An Allard type regularity theorem for varifolds with H\"older continuous generalized normal
Abstract
We prove that Allard's regularity theorem holds for rectifiable n-dimensional varifolds V assuming a weaker condition on the first variation. This, in the special case when V is a smooth manifold translates to the following: If ωn-1-n area(V B(x)) is sufficiently close to 1 and the unit normal of V satisfies a C0,α estimate, then V B/2(x) is the graph of a C1,α function with estimates. Furthermore, a similar boundary regularity theorem is true.
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