DELTA GAMMA HEDGING

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Gamma

Gamma (G) is the rate of change of delta (D) with respect to the price of the underlying asset.Gamma addresses delta hedging errors caused by curvature.



A portfolio, hedged with the combined delta and gamma values eliminates the gamma errors incorporated in a delta neutral strategy.



The number of shares (n1) and the number of options (n2) for delta and

gamma hedge are chosen as under

1+n1Delta1+n2Delta2 = 0

n1Gamma1+n2Gamma2=0



Example of Delta and Gamma Hedge

Hedging a short position on a 3 month call option with delta=0.5948 and gamma=0.0026.



Hedge Instruments

Underlying Asset, delta=1, gamma=0 and 1 month call,

delta=0.5551,gamma=0.0046


Choose n1=number of share and n2= number of calls as under

Delta= -0.5948+n1x1+n2x0.5551=0

Gamma=-0.0026+n1x0+n2x0.0046=0

N1= 0.2810……………Long 0.2810 shares

N2 = 0.5652……………Long 0.5652 calls



Delta-Gamma Hedging

Delta, D, can be changed by taking a position in the underlying asset

To adjust gamma, G, it is necessary to take a position in an option or other derivative



Delta-Gamma Hedging Example

A traded call option on the same stock with X = 95 and T = 0.6 (Option 1) will

be used to make the portfolio Delta-Gamma neutral.


Price Delta Gamma
Option to be Hedged 4.2 0.434 0.027
Option 1 6.3 0.531 0.042



Let w1 be the number of options 1 in the portfolio

Gamma neutral implies

-1,0000 x 0.027 + w1 x 0.042 = 0

w1 = 270 / 0.025 = 6,428

Delta Gamma Hedging

Let ws be the number of shares in the portfolio

Delta neutral implies

-10,000 x 0.434 + ws + w1 x 0. 531= 0


ws = -4340 + 6428 x 0. 531 = -927



The Delta-Gamma neutral portfolio is


Short 10,000 calls

Short 3413 Shares


Long 6,428 options 1

 

[rosemarry2]

Gamma

Gamma (G) is the rate of change of delta (D) with respect to the price of the underlying asset.Gamma addresses delta hedging errors caused by curvature.



A portfolio, hedged with the combined delta and gamma values eliminates the gamma errors incorporated in a delta neutral strategy.



The number of shares (n1) and the number of options (n2) for delta and

gamma hedge are chosen as under

1+n1Delta1+n2Delta2 = 0

n1Gamma1+n2Gamma2=0



Example of Delta and Gamma Hedge

Hedging a short position on a 3 month call option with delta=0.5948 and gamma=0.0026.



Hedge Instruments

Underlying Asset, delta=1, gamma=0 and 1 month call,

delta=0.5551,gamma=0.0046


Choose n1=number of share and n2= number of calls as under

Delta= -0.5948+n1x1+n2x0.5551=0

Gamma=-0.0026+n1x0+n2x0.0046=0

N1= 0.2810……………Long 0.2810 shares

N2 = 0.5652……………Long 0.5652 calls



Delta-Gamma Hedging

Delta, D, can be changed by taking a position in the underlying asset

To adjust gamma, G, it is necessary to take a position in an option or other derivative



Delta-Gamma Hedging Example

A traded call option on the same stock with X = 95 and T = 0.6 (Option 1) will

be used to make the portfolio Delta-Gamma neutral.


Price Delta Gamma
Option to be Hedged 4.2 0.434 0.027
Option 1 6.3 0.531 0.042



Let w1 be the number of options 1 in the portfolio

Gamma neutral implies

-1,0000 x 0.027 + w1 x 0.042 = 0

w1 = 270 / 0.025 = 6,428

Delta Gamma Hedging

Let ws be the number of shares in the portfolio

Delta neutral implies

-10,000 x 0.434 + ws + w1 x 0. 531= 0


ws = -4340 + 6428 x 0. 531 = -927



The Delta-Gamma neutral portfolio is


Short 10,000 calls

Short 3413 Shares


Long 6,428 options 1

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