Iterative blow-ups for maps with bounded A-variation: a refinement, with application to BD and BV
Abstract
We refine the iterated blow-up techniques. This technique, combined with a rigidity result and a specific choice of the kernel projection in the Poincar\'e inequality, might be employed to completely linearize blow-ups along at least one sequence. We show how to implement such argument by applying it to derive affine blow-up limits for BD and BV functions around Cantor points. In doing so we identify a specific subset of points - called totally singular points having blow-ups with completely singular gradient measure D p=Ds p, E p=Es p - at which such linearization fails.
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