Suppose that we want to compute the following expression, somewhat contrived in complexity for the purpose of example:
The following MATLAB code implements this formula, and measures the time required to evaluate it:
tic;
scale = 1;
y = 0;
for i = 1:10000000
x = scale;
for j = 1:50
x = x * 0.5;
end
y = y + x;
end
y = y / scale;
toc
Now suppose that we execute this same code again, but this time changing the “scale” factor 
scale = realmin, corresponding to 
And indeed, execution of the modified code confirms that we get exactly the same result… but it takes nearly 20 times longer to do so on my laptop than the original version with 
The problem is that these smaller numbers are subnormal, small enough in magnitude to require a slightly different encoding than “normal” numbers which make up most of the range of representable floating-point numbers. Arithmetic operations can be significantly more expensive when required to recognize and manipulate this “special case” encoding.
Depending on your application, there may be several approaches to handling this problem:
- Rewrite your code to prevent encountering subnormals in the first place. In the above contrived example, this is easy to do: just shift the “scale,” or magnitude, of all values involved in the computation away from the subnormal range (and possibly shifting back only at the end if necessary). This can not only result in faster code, but more accurate results, since subnormal numbers have fewer “significant” mantissa bits in their representation.
- Disable subnormal numbers altogether, so that for any floating-point operation, input arguments or output results that would otherwise be treated as subnormal are instead “flushed” to zero.
We have seen above how to manage (1). For (2), the following MEX function does nothing but set the appropriate processor flags to disable subnormals. I have only tested this on Windows 7 with an Intel laptop, compiling in MATLAB R2017b with both Microsoft Visual Studio 2015 as well as the MinGW-w64 MATLAB Add-On (edit: a reader has also tried this on Linux Mint 19 with MATLAB R2018b and GCC 7.3.0):
#include <xmmintrin.h>
#include <pmmintrin.h>
#include "mex.h"
void mexFunction(int nlhs, mxArray *plhs[], int nrhs, const mxArray *prhs[])
{
//_MM_SET_FLUSH_ZERO_MODE(_MM_FLUSH_ZERO_ON);
_mm_setcsr((_mm_getcsr() & ~0x8000) | (0x8000));
//_MM_SET_DENORMALS_ZERO_MODE(_MM_DENORMALS_ZERO_ON);
_mm_setcsr((_mm_getcsr() & ~0x0040) | (0x0040));
}
After running this MEX function in a MATLAB session, re-running the modified calculation above gets all of the speed back… but now at a different cost: instead of the correct value 
If there is any moral to this story, it’s that you’re a test pilot. First, this was a very simple test setup; it’s an interesting question whether any MATLAB built-in functions might reset these flags back to the slower subnormal support, and whether it is feasible in your application to reset them back again, possibly repeatedly as needed. And second, even after any algorithm refactoring to minimize the introduction of subnormals, can your application afford the loss of accuracy resulting from flushing them to zero? MathWorks’ Cleve Moler seems to think the answer is always yes. I think the right answer is, it depends.
blocks east and 
blocks north. Put another way, moving on the 2D integer lattice graph, how many paths are there from the origin 
to vertex 
that are of minimum length?
— so that the original problem asks for the particular case 
, but what if we allow longer paths where we sometimes move in the “wrong” direction away from the destination?
), where division is by far the most complex operation to implement efficiently.
and 
, where 
and 
of black and white balls, respectively, to be placed in the urn at the start. How many of each should you start with to maximize your probability of survival?
with the probability density shown in the following figure.
![E[X]](https://s0.wp.com/latex.php?latex=E%5BX%5D&bg=ffffff&fg=333333&s=0 "E[X]")
(using the red curve for males). In other words, if we observed a large number of hypothetical (male) infants born in the reference period 2014– and they continued to experience 2014 mortality rates throughout their lifetimes– then their ages at death would follow the above distribution, with an average of 76.5 years.![E[X | X \geq 40]](https://s0.wp.com/latex.php?latex=E%5BX+%7C+X+%5Cgeq+40%5D&bg=ffffff&fg=333333&s=0 "E[X | X \geq 40]")
?![E[X | X \geq x]](https://s0.wp.com/latex.php?latex=E%5BX+%7C+X+%5Cgeq+x%5D&bg=ffffff&fg=333333&s=0 "E[X | X \geq x]")
, as well as the corresponding expected additional lifespan ![E[X-x | X \geq x]](https://s0.wp.com/latex.php?latex=E%5BX-x+%7C+X+%5Cgeq+x%5D&bg=ffffff&fg=333333&s=0 "E[X-x | X \geq x]")
, as a function of current age 
.
for the United States 2014 period life table used in this post, derived from the NVSR data in the above reference, extended to maximum age 120 using the methodology described in the technical notes.
![[x^{16}]f_{13}(x)](https://s0.wp.com/latex.php?latex=%5Bx%5E%7B16%7D%5Df_%7B13%7D%28x%29&bg=ffffff&fg=333333&s=0 "[x^{16}]f_{13}(x)")
is the number of one-bar melodies given the above constraints… but this counts two melodies as distinct even if they only differ in ![[x^{16}]f_{13}(x) - [x^{16}]f_{12}(x) + 1](https://s0.wp.com/latex.php?latex=%5Bx%5E%7B16%7D%5Df_%7B13%7D%28x%29+-+%5Bx%5E%7B16%7D%5Df_%7B12%7D%28x%29+%2B+1+&bg=ffffff&fg=333333&s=2 "[x^{16}]f_{13}(x) - [x^{16}]f_{12}(x) + 1")
