English

Slice spectral sequences through synthetic spectra

Algebraic Topology 2025-10-23 v1

Abstract

We define a tt-structure on the category of filtered GG-spectra such that for a Borel GG-spectrum XX the slice filtration of XX is the connective cover of the homotopy fixed-point filtration of XX. Using this, we show that the slice spectral sequence for the norm NC2GMURN_{C_2}^GMU_{\mathbb{R}} of Real bordism theory refines canonically to a E\mathbb{E}_\infty-algebra in MUMU-synthetic spectra, when GG is a cyclic 22-group. Concretely, this gives a map of multiplicative spectral sequences from the classical Adams--Novikov spectral sequence of S\mathbb{S} to the slice spectral sequence for NC2GMURN_{C_2}^GMU_{\mathbb{R}} that respects the higher E\mathbb{E}_\infty structure, such as Toda brackets and power operations. We give a conjecture on the existence of vanishing lines in the equivariant Adams--Novikov spectral sequence based at tom Dieck's homotopical complex bordism MUGMU_G. Conditional on this conjecture, our tt-structure implies that the slice filtration for NC2GMURN_{C_2}^GMU_{\mathbb{R}} lifts further to an O\mathcal{O}-algebra in MUGMU_G-synthetic spectra, where O\mathcal{O} is the N\mathbb{N}_\infty-operad with all norms from nontrivial subgroups of GG.

Keywords

Cite

@article{arxiv.2510.19501,
  title  = {Slice spectral sequences through synthetic spectra},
  author = {Christian Carrick},
  journal= {arXiv preprint arXiv:2510.19501},
  year   = {2025}
}

Comments

41 pages, comments welcome

R2 v1 2026-07-01T06:59:35.710Z