Abstract:A class of boundary value problem for fractional functional differential equation with delay
$ \left\{ {\begin{array}{*{20}c} {^{C} D^{\sigma } \omega (t) = f(t,\omega _{t} ),t \in [0,\zeta ],} \\ {\omega (0) = 0,\,\omega ^{\prime}(0) = 0,\,\omega ^{\prime\prime}(\zeta ) = 1,} \\ \end{array} } \right. $
is studied, where
$ 2 < \sigma \le 3,\,\,^{c} D^{\sigma } $
devote standard Caputo fractional derivative. In this article, three new criteria on existence and uniqueness of solution are obtained by Ba… Show more
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