On SAT information content, its polynomial-time solvability and fixed code algorithms

The amount of information in satisfiability problem (SAT) is considered. SAT can be polynomial-time solvable when the solving algorithm holds an exponential amount of information. It is also established that SAT Kolmogorov complexity is constant. It is argued that the amount of information in SAT grows at least exponentially with the size of the input instance. The amount of information in SAT is compared with the amount of information in the fixed code algorithms and generated over runtime.

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SAT是研究者关注命题可满足性问题的理论与应用的第一次年度会议。除了简单命题可满足性外，它还包括布尔优化（如MaxSAT和伪布尔（PB）约束）、量化布尔公式（QBF）、可满足性模理论（SMT）和约束规划（CP），用于与布尔级推理有明确联系的问题。官网链接：http://sat2019.tecnico.ulisboa.pt/

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