Logic and Scientific Methods: Volume One of the Tenth International Congress of Logic, Methodology and Philosophy of Science, Florence, August 1995Maria Luisa Dalla Chiara, Kees Doets, Daniele Mundici, Johan van Benthem This is the first of two volumes comprising the papers submitted for publication by the invited participants to the Tenth International Congress of Logic, Methodology and Philosophy of Science, held in Florence, August 1995. The Congress was held under the auspices of the International Union of History and Philosophy of Science, Division of Logic, Methodology and Philosophy of Science. The invited lectures published in the two volumes demonstrate much of what goes on in the fields of the Congress and give the state of the art of current research. The two volumes cover the traditional subdisciplines of mathematical logic and philosophical logic, as well as their interfaces with computer science, linguistics and philosophy. Philosophy of science is broadly represented, too, including general issues of natural sciences, social sciences and humanities. The papers in Volume One are concerned with logic, mathematical logic, the philosophy of logic and mathematics, and computer science. |
Contents
659 | 69 |
127 | 126 |
K T KELLY O SCHULTE Churchs thesis and Humes problem | 159 |
Y N MOSCHOVAKIS The logic of functional recursion | 178 |
R SOARE Computability and enumerability | 221 |
Philosophical logic | 248 |
restraint | 313 |
PARSONS What can we do in principle? 335 | 355 |
faces | 377 |
and reductionism | 399 |
thinking and coherence | 413 |
P HÁJEK Logic in Central and Eastern Europe | 449 |
Balkan | 485 |
philosophical | 511 |
Table of contents Vol II | 531 |
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Common terms and phrases
Abelian algebra application argument arithmetic axioms basic belief revision Boolean valuation calculus classical cognitive complete Computer Science condition consequence relation construction corresponding cut elimination deduction defined definition denote elements empirical encoding equations equivalent example finite model theory finite structures first-order logic formal formula free lattices Gentzen given Gödel graph hypothesis IMLL2 implies induction inference interpretation intuitionistic logic isomorphism Kleene language Lemma linear logic lower bounds Math Mathematical Logic method model theory natural numbers notion operations Philosophy of Science poset predicate problem procedure proof theory properties propositional provable prove query R-lattice R-poset recursion theory recursive functions rules satisfies second-order semantics sentences sequents set theory strategy subset substructural logics Symbolic Logic Theorem true truth Turing machine Turing's University variables ΕΙ