atcoder#ABC266F. [ABC266F] Well-defined Path Queries on a Namori

[ABC266F] Well-defined Path Queries on a Namori

Score : 500500 points

Problem Statement

You are given a connected simple undirected graph GG with NN vertices numbered 11 to NN and NN edges. The ii-th edge connects Vertex uiu_i and Vertex viv_i bidirectionally.

Answer the following QQ queries.

  • Determine whether there is a unique simple path from Vertex xix_i to Vertex yiy_i (a simple path is a path without repetition of vertices).

Constraints

  • 3N2×1053 \leq N \leq 2 \times 10^5
  • 1ui<viN1 \leq u_i < v_i\leq N
  • (ui,vi)(uj,vj)(u_i,v_i) \neq (u_j,v_j) if iji \neq j.
  • GG is a connected simple undirected graph with NN vertices and NN edges.
  • 1Q2×1051 \leq Q \leq 2 \times 10^5
  • 1xi<yiN1 \leq x_i < y_i\leq N
  • All values in input are integers.

Input

Input is given from Standard Input in the following format:

NN

u1u_1 v1v_1

u2u_2 v2v_2

\vdots

uNu_N vNv_N

QQ

x1x_1 y1y_1

x2x_2 y2y_2

\vdots

xQx_Q yQy_Q

Output

Print QQ lines.

The ii-th line (1iQ)(1 \leq i \leq Q) should contain Yes if there is a unique simple path from Vertex xix_i to Vertex yiy_i, and No otherwise.

5
1 2
2 3
1 3
1 4
2 5
3
1 2
1 4
1 5
No
Yes
No

The simple paths from Vertex 11 to 22 are (1,2)(1,2) and (1,3,2)(1,3,2), which are not unique, so the answer to the first query is No.

The simple path from Vertex 11 to 44 is (1,4)(1,4), which is unique, so the answer to the second query is Yes.

The simple paths from Vertex 11 to 55 are (1,2,5)(1,2,5) and (1,3,2,5)(1,3,2,5), which are not unique, so the answer to the third query is No.

10
3 5
5 7
4 8
2 9
1 2
7 9
1 6
4 10
2 5
2 10
10
1 8
6 9
8 10
6 8
3 10
3 9
1 10
5 8
1 10
7 8
Yes
No
Yes
Yes
No
No
Yes
No
Yes
No