Set Theory and Structures
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Publication:6075428
DOI10.1007/978-3-030-15655-8_10zbMath1528.03011OpenAlexW2802525317MaRDI QIDQ6075428
Neil Barton, Sy-David Friedman
Publication date: 20 September 2023
Published in: Synthese Library (Search for Journal in Brave)
Full work available at URL: http://philsci-archive.pitt.edu/14633/1/2017_04_set_theory_urelements%20%285%29.pdf
Philosophy of mathematics (00A30) Philosophical and critical aspects of logic and foundations (03A05) Axiomatics of classical set theory and its fragments (03E30) Foundations, relations to logic and deductive systems (18A15)
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- Univalent foundations as structuralist foundations
- Homotopical algebra is not concrete
- Categorical set theory: A characterization of the category of sets
- Mathematical forms and forms of mathematics: leaving the shores of extensional mathematics
- Sets, Classes, and Categories
- THE SET-THEORETIC MULTIVERSE
- 2013 NORTH AMERICAN ANNUAL MEETING OF THE ASSOCIATION FOR SYMBOLIC LOGIC University of Waterloo Waterloo, Ontario, Canada May 8–11, 2013
- Multiversism and Concepts of Set: How Much Relativism Is Acceptable?
- Structure in Mathematics and Logic: A Categorical Perspective
- Exploring Categorical Structuralism
- Strong Statements of Analysis
- Model Theory and the Philosophy of Mathematical Practice
- UNIVERSISM AND EXTENSIONS OF V
- Categories for the Working Philosopher
- THE PROSPECTS OF UNLIMITED CATEGORY THEORY: DOING WHAT REMAINS TO BE DONE
- Foundations of Mathematics
- Numbers Can Be Just What They Have To
- On Colimits and Elementary Embeddings
- Set-theoretic foundations
- WHAT CAN A CATEGORICITY THEOREM TELL US?
- Homotopy Type Theory: Univalent Foundations of Mathematics
- AN ELEMENTARY THEORY OF THE CATEGORY OF SETS
- Categories in Context: Historical, Foundational, and Philosophical
- Inner models for set theory—Part I
- Inner models for set theory—Part II
- The strength of Mac Lane set theory
- What Do We Want a Foundation to Do?
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