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CIE
2007
Springer
2007
Springer
Refocusing Generalised Normalisation
Abstract. When defined with general elimination/application rules, natural deduction and λ-calculus become closer to sequent calculus. In order to get real isomorphism, normalisation has to be defined in a “multiary” variant, in which reduction rules are necessarily non-local (reason: nomalisation, like cut-elimination, acts at the head of applicative terms, but natural deduction focuses at the tail of such terms). Non-local rules are bad, for instance, for the mechanization of the system. A solution is to extend natural deduction even further to a unified calculus based on the unification of cut and general elimination. In the unified calculus, a sequent term behaves like in the sequent calculus, whereas the reduction steps of a natural deduction term are interleaved with explicit steps for bringing heads to focus. A variant of the calculus has the symmetric role of improving sequent calculus in dealing with tail-active permutative conversions.
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| Added | 07 Jun 2010 |
| Updated | 07 Jun 2010 |
| Type | Conference |
| Year | 2007 |
| Where | CIE |
| Authors | José Espírito Santo |
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