Pages that link to "Item:Q851741"
From MaRDI portal
The following pages link to The existence of Latin squares without orthogonal mates (Q851741):
Displaying 29 items.
- On the existence of unparalleled even cycle systems (Q326644) (← links)
- Remoteness of permutation codes (Q427818) (← links)
- Indivisible partitions of Latin squares (Q710803) (← links)
- Mutually orthogonal binary frequency squares (Q782946) (← links)
- Completing partial transversals of Cayley tables of Abelian groups (Q820857) (← links)
- Latin squares without orthogonal mates (Q851739) (← links)
- Latin trades in groups defined on planar triangulations (Q1043843) (← links)
- Balanced diagonals in frequency squares (Q1637145) (← links)
- The chromatic number of finite group Cayley tables (Q1732031) (← links)
- Enumerating extensions of mutually orthogonal Latin squares (Q2004974) (← links)
- Embedding partial Latin squares in Latin squares with many mutually orthogonal mates (Q2174579) (← links)
- Covers and partial transversals of Latin squares (Q2414936) (← links)
- Monogamous latin squares (Q2431245) (← links)
- Transversals of Latin squares and covering radius of sets of permutations (Q2509702) (← links)
- Enumeration of MOLS of small order (Q2792342) (← links)
- A gap for the maximum number of mutually unbiased bases (Q2838954) (← links)
- Cycle structure of autotopisms of quasigroups and Latin squares (Q2909597) (← links)
- Permanents of multidimensional matrices: Properties and applications (Q2959191) (← links)
- Bachelor latin squares with large indivisible plexes (Q3087612) (← links)
- Latin squares with restricted transversals (Q3165563) (← links)
- Latin Squares with Restricted Transversals (Q3167100) (← links)
- The theory and application of latin bitrades: A survey (Q3548561) (← links)
- Latin squares with no small odd plexes (Q3614744) (← links)
- (Q5114832) (← links)
- Almost all Steiner triple systems are almost resolvable (Q5135409) (← links)
- Orthogonality of approximate Latin squares and quasigroups (Q5236826) (← links)
- A class of Latin squares derived from finite abelian groups. (Q5496724) (← links)
- Computing random \(r\)-orthogonal Latin squares (Q6606227) (← links)
- Additivity of symmetric and subspace 2-designs (Q6632050) (← links)