List of eponymous laws

This list of eponymous laws provides links to articles on laws, principles, adages, and other succinct observations or predictions named after a person. In some cases the person named has coined the law – such as Parkinson's law. In others, the work or publications of the individual have led to the law being so named – as is the case with Moore's law. There are also laws ascribed to individuals by others, such as Murphy's law; or given eponymous names despite the absence of the named person.

A–B

C–D

  • Campbell's law: "The more any quantitative social indicator is used for social decision making, the more subject it will be to corruption pressures and the more apt it will be to distort and corrupt the social processes it is intended to monitor."[1] Named after Donald T. Campbell (1916–1996)
  • Casper's Dictum is a law in forensic medicine that states the ratio of time a body takes to putrefy in different substances – 1:2:8 in air, water and earth.
  • Cassie's law describes the effective contact angle θc for a liquid on a composite surface.
  • Cassini's laws provide a compact description of the motion of the Moon. Established in 1693 by Giovanni Domenico Cassini.
  • Celine's laws are a series of three laws regarding government and social interaction attributed to the fictional character Hagbard Celine from Robert Anton Wilson's The Illuminatus! Trilogy.
  • Chargaff's rules state that DNA from any cell of all organisms should have a 1:1 ratio (base Pair Rule) of pyrimidine and purine bases and, more specifically, that the amount of guanine is equal to cytosine and the amount of adenine is equal to thymine. Discovered by Austrian chemist Erwin Chargaff.
  • Charles's law, one of the gas laws in physics, states that at constant pressure the volume of a given mass of a gas increases or decreases by the same factor as its temperature (in kelvins) increases or decreases. Named after Jacques Charles.
  • Chekhov's gun states that nonessential elements of a story must be removed.
  • Chesterton's fence states that reforms should not be made until the reasoning behind the existing state of affairs is understood.
  • Child's law states that the space-charge limited current in a plane-parallel diode varies directly as the three-halves power of the anode voltage and inversely as the square of the distance separating the cathode and the anode. Named after Clement D. Child; also known as the Child–Langmuir law (after Irving Langmuir). See also Mott–Gurney law.
  • Chladni's law relates the frequency of modes of vibration for flat circular surfaces with fixed center as a function of the numbers of diametric (linear) nodes and of radial (circular) nodes. Named after Ernst Chladni.
  • Claasen's law, or the logarithmic law of usefulness: usefulness = log(technology).
  • Clarke's three laws, formulated by Arthur C. Clarke. Several corollaries to these laws have also been proposed.
    • First law: When a distinguished but elderly scientist states that something is possible, he is almost certainly right. When he states that something is impossible, he is very probably wrong.
    • Second law: The only way of discovering the limits of the possible is to venture a little way past them into the impossible.
    • Third law: Any sufficiently advanced technology is indistinguishable from magic.
  • Conway's law: Any piece of software reflects the organizational structure that produced it. Named after Melvin Conway.
  • Cooper's law: The number of radio frequency conversations which can be concurrently conducted in a given area doubles every 30 months.
  • Cope's rule: Population lineages tend to increase in body size over evolutionary time.
  • Coulomb's law is an inverse-square law indicating the magnitude and direction of electrostatic force that one stationary, electrically charged object of small dimensions (ideally, a point source) exerts on another. It is named after Charles-Augustin de Coulomb.
  • Cramer's rule: In linear algebra, an explicit formula for the solution of a system of linear equations with as many equations as unknowns, valid whenever the system has a unique solution. Named after Swiss mathematician Gabriel Cramer.
  • Cromwell's rule states that the use of prior probabilities of 0 ("the event will definitely not occur") or 1 ("the event will definitely occur") should be avoided, except when applied to statements that are logically true or false, such as 2+2 equaling 4 or 5.
  • Cunningham's law: The best way to get the right answer on the Internet is not to ask a question, but to post the wrong answer. Attributed to Ward Cunningham by Steven McGeady.
  • Curie's law: In a paramagnetic material the magnetization of the material is (approximately) directly proportional to an applied magnetic field. Named after Pierre Curie.
  • Curie-Weiss law: describes the magnetic susceptibility χ of a ferromagnet in the paramagnetic region above the Curie point. Named after Pierre Curie und Pierre-Ernest Weiss.
  • D'Alembert's principle: The sum of the differences between the forces acting on a system of mass particles and the time derivatives of the momenta of the system itself along any virtual displacement consistent with the constraints of the system, is zero. Named after Jean le Rond d'Alembert.
  • Dahl's law, a sound rule of Northeast Bantu languages, a case of voicing dissimilation.
  • Dale's principle, in neuroscience, states that a neuron is capable of producing and secreting only one neurotransmitter from its axon terminals. Named after Henry Hallett Dale but more recent data suggests it to be false. A more common interpretation of the original statement made by Dale is that neurons release the same set of transmitters at all of their synapses.
  • Dalton's law, in chemistry and physics, states that the total pressure exerted by a gaseous mixture is equal to the sum of the partial pressures of each individual component in a gas mixture. Also called Dalton's law of partial pressure, and related to the ideal gas laws, this empirical law was observed by John Dalton in 1801.
  • Darcy's law, in hydrogeology, describes the flow of a fluid (such as water) through a porous medium (such as an aquifer).
  • Davis's law, in anatomy, describes how soft tissue models along imposed demands. Corollary to Wolff's law.
  • De Morgan's laws apply to formal logic regarding the negation of pairs of logical operators.
  • Dermott's law: The sidereal period of major satellites tends to follow a geometric series. Named after Stanley Dermott.
  • De Vaucouleurs' law, in astronomy, describes how the surface brightness of an elliptical galaxy varies as a function of apparent distance from the center. Named after Gérard de Vaucouleurs.
  • Dilbert principle: "the most ineffective workers are systematically moved to the place where they can do the least damage: management." Coined by Scott Adams.
  • Doctorow's law: "Anytime someone puts a lock on something you own, against your wishes, and doesn't give you the key, they're not doing it for your benefit."
  • Dolbear's law is an empirical relationship between temperature and the rate of cricket chirping.
  • Dollo's law: "An organism is unable to return, even partially, to a previous stage already realized in the ranks of its ancestors." Simply put this law states that evolution is not reversible; the "law" is regarded as a generalisation as exceptions may exist.[2][3][4]
  • Dulong–Petit law states the classical expression for the specific heat capacity of a crystal due to its lattice vibrations. Named for Pierre Louis Dulong and Alexis Thérèse Petit.
  • Dunbar's number is a theoretical cognitive limit to the number of people with whom one can maintain stable social relationships. No precise value has been proposed for Dunbar's number, but a commonly cited approximation is 150. First proposed by British anthropologist Robin Dunbar.
  • Dunning–Kruger effect is a cognitive bias in which unskilled individuals suffer from illusory superiority, mistakenly rating their ability much higher than average. This bias is attributed to a metacognitive inability of the unskilled to recognize their mistakes.
  • Duverger's law: Winner-take-all (or first-past-the-post) electoral systems tend to create a two-party system, while proportional representation tends to create a multiple-party system. Named for Maurice Duverger.

E–G

  • Einasto's law relates the density of a galaxy to distance from the center. Named for Jaan Einasto.
  • Elliott wave principle is a form of technical analysis that finance traders use to analyze financial market cycles and forecast market trends by identifying extremes in investor psychology, highs and lows in prices, and other collective factors. Named for American accountant Ralph Nelson Elliott.
  • Emmert's law, in optics: objects that generate retinal images of the same size will look different in physical size (linear size) if they appear to be located at different distances. Named for Emil Emmert.
  • Engelbart's law: "The intrinsic rate of human performance is exponential."
  • Eroom's law, the observation that drug discovery is becoming slower and more expensive over time, despite improvements in technology. The name "Eroom" is "Moore" spelled backward, in order to contrast it with Moore's law.
  • Faraday's law of induction: a magnetic field changing in time creates a proportional electromotive force. Named for Michael Faraday, based on his work in 1831.
  • Faraday's law of electrolysis: the mass of a substance produced at an electrode during electrolysis is proportional to the number of moles of electrons transferred at that electrode; again named for Michael Faraday.
  • Faxén's law: In fluid dynamics, Faxén's laws relate a sphere's velocity and angular velocity to the forces, torque, stresslet and flow it experiences under low Reynolds number (creeping flow) conditions.
  • Fick's laws of diffusion describe diffusion, and define the diffusion coefficient D. Derived by Adolf Fick in the year 1855.
  • Fisher's fundamental theorem of natural selection states "The rate of increase in fitness of any organism at any time is equal to its genetic variance in fitness at that time."
  • Fitts's law is a principle of human movement published in 1954 by Paul Fitts which predicts the time required to move from a starting position to a final target area. Fitts's law is used to model the act of pointing, both in the real world, e.g. with a hand or finger, and on a computer, e.g. with a mouse.
  • Flynn effect describes the phenomenon of an increase in IQ test scores for many populations at an average rate of three IQ points per decade since the early 20th century.
  • Fourier's law, also known as the law of heat conduction, states that the time rate of heat flow Q through a slab (or a portion of a perfectly insulated wire) is proportional to the gradient of temperature difference; named for Joseph Fourier.
  • Frege's principle: The meaning of a complex expression is determined by the meanings of its constituent expressions and the rules used to combine them.
  • Gall's law: "A complex system that works is invariably found to have evolved from a simple system that worked."
  • Gause's law, in ecology, the competitive exclusion principle: "complete competitors cannot coexist."
  • Gauss's law, in physics, gives the relation between the electric flux flowing out a closed surface and the charge enclosed in the surface. It was formulated by Carl Friedrich Gauss. See also Gauss's law for gravity, and Gauss's law for magnetism.
  • Gay-Lussac's law: "The pressure of a fixed mass and fixed volume of a gas is directly proportional to the gas's temperature."
  • Gell-Mann amnesia effect: Believing newspaper articles outside one's area of expertise, even after acknowledging that neighboring articles in one's area of expertise are completely wrong.
  • Gérson's law: "An advantage should be taken in every situation, regardless of ethics."
  • Gibrat's law: "The size of a firm and its growth rate are independent."
  • Gibson's law: "For every PhD there is an equal and opposite PhD."
  • Ginsberg's theorem is a set of adages based on the laws of thermodynamics.
  • Godwin's law, an adage in Internet culture: "As an online discussion grows longer, the probability of a comparison involving Nazis or Hitler approaches one." Coined by Mike Godwin in 1990.
  • Gompertz–Makeham law of mortality: the death rate is the sum of an age-independent component and an age-dependent component.
  • Goodhart's law: When a measure becomes a target, it ceases to be a good measure.
  • Gossen's laws are three laws in economics relating to utility and value, formulated by Hermann Heinrich Gossen.
  • Graham's law, a gas law in physics: the average kinetic energy of the molecules of two samples of different gases at the same temperature is identical. It is named for Thomas Graham (1805–1869), who formulated it.
  • Grassmann's law: A dissimilatory phonological process in Ancient Greek and Sanskrit which states that if an aspirated consonant is followed by another aspirated consonant in the next syllable, the first one loses the aspiration. Named after its discoverer Hermann Grassmann.
  • Grassmann's law (optics), an empirical result about human color perception: that chromatic sensation can be described in terms of an effective stimulus consisting of linear combinations of different light colors.
  • Greenspun's tenth rule: Any sufficiently complicated C or Fortran program contains an ad hoc, informally specified, bug-ridden, slow implementation of half of Common Lisp; coined by Philip Greenspun.
  • Gresham's law is typically stated as "Bad money drives good money out of circulation", but more accurately "Bad money drives good money out of circulation if their exchange rate is set by law." Coined in 1858 by British economist Henry Dunning Macleod, and named for Sir Thomas Gresham (1519–1579). The principle had been stated before Gresham by others, including Nicolaus Copernicus.
  • Grimm's law explains correspondence between some consonants in Germanic languages and those in other Indo-European languages. Discovered by Jacob Grimm, (1785–1863), German philologist and mythologist and one of the Brothers Grimm.
  • Grosch's law: the economic value of computation increases with the square root of the increase in speed; that is, to do a calculation 10 times as cheaply you must do it 100 times as fast. Stated by Herb Grosch in 1965.
  • Grotthuss–Draper law: only that light which is absorbed by a system can bring about a photochemical change. Named for Theodor Grotthuss and John William Draper.
  • Gustafson's law (also known as Gustafson–Barsis's law) in computer engineering: any sufficiently large problem can be efficiently parallelized. Coined by John Gustafson in 1988.

H–K

  • Haber's rule is a mathematical statement relating the concentration of a poisonous gas and how long it must be breathed to result in death.
  • Hagen–Poiseuille law: a physical law that gives the pressure drop in an incompressible and Newtonian fluid in laminar flow flowing through a long cylindrical pipe of constant cross section. Named after Gotthilf Hagen and Jean Poiseuille.
  • Haitz's law is an observation and forecast about the steady improvement, over many years, of light-emitting diodes (LEDs).
  • Hamilton's principle: the dynamics of a physical system is determined by a variational problem for a functional based on a single function, the Lagrangian, which contains all physical information concerning the system and the forces acting on it. Named after William Rowan Hamilton.
  • Hanlon's razor is a corollary of Finagle's law, named in allusion to Occam's razor, normally taking the form "Never attribute to malice that which can be adequately explained by stupidity." As with Finagle, possibly not strictly eponymous. Alternatively, "Do not invoke conspiracy as explanation when ignorance and incompetence will suffice, as conspiracy implies intelligence."
  • Hartley's law is a way to quantify information and its line rate in an analog communications channel. Named for Ralph Hartley (1888–1970).
  • Hasse principle is the idea that one can find an integer solution to an equation by using the Chinese remainder theorem to piece together solutions modulo powers of each different prime number. Named after Helmut Hasse.
  • Hauser's law is an empirical observation about U.S. tax receipts as a percentage of GDP, theorized to be a natural equilibrium.
  • Hebb's law: "Neurons that fire together wire together."
  • Heisenberg's uncertainty principle: one cannot measure values (with arbitrary precision) of certain conjugate quantities, which are pairs of observables of a single elementary particle. The most familiar of these pairs is position and momentum.
  • Henry's law: The mass of a gas that dissolves in a definite volume of liquid is directly proportional to the pressure of the gas provided the gas does not react with the solvent.
  • Hess's law, in physical chemistry: the total enthalpy change during the complete course of a reaction is the same whether the reaction is made in one step or in several steps.
  • Hick's law, in psychology, describes the time it takes for a person to make a decision as a function of the number of possible choices.
  • Hickam's dictum, in medicine, is commonly stated as "Patients can have as many diseases as they damn well please" and is a counterargument to the use of Occam's razor.
  • Hitchens's razor is an epistemological principle maintaining that the burden of evidence in a debate rests on the claim maker, and that the opponent can dismiss the claim if this burden is not met: "That which can be asserted without evidence can be dismissed without evidence."
  • Hofstadter's law: "It always takes longer than you expect, even when you take into account Hofstadter's law" (Douglas Hofstadter, Gödel, Escher, Bach, 1979).
  • Hooke's law: The tension on a spring or other elastic object is proportional to the displacement from the equilibrium. Frequently cited in Latin as "Ut tensio sic vis." Named after Robert Hooke (1635–1703).
  • Hotelling's law in economics: Under some conditions, it is rational for competitors to make their products as nearly identical as possible.
  • Hubble's law: Galaxies recede from an observer at a rate proportional to their distance to that observer. Formulated by Edwin Hubble in 1929.
  • Hume's law, in meta-ethics: normative statements cannot be deduced exclusively from descriptive statements.
  • Humphrey's law: conscious attention to a task normally performed automatically can impair its performance. Described by psychologist George Humphrey in 1923.
  • Hund's rules are three rules in atomic physics used to determine the term symbol that corresponds to the ground state of a multi-electron atom. Named after Friedrich Hund.
  • Hutber's law: "Improvement means deterioration." Coined by financial journalist Patrick Hutber.
  • Isaac Bonewits's laws of magic are synthesized from a multitude of belief systems from around the world, collected in order to explain and categorize magical beliefs within a cohesive framework.
  • Jevons paradox: Increasing the efficiency with which a resource is used increases the usage of that resource. William Stanley Jevons
  • Joule's laws are heat laws related to electricity and to gasses, named for James Prescott Joule.
  • Joy's law in management: the principle that "no matter who you are, most of the smartest people work for someone else", attributed to Sun Microsystems co-founder Bill Joy.
  • Kepler's laws of planetary motion describe the motion of the planets around the sun. First articulated by Johannes Kepler.
  • Kerckhoffs's principle of secure cryptography: A cryptosystem should be secure even if everything about the system, except the key, is public.
  • Kirchhoff's laws are named after Gustav Kirchhoff and cover thermodynamics, thermochemistry, electrical circuits and spectroscopy (see Kirchhoff's laws (disambiguation)).
  • Klaiber's law: the silicon wafer size will dictate the largest diameter of ultrapure water supply piping needed within a semiconductor wafer factory.
  • Kluge's law: a sound law that purports to explain the origin of the Proto-Germanic long consonants. Named after Friedrich Kluge.
  • Koomey's law: the energy of computation is halved every year and a half.
  • Kopp's law: The molecular heat capacity of a solid compound is the sum of the atomic heat capacities of the elements composing it. Named for Hermann Franz Moritz Kopp.
  • Korte's law: The greater the length of a path between two successively presented stimuli, the greater the stimulus onset asynchrony must be for an observer to perceive the two stimuli as a single moving object.
  • Kranzberg's laws of technology: The first law states that technology is neither good nor bad; nor is it neutral.
  • Kryder's law: on growth of density of magnetic disk storage, compared to Moore's law.

L–M

  • L'Hôpital's rule uses derivatives to find limits of indeterminate forms 0/0 or ±∞/∞, and only applies to such cases.
  • Lamarck's theory of evolution has two laws: The first can be paraphrased as "use it or lose it". The second is the more famous law of soft inheritance.
  • Lambert's cosine law describes the radiant intensity observed from an ideal diffusely reflecting surface or ideal diffuse radiator.
  • Lanchester's laws are formulae for calculating the relative strengths of predator/prey pair and application in military conflict.
  • Landauer's principle: there is a minimum possible amount of energy required to change one bit of information, known as the Landauer limit.
  • LaSalle's invariance principle is a criterion for the asymptotic stability of an autonomous (possibly nonlinear) dynamical system. Named for mathematician Joseph P. LaSalle.
  • Leavitt's law: In astronomy, a period-luminosity relation linking the luminosity of pulsating variable stars with their pulsation period. Named for American astronomer Henrietta Swan Leavitt.
  • Lehman's laws of software evolution
  • Leibniz's law is a principle in metaphysics also known as the Identity of Indiscernibles. It states: "If two objects have all their properties in common, then they are one and the same object."
  • Lenz's law: An induced current is always in such a direction as to oppose the motion or change causing it. Named for Russian physicist Emil Lenz.
  • Lem's Law: "No one reads; if someone does read, he doesn't understand, if he understands, he immediately forgets."
  • Lewis's law: The comments on any article about feminism justify feminism. Named for English journalist Helen Lewis.
  • Liebig's law of the minimum: The growth or distribution of a plant is dependent on the one environmental factor most critically in demand.
  • Linus's law: "Given enough eyeballs, all bugs are shallow." Named for Linus Torvalds.
  • Little's law, in queuing theory: "The average number of customers in a stable system (over some time interval) is equal to their average arrival rate, multiplied by their average time in the system." The law was named for John Little from results of experiments in 1961.
  • Littlewood's law: individuals can expect miracles to happen to them, at the rate of about one per month. Coined by J. E. Littlewood, (1885–1977).
  • Liskov substitution principle in computer science is a particular definition of a subtyping relation, called (strong) behavioral subtyping.
  • Lotka's law, in infometrics: the number of authors publishing a certain number of articles is a fixed ratio to the number of authors publishing a single article. As the number of articles published increases, authors producing that many publications become less frequent. For example, there may be 14 as many authors publishing two articles within a specified time period as there are single-publication authors, 19 as many publishing three articles, 116 as many publishing four articles, etc. Though the law itself covers many disciplines, the actual ratios involved are very discipline-specific.
  • Madelung rule: the order in which atomic orbitals are filled according to the aufbau principle. Named for Erwin Madelung. Also known as the Janet rule or the Klechkowski rule (after Charles Janet or Vsevolod Klechkovsky).
  • Maes–Garreau law: most favorable predictions about future technology will fall around latest possible date they can come true and still remain in the lifetime of the person making the prediction.
  • Malthusian growth model, also referred to as the Malthusian law or simple exponential growth model, is exponential growth based on a constant rate. The model is named after Thomas Robert Malthus, who wrote An Essay on the Principle of Population (1798), one of the earliest and most influential books on population.
  • Marconi's law empirically relates radio communication distance to antenna tower height.
  • Meadow's law is a precept, now discredited, that since cot deaths are so rare, "One is a tragedy, two is suspicious and three is murder, until proved otherwise." It was named for Roy Meadow, a discredited paediatrician prominent in the United Kingdom in the last quarter of the twentieth century.
  • Mendel's laws are named for the 19th century Austrian monk Gregor Mendel who determined the patterns of inheritance through his plant breeding experiments, working especially with peas. Mendel's first law, or the law of segregation, states that each organism has a pair of genes; that it inherits one from each parent, and that the organism will pass down only one of these genes to its own offspring. These different copies of the same gene are called alleles. Mendel's second law, the law of independent assortment, states that different traits will be inherited independently by the offspring.
  • Menzerath's law, or Menzerath–Altmann law (named after Paul Menzerath and Gabriel Altmann), is a linguistic law according to which the increase of a linguistic construct results in a decrease of its constituents, and vice versa.
  • Metcalfe's law, in communications and network theory: the value of a system grows as approximately the square of the number of users of the system. Framed by Robert Metcalfe in the context of ethernet.
  • Miller's law, in communication: "To understand what another person is saying, you must assume that it is true and try to imagine what it could be true of." Named after George Armitage Miller.
  • Miller's rule, in optics, is an empirical rule which gives an estimate of the order of magnitude of the nonlinear coefficient.
  • Mooers's law: "An information retrieval system will tend not to be used whenever it is more painful and troublesome for a customer to have information than for him not to have it." An empirical observation made by American computer scientist Calvin Mooers in 1959.
  • Moore's law is an empirical observation stating that the complexity of integrated circuits doubles every 24 months. Outlined in 1965 by Gordon Moore, co-founder of Intel Corporation.
  • Murphy's law: "Anything that can go wrong will go wrong." Ascribed to Edward A. Murphy, Jr.

N–Q

  • Naismith's rule is a rule of thumb that helps in the planning of a walking or hiking expedition by calculating how long it will take to walk the route, including ascents.
  • Navier–Stokes equations: In physics, these equations describe the motion of viscous fluid substances. Named after Claude-Louis Navier and George Gabriel Stokes.
  • Neuhaus's law: Where orthodoxy is optional, orthodoxy will sooner or later be proscribed. This "law" had been expressed earlier. For example, Charles Porterfield Krauth wrote in his The Conservative Reformation: "Truth started with tolerating; it comes to be merely tolerated, and that only for a time. Error claims a preference for its judgments on all disputed points."
  • Newton's flaming laser sword, also known as Alder's razor: What cannot be settled by experiment is not worth debating.
  • Newton's law of cooling: The rate of cooling (or heating) of a body due to convection is proportional to the difference between the body temperature and the ambient temperature.
  • Newton's laws of motion, in physics, are three scientific laws concerning the behaviour of moving bodies, which are fundamental to classical mechanics (and since Einstein, which are valid only within inertial reference frames). Discovered and stated by Isaac Newton (1643–1727), they can be formulated, in modern terms, as follows:
    • First law: A body remains at rest, or keeps moving in a straight line (at a constant velocity), unless acted upon by a net outside force.
    • Second law: The acceleration of an object of constant mass is proportional to the net force acting upon it.
    • Third law: Whenever one body exerts a force upon a second body, the second body exerts an equal and opposite force upon the first body.
  • Nielsen's law: A high-end user's internet connection speed grows by 50% per year.
  • Niven's laws: several aphorisms, including "If the universe of discourse permits the possibility of time travel and of changing the past, then no time machine will be invented in that universe."
  • Occam's razor: explanations should never multiply causes without necessity. ("Entia non sunt multiplicanda praeter necessitatem.") When two or more explanations are offered for a phenomenon, the simplest full explanation is preferable. Named after William of Ockham (c. 1285–1349).
  • Oddo–Harkins rule: elements with an even atomic number are more common than those with odd atomic number. Named after Giuseppe Oddo and William Draper Harkins.
  • Ohm's law, in physics: the ratio of the potential difference (or voltage drop) between the ends of a conductor (and resistor) to the current flowing through it is a constant. Discovered by and named after Georg Simon Ohm (1789–1854).
  • Ohm's acoustic law is an empirical approximation concerning the perception of musical tones, named for Georg Simon Ohm.
  • Okrent's law is Daniel Okrent's take on the argument to moderation.
  • Okun's law, in economics: when unemployment increases by 1%, the annual GDP decreases by 2%.
  • Orgel's rules, in evolutionary biology, are a set of axioms attributed to the evolutionary biologist Leslie Orgel:
    • First rule: "Whenever a spontaneous process is too slow or too inefficient a protein will evolve to speed it up or make it more efficient."
    • Second rule: "Evolution is cleverer than you are."
  • Ostrom's law, in economics and property law: resource arrangements in practice can be represented in theory, such as arrangements of the commons or shared property.
  • O'Sullivan's first law, in politics: "All organizations that are not actually right-wing will over time become left-wing."
  • Papert's principle: "Some of the most crucial steps in mental growth are based not simply on acquiring new skills, but on acquiring new administrative ways to use what one already knows."
  • Pareto principle: for many phenomena 80% of consequences stem from 20% of the causes. Named after Italian economist Vilfredo Pareto, but framed by management thinker Joseph M. Juran.
  • Parkinson's law: "Work expands to fill the time available for its completion." Corollary: "Expenditure rises to meet income." Coined by C. Northcote Parkinson (1909–1993).
  • Parkinson's law of triviality: "The time spent on any agenda item will be in inverse proportion to the sum of money involved." Also due to C. Northcote Parkinson.
  • Peltzman effect: Safety measures are offset by increased risk-taking.[5]
  • Peter principle: "In a hierarchy, every employee tends to rise to his level of incompetence." Coined by Dr. Laurence J. Peter (1919–1990) in his book The Peter Principle. In his follow-up book, The Peter Prescription, he offered possible solutions to the problems his principle could cause.
  • Planck's law, in physics, describes the spectral radiance of a black body at a given temperature. After Max Planck.
  • Plateau's laws describe the structure of soap films. Named after Belgian physicist Joseph Plateau.
  • Poe's law (fundamentalism): "Without a winking smiley or other blatant display of humor, it is utterly impossible to parody a Creationist in such a way that someone won't mistake for the genuine article."[6] Although it originally referred to creationism, the scope later widened to any form of extremism or fundamentalism.[7]
  • Poisson's law of large numbers: For independent random variables with a common distribution, the average value for a sample tends to the mean as sample size increases. Named after Siméon Denis Poisson (1781–1840) and derived from Recherches sur la probabilité des jugements en matière criminelle et en matière civile (1837: Research on the Probability of Criminal and Civil Verdicts).
  • Postel's law: Be conservative in what you do; be liberal in what you accept from others. Derived from RFC 761 (Transmission Control Protocol, 1980) in which Jon Postel summarized earlier communications of desired interoperability criteria for the Internet Protocol (cf. IEN 111)[8]
  • Pournelle's iron law of bureaucracy: "In any bureaucracy, the people devoted to the benefit of the bureaucracy itself always get in control and those dedicated to the goals the bureaucracy is supposed to accomplish have less and less influence, and sometimes are eliminated entirely."
  • Premack's principle: More probable behaviors will reinforce less probable behaviors. Named for David Premack (1925–2015)
  • Price's law (Price's square root law) indicates that the square root of the number of all authors contribute half the publications in a given subject.
  • Putt's law: Technology is dominated by two types of people: those who understand what they do not manage and those who manage what they do not understand.
  • Putt's corollary: Every technical hierarchy, in time, develops a competence inversion.

R–S

T–Z

  • Teeter's law: "The language of the family you know best always turns out to be the most archaic." A wry observation about the biases of historical linguists, explaining how different investigators can arrive at radically divergent conceptions of the proto-language of a family. Named after the American linguist Karl V. Teeter.
  • Tesler's law of conservation of complexity states that every application has an inherent amount of complexity that cannot be removed or hidden. Named for Larry Tesler.
  • Titius–Bode law: "a hypothesis that the bodies in some orbital systems, including the Sun's, orbit at semi-major axes in a function of planetary sequence". Named for Johann Daniel Titius and Johann Elert Bode.
  • Tobler's first law of geography: "Everything is related to everything else, but near things are more related than distant things." Coined by Waldo R. Tobler (b. 1930).
  • Triffin dilemma, conflict of economic interests that arises between short-term domestic and long-term international objectives for countries whose currency serves as a global reserve currency; named for Belgian American economist Robert Triffin
  • Twyman's law:"Any figure that looks interesting or different is usually wrong", following the principle that "the more unusual or interesting the data, the more likely they are to have been the result of an error of one kind or another".
  • Van Loon's law: "The amount of mechanical development will always be in inverse ratio to the number of slaves that happen to be at a country’s disposal." Named for Hendrik Willem van Loon.
  • Vegard's law, in metallurgy, is an approximate empirical rule which holds that a linear relation exists, at constant temperature, between the crystal lattice parameter of an alloy and the concentrations of the constituent elements. Named for Lars Vegard.
  • Verdoorn's law, in economics: faster growth in output increases productivity due to increasing returns. Named after Dutch economist Petrus Johannes Verdoorn.
  • Verner's law, stated by Karl Verner in 1875, describes a historical sound change in the Proto-Germanic language whereby voiceless fricatives *f, *þ, *s and *x, when immediately following an unstressed syllable in the same word, underwent voicing and became respectively *b, *d, *z and *g.
  • Vierordt's law states that, retrospectively, "short" intervals of time tend to be overestimated, and "long" intervals of time tend to be underestimated. Named after German physician Karl von Vierordt.
  • Vopěnka's principle, in mathematics, is a large cardinal axiom that states that the set-theoretical universe is so large that in every proper class, some members are similar to others, with this similarity formalized through elementary embeddings. Named after Petr Vopěnka.
  • Wagner's law predicts that the development of an industrial economy will be accompanied by an increased share of public expenditure in gross national product, and is named after the German economist Adolph Wagner (1835–1917).
  • Walras's law: budget constraints imply that the values of excess market demands must sum to zero.
  • Weber–Fechner law, named after the Germans Ernst Heinrich Weber and Gustav Theodor Fechner, attempts to describe the human perception of various physical stimuli. In most cases, Stevens's power law gives a more accurate description.
  • Weyl law, in mathematics, describes the asymptotic behavior of eigenvalues of the Laplace-Beltrami operator. Named for Hermann Weyl.
  • The Wiedemann–Franz law, in physics, states that the ratio of the electronic contribution of the thermal conductivity (κ) to the electrical conductivity (σ) of a metal is proportional to the temperature (T). Named for Gustav Wiedemann (1826–1899) and Rudolph Franz (1826–1902).
  • Wien's displacement law states that the black body radiation curve for different temperatures peaks at a wavelength inversely proportional to the temperature. Named for Wilhelm Wien. (See also Wien approximation.)
  • Wiio's laws: The fundamental Wiio's law states that "Communication usually fails, except by accident".
  • Wike's law of low odd primes: "If the number of experimental treatments is a low odd prime number, then the experimental design is unbalanced and partially confounded."[13]
  • Winter's law: A sound law operating on Balto-Slavic short vowels. Named after Werner Winter
  • Wirth's law: Software gets slower more quickly than hardware gets faster.
  • Wiswesser's rule gives a simple method to determine the energetic sequence of electron shells. See also Aufbau principle.
  • Wolff's law: Bone adapts to pressure, or a lack of it.[14]
  • Woodward–Hoffmann rules, in organic chemistry, predict the stereochemistry of pericyclic reactions based on orbital symmetry.
  • Yao's principle, in computational complexity theory: the expected cost of any randomized algorithm for solving a given problem, on the worst case input for that algorithm, can be no better than the expected cost, for a worst-case random probability distribution on the inputs, of the deterministic algorithm that performs best against that distribution. Named for Andrew Yao.
  • Yerkes–Dodson law, an empirical relationship between arousal and performance, originally developed by psychologists Robert M. Yerkes and John Dillingham Dodson.
  • Zawinski's law: Every program attempts to expand until it can read mail. Those programs which cannot expand are replaced by ones which can.
  • Zipf's law, in linguistics, is the observation that the frequency of use of the nth-most-frequently-used word in any natural language is approximately inversely proportional to n, or, more simply, that a few words are used very often, but many or most are used rarely. Named after George Kingsley Zipf (1902–1950), whose statistical body of research led to the observation. More generally, the term Zipf's law refers to the probability distributions involved, which is applied by statisticians not only to linguistics but also to fields remote from that. See also Zipf–Mandelbrot law.

See also

References

  1. Campbell, Donald T. (January 1979). "Assessing the impact of planned social change". Evaluation and Program Planning. 2 (1): 67–90. doi:10.1016/0149-7189(79)90048-X.
  2. Domes, Katja; Norton, Roy A.; Maraun, Mark; Scheu, Stefan (24 April 2007). "Reevolution of sexuality breaks Dollo's law". Proceedings of the National Academy of Sciences. 104 (17): 7139–7144. Bibcode:2007PNAS..104.7139D. doi:10.1073/pnas.0700034104. PMC 1855408. PMID 17438282.
  3. Collin, R.; Cipriani, R. (2003). "Dollo's law and the re-evolution of shell coiling". Proceedings of the Royal Society B. 270 (1533): 2551–2555. doi:10.1098/rspb.2003.2517. PMC 1691546. PMID 14728776.
  4. Pagel, M. (2004). "Limpets break Dollo's Law". Trends in Ecology & Evolution. 19 (6): 278–280. doi:10.1016/j.tree.2004.03.020. PMID 16701270.
  5. Sam Peltzman, "Effects of Automobile Safety Regulation", Journal of Political Economy Vol. 83, No. 4 (August 1975), pp. 677–726
  6. Poe, Nathan (11 August 2005). "Big contradictions in the evolution theory, page 3". christianforums.com. Archived from the original on January 14, 2017. Retrieved January 14, 2017.
  7. Aikin, Scott F. (23 January 2009). "Poe's Law, Group Polarization, and the Epistemology of Online Religious Discourse". Social Science Research Network. doi:10.2139/ssrn.1332169. SSRN 1332169.
  8. "Internet Experiment Note 111". 1979.
  9. "The General Glut Controversy". The New School for Social Research (NSSR). Archived from the original on March 19, 2009.
  10. Shermer, Michael (2002-01-01). "Shermer's Last Law". Scientific American. 286 (1): 33. Bibcode:2002SciAm.286a..33S. doi:10.1038/scientificamerican0102-33. PMID 11799615.
  11. Evans, Leonard; Schwing, Richard C (1985). Human behavior and traffic safety. Plenum Press. ISBN 978-0-306-42225-6.
  12. John F. Sowa. "The Law of Standards". Retrieved 2016-08-30.
  13. Wike, Edward L. (1 September 2016). "Water Beds and Sexual Satisfaction: Wike's Law of Low Odd Primes (WLLOP)". Psychological Reports. 33 (1): 192–194. doi:10.2466/pr0.1973.33.1.192. S2CID 145176823.
  14. Anahad O'Connor (October 18, 2010). "The Claim: After Being Broken, Bones Can Become Even Stronger". New York Times. Retrieved 2010-10-19. This concept – that bone adapts to pressure, or a lack of it – is known as Wolff’s law.


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