Convergence of $e^{itH}$ as a sum for $H$ and unbounded operator

If $H$ is self adjoint on $mathcal H$, then you can write it as its spectral decomposition: $$ H = int_{mathbb R} lambda , dP_lambda $$ Then restricted to $$mathcal H_n = left(int_{[-n,n]} , dP_lambda right) (mathcal H) = (P_{n+} - P_{-n-})(mathcal H)$$ we have that $H$ is invariant and bounded in norm by by $n$. And $$ mathcal H_0 = bigcup_n mathcal H_n $$ is dense in $mathcal H$. So on the dense subspace $mathcal H_0$, the infinite series does converge strongly.

Of course, this is effectively the functional calculus written in a slightly different way. But your example is rather close to considering $ifrac d{dt}$ on the dense subspace of functions whose Fourier transform is compactly supported, and hence the example you give is not far from this process.

It all really boils down to the single example $H f(x) = x f(x)$ on $L^2(Omega)$ where $Omega subset mathbb R$. This is precisely what the spectral decomposition does. Your example is $f(x) = frac 1{1 + (lambda x)^2} $, which although not compactly supported, definitely converges to $0$ quite rapidly as $x to pm infty$.