Additional properties of parity based bit-counting complexity classes and hierarchies

Abstract

We study some properties of the parity based bit-counting complexity classes B|0| P and B|1| P. We first show that both of these complexity classes are closed under complement and prove that B|1|P⊂eq B|0|P. We then prove that US⊂eq P B|1|P and US⊂eq P B|0|P. We then study the characteristic functions of the parity based bit-counting complexity classes, where the characteristic function of B|1| P outputs the Prouhet-Thue-Morse sequence. We then prove that a finite contiguous block of these sequences yield the parity of the starting number and then prove that P⊂eq P B|0|P and P⊂eq P B|1|P. We then use the parity based bit-counting complexity classes to define various hierarchies and show that they all contain PH and are contained in CH.

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