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Parabolic Equations with Changing Direction of Time

S. V. PopovAcademy of Sciences of Sakha Republic (Yakutia), Yakutsk, Russia
2020en
ABI

Аннотация

A theorem about the behavior of Cauchy-type integrals at the endpoints of the integration contour and at discontinuity points of the density is stated, and its application to boundary value problems for 2n-order parabolic equations with a changing direction of time are described. The theory of singular equations, along with the smoothness of the initial data, makes it possible to specify necessary and sufficient conditions for the solution to belong to Hölder spaces. Note that, in the case n = 3, the smoothness of the initial data and the solvability conditions imply that the solution belongs to smoother spaces near the ends with respect to the time variable.

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Иқтибослар ва манбалар

3 та иқтибос0 та фойдаланилган манба