Comments for Abstraction
https://wojowu.students.wmi.amu.edu.pl
Sun, 29 Oct 2017 20:29:02 +0000hourly1https://wordpress.org/?v=4.9.3Comment on Finiteness of subsets of arbitrary finite sets by Wojowu
https://wojowu.students.wmi.amu.edu.pl/2017/04/01/finiteness-of-subsets-of-arbitrary-finite-sets/#comment-69
Sun, 29 Oct 2017 20:29:02 +0000https://wojowu.wordpress.com/?p=1849#comment-69Very much right! Thank you for spotting the mistake.
]]>Comment on Finiteness of subsets of arbitrary finite sets by David V Feldman
https://wojowu.students.wmi.amu.edu.pl/2017/04/01/finiteness-of-subsets-of-arbitrary-finite-sets/#comment-68
Fri, 20 Oct 2017 16:08:32 +0000https://wojowu.wordpress.com/?p=1849#comment-68Re the first line of your proof:
As the Frechet filter contains *co-finite* sets, not lying in it equates with having an infinite *complement.*
(Perhaps some symbol isn’t rendering, but I tried two browsers.)
]]>Comment on Proof of the Riemann hypothesis… for polynomials by PNT for polynomials using the zeta function – Abstraction
https://wojowu.students.wmi.amu.edu.pl/2016/09/19/proof-of-the-riemann-hypothesis-for-polynomials/#comment-53
Wed, 28 Jun 2017 10:33:12 +0000https://wojowu.wordpress.com/?p=2215#comment-53[…] this blog post of mine I talk about the “polynomial zeta function” (zeta_q(s)) and prove an […]
]]>Comment on Invertibility of ideals in Dedekind domains by Discriminant and different – Abstraction
https://wojowu.students.wmi.amu.edu.pl/2016/09/12/invertibility-of-ideals-in-dedekind-domains/#comment-29
Sat, 21 Jan 2017 15:15:44 +0000https://wojowu.wordpress.com/?p=83#comment-29[…] defined as the set of these ( alphain K) for which ( alphafrak asubseteqmathcal O_K). In this post we establish that ( frak afrak a^{-1}=mathcal […]
]]>Comment on Decomposition and inertia field degrees by Higher ramification groups – Abstraction
https://wojowu.students.wmi.amu.edu.pl/2016/09/13/decomposition-and-inertia-field-degrees/#comment-28
Sat, 21 Jan 2017 14:59:52 +0000https://wojowu.wordpress.com/?p=254#comment-28[…] an element which is fixed by (sigma), and indeed, by every element of (E). By result from my previous post, (mathcal O_L/frak P) is a trivial extension of (mathcal O_{L_E}/frak P_E), so every […]
]]>Comment on Solutions to exercises from Marcus’ “Number Fields” by Starting a new project – Solutions to exercises in Marcus’ book (+some info) – Abstraction
https://wojowu.students.wmi.amu.edu.pl/number_fields-solutions/#comment-27
Sat, 21 Jan 2017 14:59:35 +0000https://wojowu.wordpress.com/?page_id=3127#comment-27[…] Solutions to exercises from Marcus’ “Number Fields” […]
]]>Comment on Proof sketch of Thue’s theorem by Wojowu
https://wojowu.students.wmi.amu.edu.pl/2016/10/24/proof-sketch-of-thues-theorem/#comment-26
Mon, 16 Jan 2017 08:11:49 +0000https://wojowu.wordpress.com/?p=4275#comment-26I so happened to have already started working on the next post. It should be up later this week 🙂
]]>Comment on Proof sketch of Thue’s theorem by Nathan Ho
https://wojowu.students.wmi.amu.edu.pl/2016/10/24/proof-sketch-of-thues-theorem/#comment-25
Mon, 16 Jan 2017 07:44:58 +0000https://wojowu.wordpress.com/?p=4275#comment-25any plans for new posts?
]]>Comment on Number Fields – solutions by Wojowu
https://wojowu.students.wmi.amu.edu.pl/number-fields-solutions/#comment-24
Wed, 30 Nov 2016 20:54:25 +0000https://s426362.students.wmi.amu.edu.pl/wp-content/uploads/2016/10/number-fields-solutions.pdf#comment-24I’m afraid currently I’m a bit out of motivation for this… I will certainly get back to this project, but I can’t promise when this will happen. If I find time, the next chapter might be released around the New Year. Thanks for showing interest in this project 🙂
]]>Comment on Number Fields – solutions by Rick
https://wojowu.students.wmi.amu.edu.pl/number-fields-solutions/#comment-23
Wed, 30 Nov 2016 00:01:31 +0000https://s426362.students.wmi.amu.edu.pl/wp-content/uploads/2016/10/number-fields-solutions.pdf#comment-23?
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