Colin McLarty

Q: What Schools Are Affiliated With Colin McLarty

Colin McLarty is affiliated with the following schools: University of California, Berkeley, University of California, Riverside, Case Western Reserve University

Colin McLarty's AcademicInfluence.com Rankings

Colin McLarty

Philosophy

#3604

World Rank

#5793

Historical Rank

#1129

USA Rank

Logic

#9125

World Rank

#11514

Historical Rank

#1579

USA Rank

philosophy Degrees

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Philosophy

Why Is Colin McLarty Influential?

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According to Wikipedia, Colin McLarty is an American logician whose publications have ranged widely in philosophy and the foundations of mathematics, as well as in the history of science and of mathematics. Research Category theory He has written papers about Saunders Mac Lane, one of the founders of category theory.

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Colin McLarty's Published Works

Number of citations in a given year to any of this author's works

Total number of citations to an author for the works they published in a given year. This highlights publication of the most important work(s) by the author

Published Works

Elementary categories, elementary toposes (1992) (220)
The Uses and Abuses of the History of Topos Theory (1990) (71)
Exploring Categorical Structuralism (2004) (64)
Mathematics: Form and Function. (1987) (63)
What Does it Take to Prove Fermat's Last Theorem? Grothendieck and the Logic of Number Theory (2010) (58)
Numbers Can Be Just What They Have To (1993) (47)
Axiomatizing a category of categories (1991) (45)
Failure of Cartesian closedness in NF (1992) (28)
The Rising Sea : Grothendieck on Simplicity and Generality (2003) (27)
Emmy Noether's 'Set Theoretic' Topology: From Dedekind to the Rise of Functors (2005) (21)
Voir-Dire in the Case of Mathematical Progress (2000) (21)
Defining sets as sets of points of spaces (1988) (20)
Anti-foundation and self-reference (1993) (18)
Poincaré: Mathematics & Logic & Intuition (1997) (16)
The Last Mathematician from Hilbert's Göttingen: Saunders Mac Lane as Philosopher of Mathematics (2007) (15)
‘Mathematical Platonism’ Versus Gathering the Dead: What Socrates teaches Glaucon (2005) (13)
What Structuralism Achieves (2008) (12)
“THERE IS NO ONTOLOGY HERE”: VISUAL AND STRUCTURAL GEOMETRY IN ARITHMETIC (2008) (11)
Learning from Questions on Categorical Foundations (2005) (10)
Two Constructivist Aspects of Category Theory (2006) (10)
Saunders Mac Lane (1909–2005): His Mathematical Life and Philosophical Works (2005) (9)
Left exact logic (1986) (9)
A finite order arithmetic foundation for cohomology (2011) (7)
How Grothendieck Simplified Algebraic Geometry (2016) (7)
Recent Debate over Categorical Foundations (2011) (6)
Philosophy and Foundations of Mathematics: Epistemological and Ontological Aspects (2009) (5)
FOUNDATIONS AS TRUTHS WHICH ORGANIZE MATHEMATICS (2012) (4)
Emmy Noether’s first great mathematics and the culmination of first-phase logicism, formalism, and intuitionism (2011) (4)
EVERY GROTHENDIECK TOPOS HAS A ONE-WAY SITE (2006) (3)
VARIABLE SET THEORY (2013) (3)
Elementary axioms for canonical points of toposes (1987) (3)
Poor Taste as a Bright Character Trait: Emmy Noether and the Independent Social Democratic Party (2005) (3)
Interpreting set theory in higher order arithmetic (2012) (3)
Book review: John Bell. Introduction to toposes and local set theory. (1989) (2)
Categorical Foundations and Mathematical Practice (2012) (2)
Zariski cohomology in second order arithmetic (2012) (2)
SAUNDERS MAC LANE AND THE UNIVERSAL IN MATHEMATICS (2005) (2)
Richard courant in the German revolution (2001) (2)
The Roles of Set Theories in Mathematics (2018) (2)
Category Theory in Real Time (1994) (2)
From a Geometrical Point of View: A Study of the History and Philosophy of Category Theory By Jean-Pierre Marquis. Logic, Epistemology, and the Unity of Science. (Springer). 2010. ISBN 978-9048181179. 320 pp. $199. (2012) (1)
The finiteness theorem for invariants of a finite group (translation of Emmy Noether's "Der Endlichkeitsatz der Invarianten endlicher Gruppen") (2015) (1)
SET THEORY FOR GROTHENDIECK ’ S NUMBER THEORY (2011) (1)
THE LARGE STRUCTURES OF GROTHENDIECK FOUNDED ON FINITE-ORDER ARITHMETIC (2011) (1)
Set theories mutually interpretable with higher order arithmetic (2012) (1)
THEOLOGY AND ITS DISCONTENTS: THE ORIGIN MYTH OF MODERN MATHEMATICS (2012) (1)
Semantics for First and Higher Order Realizability (2001) (1)
Coherent, Cech, and Zariski cohomology in second order arithmetic (2012) (1)
Mini-Workshop: Category Theory and Related Fields: History and Prospects (2009) (1)
Book Review:La notion de nombre chez Dedekind, Cantor, Frege: Theories, conceptions, et philosophie Jean-Pierre Belna (1998) (0)
Henri Poincaré: A Scientific Biography by Jeremy Gray (2014) (0)
The Minneapolis Hyatt Regency, Minneapolis, Minnesota May 3–4, 2001 (2001) (0)
Mathematics: Form and Function by Saunders MacLane (1987) (0)
WEAK SET THEORY FOR GROTHENDIECK'S NUMBER THEORY (2011) (0)
Two families of set theories interpretable in higher order arithmetic (2012) (0)
Review of J. Chapman and F. Rowbottom, Relative category theory and geometric morphisms: A logical approach (1994) (0)
Introduction: Hypotheses and Progress (2012) (0)
Grothendieck’s Unifying Vision of Geometry (2018) (0)
Saunders Mac Lane: From Principia Mathematica through Göttingen to the Working Theory of Structures (2020) (0)
JSL volume 85 issue 1 Cover and Front matter (2020) (0)
VI.76 Emmy Noether (2010) (0)
Palmer House Hilton Hotel, Chicago, Illinois April 23–24, 2004 (2004) (0)
Henri Poincaré: Impatient Genius by Ferdinand Verhulst (2017) (0)
Henri Poincaré: Impatient Genius by Ferdinand Verhulst (2017) (0)
Book Review:Real Numbers, Generalizations of the Reals, & Theories of Continua Philip Ehrlich (1999) (0)
Book review (1996) (0)
Abstracts of invited talks in the Session on Category Theory and Structuralism (2013) (0)
Faulkner's last days. (1985) (0)
A univalent universe in finite order arithmetic (2014) (0)
Review of S. Duffy, Virtual Mathematics: the Logic of Difference (Clinamen, 2006) (2008) (0)
Poincare": Mathematics Logic Intuitiont (2005) (0)
Constructivism : Mathematics , Logic , Philosophy and Linguistics Two Constructivist Aspects of Category Theory (2016) (0)
1994 Spring Meeting of the Association for Symbolic Logic (1995) (0)
Book Review: Shaughan Lavine. Understanding the Infinite (1997) (0)
Penelope Maddy. Defending the Axioms: On the Philosophical Foundations of Set Theory. Oxford: Oxford University Press, 2011. ISBN 978-0-19-959618-8 (hbk); 978-0-19-967148-9 (pbk). Pp. x + 150 (2013) (0)
F. A. Muller. Sets, classes, and categories. British Journal for the Philosophy of Science , vol. 52 (2001), pp. 539–573. (2003) (0)
The divine law of distribution of labor and products of labor (0)
JSL volume 85 issue 2 Cover and Front matter (2020) (0)
Saunders Mac Lane. Saunders Mac Lane: A Mathematical Autobiography (2007) (0)
J. P. Mayberry, ,The Foundations Of Mathematics In The Theory Of Sets. Encyclopedia Of Mathematics And Its Applications Ser., Vol. 82. Cambridge: Cambridge University Press (2000), xx+429 pp., index, cloth $80.00 (cloth). (2002) (0)
The Two Mathematical Careers of Emmy Noether (2017) (0)
Henri Poincaré: A Scientific Biography by Jeremy Gray (2014) (0)
Richard in the German Revoiution (2001) (0)
COLIN MCLARTY SEMANTICS FOR FIRST AND HIGHER ORDER REALIZABILITY (2008) (0)

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What Schools Are Affiliated With Colin McLarty?

Colin McLarty is affiliated with the following schools:

Colin McLarty's Academic­Influence.com Rankings