Spectral condition, hitting times and Nash inequality

Abstract

Let X be a μ-symmetric Hunt process on a LCCB space E. For an open set G ⊂eq E, let τG be the exit time of X from G and AG be the generator of the process killed when it leaves G. Let r:[0,∞[[0,∞[ and R (t) = ∫0t r(s) ds. We give necessary and sufficient conditions for μ R (τG)<∞ in terms of the behavior near the origin of the spectral measure of -AG. When r(t)=tl, l>0, by means of this condition we derive the Nash inequality for the killed process. In the case of one-dimensional diffusions, this permits to show that the existence of moments of order l for τG implies the Nash inequality of order p=l+2l+1 for the whole process. The associated rate of convergence of the semi-group in L2(μ) is bounded by t-(l+1). For diffusions in dimension greater than one, we obtain the Nash inequality of the same order under an additional non-degeneracy condition (local Poincar\'e inequality). Finally, we show for general Hunt processes that the Nash inequality giving rise to a convergence rate of order t-(l+1) of the semi-group, implies the existence of moments of order l+1 -ε for τG, for all ε>0.