Distinguished curves and first integrals on Poincaré-Einstein and other conformally singular geometries

Gover, A. Rod; Snell, Daniel C.

doi:10.48550/arxiv.2001.02778

Cited by 1 publication

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“…Remark 4.3. Corollary 4.2 here generalizes Theorem 2 from [55], as a minimal 1-dimensional submanifold in a Riemannian manifold is exactly a geodesic. Note also that the corollary shows that for a minimal submanifold Σ the ambient scale tractor I A can, along Σ, be identified with a section of the intrinsic tractor bundle T Σ via (3.18) of Theorem 3.5.…”

Section: )) and So σ Minimal Meaning Isupporting

confidence: 53%

CR Embedded Submanifolds of CR Manifolds

Curry¹,

Gover²

2019

Memoirs of the AMS

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For conformal geometries of Riemannian signature, we provide a comprehensive and explicit treatment of the core local theory for embedded submanifolds of arbitrary dimension. This is based in the conformal tractor calculus and includes a conformally invariant Gauss formula leading to conformal versions of the Gauss, Codazzi, and Ricci equations. It provides the tools for proliferating submanifold conformal invariants, as well for extending to conformally singular Riemannian manifolds the notions of mean curvature and of minimal and CMC submanifolds.A notion of distinguished submanifold is defined by asking the tractor second fundamental form to vanish. We show that for the case of curves this exactly characterises conformal geodesics, also called conformal circles, while for hypersurfaces it is the totally umbilic condition. So, for other codimensions, this unifying notion interpolates between these extremes, and we prove that in all dimensions this coincides with the submanifold being weakly conformally circular, meaning that ambient conformal circles remain in the submanifold. We prove that submanifolds are conformally circular, meaning submanifold conformal circles coincide with ambient conformal circles, if and only also a second conformal invariant also vanishes.Next we provide a very general theory and construction of quantities that are necessarily conserved along distinguished submanifolds. This first integral theory thus vastly generalises the results available for conformal circles in [56]. We prove that any normal solution to an equation from the class of first BGG equations can yield such a conserved quantity, and we show that it is easy to provide explicit formulae for these.Finally we prove that the property of being distinguished is also captured by a type of moving incidence relation. This second characterisation is used to show that, for suitable solutions of conformal Killing-Yano equations, a certain zero locus of the solution is necessarily a distinguished submanifold.

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Section: )) and So σ Minimal Meaning Isupporting

confidence: 53%