Qualitative uncertainty principle for the Gabor transform on certain locally compact groups
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Jyoti Sharma
Abstract
Several classes of locally compact groups have been shown to possess a qualitative uncertainty principle for the Gabor transform. These include Moore groups, the Heisenberg group
Dedicated to late Professor Eberhard Kaniuth
Funding source: University Grants Commission
Award Identifier / Grant number: 21/12/2014(ii)EU-V
Funding statement: The first author is supported by University Grants Commission (Ref. No:21/12/2014(ii)EU-V).
Acknowledgements
The authors would like to thank the referee for providing the proof of Theorem 3.6 and several other suggestions.
References
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Articles in the same Issue
- Frontmatter
- Some curvature properties of paracontact metric manifolds
- An iterative method for solving minimization, variational inequality and fixed point problems in reflexive Banach spaces
- On some classes of differential equations and associated integral equations for the Laguerre–Appell polynomials
- On nonexistence of global solutions of a quasilinear riser equation
- Qualitative uncertainty principle for the Gabor transform on certain locally compact groups
- Existence of a solution for a nonlocal elliptic system of (p(x),q(x))-Kirchhoff type
Articles in the same Issue
- Frontmatter
- Some curvature properties of paracontact metric manifolds
- An iterative method for solving minimization, variational inequality and fixed point problems in reflexive Banach spaces
- On some classes of differential equations and associated integral equations for the Laguerre–Appell polynomials
- On nonexistence of global solutions of a quasilinear riser equation
- Qualitative uncertainty principle for the Gabor transform on certain locally compact groups
- Existence of a solution for a nonlocal elliptic system of (p(x),q(x))-Kirchhoff type
