Iterative methods fail to solve NLS below the Sobolev embedding threshold on the Sierpinski gasket

Abstract

We show that the nonlinear Schr\"odinger equation on the Sierpinski gasket with a power nonlinearity of order 2k+1 is not locally well-posed for initial data just below the regularity threshold for the Sobolev embedding Hs⊂eq L∞. More precisely, the flow map fails to be C2k+1-continuous in any Sobolev space Hs below that threshold, and the threshold is independent of the power nonlinearity. This novel behavior significantly differs from other compact spaces such as the torus or the sphere, and it is directly connected to the existence of localized eigenfunctions.