stochastic calculus jump processes
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Chapter 14
Stochastic Calculus for Jump Processes
The modelling of risky asset by stochastic processes with continuous paths,based on Brownian motions, suffers from several defects. First, the path con-tinuity assumption does not seem reasonable in view of the possibility ofsudden price variations (jumps) resulting of market crashes. Secondly, themodeling of risky asset prices by Brownian motion relies on the use of theGaussian distribution which tends to underestimate the probabilities of ex-treme events.
A solution is to use stochastic processes with jumps, that will account forsudden variations of the asset prices. On the other hand, such jump models
are generally based on the Poisson distribution which has a slower tail decaythan the Gaussian distribution. This allows one to assign higher probabilitiesto extreme events, resulting in a more realistic modeling of asset prices.
14.1 The Poisson Process
The most elementary and useful jump process is thestandard Poisson processwhich is a stochastic process (Nt)tR+ with jumps of size +1 only, and whose
paths are constant in between two jumps, i.e. at time t, the value Nt of theprocess is given by
Nt=k=1
1[Tk,)(t), t R+, (14.1)
where
The notation Nt is not to be confused with the same notation used for numeraireprocesses in Chapter10.
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1[Tk,)(t) =
1 ift Tk,
0 if 0 t < Tk,k 1, and (Tk)k1 is the increasing family of jump times of (Nt)tR+ suchthat lim
kTk = +.
In addition, (Nt)tR+ satisfies the following conditions:
1. Independence of increments: for all 0 t0 < t1 < < tn and n 1 therandom variables
Nt1Nt0 , . . . , N tnNtn1 ,are independent.
2. Stationarity of increments: Nt+hNs+h has the same distribution asNt Ns for all h >0 and 0 s t.The meaning of the above stationarity condition is that for all fixed k Nwe have
P(Nt+h Ns+h=k) = P(Nt Ns =k),for all h >0, i.e. the value of the probability
P(Nt+h Ns+h=k)
does not depend on h >0, for all fixed 0 s t and k N.The next figure represents a sample path of a Poisson process.
0
1
2
3
4
5
6
7
0 2 4 6 8 10
Nt
t
Fig. 14.1: Sample path of a Poisson process (Nt)tR+ .
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Based on the above assumption, given a time value T >0 a natural questionarises:
what is the probability distribution of the random variable NT?
We already know that Nt takes values in Nand therefore it has a discretedistribution for all t R+.
It is a remarkable fact that the distribution of the increments of (Nt)tR+ ,can be completely determined from the above conditions, as shown in thefollowing theorem.
As seen in the next result, cf. [6], Nt Ns has the Poisson distributionwith parameter (t s).Theorem 14.1. Assume that the counting process (Nt)tR+ satisfies theabove Conditions 1 and 2. Then for all fixed0 s t we have
P(Nt Ns =k) =e(ts) ((t s))k
k! , k N, (14.2)
for some constant >0.
The parameter >0 is called the intensity of the Poisson process (Nt)tR+and it is given by
:= limh0
1
hP(Nh = 1). (14.3)
The proof of the above Theorem 14.1 is technical and not included here,cf. e.g. [6] for details, and we could in fact take this distribution property(14.2) as one of the hypotheses that define the Poisson process.
Precisely, we could restatethe definition of the standard Poisson process(Nt)tR+ with intensity >0 as being a process defined by (14.1), which isassumed to have independent increments distributed according to the Poissondistribution, in the sense that for all 0 t0 t1< < tn,
(Nt1Nt0 , . . . , N tnNtn1)
is a vector of independent Poisson random variables with respective param-eters
((t1 t0), . . . , (tn tn1)).In particular,Nt has the Poisson distribution with parameter t, i.e.
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P(Nt =k) = (t)k
k! et, t >0.
The expected valueIE[Nt] ofNt can be computed as
IE[Nt] =t, (14.4)
cf. Exercise16.1.
Short Time Behaviour
From (14.3) above we deduce the short time asymptotics
P(Nh= 1) =heh h, h 0,
andP(Nh = 0) =e
h 1 h, h 0.By stationarity of the Poisson process we find more generally that
P(Nt+h Nt= 1) =heh h, h 0,
andP(Nt+h Nt= 0) =eh 1 h, h 0,
for all t >0.
This means that within a short interval [t, t+ h] of length h, the in-crementNt+hNt behaves like a Bernoulli random variable with parameterh. This fact can be used for the random simulation of Poisson process paths.
We also find that
P(Nt+h Nt= 2) h2 2
2 , h 0, t >0,
and more generally
P(Nt+h Nt =k) hk k
k!, h 0, t >0.
The intensity of the Poisson process can in fact be made time-dependent (e.g.by a time change), in which case we have
We use the notation f(h) hk to mean that limh0 f(h)/hk = 1.
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P(Nt Ns =k) = exp
ts
(u)du
ts (u)du
kk!
, k 0.
In particular,
P(Nt+dt Nt =k) =
e(t)dt 1 (t)dt, k= 0,
(t)e(t)dtdt (t)dt, k= 1,
o(dt), k 2,
and P(Nt+dt Nt= 0), P(Nt+dt Nt = 1) coincide respectively with (13.2)and (13.3) above. The intensity process ((t))tR+ can also be made randomin the case of Cox processes.
Poisson Process Jump Times
In order to prove the next proposition we note that we have the equivalence
{T1> t}{Nt= 0},
and more generally{Tn > t}{Nt n 1},
for all n 1.In the next proposition we compute the distribution ofTn with its density.
It coincides with the gamma distribution with integer parameter n 1, alsoknown as the Erlang distribution in queueing theory.
Proposition 14.1. For all n 1 the probability distribution of Tn has thedensity function
t net tn1
(n
1)!
onR+, i.e. for allt >0 the probabilityP(Tn t) is given by
P(Tn t) =nt
es sn1
(n 1)! ds.
Proof. We have
P(T1 > t) = P(Nt= 0) = et, t R+,
and by induction, assuming that
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P(Tn1 > t) =t
es(s)n2
(n 2)! ds, n 2,
we obtain
P(Tn > t) = P(Tn > t Tn1) + P(Tn1 > t)= P(Nt=n 1) + P(Tn1 > t)= et
(t)n1
(n 1)!+ t
es(s)n2
(n 2)! ds
=t
es(s)n1
(n 1)! ds, t R+,
where we applied an integration by parts to derive the last line.
In particular, for all n
Z and t
R+, we have
P(Nt=n) =pn(t) = et (t)
n
n! ,
i.e.pn1 : R+ R+, n 1, is the density function ofTn.
Similarly we could show, using the strong Markov property (see e.g. Theo-rem 6.5.4 of [81]) that the times
k :=Tk+1 Tkspent in state k N, with T0 = 0, form a sequence of independent identi-cally distributed random variables having the exponential distribution withparameter >0, i.e.
P(0> t0, . . . , n > tn) =e(t0+t1++tn), t0, . . . , tn R+.
Since the expectation of the exponentially distributed random variable kwith parameter >0 is given by
IE[k] =
1
,
we can check that the higher the intensity (i.e. the higher the probabilityof having a jump within a small interval), the smaller is the time spent ineach state k Non average.
In addition, conditionally to{NT = n}, the n jump times on [0, T] ofthe Poisson process (Nt)tR+ are independent uniformly distributed randomvariables on [0, T]n, cf. e.g. 12.1 of [91]. This fact can be useful for therandom simulation of the Poisson process.
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Compensated Poisson Martingale
From (14.4) above we deduce that
IE[Nt
t] = 0, (14.5)
i.e.the compensated Poisson process (Nt t)tR+ has centered increments.
Since in addition (Nt t)tR+ also has independent increments we getthe following proposition.
Proposition 14.2. The compensated Poisson process
(Nt t)tR+is amartingale with respect to its own filtration(
Ft)tR+ .
Extensions of the Poisson process include Poisson processes with time-dependent intensity, and with random time-dependent intensity (Cox pro-cesses). Renewal processes are counting processes
Nt =n1
1[Tn,)(t), t R+,
in which k = Tk+1 Tk, k N, is a sequence of independent identicallydistributed random variables. In particular, Poisson processes are renewal
processes.
14.2 Compound Poisson Processes
The Poisson process itself appears to be too limited to develop realistic pricemodels as its jumps are of constant size. Therefore there is some interest inconsidering jump processes that can have random jump sizes.
Let (Zk)k1 denote an i.i.d. sequence of square-integrable random vari-ables with probability distribution (dy) on R, independent of the Poissonprocess (Nt)tR+ . We have
P(Zk [a, b]) =([a, b]) =ba
(dy), < a b < .
Definition 14.1. The process
Yt=
Nt
k=1
Zk, tR+, (14.6)
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is called a compound Poisson process.
The next figure represents a sample path of a compound Poisson process,with here Z1 = 0.9, Z2 =0.7, Z3 = 1.4, Z4 = 0.6, Z5 =2.5, Z6 = 1.5,Z7 = 1.2.
-0.5
0
0.5
1
1.5
2
2.5
0 2 4 6 8 10
Yt
t
Fig. 14.2: Sample path of a compound Poisson process (Yt)tR+ .
Given that{NT =n}, thenjump sizes of (Yt)tR+ on [0, T] are independentrandom variables which are distributed on R according to (dx). Based onthis fact, the next proposition allows us to compute the moment generatingfunction of the increment YT Yt.Proposition 14.3. For any
t [0, T]we have
IE [exp ((YT Yt))] = exp
(T t)
(ey 1)(dy)
,
R.Proof. Since Nt has a Poisson distribution with parameter t > 0 and isindependent of (Zk)k1, for all Rwe have by conditioning:
IE [exp ((YT
Yt))] = IEexp
NT
k=Nt+1
Zk= IE
exp
NTNtk=1
Zk
=n=0
IE
exp
nk=1
Zk
P(NT Nt =n)
= e(Tt)
n=0n
n!(T t)n IE
exp
n
k=1Zk
Recall the conventionn
k=1 Zk = 0 ifn= 0.
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= e(Tt)n=0
n
n!(T t)n (IE [exp (Z1)])n
= exp((T t) IE [exp (Z1)])= exp(T t)
(ey
1)(dy) ,
since (dy) is the probability distribution ofZ1 and
(dy) = 1.
From the characteristic function we can compute the expectation and vari-ance ofYt for fixed t, as
IE[Yt] =t IE[Z1] and Var [Yt] =t IE[|Z1|2].
For the expectation we have
IE[Yt] = i dd
IE[eiYt ]|=0=t
y(dy) =t IE[Z1].
This relation can also be directly recovered as
IE[Yt] = IE
IE
Ntk=1
Zk
Nt
= et
n=1
n
t
n
n! IE nk=1
ZkNt=n
= etn=1
ntn
n! IE
nk=1
Zk
=tet IE[Z1]n=1
(t)n1
(n 1)!=t IE[Z1].
More generally one can show that for all 0 t0 t1 tnand1, . . . , nR we have
IE
nk=1
eik(YtkYtk1)
= exp
nk=1
(tk tk1)
(eiky 1)(dy)
=nk=1
exp
(tk tk1)
(eiky 1)(dy)
=n
k=1
IE ei(YtkYtk1 ) . 451
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This shows in particular that the compound Poisson process (Yt)tR+ hasindependent increments, as the standard Poisson process (Nt)tR+ .
Since the compensated Poisson process also has centered increments by(14.5), we have the following proposition.
Proposition 14.4. The compensated compound Poisson process
Mt:=Yt t IE[Z1], t R+,
is amartingale.
By construction, compound Poisson processes only have a finite numberof jumps on any interval. They belong to the family ofLevy processeswhichmay have an infinite number of jumps on any finite time interval, cf. [ 15].
14.3 Stochastic Integrals with Jumps
Given (t)tR+ a stochastic process we let the stochastic integral of (t)tR+with respect to (Yt)tR+ be defined by
T
0 tdYt:=
NTk=1 TkZk.
Note that this expressionT0
tdYt has a natural financial interpretation as
the value at time Tof a portfolio containing a (possibly fractional) quantityt of a risky asset at time t, whose price evolves according to random returnsZk at random times Tk.
In particular the compound Poisson process (Yt)tR+ in (14.1) admits thestochastic integral representation
Yt=Y0+t0
ZNsdNs.
Next, given (Wt)tR+ a standard Brownian motion independent of (Yt)tR+and (Xt)tR+ a jump-diffusion process of the form
Xt =t0
usdWs+t0
vsds + Yt, t
R+,
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where (t)tR+ is a process which is adapted to the filtration (Ft)tR+ gen-erated by (Wt)tR+ and (Yt)tR+ , and such that
IE T0
2s|us|2ds < and IE T0|svs|ds < , T >0,
we let the stochastic integral of (s)sR+ with respect to (Xs)sR+ be definedby
T0
sdXs:=T0
susdWs+T0
svsds +
NTk=1
TkZk, T >0.
The coumpound Poisson compensated stochastic integral can be shown tosatisfy the Ito isometry
IE
T0
t(dYt IE[Z1]dt)2
= IE[|Z1|2] IET
0||2tdt
,
(14.7)
provided the process (t)tR+ is adapted to the filtration generated by(Yt)tR+ , which makes the left limit process (s)sR+ predictable. The proofof (14.7) can be written using simple predictable processes, similarly to the
proof of Proposition4.3. It also follows by taking expectations on both sidesof the stochastic Fubini type theorem
T0
t(dYt IE[Z1]dt)2
= 2T0
tt0
s(dYs IE[Z1]ds)(dYt IE[Z1]dt) + IET
0||2tZ2NtdNt
,
in which the diagonal has been excluded in the double integral, and using thefact that the expectation of the double stochastic integral vanishes.
For the mixed continuous-jump martingale
Xt=t0
usdWs+ Yt t IE[Z1], t R+,
we have the isometry
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IE
T0
sdXs2
= IE
T0|s|2|us|2ds
+ IE[|Z1|2] IE T0|s|2ds
.
(14.8)
provided (s)sR+is adapted to the filtration (Ft)tR+generated by (Wt)tR+and (Yt)tR+ .
This isometry formula will be used in Section15.5for the computation ofhedging strategies in jump models.
When (Xt)tR+ takes the form
Xt =X0+t0
usdWs+t0
vsds +t0
sdYs, t R+,
the stochastic integral of (t)tR+ with respect to (Xt)tR+ satisfies
T0
sdXs :=T0
susdWs+T0
svsds +T0
ssdYs
=T0
susdWs+T0
svsds +
NT
k=1TkTkZk, T >0.
14.4 Ito Formula with Jumps
Let us first consider the case of a standard Poisson process (Nt)tR+ withintensity . We have the telescoping sum
f(Nt) =f(0) +
Nt
k=1
(f(k) f(k 1))
=f(0) +t0
(f(1 + Ns) f(Ns))dNs=f(0) +
t0
(f(Ns) f(Ns 1))dNs=f(0) +
t0
(f(Ns) f(Ns))dNs.
Here, Ns denotes the left limit of the Poisson process at time s, i.e.
Ns = limh0
Nsh.
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In particular we have
k=NTk = 1 + NTk, k 1.
By the same argument we find, in the case of the compound Poisson process
(Yt)tR+ ,
f(Yt) =f(0) +
Ntk=1
(f(YTk+ Zk) f(YTk ))
=f(0) +t0
(f(ZNs+ Ys) f(Ys))dNs=f(0) +
t0
(f(Ys) f(Ys))dNs,
which can be decomposed using a compensated Poisson stochastic integralas
f(Yt) =f(0) +t0
(f(Ys) f(Ys))(dNs ds) + t0
(f(Ys) f(Ys))ds.
More generally, for a process of the form
Xt =X0+t0
usdWs+t0
vsds +t0
sdYs, t R+,
we find, by combining the Ito formula for Brownian motion with the above
argument we get
f(Xt) =f(X0) +t0
usf(Xs)dWs+
1
2
t0
f(Xs)|us|2ds
+t0
vsf(Xs)ds +
NTk=1
(f(XTk+ TkZk) f(XTk ))
=f(X0) +t0
usf(Xs)dWs+
1
2
t0
f(Xs)|us|2ds +t0
vsf(Xs)ds
+ t
0
(f(Xs+ sZNs)
f(Xs))dNs t
R+.
i.e.
f(Xt) =f(X0) +t0
usf(Xs)dWs+
1
2
t0
f(Xs)|us|2ds +t0
vsf(Xs)ds
+t0
(f(Xs) f(Xs))dNs, t R+. (14.9)
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For example, in case
Xt =t0
usdWs+t0
vsds +t0
sdNs, t R+,
we get
f(Xt) =f(0) +t0
usf(Xs)dWs+
1
2
t0|us|2f(Xs)dWs
+t0
vsf(Xs)ds +
t0
(f(Xs+ s) f(Xs))dNs
=f(0) +t0
usf(Xs)dWs+
1
2
t0|us|2f(Xs)dWs (14.10)
+t0
vsf(Xs)ds +
t0
(f(Xs) f(Xs))dNs.
Given two processes (Xt)tR+ and (Yt)tR+ written as
Xt =t0
usdWs+t0
vsds +t0
sdNs, t R+,
and
Yt =t0
asdWs+t0
bsds +t0
csdNs, t R+,the Ito formula for jump processes also shows that
d(XtYt) =XtdYt+ YtdXt+ dXt dYtwhere the product dXt dYt is computed according to the extension
dt dBt dNtdt 0 0 0
dBt 0 dt 0dNt 0 0 dNt
of the Ito multiplication table (4.21), i.e. we have
dXt dYt = (vtdt + utdBt+ tdNt)(btdt + atdBt+ ctdNt)=btvt(dt)
2 + btutdt dBt+ bttdt dNt+atvtdtdBt+ atut(dBt)
2 + attdBt dNt+ctvtdNt dBt+ ctut(dBt)2 + cttdNt dNt
=atutdt + cttdNt,
and in particular
(dXt)2 = (vtdt + utdBt+ tdNt)
2 =u2tdt + 2t dNt.
For a process of the form
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Xt=X0+t0
usdWs+t0
sdYt, t R+,
the Ito formula with jumps (14.10) can be rewritten as
f(Xt) =f(X0) +t
0 vsf
(Xs)ds +t
0 usf
(Xs)dWs
+1
2
t0
f(Xs)|us|2ds +t0
sf(Xs)dYs
+t0
(f(Xs) f(Xs) Xsf(Xs)) d(Ns s)
+t0
(f(Xs) f(Xs) Xsf(Xs)) ds, t R+,
where we used therelation dYs =Xsf(Xs)dNs, which implies
t0 sf
(Xs)dYs=t0 Xsf
(Xs)dNs, t 0.This above formulation is at the basis of the extension of Itos formula toLevy processes with an infinite number of jumps on any interval, using thebound
|f(x + y) f(x) yf(x)| Cy2,for f aC2b (R) function. Such processes, also called infinite activity Levy
processes [15] are also useful in financial modeling and include the gammaprocess, stable processes, variance gamma processes, inverse Gaussian pro-
cesses, etc, as in the following illustrations.
1. Gamma process.
0
t
Fig. 14.3: Sample trajectories of a gamma process.
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2. Stable process.
0
t
Fig. 14.4: Sample trajectories of a stable process.
3. Variance Gamma process.
0
t
Fig. 14.5: Sample trajectories of a variance gamma process.
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4. Inverse Gaussian process.
0
t
Fig. 14.6: Sample trajectories of an inverse Gaussian process.
5. Negative Inverse Gaussian process.
0
t
Fig. 14.7: Sample trajectories of a negative inverse Gaussian process.
14.5 Stochastic Differential Equations with Jumps
Let us start with the simplest example
dSt=StdNt, (14.11)
of a stochastic differential equation with respect to the standard Poisson pro-cess, with constant coefficient R.
WhenNt=Nt Nt = 1,
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i.e.when the Poisson process has a jump at timet, the equation (14.11) reads
dSt=St St =St , t >0.
which can be solved to yield
St = (1 + )St , t >0.
By induction, applying this procedure for each jump time gives us the solution
St =S0(1 + )Nt , t R+.
Next, consider the case where is time-dependent, i.e.
dSt =tStdNt. (14.12)
At each jump time Tk, Relation (14.12) reads
dSTk =STk STk =TkSTk ,
i.e.
STk = (1 + Tk)STk,
and repeating this argument for all k= 1, . . . , N t yields the product solution
St=S
0
Ntk=1
(1 + Tk
) =S0
Ns=10st
(1 + s
), tR+
.
The equationdSt=tStdt + tSt(dNt dt), (14.13)
is then solved as
St=S0expt
0
sds
t
0
sds Nt
k=1
(1 + Tk), t
R+.
A random simulation of the numerical solution of the above equation (14.13)is given in Figure14.8for constant = t, t R+.
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Fig. 14.8: Geometric Poisson process.
The above simulation can be compared to the real sales ranking data ofFigure14.9.
Fig. 14.9: Ranking data.
A random simulation of the geometric compound Poisson process
St =S0exp
t0
sds IE[Z1]t0
sds
Ntk=1
(1 + TkZk) t R+,
solution ofdSt=tStdt + tSt(dYt IE[Z1]dt),
is given in Figure14.10.
The animationworks in Acrobat reader on the entire pdf file.
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Fig. 14.10: Geometric compound Poisson process.
In the case of a jump-diffusion stochastic differential equation of the form
dSt =tStdt + tSt(dYt IE[Z1]dt) + tStdWt,
we get
St =S0exp
t0
sds IE[Z1]t0
sds +t0
sdWs 12
t0|s|2ds
Ntk=1
(1 + TkZk),
t R+. A random simulation of the geometric Brownian motion with com-pound Poisson jumps is given in Figure14.11.
The animation works in Acrobat reader on the entire pdf file.
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Fig. 14.11: Geometric Brownian motion with compound Poisson jumps.
By rewriting St as
St =S0exp
t0
sds +t0
s(dYs IE[Z1]ds) +t0
sdWs 12
t0|s|2ds
Ntk=1
(eTk (1 + TkZk)),
t
R+, one can extend this jump model to processes with an infinite number
of jumps on any finite time interval, cf. [15]. The next Figure 14.12 showsa number of downward and upward jumps occuring in the historical priceof the SMRT stock, with a typical geometric Brownian behavior in betweenjumps.
Fig. 14.12: SMRT Stock price.
The animation works in Acrobat reader on the entire pdf file.
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14.6 Girsanov Theorem for Jump Processes
Recall that in its simplest form, the Girsanov theorem for Brownian motionfollows from the calculation
IE[f(WT T)] = 12T
f(x T)ex2/(2T)dx
= 1
2T
f(x)e(x+T)2/(2T)dx
= 1
2T
f(x)ex2T/2ex
2/(2T)dx
= IE[f(WT)eWT
2T/2]
= IE[f(WT)], (14.14)
for any bounded measurable function f on R, which shows that WT is aGaussian random variable with meanTunder the probability measurePdefined by
dP= eWT2T/2dP,
cf. Section6.2. Equivalently we have
IE[f(WT)] = IE[f(WT+ T)], (14.15)
hence
under the probability measure
dP:= eWT2T/2dP,
the random variableWT+ Thas the centered Gaussian distributionN(0, T).
More generally, the Girsanov theorem states that (Wt+ t)t[0,T] is a stan-dard Brownian motion under P.
When Brownian motion is replaced with a standard Poisson process(Nt)tR+ , the above space shift
Wt Wt+ t
may not be used because Nt+ t cannot be a Poisson process, whatever thechange of probability applied, since by construction, the paths of the stan-
dard Poisson process has jumps of unit size and remain constant between
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jump times.
The correct way to proceed in order to extend (14.15) to the Poisson caseis to replace the space shift with a time contraction(or dilation) by a certainfactor 1 + c with c >
1, i.e.
Nt Nt/(1+c) or Nt N(1+c)t.
Assume that (Nt)tR+ is a standard Poisson process with intensity underP. By analogy with (14.14) we can write
P(N(1+c)T =k) =e(1+c)T((1 + c)T)
k
k! =ecT(1 + c)kP(NT =k),
k N, and for fany bounded function on Nwe have
IE[f(N(1+c)T)] =k=0
f(k)P(N(1+c)T =k) (14.16)
=ecTk=0
f(k)(1 + c)kP(NT =k)
=ecT IE[f(NT)(1 + c)NT ]
=ecT
(1 + c)NTf(NT)dP
= f(NT)d
P
= IE[f(NT)],
where the probability measure P is defined by
dP :=ecT(1 + c)NTdP.
Consequently,
under the probability measure
dP :=ecT(1 + c)NTdP,
the random variableNThas the centered Poisson distribution P((1+c)T)with intensity (1 + c)T, i.e. the law ofN(1+c)T under P.
Equivalently to (14.16) we have
IE[f(NT)] = IE[f(NT/(1+c))],
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i.e.underP the law ofNT/(1+c) is that of a standard Poisson random vari-able with parameter T. As a consequence, (Nt/(1+c))tR+ is a standard
Poisson process with intensityunderP, and since (Nt/(1+c) t)tR+ hasindependent increments, the compensated process
Nt/(1+c) t, t R+,
is a martingale under P by (6.2). In addition we have
Nt/(1+c) =n1
1[Tn,)(t/(1 + c))
=n1
1[(1+c)Tn,)(t), t R+,
which shows that underP, the jump times of (Nt/(1+c))t[0,T] are given by
((1 + c)Tn)n1,
and we know that they are distributed as the jump times of a Poisson processwith intensity underP.
Next, taking >0 and letting
c:=
1 +
,
i.e. = (1 + c) we can rewrite the above by saying that
P(N(1+c)T =k) =ecT(1 + c)kP(NT =k) =e
T(T)k
k! =P(NT =k),
k N, and
under the probability measure
dP :=ecT(1 + c)NTdP= e()T
NTdP,
the law ofNTis that of a Poisson random variable with intensity
T =(1 + c)T.
Consequently, since
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(Nt (1 + c)t)tR+ = (Nt t)tR+has independent increments, the compensated Poisson process
Nt (1 + c)t= Nt t
is a martingale underP by (6.2), although whenc = 0 it is not a martingaleunder P.
In the case of compound Poisson processes the Girsanov theorem can beextended to variations in jump sizes in addition to time variations, and wehave the following more general result.
Theorem 14.2. Let (Yt)t0 be a compound Poisson process with inten-sity >0 and jump distribution(dx). Consider another jump distribution
(dx), and let
(x) :=
d
d(x) 1, x R.
Then,
under the probability measure
dP, :=e()T
NTk=1
(1 + (Zk))dP,,
the process
Yt=
Ntk=1
Zk, t R+,
is a compound Poisson process with
- modified intensity >0, and
- modified jump distribution(dx).
Proof. For any bounded measurable functionf on R, we extend (14.16) tothe following change of variable
IE,[f(YT)] =e()T IE,
f(YT)
NTi=1
(1 + (Zi))
=e()Tk=0
IE,
f
ki=1
Zi
ki=1
(1 + (Zi))NT =k
P(NT =k)
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=eTk=0
(T)k
k! IE,
f
ki=1
Zi
ki=1
(1 + (Zi))
=eT
k=0
(T)k
k!
f(z1+ + zk)k
i=1
(1 + (zi))(dz1) (dzk)
=eTk=0
(T)k
k!
f(z1+ + zk) ki=1
d
d(zi)
(dz1) (dzk)
=eTk=0
(T)k
k!
f(z1+ + zk)(dz1) (dzk).
This shows that under P,, YThas the distribution of a compound Poisson
process with intensityand jump distribution . We refer to Proposition 9.6
of [15] for the independence of increments of (Yt)tR+ under P,.
Note that the compound Poisson process with intensity > 0 and jumpdistribution can be built as
Xt:=
Nt/k=1
h(Zk),
provided is the image measure ofby the function h: R R, i.e.
P(h(Zk) A) = P(Zk h1
(A)) =(h1
(A)) = (A),
for all measurable subset A ofR.
Compensated Compound Poisson Martingale
As a consequence of Theorem14.2, the compensated process
Yt t IE[Z1]
becomes a martingale under the probability measure P, defined by
dP,=e()T
NTk=1
(1 + (Zk))dP,.
Finally, the Girsanov theorem can be extended to the linear combinationof a standard Brownian motion (Wt)tR+ and an independent compoundPoisson process (Yt)tR+ , as in the following result which is a particular caseof Theorem 33.2 of [105].
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Theorem 14.3. Let (Yt)t0 be a compound Poisson process with intensity >0 and jump distribution(dx). Consider another jump distribution(dx)and intensity parameter >0, and let
(x) :=
d
d(x) 1, x R
,
and let(ut)tR+ be a bounded adapted process. Then the processWt+
t0
usds + Yt IE[Z1]ttR+
is a martingale under the probability measure
dPu,,= exp
( )T T
0 usdWs 1
2T
0 |us|2
dsNTk=1(1+(Zk))d
P,.
(14.17)
As a consequence of Theorem 14.3, if
Wt+t0
vsds + Yt
is not a martingale under P,, it will become a martingale under Pu,,providedu, and are chosen in such a way that
vs=us IE[Z1], s R, (14.18)
in which case we will have the martingale decomposition
dWt+ utdt + dYt IE[Z1]dt,
in which both
Wt+
t0
usds
tR+
and
Yt t IE[Z1]tR+
are both mar-
tingales underPu,,
When= = 0, Theorem14.3coincides with the usual Girsanov theoremfor Brownian motion, in which case (14.18) admits only one solution givenbyu= v and there is uniqueness ofPu,0,0. Note that uniqueness occurs alsowhen u= 0 in the absence of Brownian motion with Poisson jumps of fixedsize a (i.e. (dx) = (dx) = a(dx)) since in this case (14.18) also admitsonly one solution= v and there is uniqueness ofP0,,a . These remarks willbe of importance for arbitrage pricing injumpmodels in Chapter15.
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Exercises
Exercise 14.1 Let (Nt)tR+ be a standard Poisson process with intensity
>0, started at N0 = 0.a) Solve the stochastic differential equation
dSt=StdNt Stdt= St(dNt dt).b) Using the first Poisson jump timeT1, solve the stochastic differential equa-
tiondSt= Stdt + dNt, t (0, T2).
Exercise 14.2 Consider a standard Poisson process (Nt)tR+ with intensity >0.
a) Solve the stochastic differential equation dXt = XtdNt for (Xt)tR+ ,where >0 and X0 = 1.
b) Show that the solution (St)tR+ of the stochastic differential equation
dSt =rdt + StdNt,
is given by St =S0Xt+ rXtt0
X1s ds.
c) Compute IE[Xt] and IE[Xt/Xs], 0 s t.d) Compute IE[St], t R+.
Exercise 14.3 Consider the compound Poisson process Yt :=
Ntk=1
Zk, where
(Nt)tR+ is a standard Poisson process with intensity > 0, (Zk)k1 is ani.i.d. sequence ofN(0, 1) Gaussian random variables. Solve the stochasticdifferential equation
dSt=rStdt + StdYt,
where , r R.
Exercise14.4 Show, by direct computation or using the characteristic func-tion, that the variance of the compound Poisson process Yt with intensity >0 satisfies
Var [Yt] =t IE[|Z1|2] =t
x2(dx).
Exercise14.5 Consider an exponential compound Poisson process of the form
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St=S0et+Wt+Yt , t R+,
where (Yt)tR+ is a compound Poisson process of the form (14.6).
a) Derive the stochastic differential equation with jumps satisfied by (St)tR+ .
b) Letr >0. Find a family (Pu,,) of probability measures under which the
discounted asset price ertSt is a martingale.
Exercise 14.6 Consider (Nt)tR+ a standard Poisson process with intensity >0, independent of (Wt)tR+ , under a probability measure P. Let (St)tR+be defined by the stochastic differential equation
dSt=Stdt + YNtStdNt, (14.19)
where (Yk)k1 is an i.i.d. sequence of random variables of the form
Yk =eXk 1, where Xk N(0, 2), k 1.
a) Solve the equation (14.19).b) We assume that and the risk-free rate r > 0 are chosen such that the
discounted process (ertSt)tR+ is a martingale under P. What relationdoes this impose on and r?
c) Under the relation of Question (b), compute the price at time t of a Eu-ropean call option on ST with strike and maturity T, using a seriesexpansion of Black-Scholes functions.
Exercise 14.7 Consider a standard Poisson process (Nt)tR+ with intensity >0 under a probability measure P. Let (St)tR+ be the mean revertingprocess defined by the stochastic differential equation
dSt= Stdt + (dNt dt), (14.20)
where S0 >0 and , >0.
a) Solve the equation (14.20) for St.b) Compute f(t) := IE[St] for all t R+.c) Under which condition on , , and does the process St become a
submartingale ?d) Propose a method for the calculation of expectations of the form IE[(ST)]
where is a payoff function.
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