AbstractThis paper analyzes the continuity and differentiability of several classes of ruin functions under Markov-modulated insurance risk models with a barrier and threshold dividend strategy, respectively. Many ruin related functions in the literature, such as the expectation and the Laplace transform of the Gerber–Shiu discounted penalty function at ruin, of the total discounted dividends until ruin, and of the time-integrated discounted penalty and/or reward function of the risk process, etc, are special cases of the functions considered in this paper. Continuity and differentiability of these functions in the corresponding dual models are also studied
AbstractWe consider a classical risk process compounded by another independent process. Both of thes...
In this paper, a Markovian risk model with two-type claims is considered. In such a risk model, the ...
In this paper, we consider the Markov-modulated insurance risk model with tax. We assume that the cl...
This paper analyzes the continuity and differentiability of several classes of ruin functions under ...
AbstractThis paper analyzes the continuity and differentiability of several classes of ruin function...
In this paper we consider a Markov-modulated risk model, where the premium rates, claim frequency an...
In the literature of ruin theory, there have been extensive studies trying to generalize the classic...
In this paper, we study a Markov regime-switching risk model where dividends are paid out according ...
In this paper, we consider the compound Poisson risk model influenced by an external Markovian envir...
Risk theory has been a very active research area over the last decades. The main objectives of the t...
In this paper we consider Markov-modulated diffusion risk reserve processes. Using diffusion approxi...
We study the ruin problem for insurance models that involve investments. Our risk reserve process is...
In the context of classical ruin theory, ruin quantities (e.g. ruin probability and the time of ruin...
In this paper, a risk model where claims arrive according to a Markovian arrival process (MAP) is co...
© 2014 Dr. Jingchao LIIn recent years, there have been many studies on ruin related quantities. In p...
AbstractWe consider a classical risk process compounded by another independent process. Both of thes...
In this paper, a Markovian risk model with two-type claims is considered. In such a risk model, the ...
In this paper, we consider the Markov-modulated insurance risk model with tax. We assume that the cl...
This paper analyzes the continuity and differentiability of several classes of ruin functions under ...
AbstractThis paper analyzes the continuity and differentiability of several classes of ruin function...
In this paper we consider a Markov-modulated risk model, where the premium rates, claim frequency an...
In the literature of ruin theory, there have been extensive studies trying to generalize the classic...
In this paper, we study a Markov regime-switching risk model where dividends are paid out according ...
In this paper, we consider the compound Poisson risk model influenced by an external Markovian envir...
Risk theory has been a very active research area over the last decades. The main objectives of the t...
In this paper we consider Markov-modulated diffusion risk reserve processes. Using diffusion approxi...
We study the ruin problem for insurance models that involve investments. Our risk reserve process is...
In the context of classical ruin theory, ruin quantities (e.g. ruin probability and the time of ruin...
In this paper, a risk model where claims arrive according to a Markovian arrival process (MAP) is co...
© 2014 Dr. Jingchao LIIn recent years, there have been many studies on ruin related quantities. In p...
AbstractWe consider a classical risk process compounded by another independent process. Both of thes...
In this paper, a Markovian risk model with two-type claims is considered. In such a risk model, the ...
In this paper, we consider the Markov-modulated insurance risk model with tax. We assume that the cl...