Loss of significance

Example of LOS in case of computing 2 forms of the same function

Loss of significance is an undesirable effect in calculations using finite-precision arithmetic. It occurs when an operation on two numbers increases relative error substantially more than it increases absolute error, for example in subtracting two nearly equal numbers (known as catastrophic cancellation). The effect is that the number of significant digits in the result is reduced unacceptably. Ways to avoid this effect are studied in numerical analysis.

Demonstration of the problem

The effect can be demonstrated with decimal numbers. The following example demonstrates loss of significance for a decimal floating-point data type with 10 significant digits:

Consider the decimal number

   0.1234567891234567890

A floating-point representation of this number on a machine that keeps 10 floating-point digits would be

   0.1234567891

which is fairly close when measuring the error as a percentage of the value. It is very different when measured in order of precision. The first is accurate to 6981099999999999999♠10×10⁻²⁰, while the second is only accurate to 6991100000000000000♠10×10⁻¹⁰.

Now perform the calculation

   0.1234567891234567890 − 0.1234567890000000000

The answer, accurate to 10 significant digits, is

   0.0000000001234567890

However, on the 10-digit floating-point machine, the calculation yields

   0.1234567891 − 0.1234567890 = 0.0000000001

In both cases the result is accurate to same order of magnitude as the inputs (-20 and -10, respectively). In the second case, the answer seems to have one significant digit, which would amount to loss of significance. However, in computer floating point arithmetic, all operations can be viewed as being performed on antilogarithms, for which the rules for significant figures indicate that the number of sigfigs remains the same as the smallest number of sigfigs in the mantissas. The way to indicate this and represent the answer to 10 sigfigs is:

   6990100000000000000♠1.000000000×10⁻¹⁰

Workarounds

It is possible to do computations using an exact fractional representation of rational numbers and keep all significant digits, but this is often prohibitively slower than floating-point arithmetic. Furthermore, it usually only postpones the problem: What if the data is accurate to only ten digits? The same effect will occur.

One of the most important parts of numerical analysis is to avoid or minimize loss of significance in calculations. If the underlying problem is well-posed, there should be a stable algorithm for solving it.

Loss of significant bits

Let x and y be positive normalized floating point numbers.

In the subtraction x − y, r significant bits are lost where

q\leq r\leq p

2^{{-p}}\leq 1-{\frac {y}{x}}\leq 2^{{-q}}

for some positive integers p and q.

Instability of the quadratic equation

For example, consider the quadratic equation:

ax^{2}+bx+c=0

with the two exact solutions:

x={\frac {-b\pm {\sqrt {b^{2}-4ac}}}{2a}}.

This formula may not always produce an accurate result. For example, when $c$ is very small, loss of significance can occur in either of the root calculations, depending on the sign of $b$ .

The case $a=1$ , $b=200$ , $c=-0.000015$ will serve to illustrate the problem:

x^{2}+200x-0.000015=0.

We have

{\sqrt {b^{2}-4ac}}={\sqrt {200^{2}+4\times 1\times 0.000015}}=200.00000015\dotso

In real arithmetic, the roots are

(-200-200.00000015)/2=-200.000000075,

(-200+200.00000015)/2=0.000000075.

In 10-digit floating-point arithmetic,

(-200-200.0000001)/2=-200.00000005,

(-200+200.0000001)/2=0.00000005.

Notice that the solution of greater magnitude is accurate to ten digits, but the first nonzero digit of the solution of lesser magnitude is wrong.

Because of the subtraction that occurs in the quadratic equation, it does not constitute a stable algorithm to calculate the two roots.

A better algorithm

A careful floating point computer implementation combines several strategies to produce a robust result. Assuming the discriminant, b² − 4ac, is positive and b is nonzero, the computation would be as follows:^[1]

{\begin{aligned}x_{1}&={\frac {-b-\operatorname{sgn}(b)\,{\sqrt {b^{2}-4ac}}}{2a}},\\x_{2}&={\frac {2c}{-b-\operatorname{sgn}(b)\,{\sqrt {b^{2}-4ac}}}}={\frac {c}{ax_{1}}}.\end{aligned}}

Here sgn denotes the sign function, where $\operatorname{sgn}(b)$ is 1 if $b$ is positive and −1 if $b$ is negative. This avoids cancellation problems between $b$ and the square root of the discriminant by ensuring that only numbers of the same sign are added.

To illustrate the instability of the standard quadratic formula versus this variant formula, consider a quadratic equation with roots $1.786737589984535$ and $1.149782767465722\times 10^{{-8}}$ . To sixteen significant figures, roughly corresponding to double-precision accuracy on a computer, the monic quadratic equation with these roots may be written as:

x^{2}-1.786737601482363x+2.054360090947453\times 10^{{-8}}=0

Using the standard quadratic formula and maintaining sixteen significant figures at each step, the standard quadratic formula yields

{\sqrt {\Delta }}=1.786737578486707

x_{1}=(1.786737601482363+1.786737578486707)/2=1.786737589984535

x_{2}=(1.786737601482363-1.786737578486707)/2=0.000000011497828

Note how cancellation has resulted in $x_{2}$ being computed to only eight significant digits of accuracy. The variant formula presented here, however, yields the following:

x_{1}=(1.786737601482363+1.786737578486707)/2=1.786737589984535

x_{2}=2.054360090947453\times 10^{{-8}}/1.786737589984535=1.149782767465722\times 10^{{-8}}

Note the retention of all significant digits for $x_{2}$ .

Note that while the above formulation avoids catastrophic cancellation between $b$ and $\sqrt{b^2-4ac}$ , there remains a form of cancellation between the terms $b^{2}$ and $-4ac$ of the discriminant, which can still lead to loss of up to half of correct significant figures.^[2]^[3] The discriminant $b^{2}-4ac$ needs to be computed in arithmetic of twice the precision of the result to avoid this (e.g. quad precision if the final result is to be accurate to full double precision).^[4] This can be in the form of a fused multiply-add operation.^[2]

To illustrate this, consider the following quadratic equation, adapted from Kahan (2004):^[2]

94906265.625x^{2}-189812534x+94906268.375

This equation has $\Delta =7.5625$ and has roots

x_{1}=1.000000028975958

x_{2}=1.000000000000000

However, when computed using IEEE 754 double-precision arithmetic corresponding to 15 to 17 significant digits of accuracy, $\Delta$ is rounded to 0.0, and the computed roots are

x_{1}=1.000000014487979

x_{2}=1.000000014487979

which are both false after the eighth significant digit. This is despite the fact that superficially, the problem seems to require only eleven significant digits of accuracy for its solution.

References

↑ Press, William H.; Flannery, Brian P.; Teukolsky, Saul A.; Vetterling, William T. (1992), Numerical Recipes in C (Second ed.) , Section 5.6: "Quadratic and Cubic Equations.
1 2 3 Kahan, Willian (November 20, 2004), On the Cost of Floating-Point Computation Without Extra-Precise Arithmetic (PDF), retrieved 2012-12-25
↑ Higham, Nicholas (2002), Accuracy and Stability of Numerical Algorithms (2nd ed.), SIAM, p. 10, ISBN 978-0-89871-521-7
↑ Hough, David (March 1981), "Applications of the proposed IEEE 754 standard for floating point arithmetic", IEEE Computer, 14 (3): 70–74, doi:10.1109/C-M.1981.220381.

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