The regularity of a semilinear elliptic system with quadratic growth of gradient

Abstract

In this paper, we study semilinear elliptic systems with critical nonlinearity of the form equationsys01 u=Q(x, u, ∇ u), equation for u: Rn→ RK, Q has quadratic growth in ∇ u. Our work is motivated by elliptic systems for harmonic map and biharmonic map. When n=2, such a system does not have smooth regularity in general for W1, 2 weak solutions, by a well-known example of J. Frehse. Classical results of harmonic map, proved by F. H\'elein (for n=2) and F. B\'ethuel (for n≥ 3), assert that a W1, n weak solution of harmonic map is always smooth. We extend B\'ethuel's result to above general system, that a W1, n weak solution of above system is smooth for n≥ 3. For a fourth order semilinear elliptic system with critical nonlinearity which extends biharmonic map, we prove a similar result, that a W2, n/2 weak solution of such system is always smooth, for n≥ 5. We also construct various examples, and these examples show that our regularity results are optimal in various sense.