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Portfolio strategies

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All underlying stochastic processes can be represented by an Ito-process ... Cvariance : the Vega. Cr: the Rho. Numerical approximation of Greeks ... – PowerPoint PPT presentation

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Title: Portfolio strategies


1
Portfolio strategies
  • Hans Dewachter

2
Overview
  • Ito processes and the Ito lemma
  • Numerical calculation of the Greeks
  • Portfolio strategies

3
Ito processes and theIto lemma
  • Assumptions
  • Itos lemma in one dimension
  • The Greeks

4
Ito processes and theIto lemma
  • Assumptions
  • All underlying stochastic processes can be
    represented by an Ito-process
  • We assume interest rates to be uncorrelated with
    underlying asset
  • Restriction to the class of derivatives with
    continuous and twice differentiable functionals
    in the underlying asset.

5
Ito processes and theIto lemma
  • Itos lemma constant interest rate
  • Let the underlying asset, X, follow an Ito
    process, dX(t) A(X, t).dt B(X,t).dW(t), and
    denote the derivative price by C(X,t)
  • Then the derivative price dynamics are
  • dC(X,t) Ct dt CX dX ½CXX B( ) dt
  • With Ci the partial derivative of C w.r.t. i

6
Ito processes and theIto lemma
  • The partial derivatives are called the Greeks
  • CX the Delta
  • Ct the Theta
  • CXX the Gamma
  • Other  Greeks 
  • Cvariance the Vega
  • Cr the Rho

7
Numerical approximation of Greeks
  • How to compute numerically a partial derivative?
  • Definition of partial derivative
  • Limh 0 (C(Xh,t) C(X,t) ) / h
  • Second partial derivative is then the derivative
    of the derivative
  • Easily computed!

8
Computing derivatives in practice
  • Calculate the delta of a derivative C(X,t) given
    a current price of 100.
  • Forward method
  • Compute C at price 100 and again at 100 h.
  • Take the difference and divide by h.
  • So (C(100h,t)-C(100,t))/h
  • How large should h be?

9
Computing derivatives in practice
  • Calculate the delta of a derivative C(X,t) given
    a current price of 100.
  • Backward method
  • Compute C at price 100 and again at 100 - h.
  • Take the difference and divide by h.
  • So (C(100,t) - C(100-h,t))/h
  • How large should h be?

10
Computing derivatives in practice
  • Calculate the delta of a derivative C(X,t) given
    a current price of 100.
  • Two-sided average
  • Compute derivatives using forward and backward
    method and take the average.
  • Take the difference and divide by 2h.
  • So (C(100h,t) - C(100-h,t))/(2 h)
  • How large should h be?

11
Example in excel
  • montecarlooptionfinal.xls

12
Portfolio strategies
  • Example 1 Insuring the writer of a call against
    stock price movements.
  • Portfolio V(X,t) - C(X,t) gX h Bond
  • Dynamics of portfolio?
  • dV -Ct dt - CX dX 1/2 CXX B()2 dt g dX h.r
    dt
  • Immunization dV0 implies that
  • g CX
  • h - ( Ct dt 1/2 CXX B()2 ) / r
  • Note that the Greeks are time- and X- dependent
    and hence that portfolio composition needs to be
    adjusted

13
Portfolio strategies
  • Example 2 Insuring the writer of a call against
    stock price movements.
  • Portfolio V(X,t) - C(X,t) gX h Bond
  • Dynamics of portfolio?
  • dV -Ct dt - CX dX 1/2 CXX B()2 dt g dX h.r
    dt
  • Making portfolio riskless dV independent of dW
    implies that
  • g CX
  • Note that the Greeks are time- and X- dependent
    and hence that portfolio composition needs to be
    adjusted

14
Portfolio strategies
15
Portfolio strategies
  • Interpretation of Gamma ?
  • d(Delta)/dX Gamma
  • So d (Delta) Gamma. dX
  • So high gamma implies a large delta portfolio
    adjustment next period, small gamma means small
    adjustment!
  • Relevant for replication with transaction costs!!!

16
Portfolio strategies
  • Producing  click funds 
  • Investment period five years. For every 1
    invested there is the guarrantee that
  • When stock markets go down you get the money back
  • Else you get as profit half of the increase of
    the stock market (without dividends).
  • Construct this porfolio (using bonds and call
    options). Does the financial institution gain on
    this contract or not?
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