Regularity Of Spectral Stacks And Discreteness Of Weight-Hearts

Abstract: We study regularity in the context of connective ring spectra and spectral stacks. Parallel to that, we construct a weight structure on the category of compact quasi-coherent sheaves on spectral quotient stacks of the form $X=[\operatorname{Spec} R/G]$ defined over a field, where R is a connective ${{\mathcal{E}}_\infty}$-k-algebra and G is a linearly reductive group acting on R. Under reasonable assumptions, we show that regularity of X is equivalent to regularity of R. We also show that if R is bounded, such… Show more

“…. Upper-triangular ring spectra are considered for example in [18]. We are ready to state and prove the main result in this article.…”

Derived equivalences of upper-triangular ring spectra via lax limits

“…. Upper-triangular ring spectra are considered for example in [18]. We are ready to state and prove the main result in this article.…”

Derived equivalences of upper-triangular ring spectra via lax limits

Categorical Milnor squares and K-theory of algebraic stacks