Vector fields with big and small volume on the 2-sphere
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Hiroshima University, Mathematics Program
Abstract
We consider the problem of minimal volume vector fields on a given Riemann
surface, specialising on the case of M*, that is, the arbitrary radius 2-sphere with
two antipodal points removed. We discuss the homology theory of the unit tangent
bundle (T^1M*,∂T^1M*) in relation with calibrations and a certain minimal volume
equation. A particular family X_m,k , k ∈ N, of minimal vector fields on M* is found
in an original fashion. The family has unbounded volume, lim_k vol(X_m,k|Ω)=+∞,
on any given open subset Ω of M* and indeed satisfies the necessary differential
equation for minimality. Another vector field X_l is discovered on a region Ω_1 ⊂ S^2, with volume smaller than any other known optimal vector field restricted to Ω_1.
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Rui Albuquerque. "Vector fields with big and small volume on the 2-sphere." Hiroshima Math. J. 53 (2) 225 - 239, July 2023. https://doi.org/10.32917/h2022009