Fibonacci arrays and their two-dimensional repetitions

Notions related to repetitive substructures in two-dimensional arrays are introduced and studied in an attempt to parallel some of the analogous developments already known for strings. In particular, sequences of \u201cFibonacci arrays\u201d are defined, capable of exhibiting extremal properties in terms of certain repetitive subpatterns called \u201ctandems\u201d. Two types of tandems are considered. For one type, it is shown that the number of occurrences in an m 7n Fibonacci array attains the general upper bound of O(m^2nlogn)