论文信息 - Lowness Properties of Reals and Hyper-Immunity

Lowness Properties of Reals and Hyper-Immunity

Abstract Ambos-Spies and Kucera [1, Problem 4.5] asked if there is a non-computable set A which is low for the computably random reals. We show that no such A is of hyper-immune degree. Thus, each g ≤T A is dominated by a computable function. Ambos-Spies and Kucera [1, problem 4.8] also asked if every S-low set is S0-low. We give a partial solution to this problem, showing that no S-low set is of hyper-immune degree.

Benjamín R. C. Bedregal | André Nies

[1] Claus-Peter Schnorr,et al. A unified approach to the definition of random sequences , 1971, Mathematical systems theory.

[2] J. Doob. What is a Martingale , 1971 .

[3] A. Nies. Lowness Properties of Reals and Randomness , 2002 .

[4] A. Church. On the concept of a random sequence , 1940 .

[5] S. Barry Cooper,et al. Local Degree Theory , 1999, Handbook of Computability Theory.

[6] Per Martin-Löf,et al. The Definition of Random Sequences , 1966, Inf. Control..

[7] Sebastiaan A. Terwijn. Computability and measure , 1998 .

[8] Klaus Ambos-Spies,et al. Randomness in Computability Theory , 2000 .

[9] Donald A. Martin,et al. The Degrees of Hyperimmune Sets , 1968 .

[10] Sebastiaan Terwijn,et al. Computational randomness and lowness* , 2001, Journal of Symbolic Logic.