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1. • CommentRowNumber1.
   • CommentAuthortonyjones
   • CommentTimeSep 6th 2014
   • PermaLink
   Author: tonyjones
   Format: Texthttp://www.math.uwo.ca/~hbacard/SZ_QS.pdf anybody seen this paper before? Talks about stable homotopy theory and its connections with physics and number theory

   http://www.math.uwo.ca/~hbacard/SZ_QS.pdf anybody seen this paper before? Talks about stable homotopy theory and its connections with physics and number theory
2. • CommentRowNumber2.
   • CommentAuthorUrs
   • CommentTimeSep 8th 2014
   • (edited Sep 8th 2014)
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   Author: Urs
   Format: MarkdownItex> Talks about stable homotopy theory and its connections with physics and number theory I have looked at it now. I am not sure if I understand the purpose. Maybe you could tell us which statement in the article you would highlight as one that made you point out this article. Regarding connections to physics, I don't actually see any being mentioned. What do you have in mind? Regarding connections to number theory, I see that the author mentions the integers. But what statement in number theory do you have in mind? Regarding this being "about stable homotopy theory" I notice that the note ends on p. 9 with the author saying he has been intimitated by the concept of spectra and then suggests a way to look at the standard definition of $\Omega$-spectra. So there seems to be some way to go for the author to speak about stable homotopy theory... In conclusion, right now I am not sure what to get out of this.

   Talks about stable homotopy theory and its connections with physics and number theory

   I have looked at it now. I am not sure if I understand the purpose. Maybe you could tell us which statement in the article you would highlight as one that made you point out this article.

   Regarding connections to physics, I don’t actually see any being mentioned. What do you have in mind?

   Regarding connections to number theory, I see that the author mentions the integers. But what statement in number theory do you have in mind?

   Regarding this being “about stable homotopy theory” I notice that the note ends on p. 9 with the author saying he has been intimitated by the concept of spectra and then suggests a way to look at the standard definition of $\Omega$-spectra. So there seems to be some way to go for the author to speak about stable homotopy theory…

   In conclusion, right now I am not sure what to get out of this.