Since there is only one center, there is either 1 or 2 in the lineup. Suppose there is 1, then we can choose 3. When we choose 4, we can choose 4 or not. If you choose 4, because there are 14 at the same time, you can't choose 6, so it becomes 13457, and at least one of them doesn't play. If 4 is not selected, it is 13567, which also meets the conditions. If you choose 2 as the center, there is no restriction that 14 cannot choose 6, but 26 cannot be far away at the same time, so it becomes 23457. Now compare three situations, because there are 3 and 5, so now it is 147,167,247.

147 is definitely higher than 167, so 147 and 147 are higher than 247, so the positive solution is 13457.