题意:给定一棵树,每个点有权值,每条边有边权(单向边)。你可以选取K个黑点,使得从每个点移动到距离他最近的黑点的花费(距离*点权)的总和最小。
n<=100 k<=50 w[i],a[i]<=10000
思路:见IOI2005龙凡解题报告
为什么要多叉转二叉?因为假设点U被选,这个被选点只会对U自己的儿子有影响,对U的兄弟并没有影响
dp[i,j,k]表示以i为根的子树,建j个节点,离i最近的被选点是k时的最小总和
\[ dp[i,j,k]=min\begin{cases} dp[l[i],t,k]+dp[r[i],j-t,k]+(dis[i]-dis[k])*a[i]\\dp[l[i],t,i]+dp[r[i],j-t-1,k] \end{cases} \]
var dp:array[..,..,..]of longint;
head,vet,next,len,l,r,tree,a,dis:array[..]of longint;
n,m,i,x,y,tot:longint; procedure add(a,b,c:longint);
begin
inc(tot);
next[tot]:=head[a];
vet[tot]:=b;
len[tot]:=c;
head[a]:=tot;
end; procedure dfs(u:longint);
var e,v:longint;
begin
e:=head[u];
while e<> do
begin
v:=vet[e];
dis[v]:=dis[u]+len[e];
dfs(v);
e:=next[e];
end;
end; function min(x,y:longint):longint;
begin
if x<y then exit(x);
exit(y);
end; function ask(u,i,k:longint):longint;
var ans,j:longint;
begin
if dp[u,i,k]<maxlongint div then exit(dp[u,i,k]);
dp[u,i,k]:=maxlongint div ;
for j:= to i do
begin
ans:=;
if l[u]> then ans:=ans+ask(l[u],j,k);
if r[u]> then ans:=ans+ask(r[u],i-j,k);
dp[u,i,k]:=min(dp[u,i,k],ans+(dis[u]-dis[k])*a[u]);
if i-j->= then
begin
ans:=;
if l[u]> then ans:=ans+ask(l[u],j,u);
if r[u]> then ans:=ans+ask(r[u],i-j-,k);
dp[u,i,k]:=min(dp[u,i,k],ans);
end;
end;
//writeln(u-,' ',i,' ',k-);
exit(dp[u,i,k]);
end; begin
assign(input,'bzoj1812.in'); reset(input);
assign(output,'bzoj1812.out'); rewrite(output);
readln(n,m);
inc(n);
for i:= to n do
begin
read(a[i],x,y);
inc(x);
if tree[x]= then begin l[x]:=i; tree[x]:=i; end
else begin r[tree[x]]:=i; tree[x]:=i; end;
add(x,i,y);
end;
dfs();
fillchar(dp,sizeof(dp),$7f);
writeln(ask(,m,));
close(input);
close(output);
end.