Husserl Or Frege?: Meaning, Objectivity, and MathematicsOpen Court Publishing, 2000 - 315 pages Most areas of philosopher Edmund Husserl’s thought have been explored, but his views on logic, mathematics, and semantics have been largely ignored. These essays offer an alternative to discussions of the philosophy of contemporary mathematics. The book covers areas of disagreement between Husserl and Gottlob Frege, the father of analytical philosophy, and explores new perspectives seen in their work. |
Table des matières
Husserl and Frege on Substitutivity | 1 |
Remarks on Sense and Reference in Frege and Husserl | 23 |
Identity Statements in the Semantics of Sense and Reference | 41 |
On Freges Two Notions of Sense | 53 |
The Varied Sorrows of Logical Abstraction | 67 |
Freges Attack on Husserl and Cantor | 95 |
Abstraction and Idealization in Georg Cantor and | 109 |
Husserls Mannigfaltigkeitslehre | 161 |
Husserl and Hilbert on Completeness | 179 |
That is the | 199 |
Husserls Epistemology of Mathematics and the | 221 |
Interderivability of Seemingly Unrelated Mathematical | 241 |
On AntiPlatonism and Its Dogmas | 263 |
291 | |
305 | |
Autres éditions - Tout afficher
Husserl Or Frege?: Meaning, Objectivity, and Mathematics Claire Ortiz Hill,Guillermo E. Rosado Haddock Aucun aperçu disponible - 2003 |
Expressions et termes fréquents
abstract situation analytic argument Axiom of Choice Basic Laws Begriffsschrift Benacerraf Bertrand Russell cardinal numbers categorial acts categorial intuition categorial objectualities chapter completely Concept of Number conceptual word considered constituted corresponding determined different sense Dordrecht Edmund Husserl epistemology equivalent expressions extension extensional first-order logic formal logic Franz Brentano Frege and Russell functions Georg Cantor Gödel Hague Hilbert Husserliana ideal ideas identity statements interderivability interpretation invariance Kluwer language logic and mathematics Logical Investigations Logik Logische Untersuchungen Mannigfaltigkeitslehre mathe mathematical entities mathematical statements mathematicians Mathematik meaning ments Nijhoff notion of sense Oxford paradoxes Phenomenology Philosophie der Arithmetik Philosophy of Arithmetic philosophy of mathematics Platonism possible present book Principle problems propositions psychological pure logic Putnam Quine relation Russell's second-order logic semantics sense and reference sentence set theory Sinn und Bedeutung situation of affairs substitutivity Theorem thought tion transfinite numbers transformations true truth value Ultrafilter University Press Weierstrass whole numbers wrote
Références à ce livre
Artificial Cognition Systems Loula, Angelo,Gudwin, Ricardo,Queiroz, Jo?o Aucun aperçu disponible - 2006 |