Meta Theorem for Hardness on FCP-Problem
Abstract
The Fewest Clues Problem (FCP) framework has been introduced to study the complexity of determining whether a solution to an ~problem can be uniquely identified by specifying a subset of the certificate. For a given problem P ∈ , its FCP variant is denoted by FCP-P. While several -complete problems have been shown to have 2-complete FCP variants, it remains open whether this holds for all -complete problems. In this work, we propose a meta-theorem that establishes the 2-completeness of FCP-P under the condition that the -hardness of P is proven via a polynomial-time reduction satisfying certain structural properties. Furthermore, we apply the meta-theorem to demonstrate the 2-completeness of the FCP variants of several -complete problems.
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