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erdos_358.parts.i

Specification

Let $A=\{a_1 < \cdots\}$ be an infinite sequence of integers. Let $f(n)$ count the number of solutions to \[n=\sum_{u\leq i\leq v}a_i.\] Is there such an $A$ for which $f(n)\to \infty$ as $n\to \infty$?

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Lean 4 Statement 
theorem erdos_358.parts.i :
    answer(sorry) ↔ ∃ A, StrictMono A ∧ atTop.Tendsto (f A) atTop
ID: ErdosProblems__358__erdos_358.parts.i
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