Projective Fra\"{\i}ss\'{e} limits of trees

Abstract

We continue study of projective Fra\"{\i}ss\'e limit developed by Irvin, Panagiotopoulos and Solecki. We modify the ideas of monotone, confluent, and light mappings from continuum theory as well as several properties of continua so as to apply to topological graphs. As the topological realizations of the projective Fra\"{\i}ss\'e limits we obtain the dendrite $D_3$ as well as quite new, interesting continua for which we do not yet have topological characterizations