On linear ternary Intersection sequences and their properties

Abstract

Let D+ be the first octant of the Euclidean space and consider the integral cube grid G in D+. The intersections of each line with G form an infinite sequence of three letters which can be considered as an extension of well-known Sturmian words. A classification of such linear ternary sequences is presented and a family of examples is constructed from a notable sequence SM which could be viewed as an analogue of the Fibonacci word in the family of Sturmian words. The factor complexity and the palindromic complexity of these linear ternary sequences are also studied. The last result stated is that each ternary sequence with factor complexity n+2 is the intersection sequence of a line.