William really likes puzzle kits. For one of his birthdays, his friends gifted him a complete undirected edge-weighted graph consisting of $n$ vertices.

He wants to build a spanning tree of this graph, such that for the first $k$ vertices the following condition is satisfied: the degree of a vertex with index $i$ does not exceed $d_i$. Vertices from $k + 1$ to $n$ may have any degree.

William wants you to find the minimum weight of a spanning tree that satisfies all the conditions.

A spanning tree is a subset of edges of a graph that forms a tree on all $n$ vertices of the graph. The weight of a spanning tree is defined as the sum of weights of all the edges included in a spanning tree.

The first line of input contains two integers $n$, $k$ ($2 \leq n \leq 50$, $1 \leq k \leq min(n - 1, 5)$).

The second line contains $k$ integers $d_1, d_2, \ldots, d_k$ ($1 \leq d_i \leq n$).

The $i$-th of the next $n - 1$ lines contains $n - i$ integers $w_{i,i+1}, w_{i,i+2}, \ldots, w_{i,n}$ ($1 \leq w_{i,j} \leq 100$): weights of edges $(i,i+1),(i,i+2),\ldots,(i,n)$.

Print one integer: the minimum weight of a spanning tree under given degree constraints for the first $k$ vertices.