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A comparison on the commutative neutrix convolution of distributions and the exchange formula

Let f̃, g̃ be ultradistributions in ℒ' and let f̃n = f̃ * δn and g̃n = g̃ * σn where {δn} is a sequence in ℒ which converges to the Dirac-delta function δ. Then the neutrix product f̃ ◇ g̃ is defined on the space of ultradistributions ℒ' as the neutrix limit of the sequence {1/2(f̃ng̃ + f̃...

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Bibliographic Details
Main Author:	Kiliçman, Adem
Format:	Article
Published:	Institute of Mathematics, Czech Academy of Sciences 2001
Online Access:	http://psasir.upm.edu.my/id/eprint/115212/ https://link.springer.com/article/10.1023/A:1013719619356?error=cookies_not_supported&code=fa5b77d0-1c48-49d8-a2e8-95ba7c29ee8e
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