Dirichlet forms for singular diffusion on graphs

Seifert, Christian; Voigt, Jürgen

Dirichlet forms for singular diffusion on graphs

Publikationstyp

Journal Article

Date Issued

2011-01-01

Sprache

English

Author(s)

Seifert, Christian

Voigt, Jürgen

Institut

Mathematik E-10

TORE-URI

http://hdl.handle.net/11420/11157

Journal

Operators and matrices

Volume

5

Issue

4

Start Page

723

End Page

734

Citation

Operators and Matrices 5 (4): 723-734 (2011)

Publisher DOI

10.7153/oam-05-51

Scopus ID

2-s2.0-84884229193

Publisher

Element

Peer Reviewed

true

We describe operators driving the time evolution of singular diffusion on finite graphs whose vertices are allowed to carry masses. The operators are defined by the method of quadratic forms on suitable Hilbert spaces. The model also covers quantum graphs and discrete Laplace operators.

Subjects

C0 -semigroup

Dirichlet form

Gap diffusion

Positive

Quantum graph

Submarkovian

DDC Class

510: Mathematik

Options

Dirichlet forms for singular diffusion on graphs