Smashing, Balmer, Zariski spectra: an ideal approach
Abstract
We introduce the Zariski frame of any presentably symmetric monoidal $\infty$-category.
This allows us to unify several spectral theories arising in higher algebra.
The Zariski frame is coherent whenever the category is compactly generated, and the associated spectral space recovers both the classical Zariski spectrum of a commutative ring and the Hochster dual of the Balmer spectrum of a commutative $2$-ring.
Moreover, the smashing frame of any stable presentably symmetric monoidal $\infty$-category can be identified with the Zariski frame of its category of dualizable modules.
This construction is based on the principle that ideals in a symmetric monoidal $\infty$-category should be understood as monomorphisms into the unit object.
In suitable contexts, this notion recovers the kinds of ideals appearing in the preceding examples, including thick ideals and smashing ideals, and it also accommodates the smashing ideals of non-stable $\infty$-categories.
We also study the problem of forming quotients by ideals, which is subtle in the setting of higher algebra.
To address this, we introduce two properties of pointed $\infty$-categories, called $\Sigma$-triviality and $\Sigma$-exactness.
These conditions ensure that quotienting by ideals behaves well.
As an application, we construct quotients of $\mathbb{E}_\infty$-semirings.
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