Boundedness of weighted composition operators $W_{u,\varphi}$ acting on theclassical Dirichlet space $\mathcal{D}$ as $W_{u,\varphi}f= u\, (f\circ\varphi)$ is studied in terms of the multiplier space associated to the symbol$\varphi$, i.e., ${\mathcal{M}(\phi)}=\{ u \in {\mathcal D}: W_{u,\phi} \hbox{is bounded on } {\mathcal D} \}$. A prominent role is played by the multipliersof the Dirichlet space. As a consequence, the spectrum of $W_{u,\varphi}$ in$\mathcal{D}$ whenever $\varphi$ is an automorphism of the unit disc isstudied, extending a recent work of Hyv\"arinen, Lindstr\"om, Nieminen andSaukko to the context of the Dirichlet space.
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