Artikel

Conserving capital by adjusting deltas for gamma in the presence of skewness

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An argument for adjusting Black Scholes implied call deltas downwards for a gamma exposure in a left skewed market is presented. It is shown that when the objective for the hedge is the conservation of capital ignoring the gamma for the delta position is expensive. The gamma adjustment factor in the static case is just a function of the risk neutral distribution. In the dynamic case one may precompute at the date of trade initiation a matrix of delta levels as a function of the underlying for the life of the trade and subsequently one just has to look up the matrix for the hedge. Also constructed are matrices for the capital reserve, the pro¯t, leverage and rate of return remaining in the trade as a function of the spot at a future date in the life of the trade. The concepts of pro¯t, capital, leverage and return are as described in Carr, Madan and Vicente Alvarez (2010). The dynamic computations constitute an application of the theory of nonlinear expectations as described in Cohen and Elliott (2010).

Language
Englisch

Bibliographic citation
Journal: Journal of Risk and Financial Management ; ISSN: 1911-8074 ; Volume: 3 ; Year: 2010 ; Issue: 1 ; Pages: 1-25 ; Basel: MDPI

Classification
Wirtschaft
Contingent Pricing; Futures Pricing; option pricing
Subject
Bid and Ask Prices
Concave Distortions
Non Linear Expectations
Variance Gamma Model
Non-Uniform Grids

Event
Geistige Schöpfung
(who)
Madan, Dilip B.
Event
Veröffentlichung
(who)
MDPI
(where)
Basel
(when)
2010

DOI
doi:10.3390/jrfm3010001
Handle
Last update
10.03.2025, 11:42 AM CET

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Object type

  • Artikel

Associated

  • Madan, Dilip B.
  • MDPI

Time of origin

  • 2010

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