# Growth of Poincare duality groups

Can one prove that Poincare duality groups cannot have intermediate growth?

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The question is well beyond of what is currently known about Poincare duality groups and groups of intermediate growth. The only known case is of PD(2) groups, since they are virtually surface groups. The answer is unclear already for PD(3) groups (conjecturally, they are 3-manifold groups, so they should not have intermediate growth). Note that before Perelman, it was unknown if 3-manifold groups could have intermediate growth. On the other side, there are no known examples of finitely presented (or even $FP_2$) groups of intermediate growth. For all what we know, they are never $FP_2$, while $PD(n)$ groups are $FP_n$ by definition.