M. Dauge proved in [1] the regularity property  $\Delta u \in (W^1_p)^*$ $\Rightarrow$ $u \in W^1_p$ for Dirichlet and Neumann problem in domains with piecewise smooth boundaries, for $p>3$. (see Corollary 3.10). Then the author stated: “By *a duality argument* it is *easy* to deduce from previous statement that the Laplace operator… is an isomorphism …. when  $3/2-\epsilon <p<3+\epsilon$ (see Rematk 3.11). What is “a duality argument” and which theorem should be used in this case?

[1] Dauge, M. *Neumann and mixed problems on curvilinear polyhedra*.
Integral Equations Operator Theory 15 (1992), no. 2, 227–261.