Abstract:
In a complete financial market we consider the discrete time hedging of the American
option with a convex payoff. It is well-known that for the perfect hedging the writer
of the option must trade continuously in time which is impossible in practice. In
reality, the writer hedges only at some discrete time instants.
The perfect hedging requires the knowledge of the partial derivative of the value
function of the American option in the underlying asset, explicit form of which is
unknown in most cases of practical importance. At the same time several approxima-
tion methods are developed for the calculation of the value function of the American
option.
We establish in this thesis that, having at hand any uniform approximation of
the American option value function at the equidistant discrete rebalancing times it
is possible to construct a discrete time hedging portfolio the value process of which
uniformly approximates the value process of the continuous time perfect delta-hedging
portfolio.
We are able to estimate the corresponding discrete time hedging error that leads
to complete justification of our hedging method for the non-increasing convex payoff
functions including the important case of the American put. It is essentially based on
a recently found new type square integral estimate for the derivative of an arbitrary
convex function by Shashiash [23]. We generalize the latter square integral estimate
to the case of the family of the weight functions, satisfying certain conditions.