A study on the existence of solutions of generalized fractional differential equations
Abstract
Fractional calculus is a branch of Mathematics that studies the derivatives and
integrals of non-integer orders. Studying generalized fractional differential
equations is significant as it allows broader exploration of mathematical models,
incorporating various kernels in the y- Caputo and y- Hilfer fractional
differential equations. This versatility leads to the formulation of diverse
fractional differential equations involving classical operators, offering a more
comprehensive understanding of complex phenomena in diverse fields. We
investigated the existence and uniqueness of neutral fractional differential
equation, Impulsive fractional neutral functional differential equation and k
system offractional neutral differential equation involving -Caputo fractional
operator, the existence of Hybrid fractional differential equations with both initial
and boundary conditions involving -Hilfer fractional derivative. Also
investigated the existence, uniqueness, Ulam Hyers, generalized Ulam Hyers,
Ulam Hyers Rassias and generalized Ulam Hyers stabilities for y -Caputo
neutral functional differential equation and y Hilfer fractional neutral
functional differential equations. Examples illustrating the results and graphs are
given.
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- Doctoral Theses [517]