Seminar on Fixed Point Theory Cluj-Napoca, Volume 1

a₁ acyclic AMS Subject Classification Babeş-Bolyai Univ Babeş-Bolyai University Banach space Bucureşti collocation method common fixed point complete metric space ComSFP(T condition consider contraction contraction mapping converges countable d(xn d(xo data dependence defined Definition delay differential equations denote Department of Applied dynamic iteration Ecuaţii exists uy fixed point structures Fixed point theorems fixed points set hence Hilbert space http://www.math.ubbcluj.ro/nodeacj/journal.htm I.A. Rus implies integral equations integrale intersection property Keywords Lemma Let X,d lim lim Math method Mönch Mönch operator Mönch type monotone increasing multi-valued map nonexpansive mapping nonlinear obtain partial differential equations Point Theory Cluj-Napoca Precup problem Proof relatively compact Remark Romania Abstract Romania E-mail satisfies BP satisfies LSB Seminar on Fixed SF)r SF)s SF)T spline functions strict fixed point suppose surjective T₁ T₂ Theorem 2.1 Traian Lalescu u₁ u₂ Vasile weakly Picard operator y₁