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I'm trying to make a fast Fibonacci algorithm. It often needs to assign a BigInteger to another variable and because the C# BigInteger is implemented as a struct, it needs to copy the entire array, which can be thousands of integers. So I need a BigInteger implementation that can be acessed by reference. Both .Net Reflector and ILSpy only show empty implementations.

In any case it'd be interesting to see the source code, as asked here: How does the BigInteger store values internally?

The problem is that every so called source code file does not actually have an implementation, dll's and downloaded from: http://referencesource.microsoft.com/netframework.aspx

Making a wrapper class won't help, because the algorithm requires much calculation and even a simple addition requires three copies of the entire array.

Does anyone know why BigInteger is implemented as a struct? And where the source code can be found?

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BigInteger is implemented as a struct so that it has value semantics rather than reference semantics. –  David Heffernan Apr 15 '13 at 19:43
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A BigInteger has two instance fields, int _sign and uint[] _bits. That means a copy of the struct refers to the same array, so the problem you describe does not exist. –  harold Apr 15 '13 at 19:44
    
A thanks, din't think of that. –  MrFox Apr 15 '13 at 19:46
    
Also, I have an implementation of the Matrix Form of Fibonacci somewhere, would you be interested in that? –  harold Apr 15 '13 at 19:48
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The array is copied by reference; copying a large BigInteger is very fast. Which you would know if you had measured the performance before you asked a question about it. Measure first when you have a performance question. Now, additions do make copies because the result is a different number. When you add two to six, you don't magically turn six into eight. You end up with three numbers: two, six and eight. –  Eric Lippert Apr 15 '13 at 20:09
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1 Answer

up vote 1 down vote accepted

If you need a faster implementation; I would recommend that you take a look at an alternative implementation; such as the GNU Multi-Precision Library wrapper.

You could also take a look at this implementation of BigInt.

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