Monadic stability and growth rates of ω$\omega$‐categorical structures

Abstract

For M $M$ ω $\omega$ -categorical and stable, we investigate the growth rate of M $M$ , that is, the number of orbits of A u t ( M ) $Aut(M)$ on n $n$ -sets, or equivalently the number of n $n$ -substructures of M $M$ after performing quantifier elimination. We show that monadic stability corresponds to a gap in the spectrum of growth rates, from slower than exponential to faster than exponential. This allows us to give a nearly complete description of the spectrum of slower than exponential growth rates (without the assumption of stability), confirming some longstanding conjectures of Cameron and Macpherson and proving the existence of gaps not previously recognized.