Kooperativer Bibliotheksverbund

UID:

Umfang: 1 online resource (384p.)

ISBN: 9781501502620

Serie: Ontos Mathematical Logic ; 6

Inhalt: A proof is a successful demonstration that a conclusion necessarily follows by logical reasoning from axioms which are considered evident for the given context and agreed upon by the community. It is this concept that sets mathematics apart from other disciplines and distinguishes it as the prototype of a deductive science. Proofs thus are utterly relevant for research, teaching and communication in mathematics and of particular interest for the philosophy of mathematics. In computer science, moreover, proofs have proved to be a rich source for already certified algorithms. This book provides the reader with a collection of articles covering relevant current research topics circled around the concept 'proof'. It tries to give due consideration to the depth and breadth of the subject by discussing its philosophical and methodological aspects, addressing foundational issues induced by Hilbert's Programme and the benefits of the arising formal notions of proof, without neglecting reasoning in natural language proofs and applications in computer science such as program extraction.

Anmerkung: Frontmatter -- , Preface -- , Contents -- , Introduction -- , Herbrand Confluence for First-Order Proofs with Π -- , Proof-Oriented Categorical Semantics -- , Logic for Gray-code Computation -- , The Continuum Hypothesis Implies Excluded Middle -- , Theories of Proof-Theoretic Strength Ψ (Γ -- , Some Remarks about Normal Rings -- , On Sets of Premises -- , Non-Deterministic Inductive Definitions and Fullness -- , Cyclic Proofs for Linear Temporal Logic -- , Craig Interpolation via Hypersequents -- , A General View on Normal Form Theorems for Łukasiewicz Logic with Product -- , Relating Quotient Completions via Categorical Logic -- , Some Historical, Philosophical and Methodological Remarks on Proof in Mathematics -- , Cut Elimination in Sequent Calculi with Implicit Contraction, with a Conjecture on the Origin of Gentzen’s Altitude Line Construction -- , Hilbert’s Programme and Ordinal Analysis -- , Aristotle’s Deductive Logic: a Proof-Theoretical Study -- , Remarks on Barr’s Theorem: Proofs in Geometric Theories , In English.

Weitere Ausg.: ISBN 978-1-5015-1080-9

Sprache: Englisch

DOI: 10.1515/9781501502620

URL: https://doi.org/10.1515/9781501502620

UID:

Umfang: 1 online resource (384 pages)

ISBN: 1-5015-0264-6 , 1-5015-0262-X

Serie: Ontos Mathematical Logic, Volume 6

Inhalt: A proof is a successful demonstration that a conclusion necessarily follows by logical reasoning from axioms which are considered evident for the given context and agreed upon by the community. It is this concept that sets mathematics apart from other disciplines and distinguishes it as the prototype of a deductive science. Proofs thus are utterly relevant for research, teaching and communication in mathematics and of particular interest for the philosophy of mathematics. In computer science, moreover, proofs have proved to be a rich source for already certified algorithms. This book provides the reader with a collection of articles covering relevant current research topics circled around the concept 'proof'. It tries to give due consideration to the depth and breadth of the subject by discussing its philosophical and methodological aspects, addressing foundational issues induced by Hilbert's Programme and the benefits of the arising formal notions of proof, without neglecting reasoning in natural language proofs and applications in computer science such as program extraction.

Anmerkung: Description based upon print version of record. , Introduction -- Herbrand Confluence for First-Order Proofs with Π2-Cuts -- Proof-Oriented Categorical Semantics -- Logic for Gray-code Computation -- The Continuum Hypothesis Implies Excluded Middle -- Theories of Proof-Theoretic Strength Ψ (ΓΩ +1) -- Some Remarks about Normal Rings -- On Sets of Premises -- Non-Deterministic Inductive Definitions and Fullness -- Cyclic Proofs for Linear Temporal Logic -- Craig Interpolation via Hypersequents -- A General View on Normal Form Theorems for Łukasiewicz Logic with Product -- Relating Quotient Completions via Categorical Logic -- Some Historical, Philosophical and Methodological Remarks on Proof in Mathematics -- Cut Elimination in Sequent Calculi with Implicit Contraction, with a Conjecture on the Origin of Gentzen’s Altitude Line Construction -- Hilbert’s Programme and Ordinal Analysis -- Aristotle’s Deductive Logic: a Proof-Theoretical Study -- Remarks on Barr’s Theorem: Proofs in Geometric Theories , Issued also in print.

Sprache: Englisch

DOI: 10.1515/9781501502620

UID:

Umfang: 1 Online-Ressource (X, 374 Seiten)

ISBN: 9781501502620 , 9781501502644

Serie: Ontos Mathematical Logic 6

Inhalt: A proof is a successful demonstration that a conclusion necessarily follows by logical reasoning from axioms which are considered evident for the given context and agreed upon by the community. It is this concept that sets mathematics apart from other disciplines and distinguishes it as the prototype of a deductive science. Proofs thus are utterly relevant for research, teaching and communication in mathematics and of particular interest for the philosophy of mathematics. In computer science, moreover, proofs have proved to be a rich source for already certified algorithms. This book provides the reader with a collection of articles covering relevant current research topics circled around the concept 'proof'. It tries to give due consideration to the depth and breadth of the subject by discussing its philosophical and methodological aspects, addressing foundational issues induced by Hilbert's Programme and the benefits of the arising formal notions of proof, without neglecting reasoning in natural language proofs and applications in computer science such as program extraction.

Anmerkung: Beiträge des Humboldt-Kollegs "Proof", Bern, 9.-13. September 2013 , Frontmatter -- -- Preface -- -- Contents -- -- Introduction -- -- Herbrand Confluence for First-Order Proofs with Π -- -- Proof-Oriented Categorical Semantics -- -- Logic for Gray-code Computation -- -- The Continuum Hypothesis Implies Excluded Middle -- -- Theories of Proof-Theoretic Strength Ψ (Γ -- -- Some Remarks about Normal Rings -- -- On Sets of Premises -- -- Non-Deterministic Inductive Definitions and Fullness -- -- Cyclic Proofs for Linear Temporal Logic -- -- Craig Interpolation via Hypersequents -- -- A General View on Normal Form Theorems for Łukasiewicz Logic with Product -- -- Relating Quotient Completions via Categorical Logic -- -- Some Historical, Philosophical and Methodological Remarks on Proof in Mathematics -- -- Cut Elimination in Sequent Calculi with Implicit Contraction, with a Conjecture on the Origin of Gentzen’s Altitude Line Construction -- -- Hilbert’s Programme and Ordinal Analysis -- -- Aristotle’s Deductive Logic: a Proof-Theoretical Study -- -- Remarks on Barr’s Theorem: Proofs in Geometric Theories , Mode of access: Internet via World Wide Web. , In English

Weitere Ausg.: ISBN 9781501510809

Weitere Ausg.: Erscheint auch als ISBN 978-1-5015-1080-9

Sprache: Englisch

Schlagwort(e): Konferenzschrift

DOI: 10.1515/9781501502620

URL: Volltext

URL: Volltext  (lizenzpflichtig)

URL: lizenzpflichtig

URL: Cover

URL: Cover

URL: Inhaltstext

URL: Cover

UID:

Umfang: 1 online resource (384 pages) : , illustrations, tables.

ISBN: 9781501502620 (e-book)

Serie: Ontos Mathematical Logic, Volume 6

Weitere Ausg.: Print version: Concepts of proof in mathematics, philosophy, and computer science. Berlin, [Germany] ; Boston, [Massachusetts] : De Gruyter, c2016 ISSN 2198-2341 ISBN 9781501510809

Sprache: Englisch

Schlagwort(e): Electronic books.

URL: Click to View