EHP spectral sequence

In mathematics, the EHP spectral sequence is a spectral sequence used for inductively calculating the homotopy groups of spheres localized at some prime p. It is described in more detail in Script error: No such module "Footnotes". and Script error: No such module "Footnotes".. It is related to the EHP long exact sequence of Script error: No such module "Footnotes".; the name "EHP" comes from the fact that George W. Whitehead named 3 of the maps of his sequence "E" (the first letter of the German word "Einhängung" meaning "suspension"), "H" (for Heinz Hopf, as this map is the second Hopf–James invariant), and "P" (related to Whitehead products).

For ${\displaystyle p=2}$ the spectral sequence uses some exact sequences associated to the fibration Script error: No such module "Footnotes".

${\displaystyle S^n(2)\to \mathrm{\Omega }{S}^{n+1}(2)\to \mathrm{\Omega }{S}^{2n+1}(2)}$,

where ${\displaystyle \mathrm{\Omega }}$ stands for a loop space and the (2) is localization of a topological space at the prime 2. This gives a spectral sequence with ${\displaystyle E_1^{k,n}}$ term equal to

${\displaystyle {\pi }_{k+n}(S^{2n-1}(2))}$

and converging to ${\displaystyle {\pi }_{*}^S(2)}$ (stable homotopy groups of spheres localized at 2). The spectral sequence has the advantage that the input is previously calculated homotopy groups. It was used by Script error: No such module "Footnotes". to calculate the first 31 stable homotopy groups of spheres.

For arbitrary primes one uses some fibrations found by Script error: No such module "Footnotes".:

${\displaystyle {\hat{S}}^{2n}(p)\to \mathrm{\Omega }{S}^{2n+1}(p)\to \mathrm{\Omega }{S}^{2pn+1}(p)}$

${\displaystyle S^{2n-1}(p)\to \mathrm{\Omega }{\hat{S}}^{2n}(p)\to \mathrm{\Omega }{S}^{2pn-1}(p)}$

where ${\displaystyle {\hat{S}}^{2n}}$ is the ${\displaystyle (2np-1)}$-skeleton of the loop space ${\displaystyle \mathrm{\Omega }{S}^{2n+1}}$. (For ${\displaystyle p=2}$, the space ${\displaystyle {\hat{S}}^{2n}}$ is the same as ${\displaystyle S^{2n}}$, so Toda's fibrations at ${\displaystyle p=2}$ are the same as the James fibrations.)

References

Template:Sfn whitelist

• Script error: No such module "citation/CS1".
• Template:Springer
• Script error: No such module "citation/CS1".
• Script error: No such module "citation/CS1".
• Script error: No such module "citation/CS1".
• Script error: No such module "citation/CS1".

Template:Asbox