Automorphisms ofη-like computable linear orderings and Kierstead's conjecture

Abstract: Abstract. We develop an approach to the longstanding conjecture of H.A. Kierstead concerning the character of strongly nontrivial automorphisms of computable linear orderings. Our main result is that for any η-like computable linear ordering B, such that B has no interval of order type η, and such that the order type of B is determined by a 0 ′ -limitwise monotonic maximal block function, there exists computable L ∼ = B such that L has no nontrivial Π 0 1 automorphism.

“…This is the fact that computable approximations to 0 -limitwise monotonic functions have similar properties to those of Π 0 2 functions, and that this facilitates the use of strategy tree constructions to build η-like linear orderings whose order type τ is determined by a 0 -limitwise monotonic maximal block function. The latter is exploited in [HLC14] to provide a generalisation-to the class of all such order types τ -of Kierstead's result [Kie87] that there exists computable L of order type 2 · η such that L has no nontrivial Π 0 1 automorphism. Section 5, which concludes the paper, is a preliminary investigation of the question of finding, for given n ≥ 1, an η-like computable linear ordering A n which is ∆ 0 n+1 categorical but not ∆ 0 n categorical.…”

On limitwise monotonicity and maximal block functions

“…This is the fact that computable approximations to 0 -limitwise monotonic functions have similar properties to those of Π 0 2 functions, and that this facilitates the use of strategy tree constructions to build η-like linear orderings whose order type τ is determined by a 0 -limitwise monotonic maximal block function. The latter is exploited in [HLC14] to provide a generalisation-to the class of all such order types τ -of Kierstead's result [Kie87] that there exists computable L of order type 2 · η such that L has no nontrivial Π 0 1 automorphism. Section 5, which concludes the paper, is a preliminary investigation of the question of finding, for given n ≥ 1, an η-like computable linear ordering A n which is ∆ 0 n+1 categorical but not ∆ 0 n categorical.…”

On limitwise monotonicity and maximal block functions

Computable Linear Orders and Limitwise Monotonic Functions

The Kierstead's Conjecture and limitwise monotonic functions