Journal article
Computing the selection gradient and evolutionary response of an infinite-dimensional trait
Journal of mathematical biology, Vol.36(3), pp.299-319
02/1998
Handle:
https://hdl.handle.net/2376/114873
Abstract
Following the results developed in a previous paper, an equation describing the evolutionary response to selection is extended from finite- to infinite-dimensional traits. The selection gradient and evolutionary response are then computed for a large class of infinite-dimensional traits of broad biological interest. In this framework, traits are modeled as Gaussian processes, and reproducing kernel Hilbert spaces constitute a primary tool.
Metrics
5 Record Views
Details
- Title
- Computing the selection gradient and evolutionary response of an infinite-dimensional trait
- Creators
- Jay H Beder - Department of Mathematical Sciences, University of Wisconsin, Milwaukee, WI 53201, USA (e-mail: beder@csd.uwm.edu) USRichard Gomulkiewicz - Department of Pure and Applied Mathematics, and Department of Genetics and Cell Biology, Washington State University, Pullman, WA 99164, USA e-mail: gomulki@wsu.edu US
- Publication Details
- Journal of mathematical biology, Vol.36(3), pp.299-319
- Academic Unit
- Biological Sciences, School of
- Publisher
- Springer-Verlag; Berlin/Heidelberg
- Identifiers
- 99900547459301842
- Language
- English
- Resource Type
- Journal article