Institutional Repository
Technical University of Crete
EN  |  EL

Search

Browse

My Space

Analytic properties and covariance functions for a new class of generalized gibbs random fields

D.T. Hristopulo, S. Elogne

Full record


URI: http://purl.tuc.gr/dl/dias/7CDE17A9-1EEE-4546-8E0C-D098037807A0
Year 2007
Type of Item Peer-Reviewed Journal Publication
License
Details
Bibliographic Citation D.T. Hristopulos , S. Elogne ," Analytic properties and covariance functions for a new class of generalized Gibbs random fields" , IEEE Tran. on Inf. Th.,vol. 53 ,no. 12, pp.4667-4679,2007f. doi : 10.1109/TIT.2007.909163 https://doi.org/10.1109/TIT.2007.909163
Appears in Collections

Summary

Spartan spatial random fields (SSRFs) are generalized Gibbs random fields, equipped with a coarse-graining kernel that acts as a low-pass filter for the fluctuations. SSRFs are defined by means of physically motivated spatial interactions and a small set of free parameters (interaction couplings). This paper focuses on the fluctuation-gradient-curvature (FGC) SSRF model, henceforth referred to as FGC-SSRF. This model is defined on the Euclidean space R by means of interactions proportional to the squares of the field realizations, as well as their gradient and curvature. The permissibility criteria of FGC-SSRFs are extended by considering the impact of a finite-bandwidth kernel. It is proved that the FGC-SSRFs are almost surely differentiable in the case of finite bandwidth. Asymptotic explicit expressions for the Spartan covariance function are derived for d = 1 and d= 3; both known and new covariance functions are obtained depending on the value of the FGC-SSRF shape parameter. Nonlinear dependence of the covariance integral scale on the FGC-SSRF characteristic length is established, and it is shown that the relation becomes linear asymptotically. The results presented in this paper are useful in random field parameter inference, and in spatial interpolation of irregularly spaced samples.

Services

Statistics