Complex symmetry of composition operators on weighted Bergman spaces

Abstract

In this article, we study the complex symmetry of compositions operators Cφf=f φ induced on weighted Bergman spaces A2β(D),\ β≥ -1, by analytic self-maps of the unit disk. One of ours main results shows that φ has a fixed point in D whenever Cφ is complex symmetric. Our works establishes a strong relation between complex symmetry and cyclicity. By assuming β∈ N and φ is an elliptic automorphism of D which not a rotation, we show that Cφ is not complex symmetric whenever φ has order greater than 2(3+β).