Equations for a "fast" 
This repository contains a set of procedures to compute numerical methods in the vein of the fast inverse root method. In particular, we will generate code that
- Computes rational powers (
) to an arbitrary precision.
- Computes irrational powers (
) to within 10% relative error.
- Computes
to within 10% relative error.
- Computes
to within 10% relative error.
- Computes the geometric mean
of an
std::arrayquickly to within 10% error.
Additionally, we will do so using mostly just integer arithmetic.
You can use everything in floathacks by including hacks.h
#include <floathacks/hacks.h>
using namespace floathacks; // Comment this out if you don't want your top-level namespace to be polluted
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can run
python -m readme2tex --output README.md --branch svgs
to recompile these docs.
To generate an estimation for 
float approximate_root = fpow<FLOAT(0.12345)>::estimate(x);
Since estimates of pow can be refined into better iterates (as long as c is "rational enough"), you can also
compute a more exact result via
float root = pow<FLOAT(0.12345), n>(x);
where n is the number of newton iterations to perform. The code generated by this template will unroll itself, so it's
relatively efficient.
However, the optimized code does not let you use it as a constexpr or where the exponent is not constant. In those cases,
you can use consts::fpow(x, c) and consts::pow(x, c, iterations = 2) instead:
float root = consts::pow(x, 0.12345, n);
Note that the compiler isn't able to deduce the optimal constants in these cases, so you'll incur additional penalties computing the constants of the method.
You can also compute an approximation of 
float guess = fexp(x);
Unfortunately, since there are no refinement methods available for exponentials, we can't do much
with this result if it's too coarse for your needs. In addition, due to overflow, this method breaks down
when x approaches 90.
Similarly, you can also compute an approximation of 
float guess = flog(x);
Again, as is with the case of fexp, there are no refinement methods available for logarithms either.
All of the f*** methods above have bounded relative errors of at most 10%. The refined pow method
can be made to give arbitrary precision by increasing the number of refinement iterations. Each refinement
iteration takes time proportional to the number of digits in the floating point representation of the exponent.
Note that since floats are finite, this is bounded above by 32 (and more tightly, 23).
You can compute the geometric mean (
std::array<float, n> with
float guess = fgmean<3>({ 1, 2, 3 });
This can be refined, but you typically do not care about the absolute precision of a mean-like statistic.
To refine this, you can run Newton's method on 
The key ingredient of these types of methods is the pair of transformations
-
takes a
IEEE 754single precision floating point number and outputs its "machine" representation. In essence, it acts likeunsigned long f2l(float x) { union {float fl; unsigned long lg;} lens = { x }; return lens.lg; } -
takes an unsigned long representing a float and returns a
IEEE 754single precision floating point number. It acts likefloat l2f(unsigned long z) { union {float fl; unsigned long lg;} lens = { z }; return lens.fl; }
So for example, the fast inverse root method:
union {float fl; unsigned long lg;} lens = { x };
lens.lg = 0x5f3759df - lens.lg / 2;
float y = lens.fl;
can be equivalently expressed as
In a similar vein, a fast inverse cube-root method is presented at the start of this page.
We will justify this in the next section.
We can approximate any 
where 
bias, as long
as it is reasonably small, will work. At bias = 0, the method computes a value whose error is completely positive.
Therefore, by increasing the bias, we can shift some of the error down into the negative plane and
halve the error.
As seen in the fast-inverse-root method, a bias of -0x5c416 tend to work well for pretty much every case that I've
tried, as long as we tack on at least one Newton refinement stage at the end. It works well without refinement as well,
but an even bias of -0x5c000 works even better.
Why does this work? See these slides for the derivation. In particular, the fast inverse square-root is a subclass of this method.
We can approximate 
Here, 
To give a derivation of this equation, we'll need to borrow a few mathematical tools from analysis. In particular, while
l2f and f2l have many discontinuities (
Consider the function
where the equality is a consequence of the chain-rule, assuming that f2l is differentiable at the particular value of
Well, it's not all that mysterious. The derivative of f2l is just the rate at which a number's IEEE 754 machine
representation changes as we make small perturbations to a number. Unfortunately, while it might be easy to compute
this derivative as a numerical approximation, we still don't have an approximate form for algebraic manipulation.
While 
where
Here, equality holds when 
Therefore,
From here, we also have
Given 
Similarly, since 
This makes sense, since we'd like these two functions to be inverses of each other.
Consider
which suggests that 
Since we would like 
which gives 
where, empirically, 
In a similar spirit, we can use the approximation
to derive
Imposing a boundary condition at 
However, this actually computes some other logarithm 
where the 
There's a straightforward derivation of the geometric mean. Consider the approximations of 
Therefore, a bit of algebra will show that
which reduces to the equation for the geometric mean.
Notice that we just add a series of integers, followed by an integer divide, which is pretty efficient.
For more information on how the constant (
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