Sorry if I misunderstood your problem regarding the solution,but I will try to explain it entirely. Firstly,imagine the relationships betweeb Hoses as a graph.2 hoses are in the same friendship group if they are in the same connected component.You can run a dfs/bfs to find all the connected components.Why does it matter?If two Hoses are n the same friendship group we can't take one without the other,so we imagine each group as a super-Hose with the weight that is the sum of the weights of the hoses of the group,and the beauty the sum of the beauties of the hoses in the group. Secondly,we have at most n items(there can't be more than n connected components) so we can just apply the classical knapsack in O(n*k):

dp[ i ][ j ]=max(dp[ i-1 ][ j ],dp[ i-1 ][ j-Sweight[ i ] ]+ Sbeauty[ i ]) where Sweight[ i ],Sbeauty[ i ] are the weight and the beauty of i-th super hose.You can optimize knapsack's memory by always holding only the current and the previous line or having just an array and going with the j index in reversed order (from w to 1) but I don't believe this is essential if you have enough memory.