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FURTHER IMPROVEMENT OF AN EXTENSION OF HOLDER-TYPE INEQUALITYIn 1995 Pearce and Pecaric proved an extension of Holder's inequality. In this paper we extend
Inequalities for the Perron root related to Levinger's theorem matrix with positive diagonal entries, the inequality ρ(A + D-1BTD) ≥ ρ(A) + ρ(B) is proved under
Characterization of the trace by monotonicity inequalitiesLet φ{symbol}be a positive linear functional on the algebra of n × n complex matrices and p be a
Mixed hybrid finite element scheme for stefan problem with prescribed convection preconditioner for the condensed matrix in mixed hybrid finite element approximation for linear elliptic equation
On Rellich’s Inequalities in Euclidean Spaces one-dimensional Rellich-type integral inequalities for linear combinations of test functions
A modified combined relaxation method for non-linear convex variational inequalities variational inequality it involves two non-linear mappings, which need not be differentiable. We propose a
On Wielandt type inequalities for powers of complex matrices matrix A and of the matrix |A| obtained by replacing entries of A by their absolute values was given
Solving of variational inequalities by reducing to the linear complementarity problem of these inequalities, we apply the reduction to the linear complementarity problem. Such reduction allows one to solve
A modified combined relaxation method for non-linear convex variational inequalities variational inequality it involves two non-linear mappings, which need not be differentiable. We propose a
Mixed hybrid finite element scheme for stefan problem with prescribed convection preconditioner for the condensed matrix in mixed hybrid finite element approximation for linear elliptic equation
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