We characterize, in terms of determinacy, the existence of 0 ♯♯ as well as the existence of each of the following: 0 ♯♯♯ , 0 ♯♯♯♯ ,0 ♯♯♯♯♯ , .... For k ∈ ω, we define two classes of sets, (k * Σ 0 1 ) * and (k * Σ 0 1 ) * + , which lie strictly between $\bigcup_{\beta and Δ(ω 2 -Π 1 1 ). We also define 0 1♯ as 0 ♯ and in general, 0 (...) (k + 1)♯ as (0 k♯) ♯ . We then show that the existence of 0 (k + 1)♯ is equivalent to the determinacy of ((k + 1) * Σ 0 1 ) * as well as the determinacy of (k * Σ 0 1 ) * +. (shrink)

We characterize, in terms of determinacy, the existence of the least inner model of "every object of type k has a sharp." For k ∈ ω, we define two classes of sets, (Π 0 k ) * and (Π 0 k ) * + , which lie strictly between $\bigcup_{\beta and Δ(ω 2 -Π 1 1 ). Let ♯ k be the (partial) sharp function on objects of type k. We show that the determinancy of (Π 0 k ) * (...) follows from $L \lbrack\ sharp_k \rbrack \models "\text{every object of type} k \text{has a sharp},$ and we show that the existence of indiscernibles for L[ ♯ k ] is equivalent to a slightly stronger determinacy hypothesis, the determinacy of (Π 0 k ) * +. (shrink)

We characterize in terms of determinacy, the existence of the least inner model of “every real has a sharp”. We let #1 be the sharp function on the reals and define two classes of sets, * and *+, which lie strictly between β<ω2- and Δ. We show that the determinacy of * follows from L[#1] “every reak has a sharp”; and we show that the existence of indiscernibles for L[#1] is equivalent to a slightly stronger determinacy hypothesis, the determinacy of (...) *+. (shrink)

DuBose, D.A., Determinacy and the sharp function on the reals, Annals of Pure and Applied Logic 55 237–263. We characterize in terms of determinacy, the existence of the least inner model of “every real has a sharp”. We let 1 be the sharp function on the reals and define two classes of sets, * and *+, which lie strictly between β<ω2 an d Δ. We show that the determinacy of * follows from L[#1] xvR; “every real has a sharp”; and (...) we show that the existence of indiscernibles for L[#1] is equivalent to a slightly determinacy hypothesis, the determinacy of *+. (shrink)