Inverse Cauchy problem for fractional diffusion equation with generalized functions in the right-hand sides

Authors

  • G. P. Lopushanska Ivan Franko national university of Lviv
  • V. R. Rapita Ivan Franko national university of Lviv

Abstract

We establish the unique solvability of the inverse Cauchy problem for a time fractional diffusion equation with distributions in the right-hand sides of the equation and in the initial condition. This problem is to find the pair of the following functions: the generalized solution (continuous in time in generalized sense) of direct Cauchy problem and the unknown minor coefficient (depending on the time variable) of the equation.

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Published

2016-05-16

How to Cite

Lopushanska, G. P., & Rapita, V. R. (2016). Inverse Cauchy problem for fractional diffusion equation with generalized functions in the right-hand sides. Transactions of Institute of Mathematics, the NAS of Ukraine, 13(1), 204–227. Retrieved from https://trim.imath.kiev.ua/index.php/trim/article/view/214

Issue

Vol. 13 No. 1 (2016): Differential equations and related problems of analysis

Section

Research papers