TY - JOUR
T1 - Charge-conserving hybrid methods for the Yang-Mills equations
AU - Berchenko-Kogan, Yakov
AU - Stern, Ari
N1 - Publisher Copyright:
© 2021 SMAI Journal of Computational Mathematics. All rights reserved.
PY - 2021
Y1 - 2021
N2 - The Yang-Mills equations generalize Maxwell's equations to nonabelian gauge groups, and a quantity analogous to charge is locally conserved by the nonlinear time evolution. Christiansen and Winther [8] observed that, in the nonabelian case, the Galerkin method with Lie algebra-valued finite element differential forms appears to conserve charge globally but not locally, not even in a weak sense. We introduce a new hybridization of this method, give an alternative expression for the numerical charge in terms of the hybrid variables, and show that a local, per-element charge conservation law automatically holds.
AB - The Yang-Mills equations generalize Maxwell's equations to nonabelian gauge groups, and a quantity analogous to charge is locally conserved by the nonlinear time evolution. Christiansen and Winther [8] observed that, in the nonabelian case, the Galerkin method with Lie algebra-valued finite element differential forms appears to conserve charge globally but not locally, not even in a weak sense. We introduce a new hybridization of this method, give an alternative expression for the numerical charge in terms of the hybrid variables, and show that a local, per-element charge conservation law automatically holds.
KW - Charge conservation
KW - Conservation laws
KW - Domain decomposition
KW - Finite element method
KW - Maxwell's equations
KW - Yang- mills equations
UR - http://www.scopus.com/inward/record.url?scp=85111213051&partnerID=8YFLogxK
U2 - 10.5802/smai-jcm.73
DO - 10.5802/smai-jcm.73
M3 - Article
AN - SCOPUS:85111213051
SN - 2426-8399
VL - 7
SP - 97
EP - 119
JO - SMAI Journal of Computational Mathematics
JF - SMAI Journal of Computational Mathematics
ER -