- Applied Nonstandard Analysis.Martin Davis - 1978 - Journal of Symbolic Logic 43 (2):383-384.details
|
|
Non-standard Analysis.Gert Heinz Müller - 2016 - Princeton University Press.details
|
|
(1 other version)The Invention of the Decimal Fractions and the Application of the Exponential Calculus by Immanuel Bonfils of Tarascon.George Sarton & Solomon Gandz - 1936 - Isis 25:16-45.details
|
|
Perceiving the infinite and the infinitesimal world: unveiling and optical diagrams and the construction of mathematical concepts.Lorenzo Magnani & Riccardo Dossena - 2005 - Foundations of Science 10 (1):7--23.details
|
|
(1 other version)Review: Jerzy Los, Quelques Remarques, Theoremes et Problemes sur les Classes Definissables d'Algebres. [REVIEW]Kurt Schutte - 1960 - Journal of Symbolic Logic 25 (2):168-168.details
|
|
A Burgessian Critique of Nominalistic Tendencies in Contemporary Mathematics and its Historiography.Karin Usadi Katz & Mikhail G. Katz - 2012 - Foundations of Science 17 (1):51-89.details
|
|
Mathematics Without Numbers: Towards a Modal-Structural Interpretation.Geoffrey Hellman - 1989 - Oxford, England: Oxford University Press.details
|
|
A subject with no object: strategies for nominalistic interpretation of mathematics.John P. Burgess & Gideon Rosen - 1997 - New York: Oxford University Press. Edited by Gideon A. Rosen.details
|
|
(3 other versions)How to make our ideas clear.C. S. Peirce - 1878 - Popular Science Monthly 12 (Jan.):286-302.details
|
|
The Completeness of the Real Line.Matthew E. Moore - 2007 - Critica 39 (117):61-86.details
|
|
On Cauchy's notion of infinitesimal.Nigel Cutland, Christoph Kessler, Ekkehard Kopp & David Ross - 1988 - British Journal for the Philosophy of Science 39 (3):375-378.details
|
|
The Rise of non-Archimedean Mathematics and the Roots of a Misconception I: The Emergence of non-Archimedean Systems of Magnitudes.Philip Ehrlich - 2006 - Archive for History of Exact Sciences 60 (1):1-121.details
|
|
Early delta functions and the use of infinitesimals in research.Detlef Laugwitz - 1992 - Revue d'Histoire des Sciences 45 (1):115-128.details
|
|
Mathematics through diagrams: microscopes in non-standard and smooth analysis.R. Dossena & L. Magnani - 2007 - In L. Magnani & P. Li (eds.), Model-Based Reasoning in Science, Technology, and Medicine. Springer. pp. 193--213.details
|
|
Leibniz’s Infinitesimals: Their Fictionality, Their Modern Implementations, and Their Foes from Berkeley to Russell and Beyond. [REVIEW]Mikhail G. Katz & David Sherry - 2013 - Erkenntnis 78 (3):571-625.details
|
|
The Logic of Relatives.Charles S. Peirce - 1897 - The Monist 7 (2):161-217.details
|
|
Continuity and Infinitesimals.John L. Bell - unknowndetails
|
|
An introduction to the foundations and fundamental concepts of mathematics.Howard Eves - 1958 - New York,: Holt, Rinehart and Winston. Edited by Carroll Vincent Newsom.details
|
|
Peirce's clarifications of continuity.Jérôme Havenel - 2008 - Transactions of the Charles S. Peirce Society 44 (1):pp. 86-133.details
|
|
A Subject with no Object.Zoltan Gendler Szabo, John P. Burgess & Gideon Rosen - 1999 - Philosophical Review 108 (1):106.details
|
|
(1 other version)The Invention of the Decimal Fractions and the Application of the Exponential Calculus by Immanuel Bonfils of Tarascon.George Sarton & Solomon Gandz - 1936 - Isis 25 (1):16-45.details
|
|
Where Mathematics Comes From How the Embodied Mind Brings Mathematics Into Being.George Lakoff & Rafael E. Núñez - 2000details
|
|
Ten Misconceptions from the History of Analysis and Their Debunking.Piotr Błaszczyk, Mikhail G. Katz & David Sherry - 2013 - Foundations of Science 18 (1):43-74.details
|
|
The analyst: A discourse addressed to an infidel mathematician.George Berkeley - 1734 - Wilkins, David R.. Edited by David R. Wilkins.details
|
|
The Analyst, Or, a Discourse Addressed to an Infidel Mathematician. Wherein it is Examined, Whether the Object, Principles and Inferences of the Modern Analysis are More Distinctly Conceived, Or More Evidently Deduced, Than Religious Mysteries and Points of Faith.George Berkeley - 1734 - Printed for J. Tonson.details
|
|
How to Define a Number? A General Epistemological Account of Simon Stevin’s Art of Defining.Jurgen Naets - 2010 - Topoi 29 (1):77-86.details
|
|
A Primer of Infinitesimal Analysis.John Lane Bell - 1998 - Cambridge University Press.details
|
|
Cauchy's Continuum.Karin U. Katz & Mikhail G. Katz - 2011 - Perspectives on Science 19 (4):426-452.details
|
|
Who Gave You the Cauchy–Weierstrass Tale? The Dual History of Rigorous Calculus.Alexandre Borovik & Mikhail G. Katz - 2012 - Foundations of Science 17 (3):245-276.details
|
|
A new look at E.G. Björling and the Cauchy sum theorem.Kajsa Bråting - 2007 - Archive for History of Exact Sciences 61 (5):519-535.details
|
|
Cauchy et Bolzano.H. Sinaceur - 1973 - Revue d'Histoire des Sciences 26 (2):97-112.details
|
|
Archimedean Intuitions.Matthew E. Moore - 2002 - Theoria 68 (3):185-204.details
|
|
Definite values of infinite sums: Aspects of the foundations of infinitesimal analysis around 1820.Detlef Laugwitz - 1989 - Archive for History of Exact Sciences 39 (3):195-245.details
|
|
The Wake of Berkeley's Analyst: Rigor Mathematicae?David Sherry - 1987 - Studies in History and Philosophy of Science Part A 18 (4):455.details
|
|
The Burgess-Rosen critique of nominalistic reconstructions.Charles Chihara - 2007 - Philosophia Mathematica 15 (1):54--78.details
|
|
Perceiving the infinite and the infinitesimal world: Unveiling and optical diagrams in mathematics. [REVIEW]Lorenzo Magnani & Riccardo Dossena - 2005 - Foundations of Science 10 (1):7-23.details
|
|