摘要
The author introduces a notion of subordination for symmetric Dirichlet forms and proves that the subordination is actually equivalent to the killing transformation by multiplicative functionals in the theory of symmetric Markov processes. This also gives a way to characterize bivariate smooth measures.
The author introduces a notion of subordination for symmetric Dirichlet forms and proves that the subordination is actually equivalent to the killing transformation by multiplicative functionals in the theory of symmetric Markov processes. This also gives a way to characterize bivariate smooth measures.