In this paper we prove a general theorem about congruences between
automorphic forms on a reductive group G which is compact at infinity modulo
the center. If the rank is one, this essentially reduces to Ribet's
level-raising theorem. We then specialize to the higher rank case where G is an
inner form of GSp(4). Here we get congruences with automorphic forms having a
generic local component. In particular, a Saito-Kurokawa form is congruent to a
form which is not of Saito-Kurokawa type. We get similar results for U(3) at
split primes.Comment: 32 page
