Alice has an integer sequence $$$a$$$ of length $$$n$$$ and all elements are different. She will choose a subsequence of $$$a$$$ of length $$$m$$$, and defines the value of a subsequence $$$a_{b_1},a_{b_2},\ldots,a_{b_m}$$$ as $$$$$$\sum_{i = 1}^m (m \cdot a_{b_i}) - \sum_{i = 1}^m \sum_{j = 1}^m f(\min(b_i, b_j), \max(b_i, b_j)),$$$$$$ where $$$f(i, j)$$$ denotes $$$\min(a_i, a_{i + 1}, \ldots, a_j)$$$.

Alice wants you to help her to maximize the value of the subsequence she choose.

A sequence $$$s$$$ is a subsequence of a sequence $$$t$$$ if $$$s$$$ can be obtained from $$$t$$$ by deletion of several (possibly, zero or all) elements.