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ICFP
2003
ACM
2003
ACM
Mechanising Hankin and Barendregt using the Gordon-Melham axioms
I describe the mechanisation in HOL of some basic -calculus theory, using the axioms proposed by Gordon and Melham [4]. Using these as a foundation, I mechanised the proofs from Chapters 2 and 3 of Hankin [5] (equational theory and reduction theory), followed by most of Chapter 11 of Barendregt [2] (residuals, finiteness of developments, and the standardisation theorem). I discuss the ease of use of the Gordon-Melham axioms, as well as the mechanical support I implemented to make some basic tasks more straightforward. Categories and Subject Descriptors F.4.1 [Mathematical Logic]: Lambda calculus and related systems; I.2.3 [Deduction and Theorem Proving]: Deduction General Terms Theory, Verification Keywords ive theorem-proving, higher order abstract syntax
Real-time TrafficBasic -calculus Theory | Equational Theory | General Terms Theory | ICFP 2003 | Programming Languages |
| Added | 13 Dec 2009 |
| Updated | 13 Dec 2009 |
| Type | Conference |
| Year | 2003 |
| Where | ICFP |
| Authors | Michael Norrish |
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