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pro vyhledávání: '"Alexander Paseau"'
Autor:
Chudnoff, Elijah
Publikováno v:
Mind, 2009 Jul 01. 118(471), 846-850.
Externí odkaz:
https://www.jstor.org/stable/40542019
Autor:
Elijah Chudnoff
Publikováno v:
Mind. 118:846-850
What is the nature of mathematical knowledge? Is it anything like scientific knowledge or is it sui generis? How do we acquire it? Should we believe what mathematicians themselves tell us about it? Are mathematical concepts innate or acquired? Eight
Autor:
Alexander Paseau
Publikováno v:
Synthese. 199:9161-9184
Number theory abounds with conjectures asserting that every natural number has some arithmetic property. An example is Goldbach’s Conjecture, which states that every even number greater than 2 is the sum of two primes. Enumerative inductive evidenc
Autor:
Alexander Paseau, Owen Griffiths
Publikováno v:
Thought: A Journal of Philosophy. 10:188-198
By mimicking the standard definition for a formal language, we define what it is for a natural language to be compact. We set out a valid English argument none of whose finite subarguments is valid. We consider one by one objections to the argument's
Autor:
Alexander Paseau
Publikováno v:
Erkenntnis. 87:2307-2328
The idea that sentences can be closer or further apart in meaning is highly intuitive. Not only that, it is also a pillar of logic, semantic theory and the philosophy of science, and follows from other commitments about similarity. The present paper
Autor:
Alexander Paseau
Publikováno v:
The Mathematical Gazette. 100:442-449
Metamathematics is the mathematical study of mathematics itself. Two of its most famous theorems were proved by Kurt Gödel in 1931. In a simplified form, Gödel's first incompleteness theorem states that no reasonable mathematical system can prove a
Autor:
Alexander Paseau
Publikováno v:
Mind. 125:177-207
Complete inferential rigour is achieved by breaking down arguments into steps that are as small as possible: inferential ‘atoms’. For example, a mathematical or philosophical argument may be made completely inferentially rigorous (‘atomized’)
Autor:
Alexander Paseau
There are three types of naturalism in the philosophy of mathematics: metaphysical, epistemological and methodological. Metaphysical naturalists maintain that all entities are natural. One reading of this claim is that mathematical ontology is the on
Externí odkaz:
https://explore.openaire.eu/search/publication?articleId=doi_________::ce1e9b3ea7f5baea1db94587fed969d9
https://doi.org/10.4324/9780415249126-y094-1
https://doi.org/10.4324/9780415249126-y094-1
Autor:
Alexander Paseau
Publikováno v:
The British Journal for the Philosophy of Science. 66:775-799
Mathematicians do not claim to know a proposition unless they think they possess a proof of it. For all their confidence in the truth of a proposition with weighty non-deductive support (f...