Использование дифференциальных свойств обобщенных мер Лебега-Фейнмана при исследовании квантовых аномалий

Translated title of the contribution: Quantum Anomalies via Differential Properties of Lebesgue–Feynman Generalized Measures

Дж. Э. Гоф, Тюдор Стефан Ратью, Олег Георгиевич Смолянов

Research output: Contribution to journalArticlepeer-review

Abstract

We address the problem concerning the origin of quantum anomalies, which has been the source of disagreement in the literature. Our approach is novel as it is based on the differentiability properties of families of generalized measures. To this end, we introduce a space of test functions over a locally convex topological vector space, and define the concept of logarithmic derivatives of the corresponding generalized measures. In particular, we show that quantum anomalies are readily understood in terms of the differential properties of the Lebesgue–Feynman generalized measures (equivalently, of the Feynman path integrals). We formulate a precise definition for quantum anomalies in these terms.
Translated title of the contributionQuantum Anomalies via Differential Properties of Lebesgue–Feynman Generalized Measures
Original languageRussian
Pages (from-to)107-118
JournalТруды Математического института имени В.А. Стеклова
Volume310
DOIs
Publication statusPublished - 01 Oct 2020

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