Roots in differential rings of ultradifferentiable functions

Let {M _k } be a logconvex sequence satisfying the differentiability condition $$\sup (M_{n + 1} /M_n )^{1/n} < \infty $$ . It is shown that the Carleman class C{k! M _k } contains all C ^∞ roots of its nonflat elements, i.e., if f ∈ C{k! M _k } and α > 0, then $$f^\alpha \in C\{ k!M_k \} whenever f^\alpha \in C^\infty $$ . If {M _k } also satisfies the additional condition M _n ^1/n → ∞, then the Beurling class C(k! M _k ) is also contains all C ^∞ roots of its nonflat elements.