Here's one way of solving it using dynamic programming:

Assume we have the number *d*_{0 }d_{1 }... d_{N} as input.

The idea is to create a table, where cell (*i*, *j*) store the product *d*_{i }· d_{i+1 }· ... · d_{j}. This can be done efficiently since the cell at (*i*, *j*) can be computed by multiplying the number at (*i*-1, *j*) by *d*_{i}.

Since *i* (the start index) must be less than or equal to *j* (the end index), we'll focus on the lower left triangle of the table.

After generating the table, we check for duplicate entries.

Here's a concrete example solution for input 2673:

We allocate a matrix, *M*, with dimensions 4 × 4.

We start by filling in the diagonals, *M*_{i,i} with *d*_{i}:

We then go row by row, and fill in *M*_{i,j} with *d*_{i }·*M*_{i-1,j}

The result looks like

To check for duplicates, we collect the products (2, 12, 6, 84, 42, 7, 252, 126, 21, 3), sort them (2, 3, 6, 7, 12, 21, 42, 84, 126, 252), and loop through to see if two consecutive numbers are equal. If so we return false, otherwise true.

**In Java code:**

Here's a working DP solution, O(n^{2}).

```
public static boolean isColorful(int num) {
// Some initialization
String str = "" + num;
int[] digits = new int[str.length()];
for (int i = 0; i < str.length(); i++)
digits[i] = str.charAt(i) - '0';
int[][] dpmatrix = new int[str.length()][str.length()];
// Fill in diagonal: O(N)
for (int i = 0; i < digits.length; i++)
dpmatrix[i][i] = digits[i];
// Fill in lower left triangle: O(N^2)
for (int i = 0; i < str.length(); i++)
for (int j = 0; j < i; j++)
dpmatrix[i][j] = digits[i] * dpmatrix[i-1][j];
// Check for dups: O(N^2)
int[] nums = new int[digits.length * (digits.length+1) / 2];
for (int i = 0, j = 0; i < digits.length; i++, j += i)
System.arraycopy(dpmatrix[i], 0, nums, j, i+1);
Arrays.sort(nums);
for (int i = 0; i < nums.length - 1; i++)
if (nums[i] == nums[i+1])
return false;
return true;
}
```

For DP-interested readers I can recommend the somewhat similar question/answer over here:

`2*6*3`

in the first example? – murgatroid99 Aug 24 '12 at 18:40`0`

or`1`

in their decimal digits, which are already guaranteed to not be brilliant anyway if there are at least 3 digits in the number; otherwise the total product is necessarily greater than any sub-product. I think the only numbers where it matters are`x0`

,`x1`

, and`1x`

for`x ≠ 0`

, plus`10`

. – Dougal Aug 24 '12 at 19:42