Buch, Englisch, 368 Seiten, Format (B × H): 161 mm x 240 mm, Gewicht: 716 g
Buch, Englisch, 368 Seiten, Format (B × H): 161 mm x 240 mm, Gewicht: 716 g
ISBN: 978-0-19-964526-8
Verlag: ACADEMIC
Abstractionism, which is a development of Frege's original Logicism, is a recent and much debated position in the philosophy of mathematics. This volume contains 16 original papers by leading scholars on the philosophical and mathematical aspects of Abstractionism. After an extensive editors' introduction to the topic of abstractionism, five contributions deal with the semantics and meta-ontology of Abstractionism, as well as the so-called Caesar Problem. Four papers then discuss abstractionist epistemology, focusing on the idea of implicit definitions and non-evidential warrants (entitlements) to account for a priori mathematical knowledge. This is followed by four chapters concerning the mathematics of Abstractionism, in particular the issue of impredicativity, the Bad Company objection, and the question of abstractionist set theory. Finally, the last section of the book contains three contributions that discuss Frege's application constraint within an abstractionist setting.
Autoren/Hrsg.
Fachgebiete
Weitere Infos & Material
- I. Introduction
- 1: Philip A. Ebert and Marcus Rossberg: Introduction to Abstractionism
- II. Semantics and Ontology of Abstraction
- 2: William Stirton: Caesar and Circularity
- 3: Richard G. Heck, Jr.: The Existence (and Non-existence) of Abstract Objects
- 4: Matti Eklund: Hale and Wright on the Metaontology of Neo-Fregeanism
- 5: Fraser MacBride: Neo-Fregean Ontology: Just Don't Ask Too Many Questions
- 6: Friederike Moltmann: The Number of Planets, a Number-Referring Term?
- III. Epistemology of Abstraction
- 7: Philip A. Ebert: A Framework for Implicit Definitions and the A Priori
- 8: Crispin Wright: Abstraction and Epistemic Entitlement: On the Epistemological Status of Hume's Principle
- 9: Nikolaj Jang Lee Linding Pedersen: Hume's Principle and Entitlement: On the Epistemology of the Neo-Fregean Programme
- 10: Agustín Rayo: Neo-Fregeanism Reconsidered
- IV. Mathematics of Abstraction
- 11: Roy T. Cook: Conservativeness, Cardinality, and Bad Company
- 12: Øystein Linnebo: Impredicativity in the Neo-Fregean Programme
- 13: Hannes Leitgeb: Abstraction Grounded: A Note on Abstraction and Truth
- 14: Stewart Shapiro and Gabriel Uzquiano: Ineffability within the Limits of Abstraction Alone
- V. Application Constraint
- 15: Paul McCallion: On Frege's Applications Constraint
- 16: Peter Simons: Applications of Complex Numbers and Quaternions: Historical Remarks, with a Note on Clifford Algebra
- 17: Bob Hale: Definitions of Numbers and Their Applications
