Memory approximate controllability properties for higher order Hilfer time fractional evolution equations

Abstract

In this paper we study the approximate controllability of fractional partial differential equations associated with the so-called Hilfer type time fractional derivative and a non-negative selfadjoint operator A with a compact resolvent on L2(), where ⊂N (N≥ 1) is an open set. More precisely, we show that if 0 1, 1<μ 2 and ⊂N is an open set, then the system equation* cases μ,tu+Au=fω\;\;& in \;×(0,T),\\ (It(1-)(2-μ)u)(·,0)=u0 & in \;,\\ (∂tIt(1-)(2-μ)u)(·,0)=u1 & in \;, cases equation* is memory approximately controllable for any T>0, u0∈ D(A1/μ), u1∈ L2() and any non-empty open set ω⊂. The same result holds for every u0∈ D(A1/2) and u1∈ L2().