English

Total Search Problems in $\mathsf{ZPP}$

Computational Complexity 2025-12-02 v1

Abstract

We initiate a systematic study of TFZPP{\sf TFZPP}, the class of total NP{\sf NP} search problems solvable by polynomial time randomized algorithms. TFZPP{\sf TFZPP} contains a variety of important search problems such as Bertrand-Chebyshev\text{Bertrand-Chebyshev} (finding a prime between NN and 2N2N), refuter problems for many circuit lower bounds, and Lossy-Code\text{Lossy-Code}. The Lossy-Code\text{Lossy-Code} problem has found prominence due to its fundamental connections to derandomization, catalytic computing, and the metamathematics of complexity theory, among other areas. While TFZPP{\sf TFZPP} collapses to FP{\sf FP} under standard derandomization assumptions in the white-box setting, we are able to separate TFZPP{\sf TFZPP} from the major TFNP{\sf TFNP} subclasses in the black-box setting. In fact, we are able to separate it from every uniform TFNP{\sf TFNP} class assuming that NP{\sf NP} is not in quasi-polynomial time. To do so, we extend the connection between proof complexity and black-box TFNP{\sf TFNP} to randomized proof systems and randomized reductions. Next, we turn to developing a taxonomy of TFZPP{\sf TFZPP} problems. We highlight a problem called Nephew\text{Nephew}, originating from an infinity axiom in set theory. We show that Nephew\text{Nephew} is in PWPPTFZPP\mathsf{PWPP}\cap \mathsf{TFZPP} and conjecture that it is not reducible to Lossy-Code\text{Lossy-Code}. Intriguingly, except for some artificial examples, most other black-box TFZPP{\sf TFZPP} problems that we are aware of reduce to Lossy-Code\text{Lossy-Code}.

Keywords

Cite

@article{arxiv.2512.01138,
  title  = {Total Search Problems in $\mathsf{ZPP}$},
  author = {Noah Fleming and Stefan Grosser and Siddhartha Jain and Jiawei Li and Hanlin Ren and Morgan Shirley and Weiqiang Yuan},
  journal= {arXiv preprint arXiv:2512.01138},
  year   = {2025}
}

Comments

ITCS 2026. Abstract shortened due to constraints

R2 v1 2026-07-01T08:02:46.667Z