Since the conditions of normality of distribution and of homogeneity of variance were not satisfied, comparisons between the variables from HP CagA-positive and HP CagA-negative groups were performed using the Mann-Whitney U test.
Similar to the analysis in [17] and [[14], Section 6], the existence in time of a non-negative weak local solution of problem (1.1 - 1.3) can be constructed by the usual vanishing viscosity method which would satisfy a comparison principle.
In particular, the retention criterion, that a filter must satisfy in comparison to the base soil, is commonly expressed as OF ≤ D85, where OF is the geotextile characteristic opening size and D85 is the soil particle diameter corresponding to the 85% of the passing soil mass grain size distribution.
Its hallmark — knowledgeable salespeople who could satisfy the comparison-shopping stereo connoisseur — helped propel its growth until it became one of the nation's largest purveyors of consumer electronics, with more than 80 stores, mostly in the Northeast, including more than a dozen in and around New York City.
A geodesic space X is called a (operatorname {CAT}(0)) space if all geodesic triangles of appropriate size satisfy the following comparison axiom: Let △ be a geodesic triangle in X and let (bar {bigtriangleup}) be a comparison triangle in (mathbb{R}^{2}).
A geodesic metric space is said to be a CAT ( 0 ) space if all geodesic triangles satisfy the following comparison axiom: Let △ be a geodesic triangle in X and let △ ¯ be a comparison triangle for △.
A geodesic space is said to be a CAT ( 0 ) space if all geodesic triangles satisfy the following comparison axiom.
A geodesic space is called a CAT ( 0 ) space [8 12] if all geodesic triangles of appropriate size satisfy the following comparison axiom.
A geodesic space is said to be a CAT 0) space if all geodesic triangles of an appropriate size satisfy the following comparison axiom.
A geodesic metric space is said to be a C A T ( 0 ) space [1] if all geodesic triangles of appropriate size satisfy the following comparison axiom.
A geodesic space is said to be a CAT 0) space if all geodesic triangles of appropriate size satisfy the following comparison axiom.
