Abstract
The solution of the square root of the Schroedinger equation for the supersymmetric quantum mechanics is expressed in the form of series. The formula may be considered as a functional integral of the chronological exponent of the super-pseudodifferential operator symbol over the superspace. 10 refs.
Citation Formats
Ktitarev, D V.
Functional integral in supersymmetric quantum mechanics.
USSR: N. p.,
1990.
Web.
Ktitarev, D V.
Functional integral in supersymmetric quantum mechanics.
USSR.
Ktitarev, D V.
1990.
"Functional integral in supersymmetric quantum mechanics."
USSR.
@misc{etde_10104722,
title = {Functional integral in supersymmetric quantum mechanics}
author = {Ktitarev, D V}
abstractNote = {The solution of the square root of the Schroedinger equation for the supersymmetric quantum mechanics is expressed in the form of series. The formula may be considered as a functional integral of the chronological exponent of the super-pseudodifferential operator symbol over the superspace. 10 refs.}
place = {USSR}
year = {1990}
month = {Dec}
}
title = {Functional integral in supersymmetric quantum mechanics}
author = {Ktitarev, D V}
abstractNote = {The solution of the square root of the Schroedinger equation for the supersymmetric quantum mechanics is expressed in the form of series. The formula may be considered as a functional integral of the chronological exponent of the super-pseudodifferential operator symbol over the superspace. 10 refs.}
place = {USSR}
year = {1990}
month = {Dec}
}