Compactness of certain integral operators (2005)(en)(3s) by Garrett P.

By Garrett P.

Show description

Read Online or Download Compactness of certain integral operators (2005)(en)(3s) PDF

Best mathematics books

Mathematical Magic Show

This is often the 8th selection of Martin Gardner's Mathematical video games columns which were showing per thirty days in medical American given that December 1956.

Amsco's Algebra Two and Trigonometry

Algebra 2 trigonometry textbook will train scholars every little thing there's to understand made effortless!

Additional resources for Compactness of certain integral operators (2005)(en)(3s)

Sample text

Geom. Dedicata, 91(1):117–135, 2002. [96] A. Procacci and B. Scoppola. Infinite graphs with a nontrivial bond percolation threshold: some sufficient conditions. J. Statist. , 115(3-4):1113–1127, 2004. [97] Y. Shapir, A. B. Harris. Localization and quantum percolation. Phys. Rev. , 49(7):486–489, 1982. [98] B. Simon. Lifschitz tails for the Anderson model. J. Statist. , 38:65–76, 1985. [99] B. Simon. Internal Lifschitz tails. J. Statist. , 46(5-6):911–918, 1987. [100] F. Sobieczky. An interlacing technique for spectra of random walks and its application to finite percolation clusters.

Phys. (8), 7(5-6):400–405, 1998. W. Kantelhardt and A. Bunde. Sublocalization, superlocalization, and violation of standard single-parameter scaling in the Anderson model. Phys. Rev. B, 66, 2002. [48] H. Kesten. Symmetric random walks on groups. Trans. Amer. Math. , 92:336– 354, 1959. [49] H. Kesten. Percolation theory for mathematicians, volume 2 of Progress in Probability and Statistics. Birkh¨ auser, Boston, 1982. [50] S. P. Eggarter. Localized states of a binary alloy. Phys. Rev. B, 6:3598, 1972.

Groups of polynomial growth and expanding maps. Inst. Hautes Etudes Sci. Publ. , 53:53–73, 1981. [43] M. A. Shubin. von Neumann spectra near zero. Geom. Funct. , 1(4):375–404, 1991. W. Kantelhardt and A. Bunde. Electrons and fractons on percolation structures at criticality: Sublocalization and superlocalization. Phys. Rev. E, 56:6693–6701, 1997. W. Kantelhardt and A. Bunde. Extended fractons and localized phonons on percolation clusters. Phys. Rev. , 81:4907–4910, 1998. W. Kantelhardt and A. Bunde.

Download PDF sample

Rated 4.31 of 5 – based on 29 votes