display all the ideas for this combination of philosophers
6 ideas
10676 | The Axiom of Choice is a non-logical principle of set-theory [Hossack] |
Full Idea: The Axiom of Choice seems better treated as a non-logical principle of set-theory. | |
From: Keith Hossack (Plurals and Complexes [2000], 4 n8) | |
A reaction: This reinforces the idea that set theory is not part of logic (and so pure logicism had better not depend on set theory). |
10686 | The Axiom of Choice guarantees a one-one correspondence from sets to ordinals [Hossack] |
Full Idea: We cannot explicitly define one-one correspondence from the sets to the ordinals (because there is no explicit well-ordering of R). Nevertheless, the Axiom of Choice guarantees that a one-one correspondence does exist, even if we cannot define it. | |
From: Keith Hossack (Plurals and Complexes [2000], 10) |
23623 | Predicativism says only predicated sets exist [Hossack] |
Full Idea: Predicativists doubt the existence of sets with no predicative definition. | |
From: Keith Hossack (Knowledge and the Philosophy of Number [2020], 02.3) | |
A reaction: This would imply that sets which encounter paradoxes when they try to be predicative do not therefore exist. Surely you can have a set of random objects which don't fall under a single predicate? |
23624 | The iterative conception has to appropriate Replacement, to justify the ordinals [Hossack] |
Full Idea: The iterative conception justifies Power Set, but cannot justify a satisfactory theory of von Neumann ordinals, so ZFC appropriates Replacement from NBG set theory. | |
From: Keith Hossack (Knowledge and the Philosophy of Number [2020], 09.9) | |
A reaction: The modern approach to axioms, where we want to prove something so we just add an axiom that does the job. |
23625 | Limitation of Size justifies Replacement, but then has to appropriate Power Set [Hossack] |
Full Idea: The limitation of size conception of sets justifies the axiom of Replacement, but cannot justify Power Set, so NBG set theory appropriates the Power Set axiom from ZFC. | |
From: Keith Hossack (Knowledge and the Philosophy of Number [2020], 09.9) | |
A reaction: Which suggests that the Power Set axiom is not as indispensable as it at first appears to be. |
10687 | Maybe we reduce sets to ordinals, rather than the other way round [Hossack] |
Full Idea: We might reduce sets to ordinal numbers, thereby reversing the standard set-theoretical reduction of ordinals to sets. | |
From: Keith Hossack (Plurals and Complexes [2000], 10) | |
A reaction: He has demonstrated that there are as many ordinals as there are sets. |