Abstract
In the paper, we consider a bipolynomial fractional Dirichlet-Laplace problem with a functional parameter u. The main goal is to prove theorems on the existence and continuous dependence of solution on functional parameter u for the above problem. Since the solution to the above fractional problem is not unique in general, we use some set-valued approach. We consider two cases (depending on a real parameter a). In the first case we use a variational method, in the second we apply some abstract results. The obtained results are applied then to a Lagrange problem.
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