Abstract
We show that contrary to recent papers by S. Albeverio, A. Yu. Khrennikov and V. Shelkovich, point values do not determine elements of the so-called p-adic Colombeau-Egorov algebra G(ℚpn) uniquely We further show in a more general way that for an Egorov algebra G(M, R) of generalized functions on a locally compact ultrametric space (M, d) taking values in a nontrivial ring, a point value characterization holds if and only if (M, d) is discrete. Finally, following an idea due to M. Kunzinger and M. Oberguggenberger, a generalized point value characterization of G(M, R) is given. Elements of G(ℚpn) are constructed which differ from the p-adic δ-distribution considered as an element of G(ℚpn), yet coincide on point values with the latter.
Original language | English |
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Pages (from-to) | 1297-1301 |
Number of pages | 5 |
Journal | Mathematische Nachrichten |
Volume | 280 |
Issue number | 11 |
DOIs | |
Publication status | Published - 2007 |
Externally published | Yes |
Keywords
- Colombeau
- Egorov
- Generalized functions
- Generalized numbers
- p-Adic
- Point values