Download PDFOpen PDF in browserOn Proof Schemata and Primitive Recursive Arithmetic14 pages•Published: May 26, 2024AbstractInductive proofs can be represented as a proof schemata, i.e. as a parameterized se- quence of proofs defined in a primitive recursive way. Applications of proof schemata can be found in the area of automated proof analysis where the schemata admit (schematic) cut-elimination and the construction of Herbrand systems. This work focuses on the ex- pressivity of proof schemata as defined in [10]. We show that proof schemata can simulate primitive recursive arithmetic as defined in [12]. Future research will focus on an extension of the simulation to primitive recursive arithmetic using quantification as defined in [7]. The translation of proofs in arithmetic to proof schemata can be considered as a crucial step in the analysis of inductive proofs.Keyphrases: Inductive proofs, primitive recursive arithmetic, Proof Schema In: Nikolaj Bjorner, Marijn Heule and Andrei Voronkov (editors). LPAR 2024 Complementary Volume, vol 18, pages 117--130
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