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Abstract and Applied Analysis
Volume 2007, Article ID 81907, 10 pages
Research Article

On the Noncommutative Neutrix Product of Distributions

1Department of Mathematics, University of Hacettepe, Ankara, Beytepe 06532, Turkey
2Faculty of Electrical Engineering, Karpos II bb, Skopje 9100, Macedonia

Received 21 August 2007; Accepted 5 November 2007

Academic Editor: Agacik Zafer

Copyright © 2007 Emin Özçaḡ et al. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.


Let f and g be distributions and let gn=(g*δn)(x), where δn(x) is a certain sequence converging to the Dirac-delta function δ(x). The noncommutative neutrix product fg of f and g is defined to be the neutrix limit of the sequence {fgn}, provided the limit h exists in the sense that N‐limnf(x)gn(x),φ(x)=h(x),φ(x), for all test functions in 𝒟. In this paper, using the concept of the neutrix limit due to van der Corput (1960), the noncommutative neutrix products x+rlnx+xr1lnx and xr1lnxx+rlnx+ are proved to exist and are evaluated for r=1,2,. It is consequently seen that these two products are in fact equal.