Self-similar asymptotics for a class of Hele-Shaw flows driven solely by surface tension

We investigate the dynamics of relaxation, by surface tension, of a family of curved interfaces between an inviscid and viscous fluids in a Hele-Shaw cell. At t=0 the interface is assumed to be of the form |y|=A x^m, where A>0, m \geq 0, and x>0. The case of 01 corresponds to a cusp, whereas m=1 corresponds to a wedge. The inviscid fluid tip retreats in the process of relaxation, forming a lobe which size grows with time. Combining analytical and numerical methods we find that, for any m, the relaxation dynamics exhibit self-similar behavior. For m\neq 1 this behavior arises as an intermediate asymptotics: at late times for 0\leq m1. In both cases the retreat distance and the lobe size exhibit power law behaviors in time with different dynamic exponents, uniquely determined by the value of m. In the special case of m=1 (the wedge) the similarity is exact and holds for the whole interface at all times t>0, while the two dynamic exponents merge to become 1/3. Surprisingly, when m\neq 1, the interface shape, rescaled to the local maximum elevation of the interface, turns out to be universal (that is, independent of m) in the similarity region. Even more remarkably, the same rescaled interface shape emerges in the case of m=1 in the limit of zero wedge angle