Дата: 04.02.2025 г., 14:00 ч. Място: Зала 403, ИМИ - БАН Докладчик: Мирослав Георгиев, Институт по математика и информатика, Българска академия на науките Доклад: Yukawa regulators in electrodynamics: Exact approach to the self-energy and anomalous g-factor Допълнителна информация: https://icms.bg/yukawa-regulators-in-electrodynamics-exact-approach-to-the-self-energy-and-anomalous-g-factor-icms-seminar-talk-by-miroslav-georgiev/ Резюме. In the present talk, we will discuss the prospect of electrodynamics in quantifying the self-interaction of a non-composite charged particle. We will demonstrate that under the consideration of unique to the particle Yukawa cut-offs the radial singularity in corresponding electromagnetic field potentials’ is removed allowing the classical theory to admit exact solutions for the particle’s self-energy and anomalous g-factor. Highly accurate results for the electron’s and muon’s anomalous g-factor will be presented, with calculated values matching the most recent measurements reported in the literature [...]
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Дата: 11.02.2025 г., 14:00 ч. Място: Зала 403, ИМИ - БАН Докладчик: Sergey Favorov, Department of Pure Mathematics, Kharkov National University, Ukraine Доклад: Fourier quasicrystals and their generalizations, zeros of Dirichlet series, other almost periodic objects Допълнителна информация: https://icms.bg/fourier-quasicrystals-and-their-generalizations-zeros-of-dirichlet-series-other-almost-periodic-objects-icms-seminar-talk-by-sergey-favorov/ Резюме. A complex measure \mu on a d-dimensional Euclidean space is a crystalline measure (CM) if it is the temperate distribution, its distributional Fourier transform \hat\mu is also a measure, and supports of \mu and \hat\mu are discrete (locally finite); \mu is a Fourier quasicrystal (FQ) if, in addition, |\mu| and |\hat\mu| are also temperate distributions. For example, if \mu_0 is the sum of the unit masses at all points with integer coordinates, then by Poisson’s formula \hat\mu_0=\mu_0. Hence, \mu_0 is FQ. We show a [...] |
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