bio | website | |
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location | Hamilton,On. Canada | |
age | 29 | |
visits | member for | 2 years, 10 months |
seen | Jun 24 '13 at 14:35 | |
stats | profile views | 268 |
I am a huge fan of Probability, and a PhD student of probability.
Jul 25 |
awarded | Popular Question |
Jul 1 |
awarded | Tumbleweed |
Jun 19 |
awarded | Popular Question |
Jan 28 |
comment |
Convergence of Dirichlet Forms
yes, That is what I mean. |
Jan 27 |
comment |
Convergence of Dirichlet Forms
The sequence of Dirichlet forms depend on a parameter, So the convergence of the associated diffusion processes are about this parameter not time $t\rightarrow\infty$. |
Jan 27 |
asked | Convergence of Dirichlet Forms |
Oct 15 |
awarded | Commentator |
Oct 15 |
comment |
Eigenvalues of infinite matrices
em interesting! Thanks a lot! |
Oct 15 |
comment |
Eigenvalues of infinite matrices
Excellent example! This is indeed what I am worried about. Thanks a lot! |
Oct 15 |
accepted | Eigenvalues of infinite matrices |
Oct 14 |
comment |
Eigenvalues of infinite matrices
Thank you so much! So we truncate the infinite matrix and find the eigenvalues, then we take limits. If the limits exist, then we regard the limit as the eigenvalue of infinite matrices. Do you think it is a legitimate treatment of eigenvalues of infinite matrices? Please do not advise me to read the general theory of linear operator in Hilbert space, seriously I know those stuff. But I just don't know how should we deal with infinite matrices. Do you think infinite sparse matrices are easier to deal with? Thank you so much! |
Oct 14 |
comment |
Eigenvalues of infinite matrices
Thanks a lot! Benjamin, I am really like the references! It is very helpful! |
Oct 14 |
comment |
Eigenvalues of infinite matrices
I am talking about the infinite matrix in Hilbert space. |
Oct 13 |
asked | Eigenvalues of infinite matrices |
Apr 5 |
accepted | Convergence of stochastic process |
Apr 5 |
comment |
Convergence of stochastic process
I have the similar idea, but i just don't know how to verify it. Thank you so much for your answer! |
Apr 5 |
asked | Convergence of stochastic process |
Oct 16 |
comment |
Eigenvalue Density of Some Random Matrices?
Thanks for your comments. Yes, you are right. Probably it is not a universal case! |
Oct 16 |
accepted | Eigenvalue Density of Some Random Matrices? |
Oct 14 |
awarded | Scholar |