[mchan889]

I'm always happy to see solid philosophy show up here. Really, it's an under-appreciated field that gets written off as useless. Looking back at when I was in college, one of the courses that I still make use of was a philosophical logic class. Infact, the prof I had for that course sent me a link to the Open Logic Project, which has come in handy ever since.

I also have a soft-spot for Russell and his student Wittgenstein. Tractatus is an incredible, though later redacted, work of pure axiomatic reasoning. While HN focuses mostly on tech, I think that the kind of reasoning found in Analytic philosophers can be a boon to anyone doing anything that requires the sort of logical design found in the technology field.

[pmoriarty]

The Tractatus is couched in language that make it seem like Wittgenstein is laying out a mathematical proof, but many of his conclusions don't follow from his premises. The Tractatus is much more a work of mysticism (in the religious sense) than of logic.

Whereof one cannot speak, thereof one must remain silent.

[ukj]

Why do you assume that premises-to-conclusions is the "right way" to go about stuff?

Why can't we go from conclusions to premises?

https://en.wikipedia.org/wiki/Reverse_mathematics

[tsimionescu]

Even if you go in reverse, finding premises for your conclusions, your conclusion must still follow from the premises you found.

Saying that the premises don't follow from the conclusions means that, taking the premises as true, the conclusion is may or may not be true, so it is illogical to draw that conclusion from those premises. Or if you prefer the other way around, if, taking the conclusion as true, the premises could be true or false (or taking the conclusion as false, the premises could still be true or false) then the conclusion does not follow from the premises you found.

[ukj]

You aren't hearing me.

The difference is the order/sequence in which the events take place.

Regular maths starts with premises then looks for conclusions.

Reverse maths starts with conclusions then looks for premises.

So in reverse maths the premises follow from the conclusions - quite literally.

[OJFord]

In writing:

> Even if you go in reverse, finding premises for your conclusions, your conclusion must still follow from the premises you found.

GP means 'follow' in the sense of logical deduction, not follow in time.

Having found the premise (after the conclusion), the conclusion (we started with) must then logically follow from the premises (we later found).

[ukj]

Well, obviously! That's by design.

[tsimionescu]

I am, really, and the idea of reverse maths/logic seems very interesting.

I was just pointing out that the GP's use of the word 'follow' was not about the temporal order of how discoveries are made, but to the logical concept of implication.

That is to say, the GP wasn't complaining that the Tractatus is doing reverse mathematics. They were complaining that the Tractatus is presenting illogical arguments, that it is taking logically unrelated statements and presenting them as conclusions and premises.

[ukj]

I am not sure how to even respond to this coherently... alas - I try.

Do you think "logical implication" (whatever that is) is not bound by temporal order?

That simply tells me that whatever you think "logic" is - it doesn't concern itself with time or downward causation. e.g your idea of "logic" is not Linear/Temporal logic.

So it can't be the logic of this universe then? Perhaps you've heard the saying "One man's modus ponens is another man's modus tollens"?

[Koshkin]

Problem is, unlike conclusions, premises are usually sufficient but not necessary.

[ukj]

I'd say ,given the nature and flow of reverse mathematics, conclusions are necessary but insufficient for premises.

The erudite/formal lingo aside. Reverse mathematics is a nice metaphor for how justification works in practice.

[corporateslave5]

The history of western philosophy by Russel is drivel. It’s full of his own personal biases