Descent in tensor triangular geometry

Abstract: We investigate to what extent we can descend the classification of localizing, smashing and thick ideals in a presentably symmetric monoidal stable $\infty$-category $\mathscr{C}$ along a descendable commutative algebra $A$. We establish equalizer diagrams relating the lattices of localizing and smashing ideals of $\mathscr{C}$ to those of $\mathrm{Mod}{A}(\mathscr{C})$ and $\mathrm{Mod}{A\otimes A}(\mathscr{C})$. If $A$ is compact, we obtain a similar equalizer for the lattices of thick ideals which, via Stone duality, yields a coequalizer diagram of Balmer spectra in the category of spectral spaces. We then give conditions under which the telescope conjecture and stratification descend from $\mathrm{Mod}_{A}(\mathscr{C})$ to $\mathscr{C}$. The utility of these results is demonstrated in the case of faithful Galois extensions in tensor triangular geometry.