Stable proper biharmonic maps in Euclidean spheres

Abstract

We construct an explicit family of stable proper weak biharmonic maps from the unit ball Bm, m≥ 5, to Euclidean spheres. To the best of the authors knowledge this is the first example of a stable proper weak biharmonic map from at compact domain. To achieve our result we first establish the second variation formula of the bienergy for maps from the unit ball into a Euclidean sphere. Employing this result, we examine the stability of the proper weak biharmonic maps q:Bmm, m,∈N with ≤ m, which we recently constructed in BS25 and thus deduce the existence of an explicit family of stable proper biharmonic maps to Euclidean spheres.