Polynomials on stable spaces

Let F be a Banach or a nuclear Frechet space isomorphic to its square. Then Ž2 . P F , the space of 2-homogeneous polynomials on F, is isomorphic to the space Ž . of continuous linear operators L F, FЈ , both of them endowed with the topology of uniform convergence on bounded sets. In this note we p

We are concerned with the following question: when can a polynomial P: Ž . E ª X E and X are Banach spaces be extended to a Banach space containing E? We prove that the polynomials that are extendible to any larger space are Ž X . precisely those which can be extended to C B , if X is complemented

We show the existence of chaotic (in the sense of Devaney) polynomials on Banach spaces of q-summable sequences. Such polynomials P consist of composition of the backward shift with a certain fixed polynomial p of one complex variable on each coordinate. In general we also prove that P is chaotic in