Constant

Constants are real numbers or numerical values which are significantly interesting in some way^[1]. The term "constant" is used both for mathematical constants and for physical constants, but with quite different meanings.

One always talks about definable, and almost always also computable, mathematical constants — Chaitin's constant being a notable exception. However for some computable mathematical constants only very rough numerical estimates are known.

When dealing with physical dimensionful constants, a set of units must be chosen. Sometimes, one unit is defined in terms of other units. For example, the metre is defined as $1/(299\ 792\ 458)$ of a light-second. This definition implies that, in metric units, the speed of light in vacuum is exactly $299\ 792\ 458$ metres per second^[2]. No increase in the precision of the measurement of the speed of light could alter this numerical value expressed in metres per second.

Mathematical constants

Archimedes' constant π

The exponential growth – or Napier's – constant e

The exponential growth constant appears in many parts of applied mathematics. For example, as the Swiss mathematician Jacob Bernoulli discovered, $e\,$ arises in compound interest. Indeed, an account that starts at $1, and yields $1+R\,$ dollars at simple interest, will yield $e^R\,$ dollars with continuous compounding. $e\,$ also has applications to probability theory, where it arises in a way not obviously related to exponential growth. Suppose that a gambler plays a slot machine with a one in n probability and plays it n times. Then, for large n (such as a million) the probability that the gambler will win nothing at all is (approximately) $1/e\,$ . Another application of $e\,$ , also discovered in part by Jacob Bernoulli along with French mathematician Pierre Raymond de Montmort is in the problem of derangements, also known as the hat check problem^[4]. Here n guests are invited to a party, and at the door each guest checks his hat with the butler who then places them into labelled boxes. But the butler does not know the name of the guests, and so must put them into boxes selected at random. The problem of de Montmort is: what is the probability that none of the hats gets put into the right box. The answer is $p_n = 1-\frac{1}{1!}+\frac{1}{2!}-\frac{1}{3!}+\cdots+(-1)^n\frac{1}{n!}$ and as $n\,$ tends to infinity, $p_n\,$ approaches $1/e\,$ .

The Feigenbaum constants α and δ

The logistic map is a polynomial mapping, often cited as an archetypal example of how chaotic behaviour can arise from very simple non-linear dynamical equations. The map was popularized in a seminal 1976 paper by the English biologist Robert May^[7], in part as a discrete-time demographic model analogous to the logistic equation first created by Pierre François Verhulst. The difference equation is intended to capture the two effects of reproduction and starvation.

Apéry's constant ζ(3)

The golden ratio φ

Adolf Zeising, whose main interests were mathematics and philosophy, found the golden ratio expressed in the arrangement of branches along the stems of plants and of veins in leaves. He extended his research to the skeletons of animals and the branchings of their veins and nerves, to the proportions of chemical compounds and the geometry of crystals, even to the use of proportion in artistic endeavours. In these phenomena he saw the golden ratio operating as a universal law.^[11] Zeising wrote in 1854:

The Euler-Mascheroni constant γ

The Euler–Mascheroni constant is a recurring constant in number theory. The French mathematician Charles Jean de la Vallée-Poussin proved in 1898 that when taking any positive integer n and dividing it by each positive integer m less than n, the average fraction by which the quotient n/m falls short of the next integer tends to

γ

as n tends to infinity. Surprisingly, this average doesn't tend to one half. The Euler-Mascheroni constant also appears in Merten's third theorem and has relations to the gamma function, the zeta function and many different integrals and series. The definition of the Euler-Mascheroni constant exhibits a close link between the discrete and the continuous (see curves on the right).

Conway's constant λ

Khinchin's constant K

Physical constants

In physics, universal constants appear in the basic theoretical equations upon which the entire science rests or are the properties of the fundamental particles of physics of which all matter is constituted (the electron charge

e

, the electron mass

m e

and the fine-structure constant

α

The speed of light c and Planck's constant h

The electron charge

e

and the electron mass

m e

Mathematical curiosities, specific physical facts and unspecified constants

Simple representatives of sets of numbers

Chaitin's constant Ω

Constants representing physical properties of elements

Such constants represents characteristics of certain physical objects such as the chemical elements. Examples include density, melting point and heat of fusion. Some of the properties of gold are listed in the box on the right.

Unspecified constants

When unspecified, constants indicate classes of similar objects, commonly functions, all equal up to a constant - technically speaking, this is may be viewed as 'similarity up to a constant'. Such constants appear frequently when dealing with integrals and differential equations. Though unspecified, they have a specific value, which often isn't important.

In integrals

Indefinite integrals are called indefinite because their solutions are only unique up to a constant. For example, when working over the field of real numbers $\int\cos x\ dx=\sin x+C$ where $C\,$ , the constant of integration, is an arbitrary fixed real number^[25]. In other words, whatever the value of $C\,$ , differentiating $\sin x+C\,$ with respect to $x\,$ always yields $\cos x\,$ .

In differential equations

When dealing with partial differential equations, the constants may be functions, constant with respect to some variables (but not necessarily all of them). For example, the PDE $\frac{\partial f(x,y)}{\partial x}=0$ has solutions $f(x,y)=C(y)\,$ where $C(y)\,$ is an arbitrary function in the variable $y\,$ .

Notation

Representing constants

Different symbols are used to represent and manipulate constants, such as $1\,$ , $\pi\,$ and $\epsilon_0\,$ . It is common, both in mathematics and physics, to express the numerical value of a constant by giving its decimal representation (or just the first few digits of it). For two reasons this representation may cause problems. First, even though rational numbers all have a finite or ever-repeating decimal expansion, some numbers don't have such an expression making them impossible to completely describe in this manner. Also, the decimal expansion of a number is not necessarily unique. For example, the two representations 0.999... and 1 are equivalent^[26]^[27] in the sense that they represent the same number.

Calculating digits of the decimal expansion of constants has been a common enterprise for many centuries. For example, german mathematician Ludolph van Ceulen of the 16th century spent a major part of his life calculating the first 35 digits of pi^[28]. Nowadays, using computers and supercomputers, some of the mathematical constants, including $\{\pi,\,e,\,\sqrt{2}\}$ , have been computed to more than one hundred billion — $10^{11}\,$ — digits. Fast algorithms have been developed, some of which — as for Apéry's constant — are unexpectedly fast. In physics, the knowledge of the numerical values of the fundamental constants with high accuracy is crucial. First, it is necessary to achieve accurate quantitative descriptions of the physical universe. Also, it is helpful for testing the overall consistency and correctness of the basic theories of physics.

Some constants differ so much from the usual kind that a new notation has been invented to represent them reasonably. Graham's number illustrates this as Knuth's up-arrow notation is used^[29]^[30].

Commonly, constants in the physical sciences are represented using the scientific notation, with, when appropriate, the inaccuracy - or measurement error - attached. When writing the Planck constant $h=6.626\ 068\ 96(33) \times 10^{-34}\ \mbox{J}\cdot\mbox{s}$ ^[31] it is meant that $h=(6.626\ 068\ 96 \plusmn 0.000\ 000\ 003\ 3)\times 10^{-34}\ \mbox{J}\cdot\mbox{s}\,$ . Only the significant figures are shown and a greater precision would be superfluous, extra figures coming from experimental inaccuracies. When writing Isaac Newton's gravitational constant $G = \left(6.67428 \plusmn 0.00067 \right) \times 10^{-11} \ \mbox{m}^3 \ \mbox{kg}^{-1} \ \mbox{s}^{-2} \,$ ^[32] only 6 significant figures are given.

For mathematical constants, it may be of interest to represent them using continued fractions to perform various studies, including statistical analysis. Many mathematical constants have an analytic form, that is they can constructed using well-known operations that lend themselves readily to calculation. However, Grossman's constant has no known analytic form^[33].

Symbolizing and naming of constants

Symbolizing constants with letters is a frequent means of making the notation more concise. A standard convention, instigated by Leonhard Euler in the 18th century, is to use lower case letters from the beginning of the Latin alphabet $a,b,c,\dots\,$ or the Greek alphabet $\alpha,\beta,\,\gamma,\dots\,$ when dealing with constants in general.

However, for more important constants, the symbols may be more complex and have an extra letter, an asterisk, a number, a lemniscate or use different alphabets such as Hebrew, Cyrillic or Gothic^[30].

Sometimes, the symbol representing a constant is a whole word. For example, American mathematician Edward Kasner's 9-year-old nephew coined the names googol and googolplex^[34]^[30]

Lumping constants

A common practice in physics is to lump constants to simplify the equations and algebraic manipulations. For example, Coulomb's constant $\kappa =(4\pi\epsilon_0)^{-1}\,$ ^[36] is just $\epsilon_0\,$ , $\pi\,$ and $4\,$ lumped together. Also, combining old constants does not necessarily make the new one less fundamental. For example, the dimensionless fine-structure constant $\alpha=\mu_0ce^2/(2h)\,$ is a fundamental constant of quantum electrodynamics and in the quantum theory of the interaction among electrons, muons and photons.

A notation simplifier : the Avogadro constant

N a

The Avogadro constant is the number of entities in one mole, commonly used in chemistry, where the entities are often atoms or molecules. Its unit is inverse mole. However, the mole being a counting unit, we can consider the Avogadro constant dimensionless, and, contrary to the speed of light, the Avogadro constant doesn't convert units, but acts as a scaling factor for dealing practically with large numbers.

Mystery and aesthetics behind constants

For some authors, constants, either mathematical or physical may be mysterious, beautiful or fascinating. For example, English mathematician Glaisher (1915) writes ^[1]: "No doubt the desire to obtain the values of these quantities to a great many figures is also partly due to the fact that most of them are interesting in themselves; for $e,\,\pi,\,\gamma,\,\log2$ , and many other numerical quantities occupy a curious, and some of them almost a mysterious, place in mathematics, so that there is a natural tendency to do all that can be done towards their precise determination".

Indian mathematician Srinivasa Ramanujan discovered the following mysterious identity containing pi and Pythagoras' constant $\sqrt{2}$ : $\frac{1}{\pi}=\frac{2\sqrt{2}}{9801} \sum^\infty_{k=0}\frac{(4k)!(1103+26390k)}{(k!)^4 396^{4k}}$ .

Steven Finch writes that "The fact that certain constants appear at all and then echo throughout mathematics, in seemingly independent ways, is a source of fascination."^[37]

Contents

Mathematical constants

Archimedes' constant π

The exponential growth – or Napier's – constant e

The Feigenbaum constants α and δ

Apéry's constant ζ(3)

The golden ratio φ

The Euler-Mascheroni constant γ

Conway's constant λ

Khinchin's constant K

Physical constants

The speed of light c and Planck's constant h

The electron charge $e$ and the electron mass $m e$

Mathematical curiosities, specific physical facts and unspecified constants

Simple representatives of sets of numbers

Chaitin's constant Ω

Constants representing physical properties of elements

Unspecified constants

In integrals

In differential equations

Notation

Representing constants

Symbolizing and naming of constants

Lumping constants

A notation simplifier : the Avogadro constant $N a$

Mystery and aesthetics behind constants

See also

References

Further reading

External links

Contents

Mathematical constants

Archimedes' constant π

The exponential growth – or Napier's – constant e

The Feigenbaum constants α and δ

Apéry's constant ζ(3)

The golden ratio φ

The Euler-Mascheroni constant γ

Conway's constant λ

Khinchin's constant K

Physical constants

The speed of light c and Planck's constant h

The electron charge e and the electron mass me

Mathematical curiosities, specific physical facts and unspecified constants

Simple representatives of sets of numbers

Chaitin's constant Ω

Constants representing physical properties of elements

Unspecified constants

In integrals

In differential equations

Notation

Representing constants

Symbolizing and naming of constants

Lumping constants

A notation simplifier : the Avogadro constant Na

Mystery and aesthetics behind constants

See also

References

Further reading

External links

The electron charge $e$ and the electron mass $m e$

A notation simplifier : the Avogadro constant $N a$