On the stability of the first order linear recurrence in topological vector spaces

Abstract

Suppose that X is a sequentially complete Hausdorff locally convex space over a scalar field K, V is a bounded subset of X, (an)n 0 is a sequence in K\0\ with the property\ n∞ |an|>1 and (bn)n 0 is a sequence in X. We show that for every sequence (xn)n 0 in X satisfying eqnarray* xn+1-anxn-bn∈ V(n≥ 0) eqnarray* there exists a unique sequence (yn)n 0 satisfying the recurrence yn+1=anyn+bn\,\,(n≥ 0) and for every q with 1<q<n∞ |an|, there exists n0∈ N such that eqnarray* xn-yn∈ 1q-1conv(Vb) (n≥ n0). eqnarray*