In mathematics, a nonlocal operator is a mapping which maps functions on a topological space to functions, in such a way that the value of the output function at a given point cannot be determined solely from the values of the input function in any neighbourhood of any point. An example of a nonlocal operator is the Fourier transform.

Formal definition

edit

Let   be a topological space,   a set,   a function space containing functions with domain  , and   a function space containing functions with domain  . Two functions   and   in   are called equivalent at   if there exists a neighbourhood   of   such that   for all  . An operator   is said to be local if for every   there exists an   such that   for all functions   and   in   which are equivalent at  . A nonlocal operator is an operator which is not local.

For a local operator it is possible (in principle) to compute the value   using only knowledge of the values of   in an arbitrarily small neighbourhood of a point  . For a nonlocal operator this is not possible.

Examples

edit

Differential operators are examples of local operators[citation needed]. A large class of (linear) nonlocal operators is given by the integral transforms, such as the Fourier transform and the Laplace transform. For an integral transform of the form

 

where   is some kernel function, it is necessary to know the values of   almost everywhere on the support of   in order to compute the value of   at  .

An example of a singular integral operator is the fractional Laplacian

 

The prefactor   involves the Gamma function and serves as a normalizing factor. The fractional Laplacian plays a role in, for example, the study of nonlocal minimal surfaces.[1]

Applications

edit

Some examples of applications of nonlocal operators are:

See also

edit

References

edit
  1. ^ Caffarelli, L.; Roquejoffre, J.-M.; Savin, O. (2010). "Nonlocal minimal surfaces". Communications on Pure and Applied Mathematics. 63 (9): 1111–1144. arXiv:0905.1183. doi:10.1002/cpa.20331. S2CID 10480423.
  2. ^ Buades, A.; Coll, B.; Morel, J.-M. (2005). "A Non-Local Algorithm for Image Denoising". 2005 IEEE Computer Society Conference on Computer Vision and Pattern Recognition (CVPR'05). Vol. 2. San Diego, CA, USA: IEEE. pp. 60–65. doi:10.1109/CVPR.2005.38. ISBN 9780769523729. S2CID 11206708.
edit
  NODES
Note 1