Natural pseudodistance

In size theory, the natural pseudodistance between two size pairs ${\displaystyle (M,\phi :M\to ℝ)}$, ${\displaystyle (N,\psi :N\to ℝ)}$ is the value ${\displaystyle \underset{h}{\inf }\Vert \phi -\psi \circ h{\Vert }_{\mathrm{\infty }}}$, where ${\displaystyle h}$ varies in the set of all homeomorphisms from the manifold ${\displaystyle M}$ to the manifold ${\displaystyle N}$ and ${\displaystyle \Vert \cdot {\Vert }_{\mathrm{\infty }}}$ is the supremum norm. If ${\displaystyle M}$ and ${\displaystyle N}$ are not homeomorphic, then the natural pseudodistance is defined to be ${\displaystyle \mathrm{\infty }}$. It is usually assumed that ${\displaystyle M}$, ${\displaystyle N}$ are ${\displaystyle C^1}$ closed manifolds and the measuring functions ${\displaystyle \phi ,\psi }$ are ${\displaystyle C^1}$. Put another way, the natural pseudodistance measures the infimum of the change of the measuring function induced by the homeomorphisms from ${\displaystyle M}$ to ${\displaystyle N}$.

The concept of natural pseudodistance can be easily extended to size pairs where the measuring function ${\displaystyle \phi }$ takes values in ${\displaystyle {ℝ}^m}$ .^[1] When ${\displaystyle M=N}$, the group ${\displaystyle H}$ of all homeomorphisms of ${\displaystyle M}$ can be replaced in the definition of natural pseudodistance by a subgroup ${\displaystyle G}$ of ${\displaystyle H}$, so obtaining the concept of natural pseudodistance with respect to the group ${\displaystyle G}$.^[2][3] Lower bounds and approximations of the natural pseudodistance with respect to the group ${\displaystyle G}$ can be obtained both by means of ${\displaystyle G}$-invariant persistent homology^[4] and by combining classical persistent homology with the use of G-equivariant non-expansive operators.^[2][3]

It can be proved ^[5] 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 ${\displaystyle k}$. If ${\displaystyle M}$ and ${\displaystyle N}$ are surfaces, the number ${\displaystyle k}$ can be assumed to be ${\displaystyle 1}$, ${\displaystyle 2}$ or ${\displaystyle 3}$.^[6] If ${\displaystyle M}$ and ${\displaystyle N}$ are curves, the number ${\displaystyle k}$ can be assumed to be ${\displaystyle 1}$ or ${\displaystyle 2}$.^[7] If an optimal homeomorphism ${\displaystyle \overline{h}}$ exists (i.e., ${\displaystyle \Vert \phi -\psi \circ \overline{h}{\Vert }_{\mathrm{\infty }}=\underset{h}{\inf }\Vert \phi -\psi \circ h{\Vert }_{\mathrm{\infty }}}$), then ${\displaystyle k}$ can be assumed to be ${\displaystyle 1}$.^[5] The research concerning optimal homeomorphisms is still at its very beginning .^[8][9]

• Fréchet distance
• Size function
• Size functor
• Size homotopy group

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