KOVAL, Serhii D, Alexander BIHLO and Roman POPOVYCH. Extended symmetry analysis of remarkable (1+2)-dimensional Fokker-Planck equation. European Journal of Applied Mathematics. New York (USA): Cambridge University Press, 2023, vol. 34, No 5, p. 1067-1098. ISSN 0956-7925. Available from: https://dx.doi.org/10.1017/S0956792523000074.
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Basic information
Original name Extended symmetry analysis of remarkable (1+2)-dimensional Fokker-Planck equation
Authors KOVAL, Serhii D, Alexander BIHLO (40 Austria) and Roman POPOVYCH (804 Ukraine, guarantor, belonging to the institution).
Edition European Journal of Applied Mathematics, New York (USA), Cambridge University Press, 2023, 0956-7925.
Other information
Original language English
Type of outcome Article in a journal
Field of Study 10102 Applied mathematics
Country of publisher United States of America
Confidentiality degree is not subject to a state or trade secret
WWW European Journal of Applied Mathematics
RIV identification code RIV/47813059:19610/23:A0000141
Organization unit Mathematical Institute in Opava
Doi http://dx.doi.org/10.1017/S0956792523000074
UT WoS 000981844100001
Keywords in English (1+2)-dimensional ultraparabolic Fokker-Planck equation; complete point-symmetry pseudogroup; Lie symmetry; Lie reductions; exact solutions; Kramers equations
Tags
Tags International impact, Reviewed
Changed by Changed by: Mgr. Aleš Ryšavý, učo 28000. Changed: 27/3/2024 14:38.
Abstract
We carry out the extended symmetry analysis of an ultraparabolic Fokker–Planck equation with three independent variables, which is also called the Kolmogorov equation and is singled out within the class of such Fokker–Planck equations by its remarkable symmetry properties. In particular, its essential Lie invariance algebra is eight-dimensional, which is the maximum dimension within the above class. We compute the complete point symmetry pseudogroup of the Fokker–Planck equation using the direct method, analyse its structure and single out its essential subgroup. After listing inequivalent one- and two-dimensional subalgebras of the essential and maximal Lie invariance algebras of this equation, we exhaustively classify its Lie reductions, carry out its peculiar generalised reductions and relate the latter reductions to generating solutions with iterative action of Lie-symmetry operators. As a result, we construct wide families of exact solutions of the Fokker–Planck equation, in particular, those parameterised by an arbitrary finite number of arbitrary solutions of the (1+1)-dimensional linear heat equation. We also establish the point similarity of the Fokker–Planck equation to the (1+2)-dimensional Kramers equations whose essential Lie invariance algebras are eight-dimensional, which allows us to find wide families of exact solutions of these Kramers equations in an easy way.
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