Given a infinite set/Universe (U) of alphanumeric elements and a family (F) of subsets of (U).

Calculate/Group all related subsets in (F), where all elements are covered or less, see example.

The Universe is not really infinite, but very large, approximately 59Mil elements and growing. Family (F) subsets, are not constant either, approximately 13Mil elements and growing as well.

Example:

U = {`9b3745e9`

,`ab70de17`

,`1c410139`

,`44038bbf`

,`9c610bb`

,...,N}

F1 = {`9b3745e9`

,07ee0220}

F2 = {`9b3745e9`

,`ab70de17`

,99b5d738}

F3 = {99b5d738,07ee0220}

F4 = {`9b3745e9`

,`ab70de17`

,`1c410139`

}

F4_{calculate()}={F2(2),F1(1)}

Of cause you can do it on brutal iteration, but over time it is not the optimal solution (NP-complete problem).

Any ideas how this can be solved more efficient? Encoding subsets, while using a element/vector Codebook that is larger than Universe, for instance 70Mil or 100Mil. But I'm not sure about calculation.