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| bio | website | |
|---|---|---|
| location | ||
| age | ||
| visits | member for | 8 months |
| seen | Jan 19 at 16:29 | |
| stats | profile views | 77 |
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Jan 10 |
comment |
Modules over local ring and completion can you please fill in some details on why your claim /YACP's implies my claims? at least the second |
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Jan 8 |
accepted | Modules over local ring and completion |
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Jan 8 |
asked | Modules over local ring and completion |
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Dec 29 |
comment |
Dedekind domain if and only if smooth manifold got it, thanks a million. i was away for holidays - sorry about that :) |
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Dec 29 |
accepted | Dedekind domain if and only if smooth manifold |
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Dec 23 |
comment |
Exercise from Matsumura about DVRs Thank you! Nice lemma |
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Dec 23 |
accepted | Exercise from Matsumura about DVRs |
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Dec 23 |
asked | Dedekind domain if and only if smooth manifold |
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Dec 4 |
accepted | $xy\in (x^2,y^2)$ if $R$ is a Dedekind domain |
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Dec 4 |
asked | Exercise from Matsumura about DVRs |
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Dec 4 |
comment |
$xy\in (x^2,y^2)$ if $R$ is a Dedekind domain Got it. Thanks a lot! |
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Dec 4 |
comment |
$xy\in (x^2,y^2)$ if $R$ is a Dedekind domain Great thanks! what about a counter example for the general case?:) |
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Dec 4 |
asked | $xy\in (x^2,y^2)$ if $R$ is a Dedekind domain |
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Nov 18 |
comment |
Is $K[x_1, x_2,…]$ normal or not? Thank you for the answer, everything is clear; I forgot that UFDs are normal |
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Nov 18 |
accepted | Is $K[x_1, x_2,…]$ normal or not? |
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Nov 18 |
asked | Is $K[x_1, x_2,…]$ normal or not? |
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Nov 7 |
comment |
Markov chain whose state space is the unit circle why $2/\pi$ and not $1 / 2\pi$? |
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Nov 7 |
comment |
Markov chain whose state space is the unit circle I'm following Koralov and Sinai and there they don't talk about general Markov chains very clearly, so that's why I'm finding difficuties following. Again, would you be kind and write me a more detailed answer so that I could understand what you're saying? It seems like everything should be pretty easy - so I just want to understand the theory |
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Nov 7 |
comment |
Markov chain whose state space is the unit circle I'm still lost with this; can anyone help? |
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Nov 6 |
comment |
Markov chain whose state space is the unit circle I'm assuming you mean we get a reversible distribution... but I don't see how to prove it |
