Asymptotic behavior of solution for functional evolution equations with Stepanov forcing terms (Q2051970)

Summary: Through the use of the measure theory, evolution family, ``Acquistapace-Terreni'' condition, and Hölder inequality, the core objective of this work is to seek to analyze whether there is unique \(\mu\)-pseudo almost periodic solution to a functional evolution equation with Stepanov forcing terms in a Banach space. Certain adequate conditions are derived guaranteeing there is unique \(\mu\)-pseudo almost periodic solution to the equation by Lipschitz condition and contraction mapping principle. Finally, an example is used to demonstrate our theoretical findings.