Feynman averaging of semigroups generated by Schrödinger operators

The extension of averaging procedure for operator-valued function is defined by means of the integration of measurable map with respect to complex-valued measure or pseudomeasure. The averaging procedure of one-parametric semigroups of linear operators based on Chernoff equivalence for operator-valued functions is constructed. The initial value problem solutions are investigated for fractional diffusion equation and for Schrödinger equation with relativistic Hamiltonian of free motion. It is established that in these examples the solution of evolutionary equation can be obtained by applying the constructed averaging procedure to the random translation operators in classical coordinate space. © 2018 World Scientific Publishing Company.

Авторы
Borisov L.A.1 , Orlov Y.N. 1, 2 , Sakbaev V.Z. 3
Издательство
World Scientific Publishing Co. Pte Ltd
Номер выпуска
2
Язык
Английский
Статус
Опубликовано
Номер
1850010
Том
21
Год
2018
Организации
  • 1 Keldysh Institute of Applied Mathematics Ras, Miusskaya sq., 4, Moscow, 125047, Russian Federation
  • 2 Peoples Friendship University of Russia, Miklukho-Maklay Street, 6, Moscow, 117198, Russian Federation
  • 3 Department of General Mathematics, Moscow Institute of Physics and Technology, Institutskiy per. 9, Dolgoprudny, Moscow Region, 141700, Russian Federation
Ключевые слова
Chernoff equivalence; Chernoff theorem; Feynman formula; One-parametric semigroup; random variable
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