In SAG Remark 6.3.3.8, Lurie asserts that if we have a representable (by Spectral Deligne-Mumford stacks) natural transformation $X\to Y$ where $Y$ is a functor satisfying fpqc descent, then so too does $X$.
In particular, if we let $Y$ be the representable functor $\operatorname{Spec}(\mathbb{S})$ the sphere spectrum, this functor of points satisfies fpqc descent, so this statement would imply that the functor of points of any spectral Deligne-Mumford stack also satisfies fpqc descent.
However, later on, in the paragraph immediately following Remark 9.1.4.2, he says that the functor of points $h_X$ of a spectral Deligne-Mumford stack need not satisfy fpqc descent.
Is this a mistake? Is it true, at any rate, that such a functor at least always satisfies fppf descent (where fppf means 'faithfully flat and locally almost of finite presentation')? Do we need to require that the functor is representable by a relative Deligne-Mumford n-stack for n finite?
(It seems like at least classically, this also isn't true.)
