Fractional evolution equations in dicrete sequences spaces

Miana, Pedro J.

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Fractional evolution equations in dicrete sequences spaces

Autor(es) y otros:

Miana, Pedro J.

Fecha de publicación:

2021

Editorial:

Servicio de Publicaciones de la Universidad de Oviedo

Citación:

Miana, P. J. (2021) Fractional evolution equations in dicrete sequences spaces. En Gallego, R. y Mateos, M.(editores) Proceedings of the XXVI Congreso de Ecuaciones Diferenciales y Aplicaciones. XVI Congreso de Matemática Aplicada (pp. 271-276). Oviedo : Universidad de Oviedo, Servicio de Publicaciones

Descripción física:

p. 271-276

Resumen:

In this talk, we consider fractional differential equations (in the sense of Caputo) on the sequence Lebesgue spaces ℓ 𝑝 (Z) with 𝑝 1. The associated operator to the Cauchy problem is defined by convolution with a sequence of compact support. We use techniques from Functional Analysis to calculate the solution of the problem. In the case of fractional powers of operators, we give explicitly the solution of the problem. As a consequence, we obtain new integral formulae for certain special functions.