Modular Constructions of g-Golomb Rulers
Abstract
A set \(\mathcal{G}\) of integers is a \(g\)-Golomb ruler if each positive difference appears at most \(g\) times between any 2 elements of the set, and \(G(g,n)\) denotes the minimum diameter of such a ruler with \(n\) marks.
We prove a general lemma for passing from certain modular constructions to ordinary \(g\)-Golomb rulers.
The key point is that, in a modular \(g\)-Golomb ruler, no cyclic gap length can occur more than \(g\) times.
This gives a larger guaranteed cut than the previous average gap argument.
We apply this lemma to cyclic relative difference sets, Singer sets, Ruzsa--Spence rulers, and Paley quadratic residues to provide many competing constructions for \(g\)-Golomb Rulers.
A computation on the grid \(1\le g\le500\), \(n=g+b\), \(2\le b\le500\), compares the four resulting construction families.
이 뉴스, 어떠셨어요?
한 번의 탭으로 반응을 남겨요 · 로그인 불필요