Add to ORKGAbstract. The weighted L2 estimates are here exploited to solve the ∂ ̄ problem on q–pseudoconvex dihedrons of Cn
AbstractLet f : Rn → (−∞, ∞] be a convex polyhedral function. We show how to find the normal minimiz...
Nordhaus-Gaddum results for weakly convex domination number of a graph G are studied
This paper deals with linear systems containing finitely many weak and/or strict inequalities, whose...
The weighted L2 estimates are here exploited to solve the  ̄∂ problem on q?pseudoconvex dihedrons of ...
The weighted L2 estimates are here exploited to solve the \uaf 02 problem on q\u2013pseudoconvex dih...
AbstractWe prove existence of C∞ solutions of the ∂̄ system on open wedges of CN under a very...
In this paper we study the ∂ problem on weakly q-convex domains and extend the results of Ho to unbo...
Low rank problems are nothing but nonlinear minimization problems over polyhedrons where a linear tr...
Abstract. Let r ≥ q. We get the stability of the estimates of the ∂-Neumann problem for (p, r)-forms...
AbstractLinear systems of an arbitrary number of inequalities provide external representations for t...
In this paper we obtain sharp weighted estimates for solutions of the ∂-equation in a lineally conve...
For integers k and n with k ≤ n a vector x ∈ ℝn is said to be weakly k-majorized by a vector q ∈ ℝk ...
A system of linear inequality and equality constraints determines a convex polyhedral set of feasibl...
This paper develops theoretical and numerical tools for quantitative local analysis of nonlinear sys...
This paper deals with systems of an arbitrary (possibly infinite) number of both weak and strict lin...
AbstractLet f : Rn → (−∞, ∞] be a convex polyhedral function. We show how to find the normal minimiz...
Nordhaus-Gaddum results for weakly convex domination number of a graph G are studied
This paper deals with linear systems containing finitely many weak and/or strict inequalities, whose...
The weighted L2 estimates are here exploited to solve the  ̄∂ problem on q?pseudoconvex dihedrons of ...
The weighted L2 estimates are here exploited to solve the \uaf 02 problem on q\u2013pseudoconvex dih...
AbstractWe prove existence of C∞ solutions of the ∂̄ system on open wedges of CN under a very...
In this paper we study the ∂ problem on weakly q-convex domains and extend the results of Ho to unbo...
Low rank problems are nothing but nonlinear minimization problems over polyhedrons where a linear tr...
Abstract. Let r ≥ q. We get the stability of the estimates of the ∂-Neumann problem for (p, r)-forms...
AbstractLinear systems of an arbitrary number of inequalities provide external representations for t...
In this paper we obtain sharp weighted estimates for solutions of the ∂-equation in a lineally conve...
For integers k and n with k ≤ n a vector x ∈ ℝn is said to be weakly k-majorized by a vector q ∈ ℝk ...
A system of linear inequality and equality constraints determines a convex polyhedral set of feasibl...
This paper develops theoretical and numerical tools for quantitative local analysis of nonlinear sys...
This paper deals with systems of an arbitrary (possibly infinite) number of both weak and strict lin...
AbstractLet f : Rn → (−∞, ∞] be a convex polyhedral function. We show how to find the normal minimiz...
Nordhaus-Gaddum results for weakly convex domination number of a graph G are studied
This paper deals with linear systems containing finitely many weak and/or strict inequalities, whose...