This paper investigates the properties of contingent claim prices in a one dimensional diffusion world and establishes that (i) the delta of any claim is bounded above (below) by the sup (inf) of its delta at maturity, and (ii), if its payoff is convex (concave) then its current value is convex...

This paper examines general properties of prices of contingent claims. When the underlying follows a one- dimensional diffusion and interest rates are deterministic, a claim's delta is bounded by the infimum and the supremum of its delta at maturity. Similar bounds hold for the bond position in...

When the underlying price process is a one-dimensional diffusion, as well as in certain restricted stochastic volatility settings, a contingent claim's delta is bounded by the infimum and supremum of its delta at maturity. Further, if the claim's payoff is convex (concave), the claim's price is...

A recent paper (Benninga-Protopapadakis 1994) considered a Lucas asset pricing model and showed that the pricing of forward and futures contracts was expressible as a simple matrix function. In this paper we derive limiting conditions for these differences and relate them to the eigenvectors of...