Title :
Mean square optimal hedges using higher order moments
Author :
Yamada, Yuji ; Primbs, James A.
Author_Institution :
Graduate Sch. of Bus. Sci., Univ. of Tsukuba, Tokyo, Japan
Abstract :
The authors pose and solve a mean square optimal hedging problem that takes higher order moments (or cumulants) into account. They first provide a discrete stochastic dynamics model using a general multinomial lattice, where the first m cumulants are matched over each time step. They then analyze the effect of higher order moments in the underlying asset process on the price of derivative securities. The relationship between the term structure of the volatility smile and smirk and higher order cumulants is illustrated through numerical experiments.
Keywords :
higher order statistics; mean square error methods; optimisation; stochastic processes; stock markets; asset process; derivative securities; discrete stochastic dynamics model; general multinomial lattice; higher order cumulants; higher order moments; mean square optimal hedges; mean square optimal hedging problem; term structure; volatility smile; volatility smirk; Bonding; Cost accounting; Dynamic programming; Engineering management; Lattices; Portfolios; Random variables; Security; Stochastic processes; Tail;
Conference_Titel :
Computational Intelligence for Financial Engineering, 2003. Proceedings. 2003 IEEE International Conference on
Print_ISBN :
0-7803-7654-4
DOI :
10.1109/CIFER.2003.1196252
