A characterization of normal 3-pseudomanifolds with g2≤4

Abstract

We characterize normal 3-pseudomanifolds with g2≤4. We know that if a 3-pseudomanifold with g2≤4 does not have any singular vertices then it is a 3-sphere. We first prove that a normal 3-pseudomanifold with g2≤4 has at most two singular vertices. Then we prove that a normal 3-pseudomanifold with g2 ≤ 4, which is not a 3-sphere is obtained from some boundary of 4-simplices by a sequence of operations connected sum, edge expansion and an edge folding. In addition, by using [17], we re-framed the characterization of normal 3-pseudomanifolds with g2≤ 9, when it has no singular vertices.