Description: Gena loves sequences of numbers. Recently, he has discovered a new type of sequences which he called an almost arithmetical progression. A sequence is an almost arithmetical progression, if its elements can be represented as: - a1 = p, where p is some integer; - ai = ai - 1 + ( - 1)i + 1·q (i > 1), where q is some integer. Right now Gena has a piece of paper with sequence b, consisting of n integers. Help Gena, find there the longest subsequence of integers that is an almost arithmetical progression. Sequence s1, s2, ..., sk is a subsequence of sequence b1, b2, ..., bn, if there is such increasing sequence of indexes i1, i2, ..., ik (1 ≤ i1 < i2 < ... < ik ≤ n), that bij = sj. In other words, sequence s can be obtained from b by crossing out some elements. Input Format: The first line contains integer n (1 ≤ n ≤ 4000). The next line contains n integers b1, b2, ..., bn (1 ≤ bi ≤ 106). Output Format: Print a single integer — the length of the required longest subsequence. Note: In the first test the sequence actually is the suitable subsequence. In the second test the following subsequence fits: 10, 20, 10.