結果
問題 | No.1227 I hate ThREE |
ユーザー | vwxyz |
提出日時 | 2021-09-15 02:45:08 |
言語 | Python3 (3.12.2 + numpy 1.26.4 + scipy 1.12.0) |
結果 |
WA
|
実行時間 | - |
コード長 | 25,269 bytes |
コンパイル時間 | 335 ms |
コンパイル使用メモリ | 15,232 KB |
実行使用メモリ | 37,760 KB |
最終ジャッジ日時 | 2024-06-27 22:35:28 |
合計ジャッジ時間 | 8,938 ms |
ジャッジサーバーID (参考情報) |
judge3 / judge5 |
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テストケース
テストケース表示入力 | 結果 | 実行時間 実行使用メモリ |
---|---|---|
testcase_00 | AC | 48 ms
19,584 KB |
testcase_01 | AC | 48 ms
14,080 KB |
testcase_02 | AC | 49 ms
14,080 KB |
testcase_03 | WA | - |
testcase_04 | WA | - |
testcase_05 | WA | - |
testcase_06 | AC | 51 ms
14,080 KB |
testcase_07 | WA | - |
testcase_08 | WA | - |
testcase_09 | WA | - |
testcase_10 | WA | - |
testcase_11 | TLE | - |
testcase_12 | TLE | - |
testcase_13 | WA | - |
testcase_14 | WA | - |
testcase_15 | WA | - |
testcase_16 | WA | - |
testcase_17 | WA | - |
testcase_18 | WA | - |
testcase_19 | WA | - |
testcase_20 | WA | - |
testcase_21 | WA | - |
testcase_22 | WA | - |
testcase_23 | TLE | - |
testcase_24 | TLE | - |
testcase_25 | -- | - |
testcase_26 | -- | - |
testcase_27 | -- | - |
testcase_28 | -- | - |
testcase_29 | -- | - |
testcase_30 | -- | - |
testcase_31 | -- | - |
testcase_32 | -- | - |
testcase_33 | -- | - |
testcase_34 | -- | - |
testcase_35 | -- | - |
ソースコード
import bisect import copy import decimal import fractions import functools import heapq import itertools import math import random import sys from collections import Counter,deque,defaultdict from functools import lru_cache,reduce from heapq import heappush,heappop,heapify,heappushpop,_heappop_max,_heapify_max def _heappush_max(heap,item): heap.append(item) heapq._siftdown_max(heap, 0, len(heap)-1) def _heappushpop_max(heap, item): if heap and item < heap[0]: item, heap[0] = heap[0], item heapq._siftup_max(heap, 0) return item from math import degrees, gcd as GCD read=sys.stdin.read readline=sys.stdin.readline readlines=sys.stdin.readlines def Extended_Euclid(n,m): stack=[] while m: stack.append((n,m)) n,m=m,n%m if n>=0: x,y=1,0 else: x,y=-1,0 for i in range(len(stack)-1,-1,-1): n,m=stack[i] x,y=y,x-(n//m)*y return x,y class MOD: def __init__(self,p,e=1): self.p=p self.e=e self.mod=self.p**self.e def Pow(self,a,n): a%=self.mod if n>=0: return pow(a,n,self.mod) else: assert math.gcd(a,self.mod)==1 x=Extended_Euclid(a,self.mod)[0] return pow(x,-n,self.mod) def Build_Fact(self,N): assert N>=0 self.factorial=[1] self.cnt=[0]*(N+1) for i in range(1,N+1): ii=i self.cnt[i]=self.cnt[i-1] while ii%self.p==0: ii//=self.p self.cnt[i]+=1 self.factorial.append((self.factorial[-1]*ii)%self.mod) self.factorial_inve=[None]*(N+1) self.factorial_inve[-1]=self.Pow(self.factorial[-1],-1) for i in range(N-1,-1,-1): ii=i+1 while ii%self.p==0: ii//=self.p self.factorial_inve[i]=(self.factorial_inve[i+1]*ii)%self.mod def Fact(self,N): return self.factorial[N]*pow(self.p,self.cnt[N],self.mod)%self.mod def Fact_Inve(self,N): if self.cnt[N]: return None return self.factorial_inve[N] def Comb(self,N,K,divisible_count=False): if K<0 or K>N: return 0 retu=self.factorial[N]*self.factorial_inve[K]*self.factorial_inve[N-K]%self.mod cnt=self.cnt[N]-self.cnt[N-K]-self.cnt[K] if divisible_count: return retu,cnt else: retu*=pow(self.p,cnt,self.mod) retu%=self.mod return retu class Graph: def __init__(self,V,edges=False,graph=False,directed=False,weighted=False): self.V=V self.directed=directed self.weighted=weighted if not graph: self.edges=edges self.graph=[[] for i in range(self.V)] if weighted: for i,j,d in self.edges: self.graph[i].append((j,d)) if not self.directed: self.graph[j].append((i,d)) else: for i,j in self.edges: self.graph[i].append(j) if not self.directed: self.graph[j].append(i) else: self.graph=graph self.edges=[] for i in range(self.V): if self.weighted: for j,d in self.graph[i]: if self.directed or not self.directed and i<=j: self.edges.append((i,j,d)) else: for j in self.graph[i]: if self.directed or not self.directed and i<=j: self.edges.append((i,j)) def SS_BFS(self,s,bipartite_graph=False,linked_components=False,parents=False,unweighted_dist=False,weighted_dist=False): seen=[False]*self.V seen[s]=True if linked_components: lc=[s] if parents: ps=[None]*self.V ps[s]=s if unweighted_dist or bipartite_graph: uwd=[float('inf')]*self.V uwd[s]=0 if weighted_dist: wd=[float('inf')]*self.V wd[s]=0 queue=deque([s]) while queue: x=queue.popleft() for y in self.graph[x]: if self.weighted: y,d=y if not seen[y]: seen[y]=True queue.append(y) if linked_components: lc.append(y) if parents: ps[y]=x if unweighted_dist or bipartite_graph: uwd[y]=uwd[x]+1 if weighted_dist: wd[y]=wd[x]+d if bipartite_graph: bg=[[],[]] for tpl in self.edges: i,j=tpl[:2] if self.weighted else tpl if type(uwd[i])==float or type(uwd[j])==float: continue if not uwd[i]%2^uwd[j]%2: bg=False break else: for x in range(self.V): if type(uwd[x])==float: continue bg[uwd[x]%2].append(x) tpl=() if bipartite_graph: tpl+=(bg,) if linked_components: tpl+=(lc,) if parents: tpl+=(ps,) if unweighted_dist: tpl+=(uwd,) if weighted_dist: tpl+=(wd,) if len(tpl)==1: tpl=tpl[0] return tpl def AP_BFS(self,bipartite_graph=False,linked_components=False,parents=False): seen=[False]*self.V if bipartite_graph: bg=[None]*self.V cnt=-1 if linked_components: lc=[] if parents: ps=[None]*self.V for s in range(self.V): if seen[s]: continue seen[s]=True if bipartite_graph: cnt+=1 bg[s]=(cnt,0) if linked_components: lc.append([s]) if parents: ps[s]=s queue=deque([s]) while queue: x=queue.popleft() for y in self.graph[x]: if self.weighted: y,d=y if not seen[y]: seen[y]=True queue.append(y) if bipartite_graph: bg[y]=(cnt,bg[x][1]^1) if linked_components: lc[-1].append(y) if parents: ps[y]=x if bipartite_graph: bg_=bg bg=[[[],[]] for i in range(cnt+1)] for tpl in self.edges: i,j=tpl[:2] if self.weighted else tpl if not bg_[i][1]^bg_[j][1]: bg[bg_[i][0]]=False for x in range(self.V): if bg[bg_[x][0]]: bg[bg_[x][0]][bg_[x][1]].append(x) tpl=() if bipartite_graph: tpl+=(bg,) if linked_components: tpl+=(lc,) if parents: tpl+=(ps,) if len(tpl)==1: tpl=tpl[0] return tpl def SS_DFS(self,s,bipartite_graph=False,cycle_detection=False,directed_acyclic=False,euler_tour=False,linked_components=False,parents=False,postorder=False,preorder=False,subtree_size=False,topological_sort=False,unweighted_dist=False,weighted_dist=False): seen=[False]*self.V finished=[False]*self.V if directed_acyclic or cycle_detection or topological_sort: dag=True if euler_tour: et=[] if linked_components: lc=[] if parents or cycle_detection or subtree_size: ps=[None]*self.V ps[s]=s if postorder or topological_sort: post=[] if preorder: pre=[] if subtree_size: ss=[1]*self.V if unweighted_dist or bipartite_graph: uwd=[float('inf')]*self.V uwd[s]=0 if weighted_dist: wd=[float('inf')]*self.V wd[s]=0 stack=[(s,0)] if self.weighted else [s] while stack: if self.weighted: x,d=stack.pop() else: x=stack.pop() if not seen[x]: seen[x]=True stack.append((x,d) if self.weighted else x) if euler_tour: et.append(x) if linked_components: lc.append(x) if preorder: pre.append(x) for y in self.graph[x]: if self.weighted: y,d=y if not seen[y]: stack.append((y,d) if self.weighted else y) if parents or cycle_detection or subtree_size: ps[y]=x if unweighted_dist or bipartite_graph: uwd[y]=uwd[x]+1 if weighted_dist: wd[y]=wd[x]+d elif not finished[y]: if (directed_acyclic or cycle_detection or topological_sort) and dag: dag=False if cycle_detection: cd=(y,x) elif not finished[x]: finished[x]=True if euler_tour: et.append(~x) if postorder or topological_sort: post.append(x) if subtree_size: for y in self.graph[x]: if y==ps[x]: continue ss[x]+=ss[y] if bipartite_graph: bg=[[],[]] for tpl in self.edges: i,j=tpl[:2] if self.weighted else tpl if type(uwd[i])==float or type(uwd[j])==float: continue if not uwd[i]%2^uwd[j]%2: bg=False break else: for x in range(self.V): if type(uwd[x])==float: continue bg[uwd[x]%2].append(x) tpl=() if bipartite_graph: tpl+=(bg,) if cycle_detection: if dag: cd=[] else: y,x=cd cd=self.Route_Restoration(y,x,ps) tpl+=(cd,) if directed_acyclic: tpl+=(dag,) if euler_tour: tpl+=(et,) if linked_components: tpl+=(lc,) if parents: tpl+=(ps,) if postorder: tpl+=(post,) if preorder: tpl+=(pre,) if subtree_size: tpl+=(ss,) if topological_sort: if dag: tp_sort=post[::-1] else: tp_sort=[] tpl+=(tp_sort,) if unweighted_dist: tpl+=(uwd,) if weighted_dist: tpl+=(wd,) if len(tpl)==1: tpl=tpl[0] return tpl def AP_DFS(self,bipartite_graph=False,cycle_detection=False,directed_acyclic=False,euler_tour=False,linked_components=False,parents=False,postorder=False,preorder=False,topological_sort=False): seen=[False]*self.V finished=[False]*self.V if bipartite_graph: bg=[None]*self.V cnt=-1 if directed_acyclic or cycle_detection or topological_sort: dag=True if euler_tour: et=[] if linked_components: lc=[] if parents or cycle_detection: ps=[None]*self.V if postorder or topological_sort: post=[] if preorder: pre=[] for s in range(self.V): if seen[s]: continue if bipartite_graph: cnt+=1 bg[s]=(cnt,0) if linked_components: lc.append([]) if parents: ps[s]=s stack=[(s,0)] if self.weighted else [s] while stack: if self.weighted: x,d=stack.pop() else: x=stack.pop() if not seen[x]: seen[x]=True stack.append((x,d) if self.weighted else x) if euler_tour: et.append(x) if linked_components: lc[-1].append(x) if preorder: pre.append(x) for y in self.graph[x]: if self.weighted: y,d=y if not seen[y]: stack.append((y,d) if self.weighted else y) if bipartite_graph: bg[y]=(cnt,bg[x][1]^1) if parents or cycle_detection: ps[y]=x elif not finished[y]: if directed_acyclic and dag: dag=False if cycle_detection: cd=(y,x) elif not finished[x]: finished[x]=True if euler_tour: et.append(~x) if postorder or topological_sort: post.append(x) if bipartite_graph: bg_=bg bg=[[[],[]] for i in range(cnt+1)] for tpl in self.edges: i,j=tpl[:2] if self.weighted else tpl if not bg_[i][1]^bg_[j][1]: bg[bg_[i][0]]=False for x in range(self.V): if bg[bg_[x][0]]: bg[bg_[x][0]][bg_[x][1]].append(x) tpl=() if bipartite_graph: tpl+=(bg,) if cycle_detection: if dag: cd=[] else: y,x=cd cd=self.Route_Restoration(y,x,ps) tpl+=(cd,) if directed_acyclic: tpl+=(dag,) if euler_tour: tpl+=(et,) if linked_components: tpl+=(lc,) if parents: tpl+=(ps,) if postorder: tpl+=(post,) if preorder: tpl+=(pre,) if topological_sort: if dag: tp_sort=post[::-1] else: tp_sort=[] tpl+=(tp_sort,) if len(tpl)==1: tpl=tpl[0] return tpl def Tree_Diameter(self,weighted=False): def Farthest_Point(u): dist=self.SS_BFS(u,weighted_dist=True) if weighted else self.SS_BFS(u,unweighted_dist=True) fp=0 for i in range(self.V): if dist[fp]<dist[i]: fp=i return fp,dist[fp] u,d=Farthest_Point(0) v,d=Farthest_Point(u) return u,v,d def SCC(self): reverse_graph=[[] for i in range(self.V)] for tpl in self.edges: i,j=tpl[:2] if self.weighted else tpl reverse_graph[j].append(i) postorder=self.AP_DFS(postorder=True) scc=[] seen=[False]*self.V for s in postorder[::-1]: if seen[s]: continue queue=deque([s]) seen[s]=True lst=[] while queue: x=queue.popleft() lst.append(x) for y in reverse_graph[x]: if self.weighted: y=y[0] if not seen[y]: seen[y]=True queue.append(y) scc.append(lst) return scc def Build_LCA(self,s): self.euler_tour,self.parents,depth=self.SS_DFS(s,euler_tour=True,parents=True,unweighted_dist=True) self.dfs_in_index=[None]*self.V self.dfs_out_index=[None]*self.V for i,x in enumerate(self.euler_tour): if x>=0: self.dfs_in_index[x]=i else: self.dfs_out_index[~x]=i self.ST=Segment_Tree(2*self.V,lambda x,y:min(x,y),float('inf')) lst=[None]*2*self.V for i in range(2*self.V): if self.euler_tour[i]>=0: lst[i]=depth[self.euler_tour[i]] else: lst[i]=depth[self.parents[~self.euler_tour[i]]] self.ST.Build(lst) def LCA(self,a,b): m=min(self.dfs_in_index[a],self.dfs_in_index[b]) M=max(self.dfs_in_index[a],self.dfs_in_index[b]) x=self.euler_tour[self.ST.Fold_Index(m,M+1)] if x>=0: return x else: return self.parents[~x] def Dijkstra(self,s,route_restoration=False): dist=[float('inf')]*self.V dist[s]=0 hq=[(0,s)] if route_restoration: parents=[None]*self.V parents[s]=s while hq: dx,x=heapq.heappop(hq) if dist[x]<dx: continue for y,dy in self.graph[x]: if dist[y]>dx+dy: dist[y]=dx+dy if route_restoration: parents[y]=x heapq.heappush(hq,(dist[y],y)) if route_restoration: return dist,parents else: return dist def Bellman_Ford(self,s,route_restoration=False): dist=[float('inf')]*self.V dist[s]=0 if route_restoration: parents=[s]*self.V for _ in range(self.V-1): for i,j,d in self.edges: if dist[j]>dist[i]+d: dist[j]=dist[i]+d if route_restoration: parents[j]=i if not self.directed and dist[i]>dist[j]+d: dist[i]=dist[j]+d if route_restoration: parents[i]=j negative_cycle=[] for i,j,d in self.edges: if dist[j]>dist[i]+d: negative_cycle.append(j) if not self.directed and dist[i]>dist[j]+d: negative_cycle.append(i) if negative_cycle: is_negative_cycle=[False]*self.V for i in negative_cycle: if is_negative_cycle[i]: continue else: queue=deque([i]) is_negative_cycle[i]=True while queue: x=queue.popleft() for y,d in self.graph[x]: if not is_negative_cycle[y]: queue.append(y) is_negative_cycle[y]=True if route_restoration: parents[y]=x for i in range(self.V): if is_negative_cycle[i]: dist[i]=-float('inf') if route_restoration: return dist,parents else: return dist def Warshall_Floyd(self,route_restoration=False): dist=[[float('inf')]*self.V for i in range(self.V)] for i in range(self.V): dist[i][i]=0 if route_restoration: parents=[[j for j in range(self.V)] for i in range(self.V)] for i,j,d in self.edges: if dist[i][j]>d: dist[i][j]=d if route_restoration: parents[i][j]=i if not self.directed and dist[j][i]>d: dist[j][i]=d if route_restoration: parents[j][i]=j for k in range(self.V): for i in range(self.V): for j in range(self.V): if dist[i][j]>dist[i][k]+dist[k][j]: dist[i][j]=dist[i][k]+dist[k][j] if route_restoration: parents[i][j]=parents[k][j] for i in range(self.V): if dist[i][i]<0: for j in range(self.V): if dist[i][j]!=float('inf'): dist[i][j]=-float('inf') if route_restoration: return dist,parents else: return dist def Route_Restoration(self,s,g,parents): route=[g] while s!=g and parents[g]!=g: g=parents[g] route.append(g) route=route[::-1] return route def Kruskal(self): UF=UnionFind(self.V) sorted_edges=sorted(self.edges,key=lambda x:x[2]) minimum_spnning_tree=[] for i,j,d in sorted_edges: if not UF.Same(i,j): UF.Union(i,j) minimum_spnning_tree.append((i,j,d)) return minimum_spnning_tree def Ford_Fulkerson(self,s,t): max_flow=0 residual_graph=[defaultdict(int) for i in range(self.V)] if self.weighted: for i,j,d in self.edges: if not d: continue residual_graph[i][j]+=d if not self.directed: residual_graph[j][i]+=d else: for i,j in self.edges: residual_graph[i][j]+=1 if not self.directed: residual_graph[j][i]+=1 while True: parents=[None]*self.V parents[s]=s seen=[False]*self.V seen[s]=True queue=deque([s]) while queue: x=queue.popleft() for y in residual_graph[x].keys(): if not seen[y]: seen[y]=True queue.append(y) parents[y]=x if y==t: tt=t while tt!=s: residual_graph[parents[tt]][tt]-=1 residual_graph[tt][parents[tt]]+=1 if not residual_graph[parents[tt]][tt]: residual_graph[parents[tt]].pop(tt) tt=parents[tt] max_flow+=1 break else: continue break else: break return max_flow def BFS(self,s): seen=[False]*self.V seen[s]=True queue=deque([s]) while queue: x=queue.popleft() for y in self.graph[x]: if self.weighted: y,d=y if not seen[y]: seen[y]=True queue.append(y) return def DFS(self,s): seen=[False]*self.V finished=[False]*self.V stack=[(s,0)] if self.weighted else [s] while stack: if self.weighted: x,d=stack.pop() else: x=stack.pop() if not seen[x]: seen[x]=True stack.append((x,d) if self.weighted else x) for y in self.graph[x]: if self.weighted: y,d=y if not seen[y]: stack.append((y,d) if self.weighted else y) elif not finished[x]: finished[x]=True return N,C=map(int,readline().split()) mod=10**9+7 edges=[] for _ in range(N-1): a,b=map(int,readline().split()) a-=1;b-=1 edges.append((a,b)) G=Graph(N,edges=edges) parents,tour=G.SS_DFS(0,parents=True,postorder=True) if C<=10**4: dp=[[1]*C for x in range(N)] for x in tour: if x==0 or len(G.graph[x])>1: for y in G.graph[x]: if y==parents[x]: continue for i in range(C): s=0 if i>=3: s+=dp[y][i-3] if i<=C-4: s+=dp[y][i+3] dp[x][i]*=s dp[x][i]%=mod ans=sum(dp[0]) else: dp=[[1]*N*3 for x in range(N)] for x in tour: if x==0 or len(G.graph[x])>1: for y in G.graph[x]: if y==parents[x]: continue for i in range(N*3): s=0 if i>=3: s+=dp[y][i-3] if i<=N*3-4: s+=dp[y][i+3] else: s+=dp[y][N*3-1] dp[x][i]*=s dp[x][i]%=mod ans=sum(dp[0])*2+(C-len(dp[0])*2)*dp[0][N*3-1] print(ans)