BROWN �GITLER SPECTRUM - Encyclopedia Information

From Wikipedia, the free encyclopedia

In the mathematical discipline of topology, the Brown–Gitler spectrum is a spectrum whose cohomology is a certain cyclic module over the Steenrod algebra.^[1]

Brown–Gitler spectra are defined by the isomorphism:^[2]

\Sigma ^{n}A/\{\operatorname {Sq} ^{i}:2i>n\}A\cong G(n).

History

The concept was introduced by mathematicians Edgar H. Brown and Samuel Gitler in a 1973 paper.^[1]^[3]

In topology, Brown–Gitler spectrum is related to the concepts of the Segal conjecture (proven in 1984) and the Burnside ring.^[4]

Applications

Brown–Gitler spectra have had many important applications in homotopy theory.^[5]

References

^ ^a ^b "Brown–Gitler spectrum in nLab".
^ "Brown–Gitler Spectra" (PDF).
^ Brown, Edgar H. Jr.; Gitler, Samuel (1973). "A spectrum whose cohomology is a certain cyclic module over the Steenrod algebra". Topology. 12 (3): 283–295. doi: 10.1016/0040-9383(73)90014-1. MR 0391071.
^ Gitler, Samuel; González, Jesús (1 January 2006). Recent Developments in Algebraic Topology: A Conference to Celebrate Sam Gitler's 70th Birthday, December 3–6, 2003, San Miguel de Allende, México. American Mathematical Society. ISBN 9780821836767 – via Google Books.
^ Cohen, Fred R.; Davis, Donald M.; Goerss, Paul G.; Mahowald, Mark E. (1 January 1988). "Integral Brown–Gitler Spectra". Proceedings of the American Mathematical Society. 103 (4): 1299–1304. doi: 10.2307/2047129. JSTOR 2047129.

External links

"Brown-Gitler_spectra", Encyclopedia of Mathematics, EMS Press, 2001 [1994]

Retrieved from " https://en.wikipedia.org/?title=Brown–Gitler_spectrum&oldid=1183370778"

Topology

From Wikipedia, the free encyclopedia

In the mathematical discipline of topology, the Brown–Gitler spectrum is a spectrum whose cohomology is a certain cyclic module over the Steenrod algebra.^[1]

Brown–Gitler spectra are defined by the isomorphism:^[2]

\Sigma ^{n}A/\{\operatorname {Sq} ^{i}:2i>n\}A\cong G(n).

History

The concept was introduced by mathematicians Edgar H. Brown and Samuel Gitler in a 1973 paper.^[1]^[3]

In topology, Brown–Gitler spectrum is related to the concepts of the Segal conjecture (proven in 1984) and the Burnside ring.^[4]

Applications

Brown–Gitler spectra have had many important applications in homotopy theory.^[5]

References

^ ^a ^b "Brown–Gitler spectrum in nLab".
^ "Brown–Gitler Spectra" (PDF).
^ Brown, Edgar H. Jr.; Gitler, Samuel (1973). "A spectrum whose cohomology is a certain cyclic module over the Steenrod algebra". Topology. 12 (3): 283–295. doi: 10.1016/0040-9383(73)90014-1. MR 0391071.
^ Gitler, Samuel; González, Jesús (1 January 2006). Recent Developments in Algebraic Topology: A Conference to Celebrate Sam Gitler's 70th Birthday, December 3–6, 2003, San Miguel de Allende, México. American Mathematical Society. ISBN 9780821836767 – via Google Books.
^ Cohen, Fred R.; Davis, Donald M.; Goerss, Paul G.; Mahowald, Mark E. (1 January 1988). "Integral Brown–Gitler Spectra". Proceedings of the American Mathematical Society. 103 (4): 1299–1304. doi: 10.2307/2047129. JSTOR 2047129.

External links

"Brown-Gitler_spectra", Encyclopedia of Mathematics, EMS Press, 2001 [1994]

Retrieved from " https://en.wikipedia.org/?title=Brown–Gitler_spectrum&oldid=1183370778"

Topology

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