Bibliographic Information: Atserias, A., & Tzameret, I. (2024). Feasibly Constructive Proof of Schwartz-Zippel Lemma and the Complexity of Finding Hitting Sets. arXiv preprint arXiv:2411.07966.
Research Objective: This paper aims to provide a feasibly constructive proof of the Schwartz-Zippel Lemma within the framework of bounded arithmetic (specifically S12) and explore its implications for the existence and complexity of finding hitting sets for polynomial identity testing (PIT).
Methodology: The authors develop a new coding-based proof of the Schwartz-Zippel Lemma that is more constructive than previous proofs. They formalize this proof within the theory of bounded arithmetic S12 and its extension with the Dual Weak Pigeonhole Principle (dWPHP). They then utilize this formalization to analyze the existence and complexity of finding hitting sets, drawing connections to the Range Avoidance Problem.
Key Findings:
Main Conclusions: The research provides a deeper understanding of the Schwartz-Zippel Lemma and its connection to hitting sets and PIT. By formalizing the proof within bounded arithmetic, the authors offer insights into the complexity of these concepts. The equivalence between hitting sets and dWPHP, and the completeness result for APEPP, further solidify the importance of this work in complexity theory.
Significance: This paper makes significant contributions to theoretical computer science, particularly in the areas of computational complexity and proof complexity. The new proof of the Schwartz-Zippel Lemma and its formalization in bounded arithmetic enhance our understanding of this fundamental lemma. The connection to hitting sets and range avoidance problems opens up new avenues for research in derandomization and circuit lower bounds.
Limitations and Future Research: The paper focuses on polynomials with integer coefficients. Exploring similar results for polynomials over other fields could be a direction for future research. Further investigation into the connections between hitting sets, range avoidance problems, and other complexity classes could yield fruitful results.
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by Albert Atser... о arxiv.org 11-13-2024
https://arxiv.org/pdf/2411.07966.pdfГлибші Запити