Extensions realizing affine datum : central extensions
Abstract
The study of extensions realizing affine datum is specialized to central extensions in varieties with a difference term which leads to generalizations of several classical theorems on central extensions from group theory. We establish a 1-dimensional Hochschild-Serre sequence for a central extension equipped with affine datum. This is used to develop a Schur-Hopf formula which characterizes the -cohomology group of regular datum in terms of the transgression map and commutators in free presentations. We prove, assuming the existence of an idempotent, the existence of covers and provide a cohomological characterization of perfect algebras. The class of varieties with a difference term contain all varieties of algebras with modular congruence lattices; for example, any variety of groups with multiple operators in the parlance of P.J. Higgins or algebras of Loday-type - analogous results recently established for these algebras can be recovered by specialization.
Cite
@article{arxiv.2312.15963,
title = {Extensions realizing affine datum : central extensions},
author = {Alexander Wires},
journal= {arXiv preprint arXiv:2312.15963},
year = {2025}
}
Comments
38 pages, updated definition of Schur multiplier (Def 5.6), added Sec 7 which proves Schur multiplier is invariant under free-presentations