I understand that for a complex domain $\Omega$, $H^2(\Omega)$ is the closure of the span of $1, z, z^2, \dots $ . However, I am unsure if this space is any different on $\mathbb{R}$.
2026-03-27 13:47:01.1774619221
What is the space $H^2([0,1])$ inside $L^2([0,1])$?
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