Subnostr

ok, maybe what's different in my mind is that i am thinking about it as a phylogeny, that is, you have to look at what is primary before you can get to a given domain. set theory is founded on the fundamental topological concept of a manifold. you can't have a set without that first existing manifold.

imagine the universe just started. what is the first thing that is going to happen? space would be divided up. the shapes would evolve into more complex patterns, this is all topology.

set theory is after the fact. topology lets you start from really zero. then you divide it, and you start to see the beginnings of phyla of things, which you have to have before you can start talking about categorising, grouping, comparing and dividing them from each other.

yes, that's the key, dividing. dividing space, be it a surface or a line or a volume, is the fundamental basis of topology. the ways in which you do this form the first sets.

i still say topology is the root of all mathematics.

YODL 6mo ago

We're gonna have to disagree out the gate. A manifold has a precise definition as a surface which is locally Reimanian, something like that. I'd classify it as one of the more elaborate constructs, and less primitive or whatever than a simple set. Afterall, you need set elements to talk about before you can define a manifold. All the formal stuff I've seen looks like "a group is a SET, with the following additional properties...".

Reading the rest I do see how you mean though, so I'll stop getting hung up on technical definitions. Yeah, I'd think patterns or differences come first, then the notion of distinct things. That's how I'm roughly understanding you.

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ᴛʜᴇ ᴅᴇᴀᴛʜ ᴏꜰ ᴍʟᴇᴋᴜ 6mo ago

i guess the thing i'm disagreeing on relates to a definition of a surface that requires discrete or compositional elements to describe.

a point is before a set, a set is a collection of points. a line can be divided, then you can make a set, a set could be said to be all sets of points in a single dimension. you can make that dimension infinite, or you can make it circular, again, the geometry precedes the establishment of a set.

a point is the primary unit of topology. so i guess i'm splitting hairs.

i just don't agree with the post-hoc nature of sets, being primordial compared to the ad-hoc nature of divisions of surfaces.

YODL 6mo ago

Follow most of your line of reasoning. Agree to disagree slightly 🤷‍♂️

ᴛʜᴇ ᴅᴇᴀᴛʜ ᴏꜰ ᴍʟᴇᴋᴜ 6mo ago

yeah, correcting myself. the topology precedes the set.

a circle, as in a theoretical perfect circle in a continuous (real) field is not an infinite set of points. that is an approximation of a circle, just as you can't get a precise number, in any number base, for the ratio of circumference to radius.

ᴛʜᴇ ᴅᴇᴀᴛʜ ᴏꜰ ᴍʟᴇᴋᴜ 6mo ago

and yes, that's the thing, you have to have a thing before you can talk about a thing.

YODL 6mo ago

First axiom of set theory is "there exists a set" lol. It's sometimes left out as it's sort of philosophical.

ᴛʜᴇ ᴅᴇᴀᴛʜ ᴏꜰ ᴍʟᴇᴋᴜ 6mo ago

probably that means philosophy precedes topology, which then grows into sets, and then numbers and geometry.

YODL 6mo ago

I dunno. I'm making coffee 😮‍💨