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Dirichlet boundary conditions on a surface can be imposed on a scalar ﬁeld, by coupling it quadraticallyto a δ -like potential, the strength of which tends to inﬁnity. Neumann conditions, on the other hand,require the introduction of an even more singular term, which renders the reﬂection and transmissioncoeﬃcients ill-deﬁned because of UV divergences. We present a possible procedure to tame thosedivergences, by introducing a minimum length scale, related to the nonzero width of a nonlocal term. Wethen use this setup to reach (either exact or imperfect) Neumann conditions, by taking the appropriatelimits. After deﬁning meaningful reﬂection coeﬃcients, we calculate the Casimir energies for ﬂat parallelmirrors, presenting also the extension of the procedure to the case of arbitrary surfaces. Finally, wediscuss brieﬂy how to generalize the worldline approach to the nonlocal case, what is potentially usefulin order to compute Casimir energies in theories containing nonlocal potentials; in particular, those whichwe use to reproduce Neumann boundary conditions.