I am currently attending the University of Calgary for an Honours Pure Mathematics degree.
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May
17 |
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awarded | Taxonomist |
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May
16 |
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awarded | Caucus |
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Apr
23 |
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accepted | Integrating a Real Function with the Residue Theorem |
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Apr
23 |
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asked | Integrating a Real Function with the Residue Theorem |
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Apr
10 |
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accepted | Counting non-isomorphic relations |
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Apr
10 |
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Counting non-isomorphic relations Okay, I will take a look at this. Thank you very much for your help! I was scouring the internet for the past two hours and this was exactly what I was looking for! |
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Apr
10 |
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Counting non-isomorphic relations That is an amazing result, is there a paper I can read which derives it or do you know if there are any known asymptotics for $a(n)$? |
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Apr
10 |
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Counting non-isomorphic relations Are there any lower bounds? I just need to show that a limit is equal to zero for my application to modal logic, so even some sort of trivial lower bound could be useful! |
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Apr
10 |
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asked | Counting non-isomorphic relations |
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Apr
8 |
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$n$-player version of Zermelo's Theorem Thanks! Your example helped. |
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Apr
8 |
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accepted | $n$-player version of Zermelo's Theorem |
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Apr
8 |
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asked | $n$-player version of Zermelo's Theorem |
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Apr
5 |
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accepted | Counting lattice points interior to a polygon |
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Apr
4 |
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asked | Counting lattice points interior to a polygon |
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Mar
30 |
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comment |
Probability that $x \equiv 3 \pmod{4}$ @amWhy: Yes, I learned a lot from both responses, thank you very much! |
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Mar
30 |
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Probability that two Gaussian integers are divisible @ZevChonoles: I'm not sure, care to explain? |
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Mar
30 |
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asked | Probability that two Gaussian integers are divisible |
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Mar
30 |
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comment |
Probability that $x \equiv 3 \pmod{4}$ Do you have a reference for a proof of your last claim regarding the probability two integers in $\mathcal{O}_{K}$ are coprime? |
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Mar
30 |
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accepted | Probability that $x \equiv 3 \pmod{4}$ |
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Mar
30 |
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comment |
Probability that $x \equiv 3 \pmod{4}$ I'll accept your answer if you can answer a follow-up question: What is the probability that a prime number $p$ has $p \equiv 3 \mod{4}$, this would be equivalent to answering my question about the zeta function, I'll make a post about how they are connected as an answer after. |
