Abstract
The eccentricity of a vertex v in a graph G is the maximum distance from v to any other vertex. The vertices whose eccentricity are equal to the diameter (the maximum eccentricity) of G are called peripheral vertices. In trees the eccentricity at v can always be achieved by the distance from v to a peripheral vertex. From this observation we are motivated to introduce normality of a vertex v as the minimum distance from v to any peripheral vertex. We consider the properties of the normality as well as the middle part of a tree with respect to this concept. Various related observations are discussed and compared with those related to the eccentricity. Then, analogous to the sum of eccentricities we consider the sum of normalities. After briefly discussing the extremal problems in general graphs we focus on trees and trees under various constraints. As opposed to the path and star in numerous extremal problems, we present several interesting and unexpected extremal structures. Lastly we consider the difference between eccentricity and normality, and the sum of these differences. We also introduce some unsolved problems in the context.
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