In this paper, we study a nonlocal degenerate parabolic equation of order
{\alpha} + 2 for 0<{\alpha}<2. The equation is a generalization of the one
arising in the modeling of hydraulic fractures studied by Imbert and Mellet in
2011. Using the same approach, we prove the existence of solutions for this
equation for 0<{\alpha}<2 and for nonnegative initial data satisfying
appropriate assumptions. The main difference is the compactness results due to
different Sobolev embeddings. Furthermore, for {\alpha} > 1, we construct a
nonnegative solution for nonnegative initial data under weaker assumptions.Comment: arXiv admin note: text overlap with arXiv:1001.5105 by other author
