A tour problem on a toroidal board

Abstract

In this paper we study a tour problem that we came cross while studying biembeddings and Heffter arrays, see [D.S. Archdeacon, Heffter arrays and biembedding graphs on surfaces, Electron. J. Combin. 22 (2015) #P1.74]. Let A be an n× m toroidal array consisting of filled cells and empty cells. Assume that an orientation R=(r1,…,rn) of each row and C=(c1,…,cm) of each column of A is fixed. Given an initial filled cell (i1,j1) consider the list LR,C=((i1,j1),(i2,j2),…,(ik,jk), (ik+1,jk+1),…) where jk+1 is the column index of the filled cell (ik,jk+1) of the row Rik next to (ik,jk) in the orientation rik, and where ik+1 is the row index of the filled cell of the column Cjk+1 next to (ik,jk+1) in the orientation cjk+1. We propose the following "Crazy Knight's Tour Problem": Do there exist R and C such that the list LR,C covers all the filled cells of A? Here we provide a complete solution for the case with no empty cells and we obtain partial results for square arrays where the filled cells follow some specific regular patterns.