Abstract
The existence of setsnot being ≤ttP-reducible to low sets is investigated for several complexity classes such as UP, NP, the polynomial-time hierarchy, PSPACE, and EXPTIME. The p-selective sets are mainly considered as a class of low sets. Such investigations were done in many earlier works, but almost all of these have dealt withpositive reductions in order to imply the strongest consequence such as P=NP under the assumption that all sets in NP are polynomial-time reducible to low sets. Currently, there seems to be some difficulty in obtaining the same strong results undernonpositive reducibilities. The purpose of this paper is to develop a useful technique to show for many complexity classes that if each set in the class is polynomial-time reducible to a p-selective set via anonpositive reduction, then the class is already contained in P. The following results are shown in this paper.
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