bio | website | isomorphism.es |
---|---|---|
location | Great Cacapon, WV | |
age | ||
visits | member for | 4 years, 5 months |
seen | yesterday | |
stats | profile views | 222 |
ὰγεωμὲρητος μηδϵὶς ϵἰσίτω
The philosopher kings of Plato's Republic were to learn Geometry at the acme of their preparation to rule. The reasoning was not only due to Plato's geometrical view of Nature but also his view of abstraction.
Without taking sides on this particular philosopher—how much more would he have valued modern geometry? I'm interested in learning mathematics from this perspective: experiencing how "the most different" human language influences my thoughts about the everyday world.
(By the everyday world I mean love, money, and human diversity — things that seem far away from serious professional text.) In particular I'd like to be able to think up novel and creative ideas about non-mathematical things, using modern mathematical shapes.
Besides this broad personal project, I am also interested in applying modern mathematics to economic theory.
May 15 |
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Where does a math person go to learn quantum mechanics?
Thank you @Sky! |
May 11 |
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Where does a math person go to learn quantum mechanics?
Do you have a recommendation of where to get to the right level of representation theory? |
May 1 |
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Colloquial catchy statements encoding serious mathematics
@kjetilbhalvorsen Indeed, near-zero-Kelvin labs on Earth mean it's probably not. |
Apr 30 |
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Colloquial catchy statements encoding serious mathematics
I feel it should be a drunk spaceship, since birds fly at most over a thickened 2-sphere, and realistically over just a small patch. |
Apr 30 |
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Colloquial catchy statements encoding serious mathematics
I like it as a way to explain cohomology on a closed circuit graph, as an alternative to exactness ⇒ Green's theorem. |
Apr 30 |
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Do good math jokes exist?
mathoverflow.net/a/54520/11500 |
Apr 30 |
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Examples of intuition from fields other than Physics to solve math problems
I don't know if this has solved any new problems to date, but Maldacena uses an economic analogy to explain some mathematics. So possibly in the future someone could use that analogy to reason about a larger system that's mathematically harder to swallow but where an argument like "That would change the arbitrage" was more intuitive. |
Apr 28 |
awarded | Yearling |
Apr 23 |
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Intuition behind Alexander duality
I sometimes understand an idea better by seeing how it's used than by seeing it described. Here's Robert MacPherson using Alexander duality at minute 21; HTH someone. |
Mar 24 |
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Visualization of the real projective plane
ℝℙ¹ is the space of lines through the origin so I just imagine a line nailed into the origin spinning around. (Reminding myself when it reaches noon it's already been there at 6:00 since unlike a ray the line is bi-directional hence $a=-a$.) |
Mar 23 |
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Visualizing functions with a number of independant variables
Often in my experience it's not necessary to show 5-way interactions – a 5-input function is really separable, with interesting interactions being 2-way but rarely 3-way. It also pays, imo, to look for ways to reduce dimensionality when you don't absolutely have to use necessarily overwrought visualisation techniques (Chernoff-Fleury faces, symphonies) which, like a time-lapse not over time, are entertaining but not super clear. |
Mar 22 |
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Intuitive crutches for higher dimensional thinking
I like the idea of "more neighbours" in higher-D euclidean space. Geoff Hinton joked about being in a grocery store buying pizza. Tomato sauce and cheese were near the pizza-dough, but sardines were not. "Unfortunately it's not at 16-dimensional grocery store", because then everything related to pizza-dough could be next to pizza-dough. So I think of ℤ³ as a graph with each vertex having 6 edges. In ℤⁿ each node has 2n edges. |
Mar 15 |
revised |
Motivation for concepts in Algebraic Geometry
improved formatting |
Mar 15 |
suggested | approved edit on Motivation for concepts in Algebraic Geometry |
Feb 17 |
revised |
What is DAG and what has it to do with the ideas of Voevodsky?
improved formatting |
Feb 17 |
suggested | approved edit on What is DAG and what has it to do with the ideas of Voevodsky? |
Nov 28 |
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What's a groupoid? What's a good example of a groupoid?
ok, right. So passing in a circle (like the Von Trapp family with Baroness Schräder) would work better than football, where movement up the field and other competitive factors would break the invertibility. |
Nov 19 |
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How to write popular mathematics well?
added 44 characters in body |
Nov 19 |
revised |
How to write popular mathematics well?
added 21 characters in body |
Oct 19 |
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What's a groupoid? What's a good example of a groupoid?
I guess if this is true, then passing in (European) football also is more like a groupoid than a group. Only the person with the ball can pass to any teammate (or "negative pass" to any opponent). Yes? |