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syzygy

 Mathematics

Associated with Math.SE; for both general discussion & math qu...
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syzygy
Nov 2, 2016 19:48
or perhaps that it maps a basis to a basis :P?
syzygy
Nov 2, 2016 19:42
^^
syzygy
Nov 2, 2016 19:42
also when you sleep 16h this sucks, because you have only 8h to do something
syzygy
Nov 2, 2016 19:42
i am not saying that is good, i was just wondering
syzygy
Nov 2, 2016 19:41
i think too little sleep is much worse
syzygy
Nov 2, 2016 19:40
true dat, but i mean unhealthy? how does it damage your health
syzygy
Nov 2, 2016 19:39
source?
syzygy
Nov 2, 2016 19:39
too much sleep is unhealthy?
syzygy
Oct 29, 2016 13:25
me too. in the end most we mentioned above is only useful in higher mathematics
syzygy
Oct 29, 2016 13:22
because in differential geometry you readily encounter modules over C^infty(M), M some base manifold
syzygy
Oct 29, 2016 13:22
but seriously i think to explain it for modules would be more useful
syzygy
Oct 29, 2016 13:22
tensor hom adjunction is also very useful to know
syzygy
Oct 29, 2016 13:21
:D
syzygy
Oct 29, 2016 13:21
nothing more, nothing less
syzygy
Oct 29, 2016 13:21
direct sum; quotient space; Hom; tensor
syzygy
Oct 29, 2016 13:21
in the end the following constructions are the fundamental ones in linear algebra
syzygy
Oct 29, 2016 13:21
perhaps you can also explain braiding
syzygy
Oct 29, 2016 13:19
@Secret
syzygy
Oct 29, 2016 13:19
tensor product IS symmetric
syzygy
Oct 29, 2016 13:18
not basically
syzygy
Oct 29, 2016 13:18
physically*
syzygy
Oct 29, 2016 13:18
but as far as i know it is an axiom
syzygy
Oct 29, 2016 13:18
I'm sure you can explain that basically
syzygy
Oct 29, 2016 13:18
how about mention that if S,S' are quantum mechanical systemts with state spaces H, H' then the composite system has state space H tensor H'?
syzygy
Oct 29, 2016 13:16
are they physics students?
syzygy
Oct 29, 2016 13:16
where M=W lol
syzygy
Oct 29, 2016 13:16
canonical isomorphism of M* tensor V with Hom(W,V) this is how you use tensors in differential geometry
syzygy
Oct 29, 2016 13:15
(real definition of the trace)
syzygy
Oct 29, 2016 13:15
explain the trace in terms of the tensor product
syzygy
Oct 28, 2016 23:17
how about you look up the definition of matrix multiplcation?
syzygy
Oct 28, 2016 23:17
loool
syzygy
Oct 27, 2016 22:15
you should read the preface to their set theory book
syzygy
Oct 27, 2016 22:15
you probably don't know what i am talking about right?
syzygy
Oct 27, 2016 22:14
i prefer a more practical attitude like bourbaki had
syzygy
Oct 27, 2016 22:13
there is nothing more to say then
syzygy
Oct 27, 2016 22:13
yeah we accept the axioms and that's our foundation
syzygy
Oct 27, 2016 22:13
yeah i sort of didn't count properly
syzygy
Oct 27, 2016 22:13
anyway, if it is only set theorists studying them why bother?
syzygy
Oct 27, 2016 22:11
who?
syzygy
Oct 27, 2016 22:11
in wikipedia's list it is missing
syzygy
Oct 27, 2016 22:10
and ZFC is what real mathematicians use
syzygy
Oct 27, 2016 22:10
obviously
syzygy
Oct 27, 2016 22:09
well the list in wiki contains only 9, but AC is missing
syzygy
Oct 27, 2016 22:09
yeah i see
syzygy
Oct 27, 2016 22:09
ah :D
syzygy
Oct 27, 2016 22:07
i was right balarka :P
syzygy
Oct 27, 2016 22:07
Zermelo–Fraenkel set theory
In mathematics, Zermelo–Fraenkel set theory, named after mathematicians Ernst Zermelo and Abraham Fraenkel, is one of several axiomatic systems that were proposed in the early twentieth century to formulate a theory of sets free of paradoxes such as Russell's paradox. Zermelo–Fraenkel set theory with the historically controversial axiom of choice included is commonly abbreviated ZFC, where C stands for choice. Many authors use ZF to refer to the axioms of Zermelo–Fraenkel set theory with the axiom of choice excluded. Today ZFC is the standard form of axiomatic set theory and as such is the most...
syzygy
Oct 27, 2016 22:01
like 10 axioms
syzygy
Oct 25, 2016 23:48
good
syzygy
Oct 25, 2016 23:47
@0celo7 telling you to learn linear algebra properly is helpful for sure.