hdu 1130 How Many Trees?(Catalan数)
How Many Trees?
Time Limit: 2000/1000 MS (Java/Others) Memory Limit: 65536/32768 K (Java/Others)
Total Submission(s): 3317 Accepted Submission(s): 1922
Problem Description
A binary search tree is a binary tree with root k such that any node v reachable from its left has label (v) <label (k) and any node w reachable from its right has label (w) > label (k). It is a search structure which can find a node with label x in O(n log
n) average time, where n is the size of the tree (number of vertices).
Given a number n, can you tell how many different binary search trees may be constructed with a set of numbers of size n such that each element of the set will be associated to the label of exactly one node in a binary search tree?
Given a number n, can you tell how many different binary search trees may be constructed with a set of numbers of size n such that each element of the set will be associated to the label of exactly one node in a binary search tree?
Input
The input will contain a number 1 <= i <= 100 per line representing the number of elements of the set.
Output
You have to print a line in the output for each entry with the answer to the previous question.
Sample Input
1
2
3
Sample Output
1
2
5
Source
题意:
对于给定的n,求n个节点能构成多少种二叉树,左子树的值 < 根节点 < 右子树
思路:Catalan数 + 大整数
import java.math.BigInteger;
import java.util.Scanner;
public class Main {
static BigInteger []F = new BigInteger[105];
public static void ini()
{
F[1] = BigInteger.valueOf(1);
for(int i = 2;i < 105;i++)
{
F[i] = F[i-1].multiply(BigInteger.valueOf(i*4-2)).divide(BigInteger.valueOf(i+1));
}
}
public static void main(String[] args) {
// TODO 自动生成的方法存根
ini();
Scanner Reader = new Scanner(System.in);
int x;
while(Reader.hasNext())
{
x = Reader.nextInt();
System.out.println(F[x]);
}
}
}
