数学物理学报(英文版) ›› 2016, Vol. 36 ›› Issue (6): 1683-1698.doi: 10.1016/S0252-9602(16)30099-6

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ON GENERALIZED FEYNMAN-KAC TRANSFORMATION FOR MARKOV PROCESSES ASSOCIATED WITH SEMI-DIRICHLET FORMS

韩新方, 马丽   

  1. Department of Mathematics and Statistics, Hainan Normal University, Haikou 571158, China
  • 收稿日期:2015-06-02 修回日期:2015-10-02 出版日期:2016-12-25 发布日期:2016-12-25
  • 通讯作者: Li MA,E-mail:malihnsd@163.com E-mail:xfanghan@163.com
  • 作者简介:Xinfang HAN,E-mail:xfanghan@163.com
  • 基金资助:

    This paper is supported by NSFC (11201102, 11326169, 11361021) and Natural Science Foundation of Hainan Province (112002, 113007).

ON GENERALIZED FEYNMAN-KAC TRANSFORMATION FOR MARKOV PROCESSES ASSOCIATED WITH SEMI-DIRICHLET FORMS

Xinfang HAN, Li MA   

  1. Department of Mathematics and Statistics, Hainan Normal University, Haikou 571158, China
  • Received:2015-06-02 Revised:2015-10-02 Online:2016-12-25 Published:2016-12-25
  • Contact: Li MA,E-mail:malihnsd@163.com E-mail:xfanghan@163.com
  • Supported by:

    This paper is supported by NSFC (11201102, 11326169, 11361021) and Natural Science Foundation of Hainan Province (112002, 113007).

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摘要:

Suppose that X is a right process which is associated with a semi-Dirichlet form (ε, D(ε)) on L2(E; m). Let J be the jumping measure of (ε, D(ε)) satisfying J(E×E-d)<∞. Let uD(ε)b:=D(ε)∩L(E; m), we have the following Fukushima's decomposition ?(Xt)-?(X0)=Mtu+Ntu. Define Ptuf(x)=Ex[eNtuf(Xt)]. Let Qu(f, g)=ε(f, g)+ε(u, fg) for f, gD(ε)b. In the first part, under some assumptions we show that (Qu, D(ε)b) is lower semi-bounded if and only if there exists a constant α0≥0 such that ||Ptu||2≤eα0t for every t>0. If one of these assertions holds, then (Ptu)t≥0 is strongly continuous on L2(E; m). If X is equipped with a differential structure, then under some other assumptions, these conclusions remain valid without assuming J(E×E-d)<∞. Some examples are also given in this part. Let At be a local continuous additive functional with zero quadratic variation. In the second part, we get the representation of At and give two sufficient conditions for PtAf(x)=Ex[eAtf(Xt)] to be strongly continuous.

关键词: semi-Dirichlet form, generalized Feynman-Kac semigroup, strong continuity, lower semi-bounded, representation of local continuous additive functional with zero quadratic variation

Abstract:

Suppose that X is a right process which is associated with a semi-Dirichlet form (ε, D(ε)) on L2(E; m). Let J be the jumping measure of (ε, D(ε)) satisfying J(E×E-d)<∞. Let uD(ε)b:=D(ε)∩L(E; m), we have the following Fukushima's decomposition ?(Xt)-?(X0)=Mtu+Ntu. Define Ptuf(x)=Ex[eNtuf(Xt)]. Let Qu(f, g)=ε(f, g)+ε(u, fg) for f, gD(ε)b. In the first part, under some assumptions we show that (Qu, D(ε)b) is lower semi-bounded if and only if there exists a constant α0≥0 such that ||Ptu||2≤eα0t for every t>0. If one of these assertions holds, then (Ptu)t≥0 is strongly continuous on L2(E; m). If X is equipped with a differential structure, then under some other assumptions, these conclusions remain valid without assuming J(E×E-d)<∞. Some examples are also given in this part. Let At be a local continuous additive functional with zero quadratic variation. In the second part, we get the representation of At and give two sufficient conditions for PtAf(x)=Ex[eAtf(Xt)] to be strongly continuous.

Key words: semi-Dirichlet form, generalized Feynman-Kac semigroup, strong continuity, lower semi-bounded, representation of local continuous additive functional with zero quadratic variation

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