The concept of critical (or principal) angle between two linear subspaces has applications in statistics, numerical linear algebra, and other areas. Such concept has been abundantly studied in the literature, both from a theoretical and computational point of view. Part I of this work is an attempt to build a general theory of critical angles for a pair of closed convex cones. The need of such theory is motivated, among other reasons, by some specific problems arising in regression analysis of cone-constrained data, see Tenenhaus (Psychometrika 53:503-524, 1988). Angle maximization and/or angle minimization problems involving a pair of convex cones are at the core of our discussion. Such optimization problems are nonconvex in general and th...
The article provides formulae for calculating the limiting normal cone introduced by Mordukhovich to...
The strong conical hull intersection property and bounded linear regularity are properties of a coll...
The authors analyze the sensitivity of optimal values and optimal sets of finite dimensional optimiz...
The concept of critical (or principal) angle between two linear subspaces has applications in statis...
The concept of critical angle between two linear subspaces has applications in statistics, numerical...
International audienceThis work concerns the numerical computation of critical angles in polyhedral ...
There are three related concepts that arise in connection with the angular analysis of a convex cone...
Canonical analysis of two convex polyhedral cones consists in looking for two vectors (one in each c...
convex polyhedral cone, alternating least squares algorithm, optimal scaling, monotone analysis of v...
AbstractThe solution to a geometric problem arising in the theory of ordinary differential equations...
Let P and Q be two disjoint convex polygons in the plane with m and n vertices, respectively. Given ...
Consider a polyhedral convex cone which is given by a finite number of linear inequal-ities. We inve...
Although the concept of angles between general subspaces may be too advanced for an under-graduate l...
In this note we investigate a problem formulated by Pleijel in 1955. It asks for the cone over a con...
AbstractLet K be a closed convex cone in a Hilbert space X. Let BX be the closed unit ball of X and ...
The article provides formulae for calculating the limiting normal cone introduced by Mordukhovich to...
The strong conical hull intersection property and bounded linear regularity are properties of a coll...
The authors analyze the sensitivity of optimal values and optimal sets of finite dimensional optimiz...
The concept of critical (or principal) angle between two linear subspaces has applications in statis...
The concept of critical angle between two linear subspaces has applications in statistics, numerical...
International audienceThis work concerns the numerical computation of critical angles in polyhedral ...
There are three related concepts that arise in connection with the angular analysis of a convex cone...
Canonical analysis of two convex polyhedral cones consists in looking for two vectors (one in each c...
convex polyhedral cone, alternating least squares algorithm, optimal scaling, monotone analysis of v...
AbstractThe solution to a geometric problem arising in the theory of ordinary differential equations...
Let P and Q be two disjoint convex polygons in the plane with m and n vertices, respectively. Given ...
Consider a polyhedral convex cone which is given by a finite number of linear inequal-ities. We inve...
Although the concept of angles between general subspaces may be too advanced for an under-graduate l...
In this note we investigate a problem formulated by Pleijel in 1955. It asks for the cone over a con...
AbstractLet K be a closed convex cone in a Hilbert space X. Let BX be the closed unit ball of X and ...
The article provides formulae for calculating the limiting normal cone introduced by Mordukhovich to...
The strong conical hull intersection property and bounded linear regularity are properties of a coll...
The authors analyze the sensitivity of optimal values and optimal sets of finite dimensional optimiz...