488 reputation
28
bio website abundantmichael.com
location Cusco Peru
age 50
visits member for 2 years, 4 months
seen Sep 25 at 1:41

I am interested in many areas of math including topology (point-set, algebraic), functional analysis, Banach spaces and algebras, real analysis, complex analysis, measures and distributions, group theory, rings, fields, Galois theory, number theory, graph theory, numeric analysis, special relativity, matrices, non-standard analysis, foundations of mathematics, logic, categories and probably some others I am not thinking about right now!

I love to question basic assumptions and also like to create new connections between different areas. I have been playing with math since I was about 4 years old (my father was a mathematician too) and also grew up playing with computers too.

My favorite math book right now is the Princeton Companion to Mathematics which contains hundreds of interesting articles and has given me many new insights into topics I thought I already knew. :-)

I have bachelor and masters degrees in math from Cambridge University. I started a software company a few years after that, which is still one of my sources of income. I have lived in UK, Holland, USA and now Permanently Traveling in South America. As part of the PT life I sold and gave away 95% of the contents of my house and stored the rest in 2011. I also sold my car. Less is more!

I have many other interests including language learning (currently Spanish!), dance, painting, improv, 2012 changes, honest communication, energy healing, teaching Kundalini yoga, EFT, gender, futurology, history (especially of WWI and WWII), alternative history, reading science fiction and mystery books. Just like in my math investigations I follow the joy!


May
31
awarded  Yearling
Apr
15
revised A good way to retain mathematical understanding?
added 697 characters in body
Apr
15
answered A good way to retain mathematical understanding?
Apr
15
answered What happens if your manuscript is accepted as a filler?
Apr
15
comment Are there surfaces with more than two sides?
What is the proof that there is not a global 3rd side? I could use the categorization of compact surfaces to show all of them have 1 or 2 sides. But that does not include non-compact surfaces and it seems to me that a hidden assumption in the categorization proof is that the surfaces have 1 or 2 sides...
Apr
9
asked Examples of the Mathematical Red Herring principle
Apr
9
comment Are mathematical articles on Wikipedia reliable?
@KRyan: wikis and internet education resources in general are in competition with paid universities professors. As they become good enough there will be less demand for high priced schools and downward pressure on professor jobs. Don't expect someone to talk up their competition... see the book "The Nearly Free University and the Emerging Economy" for more on this topic oftwominds.com/CHS-books.html
Apr
9
comment Are mathematical articles on Wikipedia reliable?
The way a wiki gives links to terms used in the article so you can look those wiki articles up too makes learning about a new math subject much easier than a book. I still use books and the wiki is fast way to get started. Often when starting a new subject I don't know not just the main topic but the definitions and related terms and topics...
Apr
9
comment Are mathematical articles on Wikipedia reliable?
In my experience wikipedia math articles on all degree level topic are good. I have read hundreds of them and not seen an issue. I did a math degree and masters in math at Cambridge and still actively study math.
Mar
6
comment Proof that a certain subset of the reals is not a ring
Yes you are right. Thanks for clarifying. Now I get that 2 sin(1) is just 1 sin(1) + 1 sin(1) and Steven showed the set is not closed under addition.
Mar
6
comment Proof that a certain subset of the reals is not a ring
Aha I had missed that point. Thanks for explaining! So given we are using the 1 from R here in regular way it seems like we must be assuming the ring has identity.
Mar
5
comment Proof that a certain subset of the reals is not a ring
Now I am curious if you assume that there is not a 1 in the ring if you can still prove the statement :-)
Mar
5
comment Proof that a certain subset of the reals is not a ring
True that is unclear from the question if they mean ring with identity or not. The other answer also assumes there is a 1 in the ring when it say there is an n such that 2 sin 1 = n sin n. Because the 2 here is an element 2 in the ring to multiply 1 sin 1 by. Hence it assumes there is a 1 in the ring to make the element 2 from.
Mar
5
answered Proof that a certain subset of the reals is not a ring
Mar
1
comment Tough contest problem
As sin(ix) = i sinh(x) (for real x) it is purely imaginary. So sin(sin(ix)) = i sinh(sinh(x)). Similarly for any more iterations of sin() and sin(sin(sin(sin(ix) = i sinh(sinh(sinh(sinh(x)))) is purely imaginary too. However cos(ix) = cosh(x) is purely real and taking cos() of this value three more times cos(cos(cos(cos(ix)))) is also purely real. Hence there is no solution to this equation on the imaginary axis. The imaginary solution(s) must lie somewhere else.
Feb
28
comment Tough contest problem
Alternative just looking at the imaginary axis putting ix for x and using cosh(x) = cos(ix) and i sinh(x) = sin(ix). I will play around with this a bit.
Feb
28
comment Tough contest problem
Cool use of Picard's Theorem! Makes sense to me. I was thinking of converting the sin() and cos() to expressions in exp()s but it gets pretty complex due to the nesting.
Feb
27
comment Tough contest problem
I know the question was for real x. I am curious if we allow complex x if there are solutions.
Jan
21
answered Why would a calculator have base 5?
Nov
20
answered Two people are looking for each other. Is it faster for both to actively search, or for one to search while the other stays still?