论文信息 - Counting Classes are at Least as Hard as the Polynomial-Time Hierarchy

Counting Classes are at Least as Hard as the Polynomial-Time Hierarchy

In this paper, it is shown that many natural counting classes, such as PP, $C_ = P$, and ${\text{MOD}}_k {\text{P}}$, are at least as computationally hard as PH (the polynomial-time hierarchy) in the following sense: for each ${\bf K}$ of the counting classes above, every set in ${\bf K}$(PH) is polynomial-time randomized many-one reducible to a set in ${\bf K}$ with two-sided exponentially small error probability. As a consequence of the result, it is seen that all the counting classes above are computationally harder than PH unless PH collapses to a finite level. Some other consequences are also shown.

Mitsunori Ogihara | Seinosuke Toda

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