Large Integer problem
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deniz kartan
am 3 Mär. 2011
Kommentiert: Walter Roberson
am 14 Jan. 2016
Hi, I am getting these strange results:
Equations are of the form (x*y + n) - x*y which has the obvious result n. But Matlab gives strange results. These are the results I get in Matlab 2007 and 2010a:
(1812433253*19650218 + 1) - (1812433253*19650218) = 0
(1812433253*19650218 + 2) - (1812433253*19650218) = 0
(1812433253*19650218 + 3) - (1812433253*19650218) = 4
I realized that 1812433253*19650218 has more than 53 bits and these results has something to do with the way Matlab handles numbers between 53 bits and 64 bits. But I couldn't find a reliable way to carry out above operations correctly. Thanks.
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Akzeptierte Antwort
Sean de Wolski
am 3 Mär. 2011
John D'Errico's vpi on the file exchange: http://www.mathworks.com/matlabcentral/fileexchange/22725-variable-precision-integer-arithmetic
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Weitere Antworten (3)
Matt Fig
am 3 Mär. 2011
You are seeing the results of the limitations of floating point arithmetic.
Read this if you plan on using MATLAB much:
You can see what is going on by looking at this:
N = 1812433253*19650218;
eps(N)
ans =
4
This means that whenever you add a number greater than eps/2 to N, the result is represented as the next largest number available, N+eps(N). Then it will make sense that:
N + eps(N) - N % Equals eps(N)
ans =
4
Conversely, whenever you add a number smaller than eps(N)/2 to N, the result is represented as N. So it makes sense that
N + eps(N)/3 - N % eps(N)/3 is less than eps(N)/2.
ans =
0
2 Kommentare
Matt Fig
am 3 Mär. 2011
Your welcome.
I recommend thoroughly understanding this because it is the same thing for non-integers.
the cyclist
am 3 Mär. 2011
I recommend John D'Errico's "Variable Precision Integer" code from the FEX:
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Michelle Hirsch
am 13 Jan. 2016
I'm 5 years late to the party, but another lightweight way to address this specific behavior is to force the variables to be int64 (or uint64), which can express integer values larger than 2^53.
>>(int64(1812433253*19650218) + 1) - int64(1812433253*19650218)
ans =
1
2 Kommentare
John D'Errico
am 13 Jan. 2016
Bearbeitet: John D'Errico
am 13 Jan. 2016
True. I totally agree that this can help, with the caveat that you must be sure that the numbers stay in 63 or 64 bits, then you can use int64 or uint64.
The problem is you get a little extra room over 2^53 for a double, but never enough. And when those int64 or uint64 multiplies overflow, you get no warning.
uint64(2^33)^2
ans =
18446744073709551615
uint64(2^35)^2
ans =
18446744073709551615
Personally, I'd rather they at least overflowed into inf or NaN instead as a warning.
So definitely use those large integer forms when they will help, but keep a careful eye out.
Walter Roberson
am 14 Jan. 2016
There are also some things that cannot be done with int64 or uint64. Like bin2dec() into one of them, or get a correct dec2bin()
>> dec2bin((uint64(2^33)^2) - uint64(1023))
ans =
10000000000000000000000000000000000000000000000000000000000000000
>> dec2bin((uint64(2^33)^2) - uint64(1024))
ans =
1111111111111111111111111111111111111111111111111111100000000000
dec2bin() converts to double() before it does the conversion to bits, which is a waste of computation power.
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