Fundamental solutions of the Cauchy problem for invariant Λ(μ)Λ(μ)-parabolic operators on Riemannian manifolds
1 Department of Mathematics, Kamianets-Podilskyi National University named after Ivan Ohienko, Kamianets-Podilskyi, 32302, Ukraine
2 Department of Differential Equations, Yuriy Fedkovych Chernivtsi National University, Chernivtsi, 58000, Ukraine
Keywords:
Cauchy problem
Abstract
On special Riemannian manifolds for ___ parabolic invariant operators, integral transformations with undefined variables have been introduced on the basis of newly constructed integral representations of the Dirac measure. This made it possible to construct fundamental solutions of the Cauchy problem for __ parabolic equations and systems of equations invariant with respect to the group of rotations around the origin of the Euclidean space ___ .
Cite
- ACS Style
- Konet, I.M.; Lenyuk, M.P. Fundamental solutions of the Cauchy problem for invariant Λ(μ)Λ(μ)-parabolic operators on Riemannian manifolds. Bukovinian Mathematical Journal. 2018, 1
- AMA Style
- Konet IM, Lenyuk MP. Fundamental solutions of the Cauchy problem for invariant Λ(μ)Λ(μ)-parabolic operators on Riemannian manifolds. Bukovinian Mathematical Journal. 2018; 1(288).
- Chicago/Turabian Style
- Ivan Mykhailovych Konet, Mykhailo Pavlovych Lenyuk. 2018. "Fundamental solutions of the Cauchy problem for invariant Λ(μ)Λ(μ)-parabolic operators on Riemannian manifolds". Bukovinian Mathematical Journal. 1 no. 288.
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