Add to ORKGWe further investigate the uniform regularity property of collections of sets via primal and dual characterizing constants. These constants play an important role in determining convergence rates of projection algorithms for solving feasibility problems
The theory of regular variation is largely complete in one dimension, but is developed under regular...
We first synthesize and unify notions of regularity, both of individual functions/sets and of famili...
Variational analysis, a relatively new area of research in mathematics, has become one of the most p...
We further investigate the uniform regularity property of collections of sets via primal and dual ch...
Several primal and dual quantitative characterizations of regularity properties of collections of se...
The paper continues investigations of stationarity and regularity properties of collections of sets ...
We examine three primal space local Holder type regularity properties of finite collections of sets,...
We synthesize and unify notions of regularity, both of individual sets and of collections of sets, a...
Regularity properties lie at the core of variational analysis because of their importance for stabil...
This article investigates extremality, stationarity, and regularity properties of infinite collectio...
Extremality, stationarity and regularity notions for a system of closed sets in a normed linear spac...
We provide dual sufficient conditions for subtransversality of collections of sets in an Asplund spa...
The theory of regular variation is largely complete in one dimension, but is developed under regular...
This paper continues studies of non-intersection properties of finite collections of sets initiated ...
This paper continues studies of non-intersection properties of finite collections of sets initiated ...
The theory of regular variation is largely complete in one dimension, but is developed under regular...
We first synthesize and unify notions of regularity, both of individual functions/sets and of famili...
Variational analysis, a relatively new area of research in mathematics, has become one of the most p...
We further investigate the uniform regularity property of collections of sets via primal and dual ch...
Several primal and dual quantitative characterizations of regularity properties of collections of se...
The paper continues investigations of stationarity and regularity properties of collections of sets ...
We examine three primal space local Holder type regularity properties of finite collections of sets,...
We synthesize and unify notions of regularity, both of individual sets and of collections of sets, a...
Regularity properties lie at the core of variational analysis because of their importance for stabil...
This article investigates extremality, stationarity, and regularity properties of infinite collectio...
Extremality, stationarity and regularity notions for a system of closed sets in a normed linear spac...
We provide dual sufficient conditions for subtransversality of collections of sets in an Asplund spa...
The theory of regular variation is largely complete in one dimension, but is developed under regular...
This paper continues studies of non-intersection properties of finite collections of sets initiated ...
This paper continues studies of non-intersection properties of finite collections of sets initiated ...
The theory of regular variation is largely complete in one dimension, but is developed under regular...
We first synthesize and unify notions of regularity, both of individual functions/sets and of famili...
Variational analysis, a relatively new area of research in mathematics, has become one of the most p...