Minimal Extension for the α-Manhattan norm
Abstract
Let ∂ Q be the boundary of a convex polygon in R2, eα = (α, α) and eα = (-α , α) be a basis of R2 for some α∈[0,2π) and φ:∂Q 2 be a continuous, finitely piecewise linear injective map. We construct a finitely piecewise affine homeomorphism v: Q R2 coinciding with φ on ∂ Q such that the following property holds: | Dv, eα|(Q) (resp. Dv, eα|(Q)) is as close as we want to ∈f | Du, eα|(Q) (resp. ∈f | Du, eα|(Q)) where the infimum is meant over the class of all BV homeomorphisms u extending φ inside Q. This result extends that already proven in [14] in the shape of the domain.
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