Sampling and Interpolation on Some Non-commutative Nilpotent Lie Groups
Abstract
Let be a non-commutative, simply connected, connected, two-step nilpotent Lie group with Lie algebra such that , the algebras are abelian, and Also, we assume that \det\left[ \left[ X_{i}% ,Y_{j}\right] \right] _{1\leq i,j\leq d} is a non-vanishing homogeneous polynomial in the unknowns where is a basis for the center of the Lie algebra. Using well-known facts from time-frequency analysis, we provide some precise sufficient conditions for the existence of sampling spaces with the interpolation property, with respect to some discrete subset of . The result obtained in this work can be seen as a direct application of time-frequency analysis to the theory of nilpotent Lie groups. Several explicit examples are computed. This work is a generalization of recent results obtained for the Heisenberg group by Currey, and Mayeli in \cite{Currey}.
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Cite
@article{arxiv.1210.3408,
title = {Sampling and Interpolation on Some Non-commutative Nilpotent Lie Groups},
author = {Vignon Oussa},
journal= {arXiv preprint arXiv:1210.3408},
year = {2014}
}
Comments
27 pages