AbstractWe introduce and study a new positive definite (in certain singular cases, positive semidefinite) geometric mean of two positive definite (under certain conditions, positive semidefinite) matrices
AbstractInequalities for norms of different versions of the geometric mean of two positive definite ...
Means of positive numbers are well-know but the theory of matrix means due to Kubo and Ando is less...
AbstractWe define a family of weighted geometric means {G(t;ω;A)}t∈[0,1]n where ω and A vary over al...
AbstractWe introduce and study a new positive definite (in certain singular cases, positive semidefi...
AbstractA matrix [aij(α)xij] is shown to be positive semidefinite or positive definite if the matrix...
AbstractOn basis of the geometric mean proposed recently by T. Ando, Chi-Kwong Li and Roy Mathias, i...
AbstractWe propose a definition for geometric mean of k positive (semi) definite matrices. We show t...
AbstractThe geometric mean of two positive definite matrices has been defined in several ways and st...
summary:We study some geometric properties associated with the $t$-geometric means $A\sharp _{t}B :=...
summary:We study some geometric properties associated with the $t$-geometric means $A\sharp _{t}B :=...
AbstractIn this paper we consider a family of nonlinear matrix equations based on the higher-order g...
AbstractIn this paper we provide a new class of (metric) geometric means of positive definite matric...
AbstractA sharper form of the arithmetic-geometric-mean inequality for a pair of positive definite m...
We extend the notion of classical metric geometric mean (MGM) for positive definite matrices of the ...
The geometric mean of two positive definite matrices has been defined in several ways and studied by...
AbstractInequalities for norms of different versions of the geometric mean of two positive definite ...
Means of positive numbers are well-know but the theory of matrix means due to Kubo and Ando is less...
AbstractWe define a family of weighted geometric means {G(t;ω;A)}t∈[0,1]n where ω and A vary over al...
AbstractWe introduce and study a new positive definite (in certain singular cases, positive semidefi...
AbstractA matrix [aij(α)xij] is shown to be positive semidefinite or positive definite if the matrix...
AbstractOn basis of the geometric mean proposed recently by T. Ando, Chi-Kwong Li and Roy Mathias, i...
AbstractWe propose a definition for geometric mean of k positive (semi) definite matrices. We show t...
AbstractThe geometric mean of two positive definite matrices has been defined in several ways and st...
summary:We study some geometric properties associated with the $t$-geometric means $A\sharp _{t}B :=...
summary:We study some geometric properties associated with the $t$-geometric means $A\sharp _{t}B :=...
AbstractIn this paper we consider a family of nonlinear matrix equations based on the higher-order g...
AbstractIn this paper we provide a new class of (metric) geometric means of positive definite matric...
AbstractA sharper form of the arithmetic-geometric-mean inequality for a pair of positive definite m...
We extend the notion of classical metric geometric mean (MGM) for positive definite matrices of the ...
The geometric mean of two positive definite matrices has been defined in several ways and studied by...
AbstractInequalities for norms of different versions of the geometric mean of two positive definite ...
Means of positive numbers are well-know but the theory of matrix means due to Kubo and Ando is less...
AbstractWe define a family of weighted geometric means {G(t;ω;A)}t∈[0,1]n where ω and A vary over al...
DOI
Add to ORKG