864 reputation
512
bio website
location Cambridge, MA
age 25
visits member for 4 years
seen May 16 at 17:54
I'm interested in topology, algebraic geometry and number theory.

Jul
2
awarded  Curious
Jun
26
awarded  Yearling
May
15
awarded  Nice Question
May
14
comment What is the coefficient ring of algebraic K theory of the discrete $\mathbb{C}$?
There are probably no modifications necessary in this case - thanks. And I'm interested in the torsion-free part, so fine with taking coefficients in any characteristic-zero field. Edited question accordingly.
May
14
revised What is the coefficient ring of algebraic K theory of the discrete $\mathbb{C}$?
removed some parentheticals, added that only interested in torsion-free part
May
13
asked What is the coefficient ring of algebraic K theory of the discrete $\mathbb{C}$?
Jun
26
awarded  Yearling
May
10
awarded  Nice Answer
Apr
29
asked A nice rigid analytic model for local systems over an elliptic curve?
Apr
24
comment What is a higher derived constructible sheaf
@David So it sounds like you're saying (in the algebraic case), that the 'etale topos contains all the topology of a manifold up to some sort of profinite completion, and higher-category analogues of locally constant (resp. constructible) sheaves are well-approximated by sheaves on this topos on the one hand, and therefore by D-modules on the other hand. Is this correct?
Apr
23
accepted What is a higher derived constructible sheaf
Apr
23
comment What is a higher derived constructible sheaf
Thanks! This is great. Looking at Aaron Smith's website, I saw he's working on a paper with Block on a constructible Riemann-Hilbert correspondence.
Apr
23
revised What is a higher derived constructible sheaf
minor edits + added local-systems tag
Apr
23
asked What is a higher derived constructible sheaf
Apr
16
answered Algebraic machinery for algebraic geometry
Apr
13
comment Intuition for Levi-Civita connection via Hamiltonian flows
Thank you! I looked at the paper. In terms of its notation, are you saying that the horizontal section is the 1-eigenspace of the derivative of the fundamental endomorphism?
Apr
13
comment Intuition for Levi-Civita connection via Hamiltonian flows
Thanks! Yes, this is exactly what I need. Do you have a link for Foulon's thesis?
Apr
13
accepted Intuition for Levi-Civita connection via Hamiltonian flows
Apr
12
asked Intuition for Levi-Civita connection via Hamiltonian flows
Apr
12
answered Description of the units of the group ring Fp[Fp] ?