Comments for the capacity to be alone
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"...cette capacité qui était leur à leur naissance, tout comme elle était mienne: la capacité d’être seul."Thu, 06 Aug 2015 07:29:25 +0000hourly1http://wordpress.com/Comment on A supplement to “A proof of the degree-genus formula” by Kevin Dong
https://etreseul.wordpress.com/2015/08/06/a-supplement-to-a-proof-of-the-degree-genus-formula/comment-page-1/#comment-33
Thu, 06 Aug 2015 07:29:25 +0000http://etreseul.wordpress.com/?p=584#comment-33Fight me nerd

]]>Comment on A supplement to “A proof of the degree-genus formula” by Zachary Kirsche
https://etreseul.wordpress.com/2015/08/06/a-supplement-to-a-proof-of-the-degree-genus-formula/comment-page-1/#comment-32
Thu, 06 Aug 2015 07:26:49 +0000http://etreseul.wordpress.com/?p=584#comment-32This post is bad

]]>Comment on Intersection Theory – Integral Notation for Degree Homomorphism on Algebraic Cycles by mathematicalchangeling
https://etreseul.wordpress.com/2015/07/12/intersection-theory-integral-notation-for-degree-homomorphism-on-algebraic-cycles/comment-page-1/#comment-23
Tue, 14 Jul 2015 16:36:47 +0000http://etreseul.wordpress.com/?p=455#comment-23~~*~~Friendship is magic~~*~~

]]>Comment on Intersection Theory – Integral Notation for Degree Homomorphism on Algebraic Cycles by Peter Xu
https://etreseul.wordpress.com/2015/07/12/intersection-theory-integral-notation-for-degree-homomorphism-on-algebraic-cycles/comment-page-1/#comment-22
Sun, 12 Jul 2015 23:50:07 +0000http://etreseul.wordpress.com/?p=455#comment-22there is absolutely something between us, and it sparkles when the stars come out

]]>Comment on Intersection Theory – Integral Notation for Degree Homomorphism on Algebraic Cycles by mathematicalchangeling
https://etreseul.wordpress.com/2015/07/12/intersection-theory-integral-notation-for-degree-homomorphism-on-algebraic-cycles/comment-page-1/#comment-19
Sun, 12 Jul 2015 22:42:17 +0000http://etreseul.wordpress.com/?p=455#comment-19This is possibly one of the most hilarious things related to mathSE I have ever seen. Best is the comment in the meta post: “there may be something between these users”

]]>Comment on Sheaf Cohomology – I. The Concept of a Sheaf by splinewizard
https://etreseul.wordpress.com/2015/06/17/sheaf-cohomology-i-the-concept-of-a-sheaf/comment-page-1/#comment-9
Thu, 18 Jun 2015 09:58:20 +0000http://etreseul.wordpress.com/?p=350#comment-9Does one take the disjoint union of germs at P for all complex points P?

]]>Comment on Connections, The Kähler Condition, and Curvature – III. The Kähler Condition by Zachary Kirsche
https://etreseul.wordpress.com/2015/05/09/connections-the-kahler-condition-and-curvature-iii-the-kahler-condition/comment-page-1/#comment-5
Sat, 09 May 2015 17:25:55 +0000http://etreseul.wordpress.com/?p=338#comment-5This is an excellent post, thank you for conferring your intuition Professor Dong. I would not have understood Kahler manifolds without your keen and clear insight.

]]>Comment on Cohomology of the Complex Grassmanian – Part II: The Betti Numbers and the Weil Conjectures by Zachary Kirsche
https://etreseul.wordpress.com/2015/04/27/cohomology-of-the-complex-grassmanian-part-ii-the-betti-numbers-and-the-weil-conjectures/comment-page-1/#comment-4
Sun, 03 May 2015 16:50:02 +0000http://etreseul.wordpress.com/?p=305#comment-4Thank you! 🙂

]]>Comment on Cohomology of the Complex Grassmanian – Part II: The Betti Numbers and the Weil Conjectures by dongerz
https://etreseul.wordpress.com/2015/04/27/cohomology-of-the-complex-grassmanian-part-ii-the-betti-numbers-and-the-weil-conjectures/comment-page-1/#comment-3
Sun, 03 May 2015 04:24:30 +0000http://etreseul.wordpress.com/?p=305#comment-3good post

]]>Comment on Cohomology of the Complex Grassmanian – Part I: A CW structure by Cohomology of the Complex Grassmanian – Part II: The Betti Numbers and the Weil Conjectures | the capacity to be alone
https://etreseul.wordpress.com/2015/04/19/cohomology-of-the-complex-grassmanian-part-i-a-cw-structure/comment-page-1/#comment-2
Mon, 27 Apr 2015 07:00:20 +0000http://etreseul.wordpress.com/?p=255#comment-2[…] See part 1 here! […]