display all the ideas for this combination of texts
10 ideas
8091 | Situation theory is logic that takes account of context [Devlin] |
Full Idea: In many respects, situation theory is an extension of classical logic that takes account of context. | |
From: Keith Devlin (Goodbye Descartes [1997], Ch. 8) | |
A reaction: John Barwise is cited as the parent of this movement. Many examples show that logical form is very hard to pin down, because word-meaning depends on context (e.g. 'several crumbs' differs from 'several mountains'). |
8087 | Golden ages: 1900-1960 for pure logic, and 1950-1985 for applied logic [Devlin] |
Full Idea: The period from 1900 to about 1960 could be described as the golden age of 'pure' logic, and 1950 to 1985 the golden age of 'applied' logic (e.g. applied to everyday reasoning, and to theories of language). | |
From: Keith Devlin (Goodbye Descartes [1997], Ch. 4) | |
A reaction: Why do we always find that we have just missed the Golden Age? However this supports the uneasy feeling that the golden age for all advances in human knowledge is just coming to an end. Biology, including the brain, is the last frontier. |
8089 | Montague's intensional logic incorporated the notion of meaning [Devlin] |
Full Idea: Montague's intensional logic was the first really successful attempt to develop a mathematical framework that incorporates the notion of meaning. | |
From: Keith Devlin (Goodbye Descartes [1997], Ch. 8) | |
A reaction: Previous logics, led by Tarski, had flourished by sharply dividing meaning from syntax, and concentrating on the latter. |
12376 | Demonstrations by reductio assume excluded middle [Aristotle] |
Full Idea: Demonstrations by reduction to the impossible assume that everything is asserted or denied. | |
From: Aristotle (Posterior Analytics [c.327 BCE], 77a23) | |
A reaction: This sounds like the lynchpin of classical logic. |
12373 | Something holds universally when it is proved of an arbitrary and primitive case [Aristotle] |
Full Idea: Something holds universally when it is proved of an arbitrary and primitive case. | |
From: Aristotle (Posterior Analytics [c.327 BCE], 73b33) | |
A reaction: A key idea in mathematical logic, but it always puzzles me. If you snatch a random person in London, and they are extremely tall, does that prove that people of London are extremely tall? How do we know the arbitrary is representative? |
8082 | Where a conditional is purely formal, an implication implies a link between premise and conclusion [Devlin] |
Full Idea: Implication involves some form of link or causality between the antecedent and the consequent of an if-then; normally it says that the conclusion is a consequence of the premise (where conditionals are just defined by 'true' and 'false'). | |
From: Keith Devlin (Goodbye Descartes [1997], Ch. 2) | |
A reaction: This distinction is a key one when discussing 'If-then' sentences. Some are merely formal conditionals, but others make real claims about where you can get to from where you are. |
12363 | Everything is either asserted or denied truly [Aristotle] |
Full Idea: Of the fact that everything is either asserted or denied truly, we must believe that it is the case. | |
From: Aristotle (Posterior Analytics [c.327 BCE], 71a14) | |
A reaction: Presumably this means that every assertion which could possibly be asserted must come out as either true or false. This will have to include any assertions with vague objects or predicates, and any universal assertions, and negative assertions. |
8072 | Sentences of apparent identical form can have different contextual meanings [Devlin] |
Full Idea: "Safety goggles must be worn in the building" is clear enough, but "dogs must always be carried on the escalator" doesn't require us to head off in search of a dog. | |
From: Keith Devlin (Goodbye Descartes [1997], Ch. 1) | |
A reaction: A nice illustration of how the requirements of logical form will often take us beyond the strict and literal meaning of a sentence, into context, tone, allusion and subjective aspects. |
13004 | Aristotle's axioms (unlike Euclid's) are assumptions awaiting proof [Aristotle, by Leibniz] |
Full Idea: Aristotle's way with axioms, rather than Euclid's, is as assumptions which we are willing to agree on while awaiting an opportunity to prove them | |
From: report of Aristotle (Posterior Analytics [c.327 BCE], 76b23-) by Gottfried Leibniz - New Essays on Human Understanding 4.07 | |
A reaction: Euclid's are understood as basic self-evident truths which will be accepted by everyone, though the famous parallel line postulate undermined that. The modern view of axioms is a set of minimum theorems that imply the others. I like Aristotle. |
8075 | Space and time are atomic in the arrow, and divisible in the tortoise [Devlin] |
Full Idea: The arrow paradox starts with the assumption that space and time are atomic; the tortoise starts with the opposite assumption that space and time are infinitely divisible. | |
From: Keith Devlin (Goodbye Descartes [1997], Ch. 2) | |
A reaction: Aquinas similarly covers all options (the cosmos has a beginning, or no beginning). The nature of movement in a space which involves quantum leaps remains metaphysically puzzling. Where is a particle at half of the Planck time? |