On backward Kolmogorov equation related to CIR process

Abstract

We consider the existence of a classical smooth solution to the backward Kolmogorov equation align* cases ∂t u(t,x)=Au(t,x),& x0,\ t∈[0,T],\\ u(0,x)=f(x),& x0, cases align* where A is the generator of the CIR process, the solution to the stochastic differential equation equation* Xxt=x+∫0tθ (-Xxs)\,ds+σ∫ 0t Xxs \,dBs, x0,\ t∈[0,T], equation* that is, Af(x)=θ(-x)f'(x)+12σ2xf''(x), x0 (θ,,σ>0). Alfonsi Alfonsi showed that the equation has a smooth solution with partial derivatives of polynomial growth, provided that the initial function f is smooth with derivatives of polynomial growth. His proof was mainly based on the analytical formula for the transition density of the CIR process in the form of a~rather complicated function series. In this paper, for a CIR process satisfying the condition σ24θ, we present a direct proof based on the representation of a CIR process in terms of a~squared Bessel process and its additivity property.