I need some help with pricing of ZCB under CIR.
CIR model: d r=a∗(b − r)dt+σ√r dW,
we know that to price a ZCB we have to change probability and we opteined:
dr=â∗(b^ − r)dt+σ√r dW (under Q probability risk-neutral), where â=a +σλ and b^=a*b/(a+σλ), λ is a costant.
My question is: how can I estimate â (b^ doesen't metter because is a function of â and λ) and λ ? with data i can estimated , a, b and σ
Thank you
CIR model: d r=a∗(b − r)dt+σ√r dW,
we know that to price a ZCB we have to change probability and we opteined:
dr=â∗(b^ − r)dt+σ√r dW (under Q probability risk-neutral), where â=a +σλ and b^=a*b/(a+σλ), λ is a costant.
My question is: how can I estimate â (b^ doesen't metter because is a function of â and λ) and λ ? with data i can estimated , a, b and σ
Thank you
