ar X iv : m at h / 07 03 53 8 v 1 [ m at h . O C ] 1 9 M ar 2 00 7 Remarks on the American Put Option for Jump Diffusions ∗

ar X iv : m at h / 07 03 53 8 v 5 [ m at h . O C ] 1 6 Ju n 20 07 Remarks on the American Put Option for Jump Diffusions ∗ †

We prove that the perpetual American put option price of an exponential Lévy process whose jumps come from a compound Poisson process is the classical solution of its associated quasi-variational inequality, that it is C except at the stopping boundary and that it is C everywhere (i.e. the smooth pasting condition always holds). We prove this fact by constructing a sequence of functions, each o...

ar X iv : m at h / 02 03 15 3 v 1 [ m at h . O C ] 1 5 M ar 2 00 2 CONTROLLABILITY OF REDUCED SYSTEMS

Sufficient conditions for the controllability of a conservative reduced system are given. Several examples illustrating the theory are also presented.

M ar 2 00 7 Remarks on the American Put Option for Jump Diffusions ∗ †

We prove that the perpetual American put option price of an exponential Lévy process whose jumps come from a compound Poisson process is the classical solution of its associated quasi-variational inequality, that it is C except at the stopping boundary and that it is C everywhere (i.e. the smooth pasting condition always holds). We prove this fact by constructing a sequence of functions, each o...

ar X iv : 0 70 7 . 33 03 v 1 [ m at h . O A ] 2 3 Ju l 2 00 7 OPERATOR - VALUED FRAMES

ar X iv : h ep - p h / 07 03 29 7 v 1 2 8 M ar 2 00 7 Introduction to Chiral Perturbation Theory

A brief introduction to chiral perturbation theory, the effective field theory of quantum chromodynamics at low energies, is given.