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Block projection operators in normed solid spaces of measurable operatorsWe prove a Hermitian analog of the well-known operator triangle inequality for vonNeumann algebras
Block projection operators in normed solid spaces of measurable operatorsWe prove a Hermitian analog of the well-known operator triangle inequality for vonNeumann algebras
The Damascus inequality inequalities, triangle geometric inequalities, inequalities for arbitrary number of values and special forms
(q-1,q-2)-quasimetric spaces. Covering mappings and coincidence pointsgeneralized triangle inequality
On exact triangle inequalities in (q1; q2) -quasimetric spaces a function f; such that f -triangle inequality is more exact than any ( q 1 ; q 2
ABOUT ONE QUASI-METRIC SPACE of identity and the weakened triangle inequality. The M -space (X, ρ) belongs to the class of f -quasi
On hermitian operators X and Y meeting the condition -Y ≤ X ≤ Y of triangle inequality found by the author in one earlier paper for pairs of Hermitian operators. © 2013
Metrics ρ, quasimetrics ρs and PSEUDOMETRICS inf ρs quasimetric (it need not satisfy the triangle inequality). The function inf ρss(a, b) defined by the condition
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