`np.einsum`

may be an option too for these kind of sum. As nevsan showed though, for `b`

which is bounded by `a`

you need to use `np.cumsum`

first, and `np.einsum`

should not be faster in the given example.

it could look like this:

```
y_acc = np.add.accumulate(y[:amax]) # same as cumsum
result = np.einsum('i,i,j->', x[:amax], y_acc, z[cmin:cmax])
```

However this is increadibly slow, because einsum does not optimize the fact that the `z`

summation only needs to be done once, so you need to reformulate it by hand:

```
result = np.einsum('i,i->', x[:amax], y_summed) * z[cmin:cmax].sum()
```

Which should in this case however should be slower then nevsan's `np.dot`

based approach, since `dot`

should normally be better optimized (ie. `np.einsum(ii->, a, b)`

is slower then `np.dot(a, b)`

). However if you have more arrays to sum over, it may be a nice option.