The Ces\`aro operator on weighted Bergman Fr\'echet and (LB)-spaces of analytic functions

Abstract

The spectrum of the Ces\`aro operator C is determined on the spaces which arises as intersections Apα + (resp. unions Apα -) of Bergman spaces Aαp of order 1<p<∞ induced by standard radial weights (1-|z|)α, for 0<α<∞. We treat them as reduced projective limits (resp. inductive limits) of weighted Bergman spaces Apα, with respect to α. Proving that these spaces admit the monomials as a Schauder basis paves the way for using Grothendieck-Pietsch criterion to deduce that we end up with a non-nuclear Fr\'echet-Schwartz space (resp. a non-nuclear (DFS)-space). We show that C is always continuous, while it fails to be compact or to have bounded inverse on Apα + and Apα -.