Frequently Asked Questions In Quantitative Finance

(Kiana) #1
102 Frequently Asked Questions In Quantitative Finance

We can understand this (if not entirely legitimately
derive it) via Taylor series by using the rules of thumb

dXi^2 =dt and dXidXj=ρijdt.

Another extension that is often useful in finance is to
incorporate jumps in the independent variable. These
are usually modelled by a Poisson process. This isdq
suchdq=1 with probabilityλdtand is 0 with probabil-
ity 1−λdt. Returning to the single independent variable
case for simplicity, supposeysatisfies
dy=a(y,t)dt+b(y,t)dX+J(y,t)dq

wheredqis a Poisson process andJis the size of the
jump or discontinuity iny(whendq=1) then

df=

(
∂f
∂t

+a(y,t)

∂f
∂y

+^12 b(y,t)^2

∂^2 f
∂y^2

)
dt+b(y,t)

∂f
∂y

dX

+(f(y+J(y,t))−f(y,t))dq.
AndthisisItˆo in the presence of jumps.

References and Further Reading


Joshi, M 2003The Concepts and Practice of Mathematical
Finance.CUP
Neftci, S 1996An Introduction to the Mathematics of Financial
Derivatives. Academic Press
Wilmott, P 2001Paul Wilmott Introduces Quantitative Finance.
John Wiley & Sons
Free download pdf