Kyle Pula
Published 2010-08-01Version 1
A $k$-plex of a latin square is a collection of cells representing each row, column, and symbol precisely $k$ times. The classic case of $k=1$ is more commonly known as a transversal. We introduce the concept of a $k$-weight, an integral weight function on the cells of a latin square whose row, column, and symbol sums are all $k$. We then show that several non-existence results about $k$-plexes can been seen as more general facts about $k$-weights and that the weight-analogues of several well-known existence conjectures for plexes actually hold for $k$-weights.
A generalization of weight polynomials to matroids
Some $q$-congruences for homogeneous and quasi-homogeneous multiple $q$-harmonic sums
A generalization of Aztec diamond theorem, part I
![QR code for arXiv:1008.0176 [math.CO]](http://oss.arxitics.com/images/favicon.svg)