The distribution of the generalized greatest common divisor and visibility of lattice points

Abstract

For a fixed b∈ N=\1,2,3,…\, Goins et al. Harris defined the concept of b-visibility for a lattice point (r,s) in L=N× N which states that (r,s) is b-visible from the origin if it lies on the graph of f(x)=axb, for some positive a∈ Q, and no other lattice point in L lies on this graph between (0,0) and (r,s). Furthermore, to study the density of b-visible points in L Goins et al. defined a generalization of greatest common divisor, denoted by b, and proved that the proportion of b-visible lattice points in L is given by 1/ζ(b+1), where ζ(s) is the Riemann zeta function. In this paper we study the mean values of arithmetic functions :L C defined using b and recover the main result of Harris as a consequence of the more general results of this paper. We also investigate a generalization of a result in Harris that asserts that there are arbitrarily large rectangular arrangements of b-visible points in the lattice L for a fixed b, more specifically, we give necessary and sufficient conditions for an arbitrary rectangular arrangement containing b-visible and b-invisible points to be realizable in the lattice L. Our result is inspired by the work of Herzog and Stewart Herzog who proved this in the case b=1.