Sums of dilates over groups of prime order
Abstract
For p prime, A ⊂eq Z/pZ and λ ∈ Z, the sum of dilates A + λ · A is defined by \[A + λ · A = \a + λ a' : a, a' ∈ A\.\] The basic problem on such sums of dilates asks for the minimum size of |A + λ · A| for given λ, A of given density α, and p tending to infinity. We investigate this problem for α fixed and λ tending to infinity, proving near-optimal bounds in this case.
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