Evaluation of Tranche in Securitization and Long-range Ising Model

Abstract

This econophysics work studies the long-range Ising model of a finite system with N spins and the exchange interaction JN and the external field H as a modely for homogeneous credit portfolio of assets with default probability Pd and default correlation d. Based on the discussion on the (J,H) phase diagram, we develop a perturbative calculation method for the model and obtain explicit expressions for Pd,d and the normalization factor Z in terms of the model parameters N and J,H. The effect of the default correlation d on the probabilities P(Nd,d) for Nd defaults and on the cumulative distribution function D(i,d) are discussed. The latter means the average loss rate of the``tranche'' (layered structure) of the securities (e.g. CDO), which are synthesized from a pool of many assets. We show that the expected loss rate of the subordinated tranche decreases with d and that of the senior tranche increases linearly, which are important in their pricing and ratings.

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