Foundations of Mathematics

Azzouni, Jody. Metaphysical Myths, Mathematical Practice: The Ontology and Epistemology of the Exact Sciences. New York: Cambridge University Press, 1994.
Argues that the epistemological questions of the preceeding two decades are misdirected, not fitting well with the practice of mathematics.

Benacerraf, Paul, Hilary Putnam. Philosophy of Mathematics. Cambridge: Cambridge Univ. Press, 1983.

Blay, Michel. Reasoning with the Infinite: from the Closed World to the Mathematical Universe. Chicago, IL: University of Chicago, 1998.

Brouwer, L. E. J. Intuitionisme En Formalísme. Groningen, 1912.

Cohen, P. J. Set Theory and the Continuum Hypothesis. Freeman, 1966.

Cole, K. C. The Universe and the Teacup: The Mathematics of Truth and Beauty. New York: Harcourt Brace & Company, 1998.
"A poetic and passionate book that reveals how the tools of mathematics get us to these fundamental truths." An excellent and entertaining book that expresses well the power of abstraction in the search for truth.

Cox, R. T. The Algebra of Probable Inference. Baltimore: Johns Hopkins Press, 1961.
Shows how the axioms of Bayesian probability theory are uniquely determined by conditions of plausibility and consistency in inductive inference.

Dales, H. G., G. Oliveri. Truth in Mathematics. Oxford: Clarendon Press, 1998.
A collection of papers presented at a conference entitled Truth in Mathematics held in 1995. Various views and philosophies of mathematics and the associated notions of truth.

Dauben, Joseph Warren. Georg Cantor: His Mathematics and Philosophy of the Infinite. Princeton, NJ: Princeton University Press, 1990.

Devlin, Keith. The Language of Mathematics: Making the Invisible Visible. New York: W. H. Feeman and Co., 1998.

Douady, A., J. H. Hubbard. Étude Dynamique Des Polynomes Complexes: Volume I & II. Orsay: Publ. Math., 1984.

Ekeland, Ivar. The Broken Dice, and Other Mathematical Tales of Chance. Chicago, IL: Chicago University Press, 1993.

Field, Hartry. Realism, Mathematics and Modality. Oxford, UK: Blackwell's, 1989.

Frege, G. Die Grundlagen Der Arithmetik. Breslau, 1884.

Frege, G. Grundgesetse Der Arithmetik: Volume 1&2. Jena, 1903.

Gödel, Kurt. On the Completeness of the Calculus of Logic. University of Vienna, 1929.

Granville, Henry. Logos: Mathematics and Christian Theology. Bucknell University Press, 1976.

Grothendieck, A. Eléments de Géométrie Algébrique: Eight Volumes. Publ. Math. IHES, 1960.

Grothendieck, A. Seminarire de Geometrie Algebrique. Berlin: Springer, 1960.

Hausdorff, F. Grundzüge Der Mengenlehre. Leipzig, 1914.

Hilbert, David, P. Bernays. Die Grundlagen Der Mathematik. Springer, 1934.

Hilbert, David. Grundlagen Der Geometrie. 1899.

Hilbert, David. The Hilbert Problems: Lecture at the International Congress of Mathematics. Paris, 1900.

Horwich, Paul. Probability and Evidence. Cambridge: Cambridge University Press, 1982.
A mathematical approach to confirmation of scientific hypotheses based on Bayes Theorem, the idea that data confirms a hypothesis to the extent that the hypothesis increases the probability of the data.

Howell, Russell W., W. James Bradley. Mathematics in a Postmodern Age. Grand Rapids: Brazos Press, 2001.

Kline, Morris. Mathematics and the Search for Knowledge. Oxford: Oxford Univ. Press, 1985.

Kline, Morris. Mathematics: The Loss of Certainty. Oxford, England: Oxford University Press, 1980.

Kolmogorov, A. N. Foundation of Probability Theory. Berlin: Springer, 1930.

Kolmogorov, A. N. On Persistence of Quasi-Periodic Motions Under a Small Perturbation of the Hamiltonian Function. , 1959.

Lebesgue, H. Lecons Sur L'integration Et La Recherche Des Fonctions Primitives. Paris, 1904.

Maor, Eli. e: The Story of a Number. Princeton: Princeton Univ. Press, 1994.

Nagel, E., J. Newman. Gödel's Proof. London: Routledge, 1959.
Accessible explanation of what Gödel achieved and how he did it.

Pickover, Clifford. The Loom of God: Mathematical Tapestries at the Edge of Time. New York: Plenum, 1997.
Mathematics is the loom upon which God weaves the fabric of the universe.

Poincaré, H. La Science Et La Méthode. Paris, 1904.

Poincaré, H. Lecons Des Mecanique Céleste. Paris, 1905.

Robinson, A. Non-Standard Analysis. Princeton, NJ: Princeton University Press, 1965.

Russell, Bertrand, Alfred North Whitehead. Principia Mathematica: 3 vols. Cambridge: Cambridge University Press, 1910.

Seife, Charles. Zero: The Biography of a Dangerous Idea. New York: Viking, 2000.
A wonderful description of the dilemas in the conception of the notion of zero. The interplay of the ideas of zero and infinity are nicely presented.

Steiner, Mark. The Applicability of Mathematics as a Philosophical Problem. Cambridge, MA: Harvard University Press, 1998.

Thompson, Darcy W. On Growth and Form. Cambridge: Cambridge University Press, 1916.
The classic study on the mathematics behind morphology, written under the aegis of the idea that "God always geometrices."

Tymoczko, T. New Directions in the Philosophy of Mathematics: An Anthology. Princeton, NJ: Princeton University Press, 1998.

Van Heijenoort, J. From Frege to Gödel: A Source Book in Mathematical Logic. Cambridge, MA: Harvard Univ. Press, 1967.

Von Mises, Richard. Probability, Statistics and Truth. London: George Allen and Unwin, 1957.

Weyl, Hermann. Das Kontnuum. Berlin, 1918.

Yourgrau, Palle. The Disappearance of Time: Kurt Gödel and the Idealistic Tradition in Philosophy. Cambridge, UK ; New York: Cambridge University Press, 1991.