We study the growth of the Betti sequence of the canonical module of a Cohen--Macaulay local ring. It is an open question whether this sequence grows exponentially whenever the ring is not Gorenstein. We answer the question of exponential growth affirmatively for a large class of rings, and prove that the growth is in general not extremal. As an application of growth, we give criteria for a Cohen--Macaulay ring possessing a canonical module to be Gorenstein.