How do we check whether the solution is continuouly dependent on parameters? Let $\Omega$ be a domain with smooth boundary. Say $f$ and $h$ are smooth. Assume that for each $\theta\in (0, 1]$, the equation $\Delta u-f(\theta, u)=h$ with Neumann boundary condition has a unique classical solution $u(x, \theta)$. How do we check that $u$ is continously dependent on $\theta$? And what happens if $\theta\rightarrow 0$? For example. for $\theta\in(0, 1]$, let $u$ be the solution of $\Delta u-\theta u= h$ subject to Neumann boundary condition. Is $u$ continuously dependent on $\theta$? It looks like $\lim_{\theta\rightarrow 0} u$ does not exist if $\int_\Omega h\neq0$; and the limit will exist if $\int_\Omega h =0$. Am I right? So in general, if $\theta=0$ the solution to $\Delta u-f(0, u)=h$ exists, then the limit exists? Can anyone give me some hint? Thanks....