DISCRETE TOMOGRAPHY FOR SOME INFINITE FAMILIES OF WINDOWS
Let f be a function on and w be a finite subset of Discrete tomography reconstructs the function f from the data This problem is proved by Hazama to be described completely by the zero locus of a certain polynomial in n variable associated with w. The purpose of this paper is to apply his result to the zero-sum arrays when the window w has the form Furthermore, when and we obtain the zero-sum arrays having spanning arrays all of whose values belong to
discrete tomography, point sequence.