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The [[Brownian motion]] models for [[financial markets]] are based on the work of [[Robert C. Merton]] and [[Paul A. Samuelson]], as extensions to the one-period market models of [[Harold Markowitz]] and [[William Forsyth Sharpe|William Sharpe]], and are concerned with defining the concepts of financial [[assets]] and [[financial markets|markets]], [[Portfolio (finance)|portfolios]], [[gains]] and [[wealth]] in terms of continuous-time [[stochastic processes]].
 
Under this model, these assets have continuous prices evolving continuously in time and are driven by Brownian motion processes.<ref>{{cite journal|last=Tsekov|first=Roumen|year=2013|url=http://cpl.iphy.ac.cn/EN/Y2013/V30/I8/088901|title=Brownian Markets|accessdate=July 29, 2013}}</ref> This model requires an assumption of perfectly divisible assets and a [[frictionless market]] (i.e. that no transaction costs occur either for buying or selling). Another assumption is that asset prices have no jumps, that is there are no surprises in the market. This last assumption is removed in [[jump diffusion]] models.
 
==Financial market processes==
Consider a financial market consisting of <math>N + 1 </math> financial assets, where one of these assets, called a ''[[Bond (finance)|bond]]'' or ''[[money market]]'', is [[risk]] free while the remaining <math>N</math> assets, called ''[[stocks]]'', are risky.
 
===Definition===
A ''financial market'' is defined as <math>\mathcal{M} = (r,\mathbf{b},\mathbf{\delta},\mathbf{\sigma},A,\mathbf{S}(0)) </math>:
# A probability space <math>(\Omega, \mathcal{F}, P)</math>
# A time interval <math>[0,T]</math>
# A <math>D</math>-dimensional Brownian process <math>\mathbf{W}(t) = (W_1(t) \ldots W_D(t))', \; 0 \leq t \leq T</math> adapted to the augmented filtration  <math> \{ \mathcal{F}(t); \; 0 \leq t \leq T \} </math>
# A measurable risk-free money market rate process <math>r(t) \in L_1[0,T] </math>
# A measurable mean rate of return process  <math>\mathbf{b}: [0,T] \times \mathbb{R}^N \rightarrow \mathbb{R} \in L_2[0,T] </math>.
# A measurable dividend rate of return process <math>\mathbf{\delta}: [0,T] \times \mathbb{R}^N \rightarrow \mathbb{R} \in L_2[0,T] </math>.
# A measurable volatility process <math>\mathbf{\sigma}: [0,T] \times \mathbb{R}^{N \times D} \rightarrow \mathbb{R}</math>  such that <math> \sum_{n=1}^N \sum_{d=1}^D \int_0^T \sigma_{n,d}^2(s)ds < \infty </math>.
# A measurable, finite variation, singularly continuous stochastic <math> A(t)</math>
# The initial conditions given by <math>\mathbf{S}(0) = (S_0(0),\ldots S_N(0))'</math>
 
===The augmented filtration===
 
Let <math>(\Omega, \mathcal{F}, p)</math> be a [[probability space]], and a
<math>\mathbf{W}(t) = (W_1(t) \ldots W_D(t))', \; 0 \leq t \leq T</math> be
D-dimensional Brownian motion [[stochastic process]], with the [[Filtration (mathematics)|natural filtration]]:
 
:<math> \mathcal{F}^\mathbf{W}(t) \triangleq \sigma\left(\{\mathbf{W}(s) ; \; 0 \leq s \leq t
\}\right), \quad \forall t \in [0,T]. </math>
 
If <math>\mathcal{N}</math> are the [[measure (probability)|measure]] 0 (i.e. null under
measure <math>P</math>) subsets of <math>\mathcal{F}^\mathbf{W}(t)</math>, then define
the ''augmented'' filtration:
 
:<math> \mathcal{F}(t) \triangleq \sigma\left(\mathcal{F}^\mathbf{W}(t) \cup
\mathcal{N}\right), \quad \forall t \in [0,T] </math>
 
The difference between <math> \{ \mathcal{F}^\mathbf{W}(t); \; 0 \leq t \leq T \}
</math> and <math> \{ \mathcal{F}(t); \; 0 \leq t \leq T \} </math> is that the
latter is both [[continuous function#Directional continuity|left-continuous]], in the sense that:
 
:<math> \mathcal{F}(t) = \sigma \left( \bigcup_{0\leq s <t}  \mathcal{F}(s)
\right),</math>
 
and [[continuous function#Directional continuity|right-continuous]], such that:
 
:<math> \mathcal{F}(t) = \bigcap_{t < s \leq T}  \mathcal{F}(s),</math>
 
while the former is only left-continuous.<ref>{{Cite book | author=Karatzas,
Ioannis; Shreve, Steven E. | authorlink= | coauthors= | title=Brownian motion and stochastic calculus | year=1991 | publisher=Springer-Verlag | location=New
York  | isbn=0-387-97655-8 | pages=}}</ref>
 
===Bond===
 
A share of a bond (money market)  has price <math>S_0(t) > 0</math> at time
<math>t</math> with <math>S_0(0)=1</math>, is continuous,  <math> \{ \mathcal{F}(t); \; 0 \leq t \leq T \} </math>  adapted, and has finite  [[Bounded variation|variation]]. Because it has finite variation, it can be decomposed into an [[Absolute continuity|absolutely continuous]] part <math>S^a_0(t)</math> and a singularly continuous part <math>S^s_0(t)</math>, by [[Lebesgue's decomposition theorem]]. Define:
 
:<math>r(t) \triangleq \frac{1}{S_0(t)}\frac{d}{dt}S^a_0(t), </math> and
 
:<math> A(t) \triangleq \int_0^t \frac{1}{S^s_0(s)}dS_0(s), </math>
 
resulting in the [[Stochastic differential equation|SDE]]:
 
:<math>dS_0(t) = S_0(t)[r(t)dt + dA(t)], \quad \forall 0\leq t \leq T,  </math>
 
which gives:
:<math>S_0(t) = \exp\left(\int_0^t r(s)ds + A(t)\right), \quad \forall 0\leq t \leq T.  </math>
 
Thus, it can be easily seen that if <math>S_0(t)</math> is absolutely continuous (i.e. <math>A(\cdot) = 0 </math>), then the price of the bond evolves like the value of a risk-free savings account with instantaneous interest rate <math>r(t)</math>, which is random, time-dependent and <math>\mathcal{F}(t) </math> measurable.
 
===Stocks===
Stock prices are modeled as being similar to that of bonds, except with a randomly fluctuating component (called its [[Volatility (finance)|volatility]]).  As a premium for the risk originating from these random fluctuations, the mean rate of return of a stock is higher than that of a bond.
 
Let <math> S_1(t) \ldots S_N(t) </math> be the strictly positive prices per share of the <math> N</math> stocks, which are continuous stochastic processes satisfying:
 
:<math> dS_n(t) = S_n(t)\left[b_n(t)dt + dA(t) + \sum_{d=1}^D \sigma_{n,d}(t)dW_d(t)\right] , \quad \forall 0\leq t \leq T, \quad n = 1 \ldots N.    </math>
 
Here, <math>\sigma_{n,d}(t), \; d=1\ldots D</math> gives the volatility of the <math>n</math>-th stock, while <math>b_n(t)</math> is its mean rate of return.
 
In order for an [[arbitrage]]-free pricing scenario, <math>A(t)</math> must be as defined above.  The solution to this is:
 
:<math> S_n(t) = S_n(0)\exp\left(\int_0^t \sum_{d=1}^D \sigma_{n,d}(s)dW_d(s) + \int_0^t \left[b_n(s) - \frac{1}{2}\sum_{d=1}^D \sigma^2_{n,d}(s)\right]ds  + A(t)\right), \quad \forall 0\leq t \leq T, \quad n = 1 \ldots N,  </math>
 
and the discounted stock prices are:
 
:<math> \frac{S_n(t)}{S_0(t)} = S_n(0)\exp\left(\int_0^t \sum_{d=1}^D \sigma_{n,d}(s)dW_d(s) + \int_0^t \left[b_n(s) - \frac{1}{2}\sum_{d=1}^D \sigma^2_{n,d}(s)\right]ds )\right), \quad \forall 0\leq t \leq T, \quad n = 1 \ldots N.  </math>
 
Note that the contribution due to the discontinuites in the bond price <math> A(t) </math> does not appear in this equation.
 
===Dividend rate===
 
Each stock may have an associated [[dividend]] rate process <math>\delta_n(t)</math> giving the rate of dividend payment per unit price of the stock at time <math>t</math>. Accounting for this in the model, gives the ''yield'' process <math>Y_n(t) </math>:
 
:<math> dY_n(t) = S_n(t)\left[b_n(t)dt + dA(t) + \sum_{d=1}^D \sigma_{n,d}(t)dW_d(t) + \delta_n(t)\right] , \quad \forall 0\leq t \leq T, \quad n = 1 \ldots N.  </math>
 
==Portfolio and gain processes==
===Definition===
Consider a financial market <math>\mathcal{M} = (r,\mathbf{b},\mathbf{\delta},\mathbf{\sigma}, A,\mathbf{S}(0)) </math>.
 
A ''portfolio process'' <math>(\pi_0, \pi_1, \ldots \pi_N) </math> for this market is an <math>\mathcal{F}(t) </math> measurable, <math>\mathbb{R}^{N+1} </math> valued process such that:
 
:<math>\int_{0}^T | \sum_{n=0}^N\pi_n(t)| \left[|r(t)|dt + dA(t) \right] < \infty </math>, [[almost surely]],
 
:<math>\int_{0}^T |\sum_{n=1}^N\pi_n(t)[b_n(t) + \mathbf{\delta}_n(t) - r(t)]| dt < \infty </math>, almost surely, and
 
:<math>\int_{0}^T \sum_{d=1}^D|\sum_{n=1}^N\mathbf{\sigma}_{n,d}(t)\pi_n(t)|^2 dt < \infty </math>, almost surely.
 
The ''gains process'' for this porfolio is:
:<math>G(t) \triangleq \int_0^t \left[\sum_{n=0}^N\pi_n(t)\right]\left(r(s)ds + dA(s)\right) + \int_0^t \left[\sum_{n=1}^N\pi_n(t)\left(b_n(t) + \mathbf{\delta}_n(t) - r(t)\right)\right]dt + \int_{0}^t \sum_{d=1}^D\sum_{n=1}^N\mathbf{\sigma}_{n,d}(t)\pi_n(t) dW_d(s) \quad 0 \leq t \leq T</math>
 
We say that the porfolio is ''[[Self-financing portfolio|self-financed]]'' if:
 
:<math>G(t) = \sum_{n=0}^N \pi_n(t) </math>.
 
It turns out that for a self-financed portfolio, the appropriate value of <math>\pi_0</math> is determined from <math>\pi =(\pi_1, \ldots \pi_N) </math> and therefore sometimes <math>\pi</math> is referred to as the portfolio process. Also, <math>\pi_0 < 0</math> implies borrowing money from the money-market, while <math>\pi_n < 0</math> implies taking a [[short position]] on the stock.
 
The term <math>b_n(t) + \mathbf{\delta}_n(t) - r(t)</math> in the SDE of <math>G(t)</math> is the ''[[risk premium]]'' process, and it is the compensation received in return for investing in the <math>n</math>-th stock.
 
===Motivation===
 
Consider time intervals <math>0 = t_0 < t_1 < \ldots < t_M = T </math>, and let <math>\nu_n(t_m) </math> be the number of shares of asset <math>n = 0 \ldots N </math>, held in a portfolio during time interval at time <math>[t_m,t_{m+1} \; m = 0 \ldots M-1 </math>. To avoid the case of [[insider trading]] (i.e. foreknowledge of the future), it is required that <math>\nu_n(t_m) </math> is <math>\mathcal{F}(t_m) </math> measurable.
 
Therefore, the incremental gains at each trading interval from such a portfolio is:
 
:<math> G(0) = 0, </math>
:<math> G(t{m+1}) - G(t_m) = \sum_{n=0}^N \nu_n(t_m) [Y_n(t_{m+1}) - Y_n(t_m)] , \quad m = 0 \ldots M-1, </math>
 
and <math>G(m)</math> is the total gain over time <math>[0,t_m]</math>, while the total value of the portfolio is <math>\sum_{n=0}^N \nu_n(t_m)S_n(t_m)</math>.
 
Define <math>\pi_n(t) \triangleq \nu_n(t) </math>, let the time partition go to zero, and substitute for <math>Y(t)</math> as defined earlier, to get the corresponding SDE for the gains process. Here <math>\pi_n(t) </math> denotes the dollar amount invested in asset <math>n </math> at time <math>t </math>, not the number of shares held.
 
==Income and wealth processes==
===Definition===
Given a financial market <math>\mathcal{M}</math>, then a ''cumulative income process'' <math>\Gamma(t) \; 0 \leq t \leq T </math> is a [[semimartingale]] and represents the income accumulated over time <math>[0,t]</math>, due to sources other than the investments in the <math>N+1</math> assets of the financial market.
 
A ''wealth process'' <math>X(t)</math> is then defined as:
 
:<math>X(t) \triangleq G(t) + \Gamma(t) </math>
 
and represents the total wealth of an investor at time <math>0 \leq t \leq T</math>. The portfolio is said to be ''<math>\Gamma(t)</math>-financed'' if:
 
:<math>X(t) = \sum_{n=0}^N \pi_n(t).</math>
 
The corresponding SDE for the wealth process, through appropriate substitutions, becomes:
 
<math>dX(t) = d\Gamma(t) + X(t)\left[r(t)dt + dA(t)\right]+ \sum_{n=1}^N \left[ \pi_n(t) \left( b_n(t) + \delta_n(t) - r(t) \right) \right] + \sum_{d=1}^D \left[\sum_{n=1}^N \pi_n(t) \sigma_{n,d}(t)\right]dW_d(t)</math>.
 
Note, that again in this case, the value of <math>\pi_0</math> can be determined from <math>\pi_n, \; n = 1 \ldots N</math>.
 
==Viable markets==
The standard theory of mathematical finance is restricted to viable financial markets, i.e. those in which there are no opportunities for [[arbitrage]]. If such opportunities exists, it implies the possibility of making an arbitrarily large risk-free profit.
 
===Definition===
In a financial market <math>\mathcal{M}</math>, a self-financed portfolio process <math>\pi(t)</math> is considered to be an ''[[arbitrage]] opportunity'' if the associated gains process <math>G(T)\geq 0</math>, almost surely and <math> P[G(T) > 0] > 0</math> strictly. A market <math> \mathcal{M}</math> in which no such portfolio exists is said to be ''viable''.
 
===Implications===
In a viable market <math>\mathcal{M}</math>, there exists a <math>\mathcal{F}(t)</math> adapted process <math>\theta :[0,T] \times \mathbb{R}^D \rightarrow \mathbb{R}</math> such that for almost every <math> t \in [0,T]</math>:
 
:<math>b_n(t) + \mathbf{\delta}_n(t) - r(t) = \sum_{d=1}^D \sigma_{n,d}(t) \theta_d(t)</math>.
 
This <math>\theta</math> is called the ''market price of risk'' and relates the premium for the <math>n</math>-the stock with its volatility <math>\sigma_{n,\cdot}</math>.
 
Conversely, if there exists a D-dimensional process <math>\theta(t)</math> such that it satisfies the above requirement, and:
 
:<math> \int_0^T \sum_{d=1}^D |\theta_d(t)|^2 dt < \infty</math>
:<math>\mathbb{E}\left[ \exp\left\{ -\int_0^T \sum_{d=1}^D \theta_d(t)dW_d(t) - \frac{1}{2}\int_0^T \sum_{d=1}^D |\theta_d(t)|^2 dt \right\} \right] = 1 </math>,
 
then the market is viable.
 
Also, a viable market <math>\mathcal{M}</math> can have only one money-market (bond) and hence only one risk-free rate. Therefore, if the <math>n</math>-th stock entails no risk (i.e.  <math>\sigma_{n,d}=0, \; d = 1 \ldots D</math>) and pays no dividend (i.e.<math>\delta_n(t)=0</math>), then its rate of return is equal to the money market rate (i.e. <math>b_n(t) = r(t)</math>) and its price tracks that of the bond (i.e. <math>S_n(t) = S_n(0)S_0(t)</math>).
 
==Standard financial market==
===Definition===
A financial market <math>\mathcal{M}</math> is said to be ''standard'' if:
:(i) It is viable.
:(ii) The number of stocks <math>N</math> is not greater than the dimension <math>D</math> of the underlying Brownian motion process <math>\mathbf{W}(t)</math>.
:(iii) The market price of risk process <math>\theta</math> satisfies:
::<math>\int_0^T \sum_{d=1}^D |\theta_d(t)|^2 dt < \infty</math>, almost surely.
:(iv) The positive process <math>Z_0(t) = \exp\left\{ -\int_0^t \sum_{d=1}^D \theta_d(t)dW_d(t) - \frac{1}{2}\int_0^t \sum_{d=1}^D |\theta_d(t)|^2 dt \right\} </math> is a [[Martingale (probability theory)|martingale]].
 
===Comments===
In case the number of stocks <math>N</math> is greater than the dimension <math>D</math>, in violation of point (ii), from linear algebra, it can be seen that there are <math>N-D</math> stocks  whose volatilies (given by the vector <math>(\sigma_{n,1} \ldots \sigma_{n,D})</math>) are linear combination of the volatilities of <math>D</math> other stocks (because the rank of <math>\sigma</math> is <math>D</math>). Therefore, the <math>N</math> stocks can be replaced by <math>D</math> equivalent mutual funds.
 
The ''standard martingale measure'' <math>P_0</math> on <math> \mathcal{F}(T)</math> for the standard market, is defined as:
:<math>P_0(A) \triangleq \mathbb{E}[Z_0(T)\mathbf{1}_A], \quad \forall A \in \mathcal{F}(T)</math>.
 
Note that <math>P</math> and <math>P_0</math> are [[absolutely continuous]] with respect to each other, i.e. they are equivalent. Also, according to [[Girsanov's theorem]],
 
:<math>\mathbf{W}_0(t) \triangleq \mathbf{W}(t) + \int_0^t \theta(s)ds  </math>,
 
is a <math>D</math>-dimensional Brownian motion process on the filtration <math> \{\mathcal{F}(t); \; 0 \leq t \leq T\}</math> with respect to <math>P_0</math>.
 
==Complete financial markets==
A complete financial market is one that allows effective [[hedge (finance)|hedging]] of the risk inherent in any investment strategy.
 
===Definition===
Let <math>\mathcal{M}</math> be a standard financial market, and <math>B</math> be an <math> \mathcal{F}(T)</math>-measurable random variable, such that:
 
:<math>P_0\left[\frac{B}{S_0(T)} > -\infty \right] = 1 </math>.
 
:<math> x \triangleq \mathbb{E}_0\left[\frac{B}{S_0(T)} \right] < \infty </math>,
 
The market <math>\mathcal{M}</math> is said to be ''complete'' if every such <math>B</math> is ''financeable'', i.e. if there is an <math>x</math>-financed portfolio process <math>(\pi_n(t); \; n = 1 \ldots N)</math>, such that its associated wealth process <math>X(t)</math> satisfies
 
:<math>X(t) = B</math>, almost surely.
 
===Motivation===
If a particular investment strategy calls for a payment <math>B</math> at time <math>T</math>, the amount of which is unknown at time <math>t=0</math>, then a conservative strategy would be to set aside an amount <math>x = \sup_\omega B(\omega)</math> in order to cover the payment. However, in a complete market it is possible to set aside less capital (viz. <math>x</math>) and invest it so that at time <math>T</math> it has grown to match the size of <math>B</math>.
 
===Corollary===
A standard financial market <math>\mathcal{M}</math> is complete if and only if <math>N=D</math>, and the <math>N \times D</math> volalatily process <math> \sigma(t)</math> is non-singular for almost every <math>t \in [0,T]</math>, with respect to the [[Lebesgue measure]].
 
==Notes==
<references/>
 
==See also==
*[[Black-Scholes model]]
*[[Martingale pricing]]
*[[Mathematical finance]]
*[[Monte Carlo method]]
 
==References==
{{Cite book | author=Karatzas, Ioannis; Shreve, Steven E. | authorlink= |
coauthors= | title=Methods of mathematical finance | year=1998 |
publisher=Springer | location=New York  | isbn=0-387-94839-2 | pages=}}
 
{{Cite book | author=Korn, Ralf; Korn, Elke | authorlink= | coauthors= |
title=Option pricing and portfolio optimization: modern methods of financial mathematics | year=2001 | publisher=American Mathematical Society |
location=Providence, R.I.  | isbn=0-8218-2123-7 | pages=}}
 
{{Cite jstor|1926560}}
 
{{Cite journal |  url = http://www.math.uwaterloo.ca/~mboudalh/Merton1971.pdf
| title = Optimum consumption and portfolio rules in a continuous-time model
| year = 1970
| author = Merton, R.C.
| journal = Journal of Economic Theory
| pages =
| volume = 3
| issue =
| doi =
| format = w
| accessdate = 2009-05-29
}} {{Dead link|date=November 2010|bot=H3llBot}}
 
{{DEFAULTSORT:Brownian Model Of Financial Markets}}
[[Category:Finance theories]]

Revision as of 15:40, 6 February 2013

The Brownian motion models for financial markets are based on the work of Robert C. Merton and Paul A. Samuelson, as extensions to the one-period market models of Harold Markowitz and William Sharpe, and are concerned with defining the concepts of financial assets and markets, portfolios, gains and wealth in terms of continuous-time stochastic processes.

Under this model, these assets have continuous prices evolving continuously in time and are driven by Brownian motion processes.[1] This model requires an assumption of perfectly divisible assets and a frictionless market (i.e. that no transaction costs occur either for buying or selling). Another assumption is that asset prices have no jumps, that is there are no surprises in the market. This last assumption is removed in jump diffusion models.

Financial market processes

Consider a financial market consisting of N+1 financial assets, where one of these assets, called a bond or money market, is risk free while the remaining N assets, called stocks, are risky.

Definition

A financial market is defined as =(r,b,δ,σ,A,S(0)):

  1. A probability space (Ω,,P)
  2. A time interval [0,T]
  3. A D-dimensional Brownian process W(t)=(W1(t)WD(t)),0tT adapted to the augmented filtration {(t);0tT}
  4. A measurable risk-free money market rate process r(t)L1[0,T]
  5. A measurable mean rate of return process b:[0,T]×NL2[0,T].
  6. A measurable dividend rate of return process δ:[0,T]×NL2[0,T].
  7. A measurable volatility process σ:[0,T]×N×D such that n=1Nd=1D0Tσn,d2(s)ds<.
  8. A measurable, finite variation, singularly continuous stochastic A(t)
  9. The initial conditions given by S(0)=(S0(0),SN(0))

The augmented filtration

Let (Ω,,p) be a probability space, and a W(t)=(W1(t)WD(t)),0tT be D-dimensional Brownian motion stochastic process, with the natural filtration:

W(t)σ({W(s);0st}),t[0,T].

If 𝒩 are the measure 0 (i.e. null under measure P) subsets of W(t), then define the augmented filtration:

(t)σ(W(t)𝒩),t[0,T]

The difference between {W(t);0tT} and {(t);0tT} is that the latter is both left-continuous, in the sense that:

(t)=σ(0s<t(s)),

and right-continuous, such that:

(t)=t<sT(s),

while the former is only left-continuous.[2]

Bond

A share of a bond (money market) has price S0(t)>0 at time t with S0(0)=1, is continuous, {(t);0tT} adapted, and has finite variation. Because it has finite variation, it can be decomposed into an absolutely continuous part S0a(t) and a singularly continuous part S0s(t), by Lebesgue's decomposition theorem. Define:

r(t)1S0(t)ddtS0a(t), and
A(t)0t1S0s(s)dS0(s),

resulting in the SDE:

dS0(t)=S0(t)[r(t)dt+dA(t)],0tT,

which gives:

S0(t)=exp(0tr(s)ds+A(t)),0tT.

Thus, it can be easily seen that if S0(t) is absolutely continuous (i.e. A()=0), then the price of the bond evolves like the value of a risk-free savings account with instantaneous interest rate r(t), which is random, time-dependent and (t) measurable.

Stocks

Stock prices are modeled as being similar to that of bonds, except with a randomly fluctuating component (called its volatility). As a premium for the risk originating from these random fluctuations, the mean rate of return of a stock is higher than that of a bond.

Let S1(t)SN(t) be the strictly positive prices per share of the N stocks, which are continuous stochastic processes satisfying:

dSn(t)=Sn(t)[bn(t)dt+dA(t)+d=1Dσn,d(t)dWd(t)],0tT,n=1N.

Here, σn,d(t),d=1D gives the volatility of the n-th stock, while bn(t) is its mean rate of return.

In order for an arbitrage-free pricing scenario, A(t) must be as defined above. The solution to this is:

Sn(t)=Sn(0)exp(0td=1Dσn,d(s)dWd(s)+0t[bn(s)12d=1Dσn,d2(s)]ds+A(t)),0tT,n=1N,

and the discounted stock prices are:

Sn(t)S0(t)=Sn(0)exp(0td=1Dσn,d(s)dWd(s)+0t[bn(s)12d=1Dσn,d2(s)]ds)),0tT,n=1N.

Note that the contribution due to the discontinuites in the bond price A(t) does not appear in this equation.

Dividend rate

Each stock may have an associated dividend rate process δn(t) giving the rate of dividend payment per unit price of the stock at time t. Accounting for this in the model, gives the yield process Yn(t):

dYn(t)=Sn(t)[bn(t)dt+dA(t)+d=1Dσn,d(t)dWd(t)+δn(t)],0tT,n=1N.

Portfolio and gain processes

Definition

Consider a financial market =(r,b,δ,σ,A,S(0)).

A portfolio process (π0,π1,πN) for this market is an (t) measurable, N+1 valued process such that:

0T|n=0Nπn(t)|[|r(t)|dt+dA(t)]<, almost surely,
0T|n=1Nπn(t)[bn(t)+δn(t)r(t)]|dt<, almost surely, and
0Td=1D|n=1Nσn,d(t)πn(t)|2dt<, almost surely.

The gains process for this porfolio is:

G(t)0t[n=0Nπn(t)](r(s)ds+dA(s))+0t[n=1Nπn(t)(bn(t)+δn(t)r(t))]dt+0td=1Dn=1Nσn,d(t)πn(t)dWd(s)0tT

We say that the porfolio is self-financed if:

G(t)=n=0Nπn(t).

It turns out that for a self-financed portfolio, the appropriate value of π0 is determined from π=(π1,πN) and therefore sometimes π is referred to as the portfolio process. Also, π0<0 implies borrowing money from the money-market, while πn<0 implies taking a short position on the stock.

The term bn(t)+δn(t)r(t) in the SDE of G(t) is the risk premium process, and it is the compensation received in return for investing in the n-th stock.

Motivation

Consider time intervals 0=t0<t1<<tM=T, and let νn(tm) be the number of shares of asset n=0N, held in a portfolio during time interval at time [tm,tm+1m=0M1. To avoid the case of insider trading (i.e. foreknowledge of the future), it is required that νn(tm) is (tm) measurable.

Therefore, the incremental gains at each trading interval from such a portfolio is:

G(0)=0,
G(tm+1)G(tm)=n=0Nνn(tm)[Yn(tm+1)Yn(tm)],m=0M1,

and G(m) is the total gain over time [0,tm], while the total value of the portfolio is n=0Nνn(tm)Sn(tm).

Define πn(t)νn(t), let the time partition go to zero, and substitute for Y(t) as defined earlier, to get the corresponding SDE for the gains process. Here πn(t) denotes the dollar amount invested in asset n at time t, not the number of shares held.

Income and wealth processes

Definition

Given a financial market , then a cumulative income process Γ(t)0tT is a semimartingale and represents the income accumulated over time [0,t], due to sources other than the investments in the N+1 assets of the financial market.

A wealth process X(t) is then defined as:

X(t)G(t)+Γ(t)

and represents the total wealth of an investor at time 0tT. The portfolio is said to be Γ(t)-financed if:

X(t)=n=0Nπn(t).

The corresponding SDE for the wealth process, through appropriate substitutions, becomes:

dX(t)=dΓ(t)+X(t)[r(t)dt+dA(t)]+n=1N[πn(t)(bn(t)+δn(t)r(t))]+d=1D[n=1Nπn(t)σn,d(t)]dWd(t).

Note, that again in this case, the value of π0 can be determined from πn,n=1N.

Viable markets

The standard theory of mathematical finance is restricted to viable financial markets, i.e. those in which there are no opportunities for arbitrage. If such opportunities exists, it implies the possibility of making an arbitrarily large risk-free profit.

Definition

In a financial market , a self-financed portfolio process π(t) is considered to be an arbitrage opportunity if the associated gains process G(T)0, almost surely and P[G(T)>0]>0 strictly. A market in which no such portfolio exists is said to be viable.

Implications

In a viable market , there exists a (t) adapted process θ:[0,T]×D such that for almost every t[0,T]:

bn(t)+δn(t)r(t)=d=1Dσn,d(t)θd(t).

This θ is called the market price of risk and relates the premium for the n-the stock with its volatility σn,.

Conversely, if there exists a D-dimensional process θ(t) such that it satisfies the above requirement, and:

0Td=1D|θd(t)|2dt<
𝔼[exp{0Td=1Dθd(t)dWd(t)120Td=1D|θd(t)|2dt}]=1,

then the market is viable.

Also, a viable market can have only one money-market (bond) and hence only one risk-free rate. Therefore, if the n-th stock entails no risk (i.e. σn,d=0,d=1D) and pays no dividend (i.e.δn(t)=0), then its rate of return is equal to the money market rate (i.e. bn(t)=r(t)) and its price tracks that of the bond (i.e. Sn(t)=Sn(0)S0(t)).

Standard financial market

Definition

A financial market is said to be standard if:

(i) It is viable.
(ii) The number of stocks N is not greater than the dimension D of the underlying Brownian motion process W(t).
(iii) The market price of risk process θ satisfies:
0Td=1D|θd(t)|2dt<, almost surely.
(iv) The positive process Z0(t)=exp{0td=1Dθd(t)dWd(t)120td=1D|θd(t)|2dt} is a martingale.

Comments

In case the number of stocks N is greater than the dimension D, in violation of point (ii), from linear algebra, it can be seen that there are ND stocks whose volatilies (given by the vector (σn,1σn,D)) are linear combination of the volatilities of D other stocks (because the rank of σ is D). Therefore, the N stocks can be replaced by D equivalent mutual funds.

The standard martingale measure P0 on (T) for the standard market, is defined as:

P0(A)𝔼[Z0(T)1A],A(T).

Note that P and P0 are absolutely continuous with respect to each other, i.e. they are equivalent. Also, according to Girsanov's theorem,

W0(t)W(t)+0tθ(s)ds,

is a D-dimensional Brownian motion process on the filtration {(t);0tT} with respect to P0.

Complete financial markets

A complete financial market is one that allows effective hedging of the risk inherent in any investment strategy.

Definition

Let be a standard financial market, and B be an (T)-measurable random variable, such that:

P0[BS0(T)>]=1.
x𝔼0[BS0(T)]<,

The market is said to be complete if every such B is financeable, i.e. if there is an x-financed portfolio process (πn(t);n=1N), such that its associated wealth process X(t) satisfies

X(t)=B, almost surely.

Motivation

If a particular investment strategy calls for a payment B at time T, the amount of which is unknown at time t=0, then a conservative strategy would be to set aside an amount x=supωB(ω) in order to cover the payment. However, in a complete market it is possible to set aside less capital (viz. x) and invest it so that at time T it has grown to match the size of B.

Corollary

A standard financial market is complete if and only if N=D, and the N×D volalatily process σ(t) is non-singular for almost every t[0,T], with respect to the Lebesgue measure.

Notes

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See also

References

20 year-old Real Estate Agent Rusty from Saint-Paul, has hobbies and interests which includes monopoly, property developers in singapore and poker. Will soon undertake a contiki trip that may include going to the Lower Valley of the Omo.

My blog: http://www.primaboinca.com/view_profile.php?userid=5889534

20 year-old Real Estate Agent Rusty from Saint-Paul, has hobbies and interests which includes monopoly, property developers in singapore and poker. Will soon undertake a contiki trip that may include going to the Lower Valley of the Omo.

My blog: http://www.primaboinca.com/view_profile.php?userid=5889534

Template:Cite jstor

One of the biggest reasons investing in a Singapore new launch is an effective things is as a result of it is doable to be lent massive quantities of money at very low interest rates that you should utilize to purchase it. Then, if property values continue to go up, then you'll get a really high return on funding (ROI). Simply make sure you purchase one of the higher properties, reminiscent of the ones at Fernvale the Riverbank or any Singapore landed property Get Earnings by means of Renting

In its statement, the singapore property listing - website link, government claimed that the majority citizens buying their first residence won't be hurt by the new measures. Some concessions can even be prolonged to chose teams of consumers, similar to married couples with a minimum of one Singaporean partner who are purchasing their second property so long as they intend to promote their first residential property. Lower the LTV limit on housing loans granted by monetary establishments regulated by MAS from 70% to 60% for property purchasers who are individuals with a number of outstanding housing loans on the time of the brand new housing purchase. Singapore Property Measures - 30 August 2010 The most popular seek for the number of bedrooms in Singapore is 4, followed by 2 and three. Lush Acres EC @ Sengkang

Discover out more about real estate funding in the area, together with info on international funding incentives and property possession. Many Singaporeans have been investing in property across the causeway in recent years, attracted by comparatively low prices. However, those who need to exit their investments quickly are likely to face significant challenges when trying to sell their property – and could finally be stuck with a property they can't sell. Career improvement programmes, in-house valuation, auctions and administrative help, venture advertising and marketing, skilled talks and traisning are continuously planned for the sales associates to help them obtain better outcomes for his or her shoppers while at Knight Frank Singapore. No change Present Rules

Extending the tax exemption would help. The exemption, which may be as a lot as $2 million per family, covers individuals who negotiate a principal reduction on their existing mortgage, sell their house short (i.e., for lower than the excellent loans), or take part in a foreclosure course of. An extension of theexemption would seem like a common-sense means to assist stabilize the housing market, but the political turmoil around the fiscal-cliff negotiations means widespread sense could not win out. Home Minority Chief Nancy Pelosi (D-Calif.) believes that the mortgage relief provision will be on the table during the grand-cut price talks, in response to communications director Nadeam Elshami. Buying or promoting of blue mild bulbs is unlawful.

A vendor's stamp duty has been launched on industrial property for the primary time, at rates ranging from 5 per cent to 15 per cent. The Authorities might be trying to reassure the market that they aren't in opposition to foreigners and PRs investing in Singapore's property market. They imposed these measures because of extenuating components available in the market." The sale of new dual-key EC models will even be restricted to multi-generational households only. The models have two separate entrances, permitting grandparents, for example, to dwell separately. The vendor's stamp obligation takes effect right this moment and applies to industrial property and plots which might be offered inside three years of the date of buy. JLL named Best Performing Property Brand for second year running

The data offered is for normal info purposes only and isn't supposed to be personalised investment or monetary advice. Motley Fool Singapore contributor Stanley Lim would not personal shares in any corporations talked about. Singapore private home costs increased by 1.eight% within the fourth quarter of 2012, up from 0.6% within the earlier quarter. Resale prices of government-built HDB residences which are usually bought by Singaporeans, elevated by 2.5%, quarter on quarter, the quickest acquire in five quarters. And industrial property, prices are actually double the levels of three years ago. No withholding tax in the event you sell your property. All your local information regarding vital HDB policies, condominium launches, land growth, commercial property and more

There are various methods to go about discovering the precise property. Some local newspapers (together with the Straits Instances ) have categorised property sections and many local property brokers have websites. Now there are some specifics to consider when buying a 'new launch' rental. Intended use of the unit Every sale begins with 10 p.c low cost for finish of season sale; changes to 20 % discount storewide; follows by additional reduction of fiftyand ends with last discount of 70 % or extra. Typically there is even a warehouse sale or transferring out sale with huge mark-down of costs for stock clearance. Deborah Regulation from Expat Realtor shares her property market update, plus prime rental residences and houses at the moment available to lease Esparina EC @ Sengkang Template:Dead link