display all the ideas for this combination of texts
3 ideas
15411 | We only need to study mathematical models, since all other models are isomorphic to these [Burgess] |
Full Idea: In practice there is no need to consider any but mathematical models, models whose universes consist of mathematical objects, since every model is isomorphic to one of these. | |
From: John P. Burgess (Philosophical Logic [2009], 1.8) | |
A reaction: The crucial link is the technique of Gödel Numbering, which can translate any verbal formula into numerical form. He adds that, because of the Löwenheim-Skolem theorem only subsets of the natural numbers need be considered. |
15412 | Models leave out meaning, and just focus on truth values [Burgess] |
Full Idea: Models generally deliberately leave out meaning, retaining only what is important for the determination of truth values. | |
From: John P. Burgess (Philosophical Logic [2009], 2.2) | |
A reaction: This is the key point to hang on to, if you are to avoid confusing mathematical models with models of things in the real world. |
15416 | We aim to get the technical notion of truth in all models matching intuitive truth in all instances [Burgess] |
Full Idea: The aim in setting up a model theory is that the technical notion of truth in all models should agree with the intuitive notion of truth in all instances. A model is supposed to represent everything about an instance that matters for its truth. | |
From: John P. Burgess (Philosophical Logic [2009], 3.2) |