Asymptotic density and the coarse computability bound

Abstract

For r ∈ [0,1] we say that a set A ⊂eq ω is coarsely computable at density r if there is a computable set C such that \n : C(n) = A(n)\ has lower density at least r. Let γ(A) = \r : A is coarsely computable at density r\. We study the interactions of these concepts with Turing reducibility. For example, we show that if r ∈ (0,1] there are sets A0, A1 such that γ(A0) = γ(A1) = r where A0 is coarsely computable at density r while A1 is not coarsely computable at density r. We show that a real r ∈ [0,1] is equal to γ(A) for some c.e.\ set A if and only if r is left-03. A surprising result is that if G is a 02 1-generic set, and A ≤T G with γ(A) = 1, then A is coarsely computable at density 1.