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0
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41 views

How inplement monte carlo simulation in bdt model ? (interest rate)

I want to implement monte carlo method in Black–Derman–Toy model to preview short interest rates. $$d\ln r_t=(\theta_t+\frac{\sigma'_t}{\sigma_t}\ln r_t)dt+\sigma_tdW_t$$ Someone can explain what ...
0
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0answers
67 views

BDT model calibration using swaptions

I am using the Black-Derman-Toy model in a binomial tree that lasts 5 years with time increments of 1/12 . I have to calibrate my model using swaptions but I don't know which maturity I should use. I ...
2
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2answers
1k views

How to express the Black Derman & Toy Model in a $dr=A\,dt+B\, dW$ form?

The Black Derman & Toy (BDT) model is given by $$d(\ln\,r)=\left(\theta(t)-\frac {d(\ln\sigma(t))}{dt}\ln r\right)\,dt+\sigma(t) \, dW.$$ How can one rewrite the BDT model as $dr=A\,dt+B\, dW$, ...
4
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2answers
710 views

BDT model implementation

I am looking for a nice and readable description of how to implement BDT model: $d log(r(t)) = [\theta(t)-\frac{\sigma'(t)}{\sigma(t)}log(r(t))]dt + \sigma(t) dW$. I assume I already have steady-...
12
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2answers
815 views

Applicability of PCA to get historical volatilities to calibrate interest rates trees

My question in short is as follows: can I take main principal component of historical covariance matrix and use it as historical volatilities when fitting a binomial tree? Here's more detailed ...