When a quantity grows towards a singularity under a finite variation (a "

finite-time singularity In mathematics, a singularity is a point at which a given mathematical object is not defined, or a point where the mathematical object ceases to be well-behaved in some particular way, such as by lacking differentiability or analyticity. For exam ...

") it is said to undergo hyperbolic growth. More precisely, the

reciprocal function In mathematics, a multiplicative inverse or reciprocal for a number ''x'', denoted by 1/''x'' or ''x''−1, is a number which when multiplied by ''x'' yields the multiplicative identity, 1. The multiplicative inverse of a fraction ''a''/''b ...

1/x

has a

hyperbola In mathematics, a hyperbola (; pl. hyperbolas or hyperbolae ; adj. hyperbolic ) is a type of smooth curve lying in a plane, defined by its geometric properties or by equations for which it is the solution set. A hyperbola has two pieces, ca ...

as a graph, and has a singularity at 0, meaning that the limit as

x \to 0

is infinite: any similar graph is said to exhibit hyperbolic growth.

Description

If the output of a function is

inversely proportional In mathematics, two sequences of numbers, often experimental data, are proportional or directly proportional if their corresponding elements have a constant ratio, which is called the coefficient of proportionality or proportionality constan ...

to its input, or inversely proportional to the difference from a given value

x_0

, the function will exhibit hyperbolic growth, with a singularity at

x_0

. In the real world hyperbolic growth is created by certain non-linear

positive feedback Positive feedback (exacerbating feedback, self-reinforcing feedback) is a process that occurs in a feedback loop which exacerbates the effects of a small disturbance. That is, the effects of a perturbation on a system include an increase in th ...

mechanisms.

Comparisons with other growth

exponential growth Exponential growth is a process that increases quantity over time. It occurs when the instantaneous rate of change (that is, the derivative) of a quantity with respect to time is proportional to the quantity itself. Described as a function, a ...

and

logistic growth A logistic function or logistic curve is a common S-shaped curve (sigmoid curve) with equation f(x) = \frac, where For values of x in the domain of real numbers from -\infty to +\infty, the S-curve shown on the right is obtained, with the ...

, hyperbolic growth is highly

nonlinear In mathematics and science, a nonlinear system is a system in which the change of the output is not proportional to the change of the input. Nonlinear problems are of interest to engineers, biologists, physicists, mathematicians, and many othe ...

, but differs in important respects. These functions can be confused, as exponential growth, hyperbolic growth, and the first half of logistic growth are convex functions; however their

asymptotic behavior In mathematical analysis, asymptotic analysis, also known as asymptotics, is a method of describing Limit (mathematics), limiting behavior. As an illustration, suppose that we are interested in the properties of a function as becomes very larg ...

(behavior as input gets large) differs dramatically: * logistic growth is constrained (has a finite limit, even as time goes to infinity), * exponential growth grows to infinity as time goes to infinity (but is always finite for finite time), * hyperbolic growth has a singularity in finite time (grows to infinity at a finite time).

Applications

Population

Certain mathematical models suggest that until the early 1970s the

world population In demographics, the world population is the total number of humans currently living. It was estimated by the United Nations to have exceeded 8 billion in November 2022. It took over 200,000 years of human prehistory and history for th ...

underwent hyperbolic growth (see, e.g.
''Introduction to Social Macrodynamics''
by

Andrey Korotayev Andrey Vitalievich Korotayev (russian: link=yes, Андре́й Вита́льевич Корота́ев; born 17 February 1961) is a Russian anthropologist, economic historian, comparative political scientist, demographer and sociologist, ...

''et al.''). It was also shown that until the 1970s the hyperbolic growth of the world population was accompanied by quadratic-hyperbolic growth of the world

GDP Gross domestic product (GDP) is a monetary measure of the market value of all the final goods and services produced and sold (not resold) in a specific time period by countries. Due to its complex and subjective nature this measure is ofte ...

, and developed a number of mathematical models describing both this phenomenon, and the World System withdrawal from the blow-up regime observed in the recent decades. The hyperbolic growth of the

and quadratic-hyperbolic growth of the world

observed till the 1970s have been correlated by

and his colleagues to a non-linear second order

between the demographic growth and technological development, described by a chain of causation: technological growth leads to more carrying capacity of land for people, which leads to more people, which leads to more inventors, which in turn leads to yet more technological growth, and on and on. It has been also demonstrated that the hyperbolic models of this type may be used to describe in a rather accurate way the overall growth of the planetary complexity of the Earth since 4 billion BC up to the present. Other models suggest

, logistic growth, or other functions.

Queuing theory

Another example of hyperbolic growth can be found in

queueing theory Queueing theory is the mathematical study of waiting lines, or queues. A queueing model is constructed so that queue lengths and waiting time can be predicted. Queueing theory is generally considered a branch of operations research because the ...

: the average waiting time of randomly arriving customers grows hyperbolically as a function of the average load ratio of the server. The singularity in this case occurs when the average amount of work arriving to the server equals the server's processing capacity. If the processing needs exceed the server's capacity, then there is no well-defined average waiting time, as the queue can grow without bound. A practical implication of this particular example is that for highly loaded queuing systems the average waiting time can be extremely sensitive to the processing capacity.

Enzyme kinetics

A further practical example of hyperbolic growth can be found in

enzyme kinetics Enzyme kinetics is the study of the rates of enzyme-catalysed chemical reactions. In enzyme kinetics, the reaction rate is measured and the effects of varying the conditions of the reaction are investigated. Studying an enzyme's kinetics in thi ...

. When the rate of reaction (termed velocity) between an

enzyme Enzymes () are proteins that act as biological catalysts by accelerating chemical reactions. The molecules upon which enzymes may act are called substrates, and the enzyme converts the substrates into different molecules known as products ...

and substrate is plotted against various concentrations of the substrate, a hyperbolic plot is obtained for many simpler systems. When this happens, the enzyme is said to follow Michaelis-Menten kinetics.

Mathematical example

The function :

x(t)=\frac

exhibits hyperbolic growth with a singularity at time in the limit as the function goes to infinity. More generally, the function :

x(t)=\frac

exhibits hyperbolic growth, where

K

is a

scale factor In affine geometry, uniform scaling (or isotropic scaling) is a linear transformation that enlarges (increases) or shrinks (diminishes) objects by a '' scale factor'' that is the same in all directions. The result of uniform scaling is similar ...

. Note that this algebraic function can be regarded as analytical solution for the function's differential:See, e.g., Korotayev A., Malkov A., Khaltourina D
''Introduction to Social Macrodynamics: Compact Macromodels of the World System Growth''
Moscow: URSS Publishers, 2006. P. 118-123. :

\frac = \frac = \frac

This means that with hyperbolic growth the absolute growth rate of the variable in the moment is proportional to the square of the value of in the moment . Respectively, the quadratic-hyperbolic function looks as follows: :

x(t)=\frac.

Notes

References

* Alexander V. Markov, and Andrey V. Korotayev (2007)
"Phanerozoic marine biodiversity follows a hyperbolic trend".
''

Palaeoworld ''Palaeoworld'' is a peer-reviewed academic journal with a focus on palaeontology and stratigraphy research in and around China. It was founded in 1991 by the Nanjing Institute of Geology and Palaeontology at the Chinese Academy of Sciences (N ...

''. Volume 16. Issue 4. Pages 311-318]. * Michael Kremer, Kremer, Michael. 1993. "Population Growth and Technological Change: One Million B.C. to 1990," The Quarterly Journal of Economics 108(3): 681-716. * Korotayev A., Malkov A., Khaltourina D. 2006
''Introduction to Social Macrodynamics: Compact Macromodels of the World System Growth.''
Moscow: URSS. . *

Rein Taagepera Rein Taagepera (born 28 February 1933) is an Estonian political scientist and former politician. Education Born in Tartu, Estonia, Taagepera fled from occupied Estonia in 1944. Taagepera graduated from high school in Marrakech, Morocco and the ...

(1979) People, skills, and resources: An interaction model for world population growth. ''Technological Forecasting and Social Change'' 13, 13-30. {{DEFAULTSORT:Hyperbolic Growth Mathematical analysis Special functions Differential equations Population Curves Population ecology