The Average Size of Giant Components Between the Double-Jump
Abstract
We study the sizes of connected components according to their excesses during a random graph process built with n vertices. The considered model is the continuous one defined in Janson 2000. An -component is a connected component with edges more than vertices. is also called the excess of such component. As our main result, we show that when and n are both large, the expected number of vertices that ever belong to an -component is about 121/3 1/3 n2/3. We also obtain limit theorems for the number of creations of -components.
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