
In this research article, we introduce a new class of hybrid Langevin equation involving two distinct fractional order derivatives in the Caputo sense and Riemann–Liouville fractional integral. Supported by three-point boundary conditions, we discuss the existence of a solution to this boundary value problem. Because of the important role of the measure of noncompactness in fixed point theory, we use the technique of measure of noncompactness as an essential tool in order to get the existence result. The modern analysis technique is used by applying a generalized version of Darbo’s fixed point theorem. A numerical example is presented to clarify our outcomes.
Darbo’s fixed point theorem, hybrid Langevin fractional differential equation, boundary value problem, QA1-939, measure of noncompactness, Mathematics
Darbo’s fixed point theorem, hybrid Langevin fractional differential equation, boundary value problem, QA1-939, measure of noncompactness, Mathematics
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