86 reputation
8
bio website none
location Reston, Va
age 26
visits member for 2 years, 5 months
seen Oct 20 '13 at 16:31
I am interested in all areas of mathematics, but primarily group theory, symplectic geometry, mirror symmetry, quantum algebra, algebraic geometry and algebraic topology.

Oct
6
awarded  Critic
Sep
1
comment Convenient definition of “category of Riemannian manifolds”?
See snapshot.metameso.org/entries/02/CategoryOfRiemannianManifolds/…, where the objects are Riemmanian manifolds and the morphisms are conformal maps between them.
Aug
30
comment Correspondence between eigenvalue distributions of random unitary and random orthogonal matrices
There is an identity for the eigenvalue distributions in this paper: web.williams.edu/go/math/sjmiller/public_html/ntandrmt/handouts/… (see page 6) Maybe this would help. It is also a known fact that the orthogonal group is similar to a standard normal distribution: www-stat.stanford.edu/~cgates/PERSI/papers/random_matrices.pdf (see page 56). Thus it is possible to solve equality of these two distributions to obtain the answer to your question.
Aug
9
accepted Concerning Problem 108 in “Open Problems in Topology”
Aug
6
comment Concerning Problem 108 in “Open Problems in Topology”
@Ricky If a space has a locally countable open refinement, then it locally has the same cardinality of the natural numbers in a refinement $V$ (a cover such that for every $v\inV$ there exists $u\inU$ such that $V\subsetU$).
Aug
6
asked Concerning Problem 108 in “Open Problems in Topology”
Jul
18
revised Concerning the classification of transversally integral affine structures on symplectic foliations $F$
improved formatting, corrected latex
Jul
17
revised Concerning the classification of transversally integral affine structures on symplectic foliations $F$
LaTEX, made clearer description
Jul
17
awarded  Student
Jul
17
asked Concerning the classification of transversally integral affine structures on symplectic foliations $F$
Jul
15
awarded  Scholar
Jul
15
accepted Concerning the homological mirror symmetry conjecture
Jul
13
answered Concerning the homological mirror symmetry conjecture
Jul
13
revised Concerning the homological mirror symmetry conjecture
added 15 characters in body
Jul
13
asked Concerning the homological mirror symmetry conjecture
Apr
24
answered #P version of SUBSET SUM
Apr
24
answered A reference for the Chevalley Groups
Apr
22
awarded  Autobiographer
Apr
9
awarded  Supporter
Apr
8
awarded  Teacher