论文信息 - Boolean Hierarchy of Partitions over Reducible Bases

Boolean Hierarchy of Partitions over Reducible Bases

The boolean hierarchy of partitions was introduced and studied by K. Wagner and S. Kosub, mostly over the lattice of NP -sets. We consider this hierarchy for the case of lattices having the reduction property and show that in this case the hierarchy behaves much easier and admits a deeper investigation. We completely characterize the hierarchy over some concrete important lattices, e.g. over the lattice of recursively enumerable

V. Selivanov

[1] K. Wagner,et al. The boolean hierarchy of NP-partitions , 2000, Inf. Comput..

[2] Victor L. Selivanov,et al. Fine hierarchies and Boolean terms , 1995, Journal of Symbolic Logic.

[3] Joseph B. Kruskal,et al. The Theory of Well-Quasi-Ordering: A Frequently Discovered Concept , 1972, J. Comb. Theory A.

[4] H. Rogers,et al. Theory of Recursive Functions and Effective Computability. , 1969 .

[5] Yu. L. Ershov,et al. On a hierarchy of sets. III , 1968 .

[6] J. Kruskal. Well-quasi-ordering, the Tree Theorem, and Vazsonyi’s conjecture , 1960 .