AbstractThe set of scaled projections of a vector onto the column space of a matrix has recently been of interest to several authors. The aim of the present investigation is to obtain a detailed description of the geometry of this set. In our main result we show by construction that the set of scaled projections is the union of finitely many polytopes. The proof makes use of a theorem on the alternative
AbstractThe following theorem is discussed. Let X be a compact subset of the unit sphere in Cn whose...
© 2018, Pleiades Publishing, Ltd. This paper is aimed at presenting a systematic exposition of the e...
AbstractAmong all linear projections onto a given linear subspace L in Rn we select those that minim...
AbstractThe set of scaled projections of a vector onto the column space of a matrix has recently bee...
AbstractLet X be a matrix of full column rank, and let D be a positive definite diagonal matrix. In ...
AbstractWe address several basic questions that arise in the use of projection in combinatorial opti...
In this paper we study the properties of the projection onto a finitely generated cone. We show for ...
AbstractLet X be a matrix of full column rank, and let D be a diagonal matrix with positive diagonal...
AbstractThe nontrivial projection problem asks whether every finite-dimensional normed space admits ...
AbstractLet Π be the projection operator, which maps every polytope to its projection body. It is we...
The aim of this research work is twofold. On the one hand, under mild assumptions, we give an explic...
We prove that for every M-dimensional body K, there is a rectangular parallelepiped B of the same vo...
Let $X$ be a finite-dimensional normed space and let $Y \subseteq X$ be its proper linear subspace. ...
AbstractIn this note, we list several formulas for computing orthogonal projections onto the linear ...
AbstractIn this paper we study the polytope T(r, c) of non-negative m × n matrices with prescribed r...
AbstractThe following theorem is discussed. Let X be a compact subset of the unit sphere in Cn whose...
© 2018, Pleiades Publishing, Ltd. This paper is aimed at presenting a systematic exposition of the e...
AbstractAmong all linear projections onto a given linear subspace L in Rn we select those that minim...
AbstractThe set of scaled projections of a vector onto the column space of a matrix has recently bee...
AbstractLet X be a matrix of full column rank, and let D be a positive definite diagonal matrix. In ...
AbstractWe address several basic questions that arise in the use of projection in combinatorial opti...
In this paper we study the properties of the projection onto a finitely generated cone. We show for ...
AbstractLet X be a matrix of full column rank, and let D be a diagonal matrix with positive diagonal...
AbstractThe nontrivial projection problem asks whether every finite-dimensional normed space admits ...
AbstractLet Π be the projection operator, which maps every polytope to its projection body. It is we...
The aim of this research work is twofold. On the one hand, under mild assumptions, we give an explic...
We prove that for every M-dimensional body K, there is a rectangular parallelepiped B of the same vo...
Let $X$ be a finite-dimensional normed space and let $Y \subseteq X$ be its proper linear subspace. ...
AbstractIn this note, we list several formulas for computing orthogonal projections onto the linear ...
AbstractIn this paper we study the polytope T(r, c) of non-negative m × n matrices with prescribed r...
AbstractThe following theorem is discussed. Let X be a compact subset of the unit sphere in Cn whose...
© 2018, Pleiades Publishing, Ltd. This paper is aimed at presenting a systematic exposition of the e...
AbstractAmong all linear projections onto a given linear subspace L in Rn we select those that minim...