Reduction methods for the bienergy

This paper, in which we develop ideas introduced in [44], focuses on reduction methods (basically, group actions or, more generally, symmetries) for the bienergy. This type of techniques enable us to produce examples of critical points of the bienergy by reducing the study of the relevant fourth order PDE's system to ODE's. In particular, we shall study rotationally symmetric biharmonic conformal diffeomorphisms between models. Next, we will adapt the reduction method to study an ample class of G-invariant immersions into the Euclidean space. At present, the known instances in these contexts are fax from reaching the depth and variety of their companions which have provided fundamental solutions to classical problems in the theories of harmonic maps and minimal immersions. However, we think that these examples represent an important starting point which can inspire further research on bihaxmonicity. In this order of ideas, we end this paper with a discussion of some open problems and possible directions for further developments.