On the Vietoris semicontinuity property of the $L_p$ balls at $p=1$ and an application

In this paper the Vietoris right lower semicontinuity at $p=1$ of the set valued map $p\rightarrow B_{\Omega,\mathcal{X},p}(r)$, $p\in [1,\infty]$, is discussed where $B_{\Omega,\mathcal{X},p}(r)$ is the closed ball of the space $L_{p}(\Omega,\Sigma,\mu; \mathcal{X})$ centered at the origin with radius $r$, $(\Omega,\Sigma,\mu)$ is a finite and positive measure space, $\mathcal{X}$ is a separable Banach space. It is proved that the considered set valued map is Vietoris right lower semicontinuous at $p=1$. Introducing additional geometric constraints on the functions from the ball $B_{\Omega,\mathcal{X},1}(r)$, a property which is close to the Hausdorff right lower semicontinuity, is derived. An application of the obtained result to the set of integrable outputs of the input-output system described by the Urysohn type integral operator is studied.