network profile
| bio | website | |
|---|---|---|
| location | ||
| age | 21 | |
| visits | member for | 5 months |
| seen | May 19 at 17:45 | |
| stats | profile views | 49 |
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Mar 5 |
asked | Relation between localization and colimit. |
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Feb 10 |
awarded | Commentator |
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Feb 10 |
comment |
Proving that if $f: \mathbb{C} \to \mathbb{C} $ is a continuous function with $f^2, f^3$ analytic, then $f$ is also analytic @ Hagen von Eitzen ,thanks for the edited version . |
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Feb 9 |
awarded | Scholar |
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Feb 9 |
comment |
Proving that if $f: \mathbb{C} \to \mathbb{C} $ is a continuous function with $f^2, f^3$ analytic, then $f$ is also analytic sorry my fault ! got your argument . thanks. |
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Feb 9 |
accepted | Proving that if $f: \mathbb{C} \to \mathbb{C} $ is a continuous function with $f^2, f^3$ analytic, then $f$ is also analytic |
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Feb 9 |
awarded | Editor |
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Feb 9 |
comment |
Proving that if $f: \mathbb{C} \to \mathbb{C} $ is a continuous function with $f^2, f^3$ analytic, then $f$ is also analytic why should be $k<0$ and how do you get $f$ analytic,I got that g/h should be analytic |
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Feb 9 |
revised |
Proving that if $f: \mathbb{C} \to \mathbb{C} $ is a continuous function with $f^2, f^3$ analytic, then $f$ is also analytic added 6 characters in body |
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Feb 9 |
asked | Proving that if $f: \mathbb{C} \to \mathbb{C} $ is a continuous function with $f^2, f^3$ analytic, then $f$ is also analytic |
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Feb 3 |
comment |
Irreducible element of the ring. Thanks Martin Brandenburg.. true UFD is not needed ,and BenjaLim for giving the explicit isomorphism . |
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Feb 2 |
awarded | Teacher |
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Feb 2 |
answered | Irreducible element of the ring. |
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Dec 23 |
comment |
Is noetherianity a local property? @QiL Got your solution thanks :).. |
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Dec 23 |
comment |
Is noetherianity a local property? In the argument you are only using that $I_1$ is contained in finitely many maximal ideals(from part 2 of the condition). |
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Dec 22 |
comment |
Is noetherianity a local property? In this argument it what you have used for I_1 sits in finitely many maximal ideals :0 is contained in finitely many maximal ideals so number of maximal ideals are finite . So you can weaken the condition (ii)of the statement by assuming that R has finitely many finitely many maximal ideals. |
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Dec 22 |
comment |
Is noetherianity a local property? thanks YACP, got your argument and thanks for posting the sketch of theorem of Nagata |
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Dec 22 |
awarded | Supporter |
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Dec 22 |
comment |
Is noetherianity a local property? what is meant by generates I at localisation at a maximal ideal ,do you mean the extension of the ideal I but that might contain 1 in local ring(s) . |
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Dec 22 |
comment |
Is noetherianity a local property? @YACP:Thanks for editing,and i think in a commutative ring it is enough to show that any ascending chain of prime ideal terminates to show that the ring is noetherian . |
