If there are certain numbers x_{0} and x_{n+1} , and if x_{i} is an integer for 0 <= i <= n+1, how to calculate the sum of the numbers with JAVA?

The sum indicates that it takes the sum of f(x_{1},x_{2},...x_{n}) for every possible combination of (x_{1},x_{2},...x_{n}) such that the inequality holds. The inequality is **x _{0} < x_{1} < x_{2} < ... < x_{n+1}**

I have an idea for the solution, but it is a terribly ineffective algorithm using binary, and it's O(2^{n}). Of course, I cannot use "for" because it must be used for n (non-specific) times.

for example,

if given is x_{1} = 1, and x_{n+1} is x_{3} = 5, then the possible combinations are

- x
_{1}=1, x_{2}=2, x_{3}=5 - x
_{1}=1, x_{2}=3, x_{3}=5 - x
_{1}=1, x_{2}=4, x_{3}=5

the sum should calculate sum for all these 3 possible value set.

Is there anyone who knows more effective algorithm for this?