Enumeration and classification of self-orthogonal partial Latin rectangles by using the polynomial method

Abstract: The current paper deals with the enumeration and classification of the set $\mathcal{SOR}{r,n}$ of self-orthogonal $r\times r$ partial Latin rectangles based on $n$ symbols. These combinatorial objects are identified with the independent sets of a Hamming graph and with the zeros of a radical zero-dimensional ideal of polynomials, whose reduced Gr\"obner basis and Hilbert series can be computed to determine explicitly the set $\mathcal{SOR}{r,n}$. In particular, the cardinality of this set is shown for $r\leq 4$ and $n\leq 9$ and several formulas on the cardinality of $\mathcal{SOR}_{r,n}$ are exposed, for $r\leq 3$. The distribution of $r\times s$ partial Latin rectangles based on $n$ symbols according to their size is also obtained, for all $r,s,n\leq 4$.