Nonlinear rescaling
Nonlinear rescaling is a method of transforming a function consisting of the constraints of an optimization problem into another equation/problem that is equivalent to the optimal solution for said problem. [1][2]
History[edit]
Roman Polyak published the original paper, titled Nonlinear rescaling and proximal-like methods in convex optimization in February of 1997.[1] The method has seen application in medical [3] and remote sensing settings.[4]
References[edit]
- ↑ 1.0 1.1 Polyak, Roman; Teboulle, Marc (1997). "Nonlinear rescaling and proximal-like methods in convex optimization". Mathematical Programming. Springer Science and Business Media LLC. 76 (2): 265–284. doi:10.1007/bf02614440. ISSN 0025-5610.
- ↑ Polyak, R.; Ho, S. S.; Griva, I. (2007). "Support vector machine via nonlinear rescaling method". Optimization Letters. 1 (4): 367–378.
- ↑ Wei, Bo; Haskell, William B.; Zhao, Sixiang (2020-03-24). "A Randomized Nonlinear Rescaling Method in Large-Scale Constrained Convex Optimization". arXiv.org. Retrieved 2021-02-02.
- ↑ Afshar, M. H.; Yilmaz, M. T. (2017). "The added utility of nonlinear methods compared to linear methods in rescaling soil moisture products". Remote Sensing of Environment. 196: 224–237.
This mathematics-related article is a stub. You can help EverybodyWiki by expanding it. |
This article "Nonlinear rescaling" is from Wikipedia. The list of its authors can be seen in its historical and/or the page Edithistory:Nonlinear rescaling. Articles copied from Draft Namespace on Wikipedia could be seen on the Draft Namespace of Wikipedia and not main one.