Wen Chao scite author profile

Wen Chao

5Publications

25Citation Statements Received

36Citation Statements Given

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Affiliations

Fujian University of Technology, Fuzhou University

Publications

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Multiple-Event Catastrophe Bond Pricing Based on CIR-Copula-POT Model

Chao

Zou

2018

Discrete Dynamics in Nature and Society

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Catastrophe events are attracting increased attention because of their devastating consequences. Aimed at the nonlinear dependency and tail characteristics of different triggered indexes of multiple-event catastrophe bonds, this paper applies Copula function and the extreme value theory to multiple-event catastrophe bond pricing. At the same time, floating coupon and principal payoff structures are adopted instead of fixed coupon and principal payoff structures, to reduce moral hazard and improve bond attractiveness. Furthermore, we develop a CIR-Copula-POT bond pricing model with CIR stochastic rate and estimate flood multiple-event triggered catastrophe bond price using Monte Carlo simulation method. Finally, we implement the sensitivity analysis to show how catastrophe intensity, maturity date, and the dependence affect the prices of catastrophe bonds.

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Existence of positive solutions for nonlocal problems with indefinite nonlinearity

Qian

Chao

2020

Bound Value Probl

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Positive solutions for a Kirchhoff type problem with fast increasing weight and critical nonlinearity

Qian¹,

Chao²

2019

Electron. J. Qual. Theory Differ. Equ.

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Existence and concentration of ground state solutions for a class of nonlocal problem in RN

Qian

Chao

2021

Nonlinear Analysis

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Valuing Multirisk Catastrophe Reinsurance Based on the Cox–Ingersoll–Ross (CIR) Model

Chao

2021

Discrete Dynamics in Nature and Society

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Catastrophe risks lead to severe problems of insurance and reinsurance industry. In order to reduce the underwriting risk, the insurer would seek protection by transferring part of its risk exposure to the reinsurer. A framework for valuing multirisk catastrophe reinsurance under stochastic interest rates driven by the CIR model shall be discussed. To evaluate the distribution and the dependence of catastrophe variables, the Peaks over Threshold model and Copula function are used to measure them, respectively. Furthermore, the parameters of the valuing model are estimated and calibrated by using the Global Flood Date provided by Dartmouth College from 2000 to 2016. Finally, the value of catastrophe reinsurance is derived and a sensitivity analysis of how stochastic interest rates and catastrophe dependence affect the values is performed via Monte Carlo simulations. The results obtained show that the catastrophe reinsurance value is the inverse relation between initial value of interest rate and average interest rate in the long run. Additionally, a high level of dependence between catastrophe variables increases the catastrophe reinsurance value. The findings of this paper may be interesting to (re)insurance companies and other financial institutions that want to transfer catastrophic risks.

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Wen Chao

Multiple-Event Catastrophe Bond Pricing Based on CIR-Copula-POT Model

Existence of positive solutions for nonlocal problems with indefinite nonlinearity

Positive solutions for a Kirchhoff type problem with fast increasing weight and critical nonlinearity

Existence and concentration of ground state solutions for a class of nonlocal problem in RN

Valuing Multirisk Catastrophe Reinsurance Based on the Cox–Ingersoll–Ross (CIR) Model

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