Lipschitz interpolative nonlinear ideal procedure

Abstract

We treat the general theory of nonlinear ideals and extend as many notions as possible from the linear theory to the nonlinear theory. We define nonlinear ideals with special properties which associate new non-linear ideals to given ones and establish several properties and characterizations of them. Building upon the results of U. Matter we define a Lipschitz interpolative nonlinear ideal procedure between metric spaces and Banach spaces and establish this class of Lipschitz operators is an injective Banach nonlinear ideal and show several standard basic properties for such class. Extending the work of J. A. L\'opez Molina and E. A. S\'anchez P\'erez we define a Lipschitz (p,θ, q, )-dominated operators for 1≤ p, q <∞; 0≤ θ, < 1 and establish several characterizations. Afterwards we generalize a notion of Lipschitz interpolative nonlinear ideal procedure between arbitrary metric spaces and prove its a nonlinear ideal. Finally, we present certain basic counter examples of Lipschitz interpolative nonlinear ideal procedure between arbitrary metric spaces.