Two New Ways to Formally Prove Dandelin-Gallucci's Theorem

Self Cite

Several tools have been developed to enhance automation of theorem proving in the 2D plane. However, in 3D, only a few approaches have been studied, and to our knowledge, nothing has been done in higher dimensions. In this paper, we present a few examples of incidence geometry theorems in dimensions 3, 4, and 5. We then prove them with the help of a combinatorial prover based on matroid theory applied to geometry.

Section: Desargues's Theorem(s) In Ndmentioning

confidence: 99%

“…We only give a brief description here, the interested reader can consult David's thesis [5] (in French), or another brief introduction in [4]. The algorithm is based on a graph whose nodes are labeled by a set, a lower bound and an upper bound for the value of the rank function for this set.…”

Section: Bip a Matroid Based Incidence Provermentioning

confidence: 99%

Mechanization of Incidence Projective Geometry in Higher Dimensions, a Combinatorial Approach

Schreck

Magaud

Braun

2021

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“…Even though our framework can be used to implement other proof script transformations, this one is of special interest to us. Indeed, we recently designed a prover for projective incidence geometry [3,12] which relies on the concept of rank to carry out proofs of geometric theorems such as Desargues or Dandelin-Gallucci automatically. This prover produces a trace (a large Coq proof script containing several statements and their proofs).…”

Section: Motivationsmentioning

confidence: 99%

“…We recently developed a new way [3,12], based on ranks, to automatically prove statements in projective incidence geometry. Our approach works well but produces proof scripts which are very large and often feature several auxiliary lemmas.…”

Section: Refactoring Proof Scripts Automatically Generated By Our Pro...mentioning

confidence: 99%

Towards Automatic Transformations of Coq Proof Scripts

Magaud

2024

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Proof assistants like Coq are increasingly popular to help mathematicians carry out proofs of the results they conjecture. However, formal proofs remain highly technical and are especially difficult to reuse. In this paper, we present a framework to carry out a posteriori script transformations. These transformations are meant to be applied as an automated post-processing step, once the proof has been completed. As an example, we present a transformation which takes an arbitrary large proof script and produces an equivalent single-line proof script, which can be executed by Coq in one single step. Other applications, such as fully expanding a proof script (for debugging purposes), removing all named hypotheses, etc. could be developed within this framework. We apply our tool to various Coq proof scripts, including some from the GeoCoq library.

“…The above two approaches are shown to be equivalent [5] and the combinatorial one can be successfully used to automatically prove some emblematic theorems of 3D projective incidence geometry [4]. Among them we can cite Desargues' theorem and Dandelin-Gallucci's theorem [6]. The automated prover, named Bip for matroid Based Incidence Prover, is designed to prove equality between ranks of various sets of points.…”

Section: The Automated Provermentioning

confidence: 99%

Integrating an Automated Prover for Projective Geometry as a New Tactic in the Coq Proof Assistant

Magaud

2021

Self Cite

Recently, we developed an automated theorem prover for projective incidence geometry. This prover, based on a combinatorial approach using matroids, proceeds by saturation using the matroid rules. It is designed as an independent tool, implemented in C, which takes a geometric configuration as input and produces as output some Coq proof scripts: the statement of the expected theorem, a proof script proving the theorem and possibly some auxiliary lemmas. In this document, we show how to embed such an external tool as a plugin in Coq so that it can be used as a simple tactic.