Temat: structuralism, - Katalog OPAC zbiorów

Skocz do pozycji: 1.

Tytuł:: Antyrealistyczna ucieczka w sferę możliwości
Antirealist escape to the realm of possibilities
Autorzy:: Wójtowicz, Krzysztof
Powiązania:: https://bibliotekanauki.pl/articles/690612.pdf
Data publikacji:: 2008
Wydawca:: Copernicus Center Press
Tematy:: Charles S. Chihara
constructivism
Geoffrey Hellman
structuralism
linguistic constructivism
modal structuralism
Opis:: The article is devoted to a popular presentation of two important styles of thinking concerning the problem of existence of mathematical objects: Chihara's linguistic constructivism, and Hellman's modal structuralism. According to Chihara, mathematical statements should be interpreted as referring to certain linguistic construction; according to Hellman, mathematics is the science of possible structures. The motivations and main ideas are examined (without going into technical details), and the similarities and differences between these two viewpoints are highlighted.
Źródło:: Zagadnienia Filozoficzne w Nauce; 2008, 42; 15-27
0867-8286
2451-0602
Pojawia się w:: Zagadnienia Filozoficzne w Nauce
Dostawca treści:: Biblioteka Nauki

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Skocz do pozycji: 2.

Tytuł:: Abstract logical structuralism
Autorzy:: Marquis, Jean-Pierre
Powiązania:: https://bibliotekanauki.pl/articles/1047597.pdf
Data publikacji:: 2020-12-29
Wydawca:: Copernicus Center Press
Tematy:: philosophy
logic
structuralism
categorical logic
Opis:: Structuralism has recently moved center stage in philosophy of mathematics. One of the issues discussed is the underlying logic of mathematical structuralism. In this paper, I want to look at the dual question, namely the underlying structures of logic. Indeed, from a mathematical structuralist standpoint, it makes perfect sense to try to identify the abstract structures underlying logic. We claim that one answer to this question is provided by categorical logic. In fact, we claim that the latter can be seen—and probably should be seen—as being a structuralist approach to logic and it is from this angle that categorical logic is best understood.
Źródło:: Zagadnienia Filozoficzne w Nauce; 2020, 69; 67-110
0867-8286
2451-0602
Pojawia się w:: Zagadnienia Filozoficzne w Nauce
Dostawca treści:: Biblioteka Nauki

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Skocz do pozycji: 3.

Tytuł:: Podstawowe założenia strukturalizmu w filozofii matematyki
Mathematical structuralism and its basic assumptions
Autorzy:: Wójtowicz, Krzysztof
Powiązania:: https://bibliotekanauki.pl/articles/690706.pdf
Data publikacji:: 2009
Wydawca:: Copernicus Center Press
Tematy:: mathematical structuralism
ontology of mathematics
Stewart Shapiro
structure
Opis:: The notion of a structure is one of fundamental notions in mathematics: we speak of geometrical, topological, probabilistic, differential etc. structures. This notion is also important in the philosophical discussion concerning ontology for mathematics. In the last decades, the stance of mathematical structuralism attracts more and more attention. In this article the author discusses the motivations which lie behind mathematical structuralism and briefly present Shapiro's 'ante rem' structuralism.
Źródło:: Zagadnienia Filozoficzne w Nauce; 2009, 44; 40-60
0867-8286
2451-0602
Pojawia się w:: Zagadnienia Filozoficzne w Nauce
Dostawca treści:: Biblioteka Nauki

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Skocz do pozycji: 4.

Tytuł:: Logika racjonalności. W stronę modalnego platonizmu matematycznego
The Logic of Rationality. Towards Modal Mathematical Platonism
Autorzy:: Wilczek, Piotr
Powiązania:: https://bibliotekanauki.pl/articles/691018.pdf
Data publikacji:: 2011
Wydawca:: Copernicus Center Press
Tematy:: Alfred N. Whitehead
Alfred Tarski
logical consequence
ZFC
second-order set theory
forcing
modal logics
field of rationality
structuralism
platonism
Opis:: In this article Whitehead’s philosophy of mathematics is characterized as a Structural Second-Order Platonism and it is demonstrated that the Whiteheadian ontology is consistent with modern formal approaches to the foundation of mathematics. We follow the pathway taken by model-theoretically and semantically oriented philosophers. Consequently, it is supposed that all mathematical theories (understood as deductively closed set of sentences) determine their own models. These models exist mind-independently in the realm of eternal objects. From the metatheoretical point of view the hypothesis (posed by Józef Życiński) of the Rationality Field is explored. It is indicated that relationships between different models can be described in the language of modal logics and can further be axiomatized in the framework of the Second Order Set Theory. In conclusion, it is asserted that if any model (of a mathematical theory) is understood, in agreement with Whitehead’s philosophy, as a collection of eternal objects, which can be simultaneously realized in a single actual occasion, then our external world is governed by the hidden pattern encoded in the field of pure potentialities which constitute the above mentioned Field of Rationality. Therefore, this work can be regarded as the first step towards building a Logic of Rationality.
Źródło:: Zagadnienia Filozoficzne w Nauce; 2011, 49; 98-122
0867-8286
2451-0602
Pojawia się w:: Zagadnienia Filozoficzne w Nauce
Dostawca treści:: Biblioteka Nauki

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