March 3, 2026Open Access

Structural and Semantic Irreducibility of Random 3-SAT: An Unconditional Omega(n) Lower Bound.

Key Points

Unsatisfiability in random 3-SAT is shown to be a global property that is not visible to bounded-local verifiers, highlighting the challenges in resolving these instances.
The proven Semantic Depth Invariant (SDI) yields a lower bound of Omega(n), emphasizing the complexity of these satisfiability problems.
Introducing the Assignment-DAG Partition Complexity reveals that partial assignments can create exponentially many subproblems in random 3-SAT.
This work illustrates that the SDI can illustrate even classical exponential lower bounds, establishing deeper linkages within computational theory.

Abstract

Random 3-SAT formulas above the satisfiability threshold are a canonical source of hard instances for both SAT algorithms and proof systems. In this work, we propose a unified, instance-level explanation for this hardness based on two unconditional properties: structural explosion and semantic irreducibility. We introduce the Assignment-DAG Partition Complexity (ADPC) and prove that the space of partial assignments fragments into exponentially many locally distinguishable subproblems. We then introduce the Semantic Depth Invariant (SDI) and prove that SDI(F)=Omega(n), establishing that unsatisfiability is a global property invisible to bounded-local verifiers. Finally, we demonstrate that SDI strictly subsumes Resolution width, recovering classical exponential lower bounds as a direct corollary.

Structural and Semantic Irreducibility of Random 3-SAT: An Unconditional Omega(n) Lower Bound.

Key Points

Abstract

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