering ; Mathematics and Statistics
- Language
- English