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Fixed minor problems
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Daniel Asimov
Daniel Asimov
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Motivation:

  • The representation is very clean in the Hopf fibration case (2n=2,4,8).
  • These maps are known since Serres 51Serre's 1951 paper.
  • There are clean generators for the only other infinite case $\pi_n(S^n)$.

Motivation:

  • The representation is very clean in the Hopf fibration case (2n=2,4,8).
  • These maps are known since Serres 51 paper.
  • There are clean generators for the only other infinite case $\pi_n(S^n)$.

Motivation:

  • The representation is very clean in the Hopf fibration case (2n=2,4,8).
  • These maps are known since Serre's 1951 paper.
  • There are clean generators for the only other infinite case $\pi_n(S^n)$.
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David Lehavi
David Lehavi
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Are there “nice” explicit representations of infinite order elements in $\pi_{4n-1}(S^{2n})$

Motivation:

  • The representation is very clean in the Hopf fibration case (2n=2,4,8).
  • These maps are known since Serres 51 paper.
  • There are clean generators for the only other infinite case $\pi_n(S^n)$.