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Full Idea
Brand higher-order logic as unintelligible if you will, but don't conflate it with set theory.
Gist of Idea
Higher-order logic may be unintelligible, but it isn't set theory
Source
Harold Hodes (Logicism and Ontological Commits. of Arithmetic [1984], p.131)
Book Ref
-: 'Journal of Philosophy' [-], p.131
A Reaction
[he gives Boolos 1975 as a further reference] This is simply a corrective, because the conflation of second-order logic with set theory is an idea floating around in the literature.
10011 | Identity is a level one relation with a second-order definition [Hodes] |
10027 | Mathematics is higher-order modal logic [Hodes] |
10021 | It is claimed that numbers are objects which essentially represent cardinality quantifiers [Hodes] |
10016 | When an 'interpretation' creates a model based on truth, this doesn't include Fregean 'sense' [Hodes] |
10017 | Truth in a model is more tractable than the general notion of truth [Hodes] |
10015 | Higher-order logic may be unintelligible, but it isn't set theory [Hodes] |
10018 | Truth is quite different in interpreted set theory and in the skeleton of its language [Hodes] |
10022 | Numerical terms can't really stand for quantifiers, because that would make them first-level [Hodes] |
10023 | Talk of mirror images is 'encoded fictions' about real facts [Hodes] |
10026 | Arithmetic must allow for the possibility of only a finite total of objects [Hodes] |