# What is the time-Complexity for the following code?

What is the time complexity for this code?

In this code I am trying to solve the "Palindrome Partitioning" problem. I am using recursion. I am trying to understand DP. and through this program I want to analyse it's time complexity. I want to compare it with the bottom-up approach of Dynamic Programming. The bottom-up approach takes O(n^3) and I have problem finding time complexity for recursive functions. Please help

string str;

int l;
int cut[200][200];
bool isPalin(int i,int j)
{
bool f=true;
for(int x=i,y=j;x<y;x++,y--)
if(str[x]!=str[y])f=false;
return f;
}
int func(int i,int j)
{
if(i==j){cut[i][j]=0;return 0;}
if(isPalin(i,j))return 0;
if(cut[i][j]!=-1)return cut[i][j];
cut[i][j]=9999999;
for(int k=i;k<j;k++)
{
cut[i][j]=min(cut[i][j],func(i,k)+1+func(k+1,j));
}
return cut[i][j];
}
int main()
{
while(1){
cin>>str;
l=str.size();
for(int i=0;i<l;i++)
for(int j=0;j<l;j++)
cut[i][j]=-1;
cout<<func(0,str.size()-1)<<endl;
}
return 0;
}
-
Your question isn't refined enough. What problem are you having determining the time complexity of this code? What specifically do you need help with? (As asked, this question is "Do my work for me.", which isn't a question.) –  David Schwartz Dec 27 '13 at 9:40
@DavidSchwartz : I am trying to understand DP. and through this program I want to analyse it's time complexity. I want to compare it with the bottom-up approach of Dynamic Programming. The bottom-up approach takes O(n^3) and I have problem finding time complexity for recursive functions. Please help. –  user3138968 Dec 27 '13 at 10:00
Look at the 2709106 question. The answer contains the perfect instructions for understanding the time complexity for recursive functions. –  yakov Dec 27 '13 at 10:20