To expand on @Ilmari Karonen's solution, what you want to do is compute weights for each histogram and then sample according to those weights. It appears to me that the most efficient way to do this, given your goal, would be with a linear program.

Let D_ij be the weight of the jth bin in the histogram of the ith item. Then if each item is weighted with weight w_i, the "summed histogram" would have weight sum(i in items) w_i D_ij. One way to get your "approximately uniform" distribution would be to minimize the maximum difference across bins, so we would solve the following LP:

```
minimize z
subject to (for all j, k)
z >= (sum i in items) w_i D_ij - (sum i in items) w_i D_ik
z >= (sum i in items) w_i D_ik - (sum i in items) w_i D_ij
```

The above is basically saying that `z >=`

absolute value of difference across all weighted pairs of bins. To solve this LP you will need a separate package since numpy does not include a LP solver. See this gist for a solution using `cplex`

or this gist for a solution using `cvxpy`

. Note that you will need to set some constraints on the weights (e.g. each weight is larger or equal to 0) as these solutions do. Other python bindings for GLPK (GNU Linear Programming kit) can be found here: http://en.wikibooks.org/wiki/GLPK/Python.

Finally you just sample from histogram `i`

with weight `w_i`

. This can be done with an adaptation of roulette selection using `cumsum`

and `searchsorted`

as suggested by @Ilmari Karonen, see this gist.

If you wanted the resulting weighted distribution to be "as uniform as possible", I would solve a similar problem with weights, but maximize the weighted entropy across the weighted sum of bins. This problem would appear to be nonlinear although you could use any number of nonlinear solvers such as BFGS or gradient-based methods. This would probably be a bit slower than the LP method but it depends on what you need in your application. The LP method would approximate the nonlinear method very closely if you have a large number of histograms, because it would be easy to reach a uniform distribution.

When using the LP solution, a bunch of the histogram weights may bind to 0 because the number of constraints is small, but this will not be a problem with a non-trivial number of bins, since the number of constraints is O(n^2).

Example weights with 50 histograms and 10 bins:

```
[0.006123642775837011, 0.08591660144140816, 0.0, 0.0, 0.0, 0.0, 0.03407525280610657, 0.0, 0.0, 0.0, 0.07092537493489116, 0.0, 0.0, 0.023926802333318554, 0.0, 0.03941537854267549, 0.0, 0.0, 0.0, 0.0, 0.10937063438351756, 0.08715770469631079, 0.0, 0.05841899435928017, 0.016328676622408153, 0.002218517959171183, 0.0, 0.0, 0.0, 0.08186919626269101, 0.03173286609277701, 0.08737065271898292, 0.0, 0.0, 0.041505225727435785, 0.05033635148761689, 0.0, 0.09172214842175723, 0.027548495513552738, 0.0, 0.0, 0.0, 0.0, 0.0, 0.0259929997624099, 0.0, 0.0, 0.028044483157851748, 0.0, 0.0, 0.0]
```

With 50 histograms each with 50 bins, now very few zero values:

```
[0.0219136051655165, 0.0, 0.028325808078797768, 0.0, 0.040889043180965624, 0.04372501089775975, 0.0, 0.031032870504105477, 0.020745831040881676, 0.04794861828714149, 0.0, 0.03763592540998652, 0.0029093177405377577, 0.0034239051136138398, 0.0, 0.03079554151573207, 0.0, 0.04676278554085836, 0.0461258666541918, 9.639105313353352e-05, 0.0, 0.013649362063473166, 0.059168272186891635, 0.06703936360466661, 0.0, 0.0, 0.03175895249795131, 0.0, 0.0, 0.04376133487616099, 0.02406633433758186, 0.009724226721798858, 0.05058252335384487, 0.0, 0.0393763638188805, 0.05287112817101315, 0.0, 0.0, 0.06365320629437914, 0.0, 0.024978299494456246, 0.023531082497830605, 0.033406648550332804, 0.012693750980220679, 0.00274892002684083, 0.0, 0.0, 0.0, 0.0, 0.04465971034045478, 4.888224154453002]
```

`cumsum()`

to compute the CDF and`searchsorted()`

to sample it. – Ilmari Karonen Feb 11 '13 at 14:30