# Find electric circuit with given resistance

I need some help with the following problem:
Given a set of resistances, need to construct circuit with given resistance (i.e. we choose some resistors and construct circuit). Only parallel and sequential connection are allowed. So, the formal definition of such circuit is the following:

``````Circuit = Resistance | (Sequential (Circuit) (Circuit a)) |
(Parallel (Circuit) (Circuit))
``````

The total number of circuits with N unlabeled resistors (where all resistors are used) is A000084 (Thanks Axel Kemper). But in my case resistors are labeled and I don't know how to check all circuits efficiently.

Number of resistors is about 15, is it possible to solve this problem?

UPD. Resistors may have different resistance. And of course, some resistances can't be achieved, in such case we just say that there is no solutions.

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You could look if you can adapt an A* algorithm. – Appleshell Oct 5 '13 at 21:23
Try out brute force "backtracking". Although it is very slow, very inefficient, but can report whether there is a solution existing or no – Desolator Oct 5 '13 at 21:25
@us2012: oops, didn't see the title. The body says "scheme" which sounds wrong for some reason. – n.m. Oct 5 '13 at 21:31
smells NP hard to me – nicholas Oct 5 '13 at 21:39
Is a solution guaranteed? Example: 15 resisors with 10 Ohm each cannot be combined to more than 150 Ohm. – Axel Kemper Oct 5 '13 at 22:07

Integer sequence A000084 lists the Number of series-parallel networks with n unlabeled edges. Also called yoke-chains by Cayley and MacMahon. MacMahon's paper is online.

The first 15 elements of the sequence: 1, 2, 4, 10, 24, 66, 180, 522, 1532, 4624, 14136, 43930, 137908, 437502, 1399068

If the resistors have different resistance values, they are not "unlabeled".

The number of different overall-resistances is less than the number of networks.

Looking at the numbers, brute-force enumeration is probably feasible for moderate values of n.

It is not possible to match every conceivable total resistance exactly. As mentioned in a comment: The number of 15 resistors might be too small to reach the required value. Other example: If all 15 restors have 1 ohm each, the total resistance cannot be smaller than 1/15 ohm.

Look on page 70 of Analytic Combinatorics to find an illustration of the equivalence between a tree, a bracketed expression and a series-parallel graph:

Like mentioned in one of the comments, a search procedure like A* could be used to search the space of possible trees. The tree representation of the series-parallel network is also useful to determine the source-to-sink resistance with a simple recursive function.

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Thanks for the paper! In my case resistors are labeled, because they may have different resistances. It's more challenging, because every circuit with N unlabeled resistors produces several circuits with unlabeled resistors (bounded by N!). It's unclear to me, how to generate and check all such circuits. – pfedotovsky Oct 6 '13 at 14:42