Orig Description
Score : 400 points
Problem StatementWe have a pyramid with N steps, built with blocks.
The steps are numbered 1 through N from top to bottom.
For each 1≤i≤N, step i consists of 2i-1 blocks aligned horizontally.
The pyramid is built so that the blocks at the centers of the steps are aligned vertically.
A pyramid with N=4 steps
Snuke wrote a permutation of (1, 2, ..., 2N-1) into the blocks of step N.
Then, he wrote integers into all remaining blocks, under the following rule:
The integer written into a block b must be equal to the median of the three integers written into the three blocks directly under b, or to the lower left or lower right of b.
Writing integers into the blocks
Afterwards, he erased all integers written into the blocks.
Now, he only remembers that the integer written into the block of step 1 was x.
Construct a permutation of (1, 2, ..., 2N-1) that could have been written into the blocks of step N, or declare that Snuke's memory is incorrect and such a permutation does not exist.
Constraints
2≤N≤10^5
1≤x≤2N-1
InputThe input is given from Standard Input in the following format:
N x
OutputIf no permutation of (1, 2, ..., 2N-1) could have been written into the blocks of step N, print No.
Otherwise, print Yes in the first line, then print 2N-1 lines in addition.
The i-th of these 2N-1 lines should contain the i-th element of a possible permutation.
Sample Input 14 4
Sample Output 1Yes
1
6
3
7
4
5
2
This case corresponds to the figure in the problem statement.
Sample Input 22 1
Sample Output 2No
No matter what permutation was written into the blocks of step N, the integer written into the block of step 1 would be 2.
Extracted Specification
An integer N (2 ≤ N ≤ 10^5), representing some quantity or size.
An integer x (1 ≤ x ≤ 2N-1).
### Example Input:
```
4 4
```
### Function Signature:
Write a function f(N, x) that takes in the input.
def f(N: int, x: int):
'''
N: an integer
x: an integer
'''
Test Case Generator
Sure, here's the test case generator for the given problem:
```python
import random
def tcgen():
N = random.randint(2, 10**5)
x = random.randint(1, 2*N-1)
return N, x
# Example usage
N, x = tcgen()
print(N, x)
```
Explanation:
- **N** is generated to be an integer within the range [2, 10^5] as per the constraints.
- **x** is generated to be an integer within the range [1, 2N-1] as per the constraints.
This function will generate random values for N and x that fit within the constraints of the problem statement. You can call this function to generate test cases for your problem.
Extract Arguments
def extract_arguments(fh):
N, x = map(int, fh.readline().strip().split())
return N, x