Strong law of large numbers for supercritical superprocesses under second moment condition (1502.01426v3)
Abstract: Suppose that $X={X_t, t\ge 0}$ is a supercritical superprocess on a locally compact separable metric space $(E, m)$. Suppose that the spatial motion of $X$ is a Hunt process satisfying certain conditions and that the branching mechanism is of the form $$ \psi(x,\lambda)=-a(x)\lambda+b(x)\lambda2+\int_{(0,+\infty)}(e{-\lambda y}-1+\lambda y)n(x,dy), \quad x\in E, \quad\lambda> 0, $$ where $a\in \mathcal{B}b(E)$, $b\in \mathcal{B}_b+(E)$ and $n$ is a kernel from $E$ to $(0,\infty)$ satisfying $$ \sup{x\in E}\int_0\infty y2 n(x,dy)<\infty. $$ Put $T_tf(x)=\mathbb{P}{\delta_x}< f,X_t>$. Let $\lambda_0>0$ be the largest eigenvalue of the generator $L$ of $T_t$, and $\phi_0$ and $\hat{\phi}_0$ be the eigenfunctions of $L$ and $\hat{L}$ (the dural of $L$) respectively associated with $\lambda_0$. Under some conditions on the spatial motion and the $\phi_0$-transformed semigroup of $T_t$, we prove that for a large class of suitable functions $f$, we have $$ \lim{t\rightarrow\infty}e{-\lambda_0 t}< f, X_t> = W_\infty\int_E\hat{\phi}0(y)f(y)m(dy),\quad \mathbb{P}{\mu}{-a.s.}, $$ for any finite initial measure $\mu$ on $E$ with compact support, where $W_\infty$ is the martingale limit defined by $W_\infty:=\lim_{t\to\infty}e{-\lambda_0t}< \phi_0, X_t>$. Moreover, the exceptional set in the above limit does not depend on the initial measure $\mu$ and the function $f$.