The Fourier transform on quantum Euclidean space.
The Poisson summation formula.
Tiling and spectral properties of near-cubic domains
We prove that if a measurable domain tiles ℝ or ℝ² by translations, and if it is "close enough" to a line segment or a square respectively, then it admits a lattice tiling. We also prove a similar result for spectral sets in dimension 1, and give an example showing that there is no analogue of the tiling result in dimensions 3 and higher.
Topics on analytic sets
Weighted Friedrichs inequalities in amalgams
Порядковые оценки производных периодического многомерного alpha-ядра Дирихле в смешанной норме
Суммируемость логарифма почти аналитической функции и обобщение теоремы Левинсона-Картрайт