# Any faster solution other than this bruteforce approach

I've been submitting programs to this problem at ACM. Problem ID=1922 but my solution keeps getting Time Limit Exceeded on test 3.

My idea is to use brute-force but with some branches-cutting-off. The below is my Java code, any faster solutions or improvements would be appreciated... I guess this isn't difficult at all because the difficulty is only 195, but I just can't get it accepted.

Finally got it accepted. The algorithm is to first sort the heroes, and start with the smallest-wish first. Just O(n)..

My Java code is so far the fastest Solution Rank

Many thanks!

``````public class testtest
{
static boolean[] used;
// length of heros
static int ulen;
// list of heros
static Wish[] w;
// number of possible teams
static int count = 0;
// and output
static StringBuilder str = new StringBuilder();

// check if it is a valid team
static boolean check(int len)
{
for (int i = 0; i < ulen; i ++)
{
if (!used[i])
{
// adding another hero makes it reliable, so invalid
if (w[i].wish <= len + 1)
{
return false;
}
}

}
return true;
}

// search the teams, team size = total, current pick = len, start from root + 1
static void search(int root, int total, int len)
{
if (len >= total) // finish picking len heros
{
if (check(total))  // valid
{
}
return;
}
for (int i = root + 1; i < ulen; i ++)
{
if (w[i].wish > len + ulen - i)
{
return; // no enough heros left, so return
}
else
if (w[i].wish <= total)  // valid hero for this team
{
used[i] = true;
search(i, total, len + 1);  // search next hero
used[i] = false;
}
}
}

public static void main(String[] args) throws IOException
{
w = new Wish[ulen];
for (int i = 0; i < ulen; i ++)
{
w[i] = new Wish(i + 1, Integer.parseInt(rr.readLine()));
}
Arrays.sort(w);
used = new boolean[ulen];
Arrays.fill(used, false);
for (int i = 1; i <= ulen; i ++)
{
for (int j = 0; j <= ulen - i; j ++)
{
if (w[j].wish <= i) // this hero is valid
{
used[j] = true;
search(j, i, 1);
used[j] = false;
}
}
}
System.out.println(count);
System.out.print(str);
}
}
``````
-
You might want to take a look at combinatorics. –  bdares Dec 28 '12 at 16:21
I think the algorithm is still based on search because the entire list needs to be printed, not just the total number of answers. –  DoctorLai Dec 28 '12 at 16:43
Nothing to do with the algorithm, but changing your `+` inside `StringBuffer.append` calls will certainly shave-off some time. –  Christopher Schultz Dec 28 '12 at 17:26
@ChristopherSchultz I don't think the effect will be very large though. –  Jan Dvorak Dec 28 '12 at 17:28
How long does your code take to run? –  Christopher Schultz Dec 28 '12 at 17:31

First, my results (of Java) is the fastest. http://acm.timus.ru/rating.aspx?space=1&num=1922&lang=java

The fact that I didn't make full use before is that I have sorted list of heroes according to their wishes.

Therefore, the main loop just needs to be changed to O(n) instead of O(n^2)

``````for (int i = 1; i <= ulen; i ++)
{
if (w[0].wish <= i)
{
used[0] = true;
search(0, i, 1);
used[0] = false;
}
}
``````
-

Here is what I have that executes for the sample test in ~0.00013 seconds (on my CPU):

``````import java.io.*;
import java.util.List;
import java.util.ArrayList;
import java.util.Map;
import java.util.HashMap;
import java.util.Map.Entry;
import java.util.Arrays;

/**
* Hero.java
*
* This program solves the Super Hero problem put forth by Timus Online Judge
* http://acm.timus.ru/problem.aspx?space=1&num=1922
*
* @author  Hunter McMillen
* @version 1.0 12/29/2012
*/
public class Hero {
private static Map<Integer, Integer> indexMap = new HashMap<Integer, Integer>();
private static List<Integer>                indices  = new ArrayList<Integer>();
private static boolean[]                    used;

/**
* Entry point into the application
*
* @args command line arguments
*/
public static void main(String[] args) throws IOException {
int numHeroes, wish;
List<Integer> heroes = new ArrayList<Integer>();
List<List<Integer>> groups;

// read 'numHeroes' wishes from stdin
// filter out heroes that have a minimum required that exceeds
// the number of heroes
for(int i = 0; i < numHeroes; i++) {
if(wish <= numHeroes)
}

// split into groups
groups = reliableGroups(heroes);

// output results
System.out.println(groups.size());
for(List<Integer> g : groups) {
System.out.println(g.size() + " " + g.toString().replaceAll("[\\]\\[\\,]", ""));
}
}

/**
* Determines whether a group is effective, meaning that all wishes
* for that group are met
*
* @group The group to evaluate for effectiveness
*/
public static boolean isEffective(List<Integer> group)  {
int maxWish = Integer.MIN_VALUE;
int temp;

// find the maximum wish size of all members in group
for(int i = 0; i < group.size(); i++) {
if((temp = indexMap.get(group.get(i))) > maxWish)
maxWish = temp;
}

// make sure that the maximum wish size is respected
return group.size() >= maxWish;
}

/**
* Checks to see if there exists some other superhero
* that when added to this group makes another effective group
*
* @effectiveGroup The current grouping that is effective but might
*                 not be reliable
*/
public static boolean isReliable(List<Integer> effectiveGroup) {
for(int i = 1; i <= indices.size(); i++) {
if(!used[i]) {
// add another hero to this group to see if it remains effective

// if it is still effective, then this group is not reliable
if(isEffective(effectiveGroup))
return false;

// remove the hero that was temporarily added
effectiveGroup.remove(effectiveGroup.size()-1);
}
}

// true if adding any unused member to this group made it ineffective
return true;
}

/**
* Separates the List<Integer> of heroes into reliable groups
*
* @heroes The List of heroes
*/
public static List<List<Integer>> reliableGroups(List<Integer> heroes) {
List<List<Integer>> groups = new ArrayList<List<Integer>>();
boolean       effective    = true;
int h, current;

// create HashMap with mapping between hero wish values and their index
for(int i = 1; i <= heroes.size(); i++) {
indexMap.put(i, heroes.get(i-1));
}

// create an array to track which heroes have been used
used = new boolean[indices.size()+1];
Arrays.fill(used, false);

List<int[]>   combinations;
List<Integer> tempList;
for(int i = 1; i <= indices.size(); i++) {
h = indexMap.get(i);

combinations = combination(heroes, h);

// iterate over all combinations making sure the wish values are below
// the threshold for this hero at map index `i`
for(int[] aCombination : combinations) {
for(int j = 0; j < aCombination.length; j++) {
current = aCombination[j];
used[current] = true;
if(indexMap.get(current) > h) {
effective = false;
break;
}
}

// create a List from the integer[] combination
tempList = asList(aCombination);

// if the group makeup is reliable, save it
if(effective && !groups.contains(tempList) && isReliable(tempList))

// reset flags
effective = true;
Arrays.fill(used, false);
}
}

return groups;
}

/**
* Helper method that returns a List<Integer> given
* an array of primitive ints
*
* @array The array to convert to a List<Integer>
*/
public static List<Integer> asList(int[] array) {
List<Integer> boxed = new ArrayList<Integer>();

for(int i = 0; i < array.length; i++) {
}

return boxed;
}

/**
* Generates the intial r combination in ascending order
* i.e [1, 2, 3, 4, ..., r]
*
* @r The size of the intial combination
*/
public static int[] initialCombination(int r) {
int[] indices = new int[r];

for(int i = 0; i < r; i++)
indices[i] = i+1;

return indices;
}

/**
* Generates the next combination given an array of indices
*
* @indicesIn The array of indices
* @n         The size of this combination
*/
public static int[] nextCombination(int[] indicesIn, int n) {
int[] indices = (int[])indicesIn.clone();
int r = indices.length;

// find the rightmost index that is not at its final highest value
int i = 0;
for (i = r - 1; i >= 0; i--) {
if (indices[i] != (i + n - r + 1)) {
break;
}
}

// return null if no more combinations exist
if (i == -1)
return null;

// increment rightmost index
indices[i]++;

// reset all the indices to the right of indices[i]
// to their smallest possible value.
for (int j = i + 1; j < r; j++) {
indices[j] = indices[j-1] + 1;
}

return indices;
}

/**
* Generates all r-combinations of the indices array
*
* @heroes The array of heroes wishes
* @r      The length of the combination to generate
*/
public static List<int[]> combination(List<Integer> heroes, int r) {
List<int[]> combinations = new ArrayList<int[]>();
int[] indices = initialCombination(r);

while(indices != null) {
indices = nextCombination(indices, heroes.size());
}

return combinations;
}
}
``````
-
thanks... the sample test is simple, so it shouldn't take long.. the problem description states that the input size of heroes can take up to 1000... Is it possible for you to write in C/C++ or, C#, java? You code much depends on some inbuilt statements/functions of ruby, such as combination. –  DoctorLai Dec 28 '12 at 19:07
@DoctorLai Yeah, I can work at converting it. I might not have time today, but I will try. –  Hunter McMillen Dec 28 '12 at 19:16
finally got accepted.... will update my answer soon. –  DoctorLai Dec 28 '12 at 19:24
@DoctorLai I am going to try to beat yours :) –  Hunter McMillen Dec 28 '12 at 21:11
@DoctorLai I keep getting WA on test 2 but I have no idea why? My output matches what was posted on the board. Any thoughts? –  Hunter McMillen Dec 30 '12 at 1:53