Superselection of the weak hypercharge and the algebra of the Standard Model

TL;DR

This paper introduces a superselection rule based on the weak hypercharge in the Standard Model, leading to a refined algebraic framework that accurately predicts the W boson and Higgs masses.

Contribution

It proposes a novel superselection rule for weak hypercharge, refining the algebraic structure of the Standard Model and improving mass predictions within experimental accuracy.

Findings

Accurate prediction of W boson and Higgs masses within 1%

Refined algebraic framework excluding sterile neutrinos

Superselection rule based on weak hypercharge

Abstract

Restricting the $\mathbb{Z}_2$-graded tensor product of Clifford algebras $C\ell_4\hat{\otimes}C\ell_6 $ to the particle subspace allows a natural definition of the Higgs field $\Phi$, the scalar part of Quillen's superconnection, as an element of $C\ell_4^1$. We emphasize the role of the exactly conserved weak hypercharge Y, promoted here to a superselection rule for both observables and gauge transformations. This yields a change of the definition of the particle subspace adopted in recent work with Michel Dubois-Violette \cite{DT20}; here we exclude the zero eigensubspace of Y consisting of the sterile (anti)neutrinos which are allowed to mix. One thus modifies the Lie superalgebra generated by the Higgs field. Equating the normalizations of $\Phi$ in the lepton and the quark subalgebras we obtain a relation between the masses of the W boson and the Higgs that fits the experimental values within one percent accuracy.