Consider a sequence of *n* positive real numbers, (*a _{i}*), and its partial sum sequence, (

*s*). Given a number

_{i}*x*∊ (0,

*s*], we have to find

_{n}*i*such that

*s*

_{i−1}<

*x*≤

*s*. Also we want to be able to change one of the

_{i}*a*’s without having to update all partial sums. Both can be done in O(log

_{i}*n*) time by using a binary tree with the

*a*’s as leaf node values, and the values of the non-leaf nodes being the sum of the values of the respective children. If

_{i}*n*is known and fixed, the tree doesn’t have to be self-balancing and can be stored efficiently in a linear array. Furthermore, if

*n*is a power of two, only 2

*n*− 1 array elements are required. See Blue et al., Phys. Rev. E

**51**(1995), pp. R867–R868 for an application. Given the genericity of the problem and the simplicity of the solution, I wonder whether this data structure has a specific name and whether there are existing implementations (preferably in C++). I’ve already implemented it myself, but writing data structures from scratch always seems like reinventing the wheel to me—I’d be surprised if nobody had done it before.