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Spectral Analysis on Homogeneous Trees
For each complex numberz, we construct an operatorHzdefined on the space of all complex-valued functions on a homogeneous tree. This operator has the property that if a functionfis harmonic (i.e., the local averaging operator fixes the values off), thenHz(f) isz-harmonic (i.e., the local averaging o...
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| Published in: | Advances in applied mathematics 1998-02, Vol.20 (2), p.253-274 |
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| Main Authors: | , |
| Format: | Article |
| Language: | English |
| Subjects: | |
| Citations: | Items that this one cites Items that cite this one |
| Online Access: | Get full text |
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| Summary: | For each complex numberz, we construct an operatorHzdefined on the space of all complex-valued functions on a homogeneous tree. This operator has the property that if a functionfis harmonic (i.e., the local averaging operator fixes the values off), thenHz(f) isz-harmonic (i.e., the local averaging operator multipliesHz(f) byz). Because the Laplacian is the local averaging operator minus the identity, az-harmonic function is an eigenfunction of the Laplacian relative to the eigenvaluez−1. We show that allz-harmonic functions are in the image ofHz, and we compareHzto another well-known operator which converts harmonic functions toz-harmonic functions. We then study the problem of representing a function as the integral ofz-harmonic functions with respect to a distribution. In particular, if a function grows no faster than exponentially, then the distribution is of the formf(z,−)dλ(z), wheref(z,−) is az-harmonic function and λ is the Lebesgue measure in C. If the base of the growth is sufficiently small, the distribution is supported over the interval [equation] |
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| ISSN: | 0196-8858 1090-2074 |
| DOI: | 10.1006/aama.1997.0570 |