APPENDIX D
Multiple Bond Survival Probabilities Given Correlated Default Probability Rates
Let the survival probability of bond 1 be s1 and the default probability be p1Δt over a time period Δt, then
s1 = 1 − p1Δt.
If we introduce the idea of an expectation probability for default, then
p1
(1) = p1Δt,
s1(1) = s1 = 1 − p1Δt
where the superscript denotes the fact that the probability is in a system with only one variable (bond).
We introduce correlation for a pair of bonds 1 and 2, by making the double default pobability different to the product of the uncorrelated probabilities by introducing a “mixing parameter” α12,
p1p2(2) = (p1Δt)(p2Δt) + α12(p1Δts2 + s1p2Δt),
p1(2) = p1Δt + α12s1p2Δt.
This ...
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