Extensions of homogeneous distributions on deformations to the normal cone
Abstract
On a deformation to the normal cone DNC(M,V) we show that given a distribution u∈D'(DNC(M,V) V×R) if u is homogeneous of order a for the zoom action, then it admits an a-homogeneous extension u∈D'(DNC(M,V)). We describe all such extensions and discuss briefly about how it translates to the work of Van Erp and Yuncken in arXiv:2303.15787 . The technique used come from the results on the extension of weakly homogeneous distributions provided by Yves Meyer in the 90s.
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