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Main Authors: Gripaios, Ben, Nguyen, Khoi Le Nguyen
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2508.11583
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author Gripaios, Ben
Nguyen, Khoi Le Nguyen
author_facet Gripaios, Ben
Nguyen, Khoi Le Nguyen
contents We use methods of arithmetic geometry to find solutions to the abelian local anomaly cancellation equations for a four-dimensional gauge theory whose Lie algebra has a single $\mathfrak{u}_1$ summand, assuming that a non-trivial solution exists. The resulting polynomial equations in the integer $\mathfrak{u}_1$ charges define a projective cubic hypersurface over the field of rational numbers. Generically, such a hypersurface is (by a theorem of Koll{á}r) unirational, making it possible to find a finitely-many-to-one parameterization of infinitely many solutions using secant and tangent constructions. As an example, for the Standard Model Lie algebra with its three generations of quarks and leptons (or even with just a single generation and two $\mathfrak{su}_3\oplus\mathfrak{su}_2$ singlet right-handed neutrinos), it follows that there are infinitely many anomaly-free possibilities for the $\mathfrak{u}_1$ hypercharges. We also discuss whether it is possible to find all solutions in this way.
format Preprint
id arxiv_https___arxiv_org_abs_2508_11583
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Anomaly cancellation for a $U(1)$ factor
Gripaios, Ben
Nguyen, Khoi Le Nguyen
High Energy Physics - Theory
High Energy Physics - Phenomenology
Algebraic Geometry
We use methods of arithmetic geometry to find solutions to the abelian local anomaly cancellation equations for a four-dimensional gauge theory whose Lie algebra has a single $\mathfrak{u}_1$ summand, assuming that a non-trivial solution exists. The resulting polynomial equations in the integer $\mathfrak{u}_1$ charges define a projective cubic hypersurface over the field of rational numbers. Generically, such a hypersurface is (by a theorem of Koll{á}r) unirational, making it possible to find a finitely-many-to-one parameterization of infinitely many solutions using secant and tangent constructions. As an example, for the Standard Model Lie algebra with its three generations of quarks and leptons (or even with just a single generation and two $\mathfrak{su}_3\oplus\mathfrak{su}_2$ singlet right-handed neutrinos), it follows that there are infinitely many anomaly-free possibilities for the $\mathfrak{u}_1$ hypercharges. We also discuss whether it is possible to find all solutions in this way.
title Anomaly cancellation for a $U(1)$ factor
topic High Energy Physics - Theory
High Energy Physics - Phenomenology
Algebraic Geometry
url https://arxiv.org/abs/2508.11583