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Convergence of univariate non-stationary subdivision schemes via asymptotical similarity

A new equivalence notion between non-stationary subdivision schemes, termed asymptotical similarity, which is weaker than asymptotical equivalence, is introduced and studied. It is known that asymptotical equivalence between a non-stationary subdivision scheme and a convergent stationary scheme guarantees the convergence of the non-stationary scheme. We show that for non-stationary schemes reproducing constants, the condition of asymptotical equivalence can be relaxed to asymptotical similarity. This result applies to a wide class of non-stationary schemes of importance in theory and applications.

preprint2014arXivOpen access
Costanza ContiNira DynCarla ManniMarie-Laurence Mazure
math.NA
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Open access4 authors1 topic
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Costanza ContiNira DynCarla ManniMarie-Laurence Mazure

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