A superadditivity and submultiplicativity property for cardinalities of sumsets
Abstract
For finite sets of integers A1, A2 ... An we study the cardinality of the n-fold sumset A1+... +An compared to those of n-1-fold sumsets A1+... +Ai-1+Ai+1+... An. We prove a superadditivity and a submultiplicativity property for these quantities. We also examine the case when the addition of elements is restricted to an addition graph between the sets.
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