Bibtex entry: Random potentials for Markov processes in ccm.bib
@Article{Kondratiev2022,
  author       = {Kondratiev, Y. G. and da Silva, J. L.},
  journal      = {Applicable Analysis},
  title        = {{Random potentials for Markov processes}},
  year         = {2022},
  month        = jul,
  note         = {Accepted for publication on July 09, 2022},
  abstract     = {{The paper is devoted to the integral functionals \$\textbackslashint\_0\textasciicircum\textbackslashinfty f(X\_t)\textbackslash,\{\textbackslashmathrm\{d\}t\}\$ of Markov processes in \$\textbackslashX\$ in the case  \$d\textbackslashge 3\$. It is established that such functionals can be presented as the integrals \$\textbackslashint\_\{\textbackslashX\} f(y) \textbackslashG(x, \textbackslashmathrm\{d\}y, \textbackslashomega)\$ with  vector valued random measure \$\textbackslashG(x, \textbackslashmathrm\{d\}y, \textbackslashomega)\$. Some examples such as compound Poisson processes, Brownian motion and diffusions  are considered.}},
  doi          = {10.1080/00036811.2022.2101453},
  journaltitle = {Applicable Analysis},
  keywords     = {Green function, Random Green function, Markov processes},
  local-url    = {file://localhost/Users/jluis/Documents/Papers%20Library/2022/Kondratiev/2022-Kondratiev_1.pdf},
  rating       = {0},
}