Higher dimensional Sacks-Uhlenbeck-type functionals and applications

Abstract

In this work, we generalize Sacks-Uhlenbeck's existence result for harmonic spheres, constructing for n 2, regular, non-trivial, n-harmonic n-spheres into suitable target manifolds. We obtain an infinite family of new null-homotopic such maps. The proof follows a similar perturbative argument, which in high dimensions leads to a degenerate and double-phase-type Euler-Lagrange system, making the uniform regularity needed to formalize the bubbling harder to achieve. Then, we develop a refined neck-analysis leading to an energy identity along the approximation, assuming a suitable Struwe-type entropy bound along a sequence of critical points. Finally, we combine these results to solve quite general min-max problems for the n-energy modulo bubbling.