We analyze the general Lévy insurance risk process for Lévy measures in the convolution equivalence class S(α), α > 0, via a new kind of path decomposition. This yields a very general functional limit theorem as the initial reserve level u → ∞, and a host of new results for functionals of interest in insurance risk. Particular emphasis is placed on the time to ruin, which is shown to have a proper limiting distribution, as u → ∞, conditional on ruin occurring under our assumptions. Existing asymptotic results under the S(α) assumption are synthesized and extended, and proofs are much simpli- fied, by comparison with previous methods specific to the convolution equivalence analyses. Additionally, limiting expressions for penalty fun...
23 pages, 4 figuresThe field of risk theory has traditionally focused on ruin-related quantities. In...
We consider a risk reserve process whose premium rate reduces from cd to cu when the reserve comes a...
Using fluctuation theory, we solve the two-sided exit problem and identify the ruin probability for ...
We analyse the general Levy insurance risk process for Levy measures in the convolution equivalence ...
We formulate the insurance risk process in a general Levy process setting, and give general theorem...
AbstractAssume that a compound Poisson surplus process is invested in a stochastic interest process ...
© 2012 Dr. Ciyu (Jade) NieIn this thesis we present a new model, namely the lower barrier model, bas...
Risk theory has been a very active research area over the last decades. The main objectives of the t...
Recent models of the insurance risk process use a Levy process to generalise the traditional Cramer-...
In this paper we develop a symbolic technique to obtain asymptotic expressions for ruin probabilitie...
In this paper we investigate the number and maximum severity of the ruin excursion of the insurance ...
In this paper we consider the ruin probabilities of a multidimensional insurance risk model perturbe...
AbstractFor certain Gaussian processes X(t) with trend −ctβ and variance V2(t), the ruin time is ana...
AbstractWe consider the classical model for an insurance business where the claims occur according t...
In this short paper, we investigate a definition of Parisian ruin introduced in [3], namely Parisian...
23 pages, 4 figuresThe field of risk theory has traditionally focused on ruin-related quantities. In...
We consider a risk reserve process whose premium rate reduces from cd to cu when the reserve comes a...
Using fluctuation theory, we solve the two-sided exit problem and identify the ruin probability for ...
We analyse the general Levy insurance risk process for Levy measures in the convolution equivalence ...
We formulate the insurance risk process in a general Levy process setting, and give general theorem...
AbstractAssume that a compound Poisson surplus process is invested in a stochastic interest process ...
© 2012 Dr. Ciyu (Jade) NieIn this thesis we present a new model, namely the lower barrier model, bas...
Risk theory has been a very active research area over the last decades. The main objectives of the t...
Recent models of the insurance risk process use a Levy process to generalise the traditional Cramer-...
In this paper we develop a symbolic technique to obtain asymptotic expressions for ruin probabilitie...
In this paper we investigate the number and maximum severity of the ruin excursion of the insurance ...
In this paper we consider the ruin probabilities of a multidimensional insurance risk model perturbe...
AbstractFor certain Gaussian processes X(t) with trend −ctβ and variance V2(t), the ruin time is ana...
AbstractWe consider the classical model for an insurance business where the claims occur according t...
In this short paper, we investigate a definition of Parisian ruin introduced in [3], namely Parisian...
23 pages, 4 figuresThe field of risk theory has traditionally focused on ruin-related quantities. In...
We consider a risk reserve process whose premium rate reduces from cd to cu when the reserve comes a...
Using fluctuation theory, we solve the two-sided exit problem and identify the ruin probability for ...