{"problem":{"name":"Climbing Takahashi","description":{"content":"There are $N$ platforms arranged in a row. The height of the $i$\\-th platform from the left is $H_i$. Takahashi is initially standing on the leftmost platform. Since he likes heights, he will repeat t","description_type":"Markdown"},"platform":"AtCoder","limit":{"time_limit":2000,"memory_limit":262144},"difficulty":"None","is_remote":true,"is_sync":true,"sync_url":null,"sign":"abc235_b"},"statements":[{"statement_type":"Markdown","content":"There are $N$ platforms arranged in a row. The height of the $i$\\-th platform from the left is $H_i$.\nTakahashi is initially standing on the leftmost platform.\nSince he likes heights, he will repeat the following move as long as possible.\n\n*   If the platform he is standing on is not the rightmost one, and the next platform to the right has a height greater than that of the current platform, step onto the next platform.\n\nFind the height of the final platform he will stand on.\n\n## Constraints\n\n*   $2 \\leq N \\leq 10^5$\n*   $1 \\leq H_i \\leq 10^9$\n*   All values in input are integers.\n\n## Input\n\nInput is given from Standard Input in the following format:\n\n$N$\n$H_1$ $\\ldots$ $H_N$\n\n[samples]","is_translate":false,"language":"English"}],"meta":{"iden":"abc235_b","tags":[],"sample_group":[["5\n1 5 10 4 2","10\n\nTakahashi is initially standing on the leftmost platform, whose height is $1$. The next platform to the right has a height of $5$ and is higher than the current platform, so he steps onto it.\nHe is now standing on the $2$\\-nd platform from the left, whose height is $5$. The next platform to the right has a height of $10$ and is higher than the current platform, so he steps onto it.\nHe is now standing on the $3$\\-rd platform from the left, whose height is $10$. The next platform to the right has a height of $4$ and is lower than the current platform, so he stops moving.\nThus, the height of the final platform Takahashi will stand on is $10$."],["3\n100 1000 100000","100000"],["4\n27 1828 1828 9242","1828"]],"created_at":"2026-03-03 11:01:14"}}