Abstract The idea of a finite collection of closed sets having “linearly regular inter-section ” at a point is crucial in variational analysis. This central theoretical condition also has striking algorithmic consequences: in the case of two sets, one of which satisfies a further regularity condition (convexity or smoothness, for example), we prove that von Neumann’s method of “alternating projections ” converges locally to a point in the intersection, at a linear rate associated with a modulus of regularity. As a consequence, in the case of several arbitrary closed sets having linearly regular intersection at some point, the method of “averaged projections ” converges locally at a linear rate to a point in the intersection. Inexact version...
We present necessary conditions for monotonicity of fixed point iterations of mappings that may viol...
We first synthesize and unify notions of regularity, both of individual functions/sets and of famili...
We develop a framework for quantitative convergence analysis of Picard iterations of expansive set-v...
Abstract The idea of a finite collection of closed sets having “linearly regular inter-section ” at ...
Abstract The idea of a finite collection of closed sets having “linearly regular inter-section ” at ...
International audienceThe idea of a finite collection of closed sets having "linearly regular interse...
We consider the method of alternating projections for finding a point in the intersection of two pos...
We prove that if two smooth manifolds intersect transversally, then the method of alternating projec...
International audienceThe method of alternating projections is a classical tool to solve feasibility...
Abstract. We consider projection algorithms for solving (nonconvex) feasibility problems in Euclidea...
AbstractThe cyclic projections algorithm is an important method for determining a point in the inter...
We consider the popular and classical method of alternating projections for finding a point in the i...
Dedicated to Boris Mordukhovich on the occasion of his 65th Birthday TheMethod of Alternating Projec...
This paper studies the convergence of the classical proximal point algorithm without assuming monoto...
In this paper, we establish sublinear and linear convergence of fixed point iterations generated by ...
We present necessary conditions for monotonicity of fixed point iterations of mappings that may viol...
We first synthesize and unify notions of regularity, both of individual functions/sets and of famili...
We develop a framework for quantitative convergence analysis of Picard iterations of expansive set-v...
Abstract The idea of a finite collection of closed sets having “linearly regular inter-section ” at ...
Abstract The idea of a finite collection of closed sets having “linearly regular inter-section ” at ...
International audienceThe idea of a finite collection of closed sets having "linearly regular interse...
We consider the method of alternating projections for finding a point in the intersection of two pos...
We prove that if two smooth manifolds intersect transversally, then the method of alternating projec...
International audienceThe method of alternating projections is a classical tool to solve feasibility...
Abstract. We consider projection algorithms for solving (nonconvex) feasibility problems in Euclidea...
AbstractThe cyclic projections algorithm is an important method for determining a point in the inter...
We consider the popular and classical method of alternating projections for finding a point in the i...
Dedicated to Boris Mordukhovich on the occasion of his 65th Birthday TheMethod of Alternating Projec...
This paper studies the convergence of the classical proximal point algorithm without assuming monoto...
In this paper, we establish sublinear and linear convergence of fixed point iterations generated by ...
We present necessary conditions for monotonicity of fixed point iterations of mappings that may viol...
We first synthesize and unify notions of regularity, both of individual functions/sets and of famili...
We develop a framework for quantitative convergence analysis of Picard iterations of expansive set-v...