Incompressible flows of an ideal fluid with unbounded vorticity

In this paper we study solutions to the Euler equations of an ideal incompressible fluid in R-n singular at the origin with a finite symmetry group. For an "admissible" class of finite groups we prove a local existence and uniqueness theorem. In even dimensions this theorem covers some symmetric flows with essentially unbounded vorticity. In arbitrary dimension (including n = 3) we construct local in time solutions with vorticity that behaves, e.g., like a function of homogeneous degree zero near the origin. The symmetry condition provides necessary additional cancellations and is preserved by the evolution due to uniqueness.