| 【外文摘要】: | From the viewpoint of the bankrupt risk of a typical bank, this dissertation studied the relationships among regulation, competition or interaction, risk and revenue in a systematic method and quantitative economic model on the base of some credit risk management tools. In fact, we developed Mean-CVaR model from the new tail risk management tool, CVaR, and tried to do some research on how a bank allocates its economic capital and assets(or debts) and the influence on banks from their interactions under the given regulation environment. We proved that the model of Mean-CVaR not only has some good properties as CVaR but also can be widely used in theoretical and empirical research on the form of linear or non-linear model under some regular conditions. On the available data of American commercial banks and computer simulation, we drove some important conclusions from the numberical results of Mean-CVaR model. Some main conclusions were described as following: (1) the result of the bankrupt risk and revenue allocation from the model of Mean-CVaR can be more efficient than the model of CVaR; (2) the result of bankrupt risk and revenue allocation from the model of Mean-CVaR is highly sensitive to the length of sample data; (3) the demand for risk capital reserve doesn’t have positive relationship with the revenue from risk operations and the relationship between them de facto depends on the objection of each bank operation; (4) there are minimal and optimal demands for capital scale in the oligopoly banking under Mean-CVaR model. At the same time, the competition among banks will make a significant effect on the efficiency of bank risk operations and those big banks have a special strategic advantage because of higher exit barrier than small banks; (5) Mean-CVaR model can be seemed as a systematic risk management framework, into which other basic risk management tools could be included. If we put Mean-CVaR model in bank daily operations to get the best allocation of assets (debts) and economic capital, the key problem is to how to classify and re-construct assets (debts) by the real rate of return on assets (rate of cost on debts). We also put forward risk-adjusted rate of return on capital and risk-adjusted marginal rate of return on capital by the model of Mean-CVaR to measure and compare the efficiency of bank risk operation after taking account of capital scale. In the field of empirical research on bank performance, Mean-CVaR not only specifies two important variables: capital scale and competition environment, but also overcomes the selection bias of sample data and improves the accuracy and rationality of model specification. Finally, we must point out if some regular conditions can’t be satisfied, Mean-CVaR model won’t be a good benchmark for the allocation of bankrupt risk capital reserve and revenue. |
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