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non-constant arithmetic progression, existence of a sequence

Source: BMO 2024 Problem 2

April 29, 2024

arithmetic sequencecombinatorics

Problem Statement

Let

n \ge k \ge 3

be integers. Show that for every integer sequence

1 \le a_1 < a_2 < . . . < a_k \le n

one can choose non-negative integers

b_1, b_2, . . . , b_k

, satisfying the following conditions:
[*]

0 \le b_i \le n

for each

1 \le i \le k

, [*] all the positive

b_i

are distinct, [*] the sums

a_i + b_i

,

1 \le i \le k

, form a permutation of the first

k

terms of a non-constant arithmetic progression.

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