Entire solutions to a strongly competitive nonlinear Schr\"odinger system

Abstract

We build infinitely-many non-radial positive solutions to the Schr\"odinger system equation* \aligned &- u1+u1=u1 p - u1a1 u2a2\ in\ RN\\ &- u2+u2=u2 p - u1b1u2b2 \ in\ RN\\ aligned. equation* with sub-critical p-growth as +∞. The profile of each component is the sum of several copies of the positive solution to - U+U=U p in RN, centered at suitable peaks whose mutual distances diverge as increases. More precisely, given two concentric regular polygons with k sides and very large radii, the peaks of the first component are arranged along the edges of the outer polygon, alternated with those of the second component, and along the k rays joining the vertices of the two polygons. To the best of our knowledge, this provides the first example of non-radial positive solutions for strongly competitive Schr\"odinger systems in the whole space.