Chapter 5: Models and Equations 289
In all of the spot rate models below we have
dr=u(r,t)dt+w(r,t)dXas the real process for the spot interest rate. The risk-
neutral process which governs the value of fixed-income
instruments is
dr=(u−λw)dt+wdXwhereλis the market price of interest rate risk. In each
case the stochastic differential equation we describe is
for the risk-neutral spot rate process, not the real.
The differential equation governing the value of non-
path-dependent contracts is
∂V
∂t+^12 w^2∂^2 V
∂r^2+(u−λw)∂V
∂r−rV= 0.The value of fixed-income derivatives can also be inter-
preted as
E
Q
t[
Present value of cashflows]
,where the expectation is with respect to the risk-neutral
process
Vasicek In this model the risk-neutral process is
dr=(a−br)dt+cdX,witha,bandcbeing constant. It is possible forrto go
negative in this model.
There is a solution for bonds of the form exp(A(t;T)−
B(t;T)r).
Cox, Ingersoll and Ross In this model the risk-neutral pro-
cess is
dr=(a−br)dt+cr^1 /^2 dX,