. . "We study the resolvents of coaccretive operators in the Hilbert ball, with special emphasis on the asymptotic behavior of their compositions and metric convex combinations. We consider the case where the given coaccretive operators share a common fixed point inside the ball, as well as the case where they share a common sink point an its boundary. We establish weak convergence in the former case and strong convergence in the latter. We also present two related convergence results for a continuous implicit scheme." . "Kopeck\u00E1, Eva" . "Asymptotic behavior of resolvents of coaccretive operators in the Hilbert ball"@en . "1"^^ . . "8"^^ . . "0362-546X" . "2"^^ . "P(GA201/06/0018), Z(AV0Z10190503)" . . "Asymptotic behavior of resolvents of coaccretive operators in the Hilbert ball" . . . "GB - Spojen\u00E9 kr\u00E1lovstv\u00ED Velk\u00E9 Brit\u00E1nie a Severn\u00EDho Irska" . . "70" . "9" . "Nonlinear Analysis: Theory, Methods & Applications" . . "000264691300017" . . "firmly nonexpansive mapping; Hilbert ball; hyperbolic metric"@en . . "[58700ECA342F]" . "304281" . "Reich, S." . . "RIV/67985840:_____/09:00358114" . . . "Asymptotic behavior of resolvents of coaccretive operators in the Hilbert ball" . . "RIV/67985840:_____/09:00358114!RIV11-GA0-67985840" . . . "Asymptotic behavior of resolvents of coaccretive operators in the Hilbert ball"@en . "We study the resolvents of coaccretive operators in the Hilbert ball, with special emphasis on the asymptotic behavior of their compositions and metric convex combinations. We consider the case where the given coaccretive operators share a common fixed point inside the ball, as well as the case where they share a common sink point an its boundary. We establish weak convergence in the former case and strong convergence in the latter. We also present two related convergence results for a continuous implicit scheme."@en .