Bit Counting Sequence - 题目

#10155. Bit Counting Sequence

统计

AI Translation — This statement was translated using AI and may contain inaccuracies. Please refer to the original statement if in doubt.

对于非负整数 $x$，令 $p(x)$ 为 $x$ 的二进制表示中 1 的个数。例如，$p(26) = 3$，因为 $26 = (11010)_2$。

给定一个包含 $n$ 个整数的序列 $(a_1, a_2, \dots, a_n)$。你的任务是判断是否存在一个非负整数 $x$，使得 $(p(x), p(x + 1), \dots, p(x + n - 1))$ 等于 $(a_1, a_2, \dots, a_n)$。如果存在，请计算满足条件的最小 $x$。

输入格式

第一行包含一个整数 $t$ ($1 \le t \le 1000$)，表示测试用例的数量。接下来是 $t$ 个测试用例。每个测试用例的格式如下：

第一行包含一个整数 $n$ ($1 \le n \le 500\,000$)。第二行包含 $n$ 个整数 $a_1, a_2, \dots, a_n$ ($0 \le a_i \le 60$，对于所有 $i$)。

单个输入文件中所有测试用例的 $n$ 之和不超过 $500\,000$。

输出格式

对于每个测试用例，输出满足上述条件的最小非负整数 $x$。如果不存在这样的 $x$，则输出 $-1$。

样例

输入 1

输出 1

13
3
2305843009213693949
-1

说明 1

对于第一个测试用例，$x = 13$ 满足上述条件，因为 $(p(13), p(14), p(15), p(16), p(17)) = (3, 3, 4, 1, 2)$。可以证明不存在小于 13 的非负整数满足上述条件。

Discussions

About Discussions

The discussion section is only for posting: General Discussions (problem-solving strategies, alternative approaches), and Off-topic conversations.

This is NOT for reporting issues! If you want to report bugs or errors, please use the Issues section below.

Open Discussions 0

No discussions in this category.

Issues

About Issues

If you find any issues with the problem (statement, scoring, time/memory limits, test cases, etc.), you may submit an issue here. A problem moderator will review your issue.

Guidelines:

This is not a place to publish discussions, editorials, or requests to debug your code. Issues are only visible to you and problem moderators.
Do not submit duplicated issues.
Issues must be filed in English or Chinese only.

Active Issues 0

No issues in this category.

Closed/Resolved Issues 0