Ulam-Hyers stability for operatorial equations (Q2919583)

Let \((X,d)\) be a metric space, \(\mathcal P(X):=\{Y\subset X\}\), \(P(X):=\{Y\in\mathcal P(X):Y\neq\emptyset\}\), \(D_d:P(X)\times P(X)\to\mathbb R_+\) the gap functional, given by NEWLINE\[NEWLINED_d(A,B)=\inf\left\{d(a,b):a\in A,\,b\in B\right\},NEWLINE\]NEWLINE and let \(F:X\to P(X)\) be a multivalued operator. The fixed point inclusion NEWLINE\[NEWLINEx\in F(x),\,x\in XNEWLINE\]NEWLINE is said to be generalized Ulam-Hyers stable if and only if there exists an increasing function \(\psi:\mathbb R_+\to\mathbb R_+\), continuous at \(0\) and with \(\Psi(0)=0\) such that for each \(\epsilon >0\) and for each solution \(y^*\in X\) of of the inequality NEWLINE\[NEWLINED_d\left( y,F(y)\right)\leq\epsilon,NEWLINE\]NEWLINE there exists a solution \(x^*\) of the fixed point inclusion such that NEWLINE\[NEWLINEd(x^*,y^*)\leq\psi(\epsilon).NEWLINE\]NEWLINE In the paper under review, the authors establish generalized Ulam-Hyers stability results for fixed point problems as well as for coincidence point problems with multivalued operators.