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In size theory, the natural pseudodistance between two size pairs (M,φ:M), (N,ψ:N) is the value infhφψh, where h varies in the set of all homeomorphisms from the manifold M to the manifold N and is the supremum norm. If M and N are not homeomorphic, then the natural pseudodistance is defined to be . It is usually assumed that M, N are C1 closed manifolds and the measuring functions φ,ψ are C1. Put another way, the natural pseudodistance measures the infimum of the change of the measuring function induced by the homeomorphisms from M to N.

The concept of natural pseudodistance can be easily extended to size pairs where the measuring function φ takes values in m .[1]

Main properties

It can be proved [2] that the natural pseudodistance always equals the Euclidean distance between two critical values of the measuring functions (possibly, of the same measuring function) divided by a suitable positive integer k. If M and N are surfaces, the number k can be assumed to be 1, 2 or 3.[3] If M and N are curves, the number k can be assumed to be 1 or 2.[4] If an optimal homeomorphism h¯ exists (i.e., φψh¯=infhφψh), then k can be assumed to be 1.[2]

See also

References

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  1. Patrizio Frosini, Michele Mulazzani, Size homotopy groups for computation of natural size distances, Bulletin of the Belgian Mathematical Society - Simon Stevin, 6:455-464, 1999.
  2. 2.0 2.1 Pietro Donatini, Patrizio Frosini, Natural pseudodistances between closed manifolds, Forum Mathematicum, 16(5):695-715, 2004.
  3. Pietro Donatini, Patrizio Frosini, Natural pseudodistances between closed surfaces, Journal of the European Mathematical Society, 9(2):231–253, 2007.
  4. Pietro Donatini, Patrizio Frosini, Natural pseudodistances between closed curves, Forum Mathematicum, 21(6):981–999, 2009.