Uniform bounds for strongly competing systems: the optimal Lipschitz case

Abstract

For a class of systems of semi-linear elliptic equations, including \[ - ui=fi(x,ui) - β uiΣj≠ iaijujp, i=1,…,k, \] for p=2 (variational-type interaction) or p = 1 (symmetric-type interaction), we prove that uniform L∞ boundedness of the solutions implies uniform boundedness of their Lipschitz norm as β +∞, that is, in the limit of strong competition. This extends known quasi-optimal regularity results and covers the optimal case for this class of problems. The proof rests on monotonicity formulae of Alt-Caffarelli-Friedman and Almgren type in the variational setting and Caffarelli-Jerison-Kenig in the symmetric one.