The goal of this note is to show that, also in a bounded domain $\Omega
\subset \mathbb{R}^n$, with $\partial \Omega\in C^2$, any weak solution,
$(u(x,t),p(x,t))$, of the Euler equations of ideal incompressible fluid in
$\Omega\times (0,T) \subset \mathbb{R}^n\times\mathbb{R}_t$, with the
impermeability boundary condition: $u\cdot \vec n =0$ on
$\partial\Omega\times(0,T)$, is of constant energy on the interval $(0,T)$
provided the velocity field $u \in L^3((0,T);
C^{0,\alpha}(\overline{\Omega}))$, with $\alpha>\frac13\,.$