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1. Mathew, Akhil. Nilpotence and Descent in Stable Homotopy Theory.

Degree: PhD, 2017, Harvard University

URL: http://nrs.harvard.edu/urn-3:HUL.InstRepos:40046422

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We study various applications of the ideas of descent and nilpotence to stable homotopy theory. In particular, we give a descent-theoretic calculation of the Picard… (more)

Subjects/Keywords: Mathematics

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APA · Chicago · MLA · Vancouver · CSE | Export to Zotero / EndNote / Reference Manager

APA (6^{th} Edition):

Mathew, A. (2017). Nilpotence and Descent in Stable Homotopy Theory. (Doctoral Dissertation). Harvard University. Retrieved from http://nrs.harvard.edu/urn-3:HUL.InstRepos:40046422

Chicago Manual of Style (16^{th} Edition):

Mathew, Akhil. “Nilpotence and Descent in Stable Homotopy Theory.” 2017. Doctoral Dissertation, Harvard University. Accessed April 02, 2020. http://nrs.harvard.edu/urn-3:HUL.InstRepos:40046422.

MLA Handbook (7^{th} Edition):

Mathew, Akhil. “Nilpotence and Descent in Stable Homotopy Theory.” 2017. Web. 02 Apr 2020.

Vancouver:

Mathew A. Nilpotence and Descent in Stable Homotopy Theory. [Internet] [Doctoral dissertation]. Harvard University; 2017. [cited 2020 Apr 02]. Available from: http://nrs.harvard.edu/urn-3:HUL.InstRepos:40046422.

Council of Science Editors:

Mathew A. Nilpotence and Descent in Stable Homotopy Theory. [Doctoral Dissertation]. Harvard University; 2017. Available from: http://nrs.harvard.edu/urn-3:HUL.InstRepos:40046422

Harvard University

2. Brantner, David Lukas Benjamin. The Lubin-Tate Theory of Spectral Lie Algebras.

Degree: PhD, 2017, Harvard University

URL: http://nrs.harvard.edu/urn-3:HUL.InstRepos:41140243

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We use equivariant discrete Morse theory to establish a general technique in poset topology and demonstrate its applicability by computing various equivariant properties of the… (more)

Subjects/Keywords: Morava E-theory; Lubin-Tate space; spectral Lie algebras; poset topology; discrete Morse theory; Andre-Quillen homology; monoids; Koszul duality

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APA · Chicago · MLA · Vancouver · CSE | Export to Zotero / EndNote / Reference Manager

APA (6^{th} Edition):

Brantner, D. L. B. (2017). The Lubin-Tate Theory of Spectral Lie Algebras. (Doctoral Dissertation). Harvard University. Retrieved from http://nrs.harvard.edu/urn-3:HUL.InstRepos:41140243

Chicago Manual of Style (16^{th} Edition):

Brantner, David Lukas Benjamin. “The Lubin-Tate Theory of Spectral Lie Algebras.” 2017. Doctoral Dissertation, Harvard University. Accessed April 02, 2020. http://nrs.harvard.edu/urn-3:HUL.InstRepos:41140243.

MLA Handbook (7^{th} Edition):

Brantner, David Lukas Benjamin. “The Lubin-Tate Theory of Spectral Lie Algebras.” 2017. Web. 02 Apr 2020.

Vancouver:

Brantner DLB. The Lubin-Tate Theory of Spectral Lie Algebras. [Internet] [Doctoral dissertation]. Harvard University; 2017. [cited 2020 Apr 02]. Available from: http://nrs.harvard.edu/urn-3:HUL.InstRepos:41140243.

Council of Science Editors:

Brantner DLB. The Lubin-Tate Theory of Spectral Lie Algebras. [Doctoral Dissertation]. Harvard University; 2017. Available from: http://nrs.harvard.edu/urn-3:HUL.InstRepos:41140243

3. Tynan, Philip Douglas. Equivariant Weiss Calculus and Loops of Stiefel Manifolds.

Degree: PhD, 2016, Harvard University

URL: http://nrs.harvard.edu/urn-3:HUL.InstRepos:33493281

► In the mid 1980s, Steve Mitchell and Bill Richter produced a filtration of the Stiefel manifolds O(V ;W) and U(V ;W) of orthogonal and unitary,…
(more)

Subjects/Keywords: Mathematics

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APA · Chicago · MLA · Vancouver · CSE | Export to Zotero / EndNote / Reference Manager

APA (6^{th} Edition):

Tynan, P. D. (2016). Equivariant Weiss Calculus and Loops of Stiefel Manifolds. (Doctoral Dissertation). Harvard University. Retrieved from http://nrs.harvard.edu/urn-3:HUL.InstRepos:33493281

Chicago Manual of Style (16^{th} Edition):

Tynan, Philip Douglas. “Equivariant Weiss Calculus and Loops of Stiefel Manifolds.” 2016. Doctoral Dissertation, Harvard University. Accessed April 02, 2020. http://nrs.harvard.edu/urn-3:HUL.InstRepos:33493281.

MLA Handbook (7^{th} Edition):

Tynan, Philip Douglas. “Equivariant Weiss Calculus and Loops of Stiefel Manifolds.” 2016. Web. 02 Apr 2020.

Vancouver:

Tynan PD. Equivariant Weiss Calculus and Loops of Stiefel Manifolds. [Internet] [Doctoral dissertation]. Harvard University; 2016. [cited 2020 Apr 02]. Available from: http://nrs.harvard.edu/urn-3:HUL.InstRepos:33493281.

Council of Science Editors:

Tynan PD. Equivariant Weiss Calculus and Loops of Stiefel Manifolds. [Doctoral Dissertation]. Harvard University; 2016. Available from: http://nrs.harvard.edu/urn-3:HUL.InstRepos:33493281

4. Sankar, Krishanu Roy. Symmetric Powers and the Equivariant Dual Steenrod Algebra.

Degree: PhD, 2017, Harvard University

URL: http://nrs.harvard.edu/urn-3:HUL.InstRepos:40046450

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The structure of the Steenrod algebra of stable mod p cohomology operations and its dual A_* was worked out completely by Milnor - for every… (more)

Subjects/Keywords: Mathematics

Record Details Similar Records

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APA · Chicago · MLA · Vancouver · CSE | Export to Zotero / EndNote / Reference Manager

APA (6^{th} Edition):

Sankar, K. R. (2017). Symmetric Powers and the Equivariant Dual Steenrod Algebra. (Doctoral Dissertation). Harvard University. Retrieved from http://nrs.harvard.edu/urn-3:HUL.InstRepos:40046450

Chicago Manual of Style (16^{th} Edition):

Sankar, Krishanu Roy. “Symmetric Powers and the Equivariant Dual Steenrod Algebra.” 2017. Doctoral Dissertation, Harvard University. Accessed April 02, 2020. http://nrs.harvard.edu/urn-3:HUL.InstRepos:40046450.

MLA Handbook (7^{th} Edition):

Sankar, Krishanu Roy. “Symmetric Powers and the Equivariant Dual Steenrod Algebra.” 2017. Web. 02 Apr 2020.

Vancouver:

Sankar KR. Symmetric Powers and the Equivariant Dual Steenrod Algebra. [Internet] [Doctoral dissertation]. Harvard University; 2017. [cited 2020 Apr 02]. Available from: http://nrs.harvard.edu/urn-3:HUL.InstRepos:40046450.

Council of Science Editors:

Sankar KR. Symmetric Powers and the Equivariant Dual Steenrod Algebra. [Doctoral Dissertation]. Harvard University; 2017. Available from: http://nrs.harvard.edu/urn-3:HUL.InstRepos:40046450