Normal-Yang-Mills and Tangent-Yang-Mills submanifolds are defined as critical points under normal variations of L2 curvature functionals, with the Euler-Lagrange equations derived in terms of the second fundamental form and infinitely many examples constructed from focal submanifolds of OT-FKM isopm
Tian,Gauge theory and calibrated geometry, I, Annals of Math.,151(1)(2000), 193-268
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Normal-Yang-Mills and Tangent-Yang-Mills submanifolds
Normal-Yang-Mills and Tangent-Yang-Mills submanifolds are defined as critical points under normal variations of L2 curvature functionals, with the Euler-Lagrange equations derived in terms of the second fundamental form and infinitely many examples constructed from focal submanifolds of OT-FKM isopm