You came to the exhibition and one exhibit has drawn your attention. It consists of nn stacks of blocks,where the ii-th stack consists of aiaiblocks resting on the surface.
The height of the exhibit is equal to mm. Consequently,the number of blocks in each stack is less than or equal to mm.
There is a camera on the ceiling that sees the top view of the blocks and a camera on the right wall that sees the side view of the blocks.
Find the maximum number of blocks you can remove such that the views for both the cameras would not change.
Note,that while originally all blocks are stacked on the floor,it is not required for them to stay connected to the floor after some blocks are removed. There is no gravity in the whole exhibition,so no block would fall down,even if the block underneath is removed. It is not allowed to move blocks by hand either.
The first line contains two integers nn and mm (1≤n≤1000001≤n≤100000, 1≤m≤1091≤m≤109) — the number of stacks and the height of the exhibit.
The second line contains nn integers a1,a2,…,ana1,a2,…,an (1≤ai≤m1≤ai≤m) — the number of blocks in each stack from left to right.
Print exactly one integer — the maximum number of blocks that can be removed.
The following pictures illustrate the first example and its possible solution.
Blue cells indicate removed blocks. There are 1010 blue cells,so the answer is 1010.
版权声明:本文内容由互联网用户自发贡献,该文观点与技术仅代表作者本人。本站仅提供信息存储空间服务,不拥有所有权,不承担相关法律责任。如发现本站有涉嫌侵权/违法违规的内容, 请发送邮件至 dio@foxmail.com 举报,一经查实,本站将立刻删除。