Intrinsic Ultracontractivity of Feynman-Kac Semigroups for Symmetric Jump Processes (1403.3486v3)
Abstract: Consider the symmetric non-local Dirichlet form $(D,\D(D))$ given by $$ D(f,f)=\int_{\Rd}\int_{\Rd}\big(f(x)-f(y)\big)2 J(x,y)\,dx\,dy $$with $\D(D)$ the closure of the set of $C1$ functions on $\Rd$ with compact support under the norm $\sqrt{D_1(f,f)}$, where $D_1(f,f):=D(f,f)+\int f2(x)\,dx$ and $J(x,y)$ is a nonnegative symmetric measurable function on $\Rd\times \Rd$. Suppose that there is a Hunt process $(X_t){t\ge 0}$ on $\Rd$ corresponding to $(D,\D(D))$, and that $(L,\D(L))$ is its infinitesimal generator. We study the intrinsic ultracontractivity for the Feynman-Kac semigroup $(T_tV){t\ge 0}$ generated by $LV:=L-V$, where $V\ge 0$ is a non-negative locally bounded measurable function such that Lebesgue measure of the set ${x\in \Rd: V(x)\le r}$ is finite for every $r>0$. By using intrinsic super Poincar\'{e} inequalities and establishing an explicit lower bound estimate for the ground state, we present general criteria for the intrinsic ultracontractivity of $(T_tV)_{t\ge 0}$. In particular, if $$J(x,y)\asymp|x-y|{-d-\alpha}\I_{{|x-y|\le 1}}+e{-|x-y|\gamma}\I_{{|x-y|> 1}}$$ for some $\alpha \in (0,2)$ and $\gamma\in(1,\infty]$, and the potential function $V(x)=|x|\theta$ for some $\theta>0$, then $(T_tV)_{t\ge 0}$ is intrinsically ultracontractive if and only if $\theta>1$. When $\theta>1$, we have the following explicit estimates for the ground state $\phi_1$ $$c_1\exp\Big(-c_2 \theta{\frac{\gamma-1}{\gamma}}|x| \log{\frac{\gamma-1}{\gamma}}(1+|x|)\Big) \le \phi_1(x) \le c_3\exp\Big(-c_4 \theta{\frac{\gamma-1}{\gamma}}|x| \log{\frac{\gamma-1}{\gamma}}(1+|x|)\Big) ,$$ where $c_i>0$ $(i=1,2,3,4)$ are constants. We stress that, our method efficiently applies to the Hunt process $(X_t){t \ge 0}$ with finite range jumps, and some irregular potential function $V$ such that $\lim{|x| \to \infty}V(x)\neq\infty$.