Factorization of delta-monotone linear mappings

We construct a generalized spectral decomposition of the Frobcnius-Pcrron operator for one class of piecewise linear monotonic maps by using a general, iterative, operator method which is applicable in principle for any mixing dynamical system. The Jordan b&k structure is specified and analyzed. The

## Abstract We present some results on factorization of multilinear mappings and polynomials of Schatten class type 𝒮~2~ through infinite dimensional Banach spaces, ℒ︁~1~ and ℒ︁~∞~ spaces. We conclude this work with a factorization result for holomorphic mappings of Schatten class type 𝒮~2~. (© 200

A mapping between continua is said to be feebly monotone if whenever the range is the union of two proper subcontinua, their preimages are connected. Basic properties of these mappings and their connections with related classes of mappings are investigated. Further, some special properties of contin