Scale calculus problems
Scale calculus was developed to make reparametrization actions on function spaces smooth. All the key issues and ideas can already be seen at the example of acting on a space of nonconstant functions on , for example the shift action
The purpose of the following exercises is to give the quotient of S^1-valued functions homotopic to the identity, modulo reparametrization by shifts, the structure of a scale-smooth manifold ... and to see that classical Banach space topologies fail at giving it a differentiable Banach manifold structure.
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differentiability of shift map
Compute the directional derivatives of the shift map , first at , then at .
Next, understand how to identify , and write down a conjectural formula for the differential .
Then recall the definition of differentiability in terms of uniform linear approximation and see whether it can be satisfied at any base point .
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local charts
Verify that has local Banach manifold charts modeled on . To set up a chart near a given point, pick a representative with and consider the map
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transition maps
For with representatives but determine the transition map .
Then find an example of a point and direction in which this transition map is not differentiable.
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alternative Banach norms
Explain why working with , H\"older, or Sobolev spaces does not resolve these differentiabliity issues. Possibly come up with other ideas for a Banach manifold structure on .
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reparametrization on Riemann surfaces
Explore the same questions for a space of nonconstant functions on a Riemann surface modulo the reparametrization action of a nontrivial automorphism group (e.g. ).
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scale smoothness of the shift map
Show that the shift action is a scale-smooth map by the following steps:
a) find a scale-Banach space with
b) show that is and calculate
c) iteratively show that is for all k
Note: The actual map above is a restriction of the map to the subset given by embedding .