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Mikhail Bondarko
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On the relation of motivic"topological" Hopf map eta and its relation to the "topological"motivic one

Morel has defined the motivic Hopf map $\eta$ (in the motivic stable homotopy category $SH(k)$). I suspect that the following facts are valid for it and its topological "cousin"; please correct me if they are false and give me some (nice) references if they are true.

  1. For the topological Hopf map we have $\eta^4=0$.

  2. The action ot the topological $\eta$ on the values of oriented cohomology theories is zero.

  3. If $k$ is the field of complex numbers then the "topological realization" of motivic $\eta$ is the topological Hopf morphism in $SH$ (also denoted by $\eta$?).

  4. For the topological Hopf map we have $\eta^4=0$.

  5. The action ot the topological $\eta$ on the values of ("topological") oriented cohomology theories is zero.

On the relation of motivic Hopf map eta to the "topological" one

Morel has defined the motivic Hopf map $\eta$ (in the motivic stable homotopy category $SH(k)$). I suspect that the following facts are valid for it and its topological "cousin"; please correct me if they are false and give me some (nice) references if they are true.

  1. If $k$ is the field of complex numbers then the "topological realization" of motivic $\eta$ is the topological Hopf morphism in $SH$ (also denoted by $\eta$?).

  2. For the topological Hopf map we have $\eta^4=0$.

  3. The action ot the topological $\eta$ on the values of ("topological") oriented cohomology theories is zero.

On "topological" Hopf map eta and its relation to the motivic one

Morel has defined the motivic Hopf map $\eta$ (in the motivic stable homotopy category $SH(k)$). I suspect that the following facts are valid for it and its topological "cousin"; please correct me if they are false and give me some (nice) references if they are true.

  1. For the topological Hopf map we have $\eta^4=0$.

  2. The action ot the topological $\eta$ on the values of oriented cohomology theories is zero.

  3. If $k$ is the field of complex numbers then the "topological realization" of motivic $\eta$ is the topological Hopf morphism in $SH$ (also denoted by $\eta$?).

Source Link
Mikhail Bondarko
  • 16.9k
  • 4
  • 34
  • 99

On the relation of motivic Hopf map eta to the "topological" one

Morel has defined the motivic Hopf map $\eta$ (in the motivic stable homotopy category $SH(k)$). I suspect that the following facts are valid for it and its topological "cousin"; please correct me if they are false and give me some (nice) references if they are true.

  1. If $k$ is the field of complex numbers then the "topological realization" of motivic $\eta$ is the topological Hopf morphism in $SH$ (also denoted by $\eta$?).

  2. For the topological Hopf map we have $\eta^4=0$.

  3. The action ot the topological $\eta$ on the values of ("topological") oriented cohomology theories is zero.