[
Buzaglo, M. 2002. The Logic of Concept Expansion, Cambridge: Cambridge University Press.10.1017/CBO9780511487460
]Search in Google Scholar
[
Byers, W. 2007. How Mathematicians Think: Using Ambiguity, Contradiction, and Paradox to Create Mathematics, Princeton, NJ: Princeton University Press.
]Search in Google Scholar
[
Detlefsen, M. 2005. Formalism, in Stewart Shapiro (ed.) Philosophy of mathematics and logic, Oxford: Oxford University Press, 236–317.10.1093/0195148770.003.0008
]Search in Google Scholar
[
Feferman, S. 2000. Mathematical intuition vs. mathematical monsters, Synthese 125 (3): 317–332.10.1023/A:1005223128130
]Search in Google Scholar
[
Friedman, H. 1992. The incompleteness phenomena, Proceedings of the AMS Centennial Symposium, August 8–12, 1988. American Mathematical Society, 49–84.
]Search in Google Scholar
[
Gaifman, H. 2004. Nonstandard models in a broader perspective. In Enayat, A., Roman, R., editors, Nonstandard models in arithmetic and set theory, 1–22, AMS Special Session Nonstandard Models of Arithmetic and Set Theory, January 15–16, 2003, Baltimore, Maryland, Contemporary Mathematics, 361, American Mathematical Society, Providence, Rhode Island.10.1090/conm/361/06585
]Search in Google Scholar
[
Gelbaum, B.R., Olmsted, J.M.H. 1990. Theorems and Counterexamples in Mathematics, New York: Springer-Verlag.10.1007/978-1-4612-0993-5
]Search in Google Scholar
[
Gelbaum, B.R., Olmsted, J.M.H. 2003. Counterexamples in Analysis, Mineola, New York: Dover Publications.
]Search in Google Scholar
[
Hahn, H. 1980. Empiricism, Logic, and Mathematics. Philosophical Papers (edited by Brian McGuinness) Dordrecht Boston London: D. Reidel Publishing Company.10.1007/978-94-009-8982-5
]Search in Google Scholar
[
Hankel, H. 1867. Vorlesungenüber die complexen Zahlen und ihre Funktionen. I Teil: Theorie der complexen Zahlensysteme insbesondere der gemeinen imaginären Zahlen und der Hamilton’schen Quaternionen nebst ihrer geometrischen Darstellung. Leipzig: Leopold Voss.
]Search in Google Scholar
[
Heller, M. 2010. Co to znaczy, że przyroda jest matematyczna? (What does it mean that nature is mathematical?), in Michał Heller and Józef Życiński (eds.) Matematyczność przyrody, Kraków: Wydawnictwo Petrus, 9–22.
]Search in Google Scholar
[
Hersh, R. 1997. What is Mathematics Really?, New York: Oxford University Press.10.1515/dmvm-1998-0205
]Search in Google Scholar
[
Hilbert, D. 1901. Mathematische Probleme, Archiv der Mathematik und Physik 3 (1): 44–63, 213–237.
]Search in Google Scholar
[
Kharazishvili, A.B. 2006. Strange Functions in Real Analysis, Boca Raton London New York Singapore: Chapman & Hall/CRC, Taylor & Francis Group.
]Search in Google Scholar
[
Kline, M. 1972. Mathematical Thought from Ancient to Modern Times, New York Oxford: Oxford University Press.
]Search in Google Scholar
[
Lakatos, I. 1976. Proofs and Refutations, Cambridge: Cambridge University Press.10.1017/CBO9781139171472
]Search in Google Scholar
[
Peacock, G. 1845. A Treatise on Algebra (second edition, volume II), Cambridge: J.J. Deighton.
]Search in Google Scholar
[
Pogonowski, J. 2014. Twórcza rola patologii w matematyce (Creative role of pathologies in mathematics). Annales Universitatis Paedagogicae Cracoviensis. Studia ad Didacticam Mathematicae Pertinentia 6, 101–121.
]Search in Google Scholar
[
Pogonowski, J. 2020. Oswajanie patologii matematycznych (Domestication of mathematical pathologies). Principia 67. In print.10.4467/20843887PI.20.004.13834
]Search in Google Scholar
[
Poincaré, H. 1905. La valeur de la science, Paris: Flammarion.
]Search in Google Scholar
[
Romero, G.E. 2014. The collapse of supertasks, Foundation of science 19 (2): 209–216.10.1007/s10699-013-9338-7
]Search in Google Scholar
[
Sierpińska, A. 1994. Understanding in Mathematics, London: The Falmer Press.
]Search in Google Scholar
[
Steen, L.A., Seebach, J.A., Jr. 1995. Counterexamples in Topology, New York: Dover Publications.
]Search in Google Scholar
[
Stillwell, J. 2010. Mathematics and its History, New York Dordrecht Heidelberg London: Springer.10.1007/978-1-4419-6053-5
]Search in Google Scholar
[
Wise, G.L., Hall, E.B. 1993. Counterexamples in Probability and Real Analysis, New York: Oxford University Press.10.1093/oso/9780195070682.001.0001
]Search in Google Scholar
