In the mathematical discipline of topology, the BrownâGitler spectrum is a spectrum whose cohomology is a certain cyclic module over the Steenrod algebra. [1]
BrownâGitler spectra are defined by the isomorphism: [2]
The concept was introduced by mathematicians Edgar H. Brown and Samuel Gitler in a 1973 paper. [1] [3]
In topology, BrownâGitler spectrum is related to the concepts of the Segal conjecture (proven in 1984) and the Burnside ring. [4]
BrownâGitler spectra have had many important applications in homotopy theory. [5]
In the mathematical discipline of topology, the BrownâGitler spectrum is a spectrum whose cohomology is a certain cyclic module over the Steenrod algebra. [1]
BrownâGitler spectra are defined by the isomorphism: [2]
The concept was introduced by mathematicians Edgar H. Brown and Samuel Gitler in a 1973 paper. [1] [3]
In topology, BrownâGitler spectrum is related to the concepts of the Segal conjecture (proven in 1984) and the Burnside ring. [4]
BrownâGitler spectra have had many important applications in homotopy theory. [5]