Invariant subspace problem for classical spaces of functions (Q665522)

The author considers the Köthe sequence space and proves that, if the generating matrix satisfies some additional assumptions, there exists a linear continuous operator on this space having no nontrivial invariant subspaces. The proof is based on the methods developed by C.\,J.\thinspace Read. This result allows to obtain similar results for several classical non-Banach spaces of analysis: the Schwartz space of rapidly decreasing functions, the space of smooth functions on a~compact smooth manifold, the space of holomorphic functions on the unit disk or on the polydisk, and the space of entire functions on \({\mathbb C}^ d\) for \(d\geq 2\).