Some New Disjoint Golomb Rulers

Let a Golomb ruler be a set {a/sub i/} of integers so that all the differences a/sub i/-a/sub j/, i/spl ne/j, are distinct. Let H(I.J) be the smallest n such that there are I disjoint Golomb rulers each containing J elements chosen from {1,2,...n}. In 1990, Klove gave a table of bounds on H(I,J). In this correspondence we improve and extend this table with results found by computer search.

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