List of inventions and discoveries by women

Part of a series on
Women in society
Society Women's history (legal rights) Woman Animal advocacy Business Female entrepreneur Gender representation on corporate boards of directors Economic development Explorers and travelers Education Feminism Womyn Government Conservatives in the US heads of government heads of state Queen regnant List Health Journalism and the media Law Law enforcement Military Mother Nobel Prize laureates Piracy Positions of power Reproductive rights Venture capital Violence and abuse Voting rights Workforce
Science Technology Computing Engineering Geology Medicine dentistry in the United States Organizations Science Science, technology, engineering and mathematics Space Telegraphy
Arts Humanities Architecture Arts Art history field Dance Film industry "Chick flicks" Films about women Film directors, cinematographers and screenwriters Fine arts Literature Science fiction Philosophy Feminist philosophy Photography Music Jazz Punk rock In Shakespeare's works
Religion Bahá'í Faith Bible Buddhism Christianity Catholicism Mormonism Opus Dei Hinduism Islam Judaism Sikhism
Popular culture Comics Portrayal in American comics Film industry Music Fictional pirates Speculative fiction Video games Gender representation in video games
Sports Auto racing Baseball Basketball Boxing Cricket Curling Cycling Fastpitch softball Football / soccer Golf Gymnastics Ice hockey Lacrosse Mixed martial arts Netball Paralympic Games Rodeo Roller derby Rowing Surfing Swimming Tennis Track and field Volleyball Winter sport See also: List of sports
By country Afghanistan Albania Algeria Andorra Angola Argentina Armenia Australia Azerbaijan Bahrain Bangladesh Belgium Benin Bhutan Bolivia Bosnia Brazil Brunei Burma Cambodia Chad Chile China Colombia Comoros Croatia Cuba Cyprus (North) Denmark DR Congo Dominican Republic Ecuador Egypt El Salvador East Timor Ethiopia FS Micronesia Fiji Finland France Georgia Germany Ghana Greece Guatemala Guyana Haiti Honduras Italy India Indonesia Iran Iraq Israel Ivory Coast Japan Jordan Kazakhstan Kenya Kiribati Kuwait Kyrgyzstan Laos Lebanon Libya Madagascar Malaysia Maldives Mali Marshall Islands Mauritania Mauritius Mexico Mongolia Morocco Nepal New Zealand Niger Nigeria North Korea Oman Pakistan Palau Panama Paraguay Peru Philippines Portugal Puerto Rico Qatar Russia Saudi Arabia Senegal Seychelles Sierra Leone Singapore Spain Somalia South Africa South Korea South Sudan Sudan Suriname Sri Lanka Sweden Syria Tajikistan Thailand Tonga Tunisia Turkey Turkmenistan Tuvalu Trinidad and Tobago Uganda Ukraine United Arab Emirates United Kingdom United States Uruguay Uzbekistan Vanuatu Venezuela Vietnam Yemen
Feminism portal

This page aims to list inventions and discoveries in which women played a major role.

Medicine

Pediatrics

Virginia Apgar^[11]

Apgar score

Invented in 1952 by Virginia Apgar.

Disposable diapers

The first disposable diaper was invented in 1946 by Marion Donovan, a professional-turned-housewife who wanted to ensure her children's cloth diapers remained dry while they slept.^[12] Donovan patented her design (called 'Boaters') in 1951. She also invented the first paper diapers, but executives did not invest in this idea and it was consequently scrapped for over ten years, until Procter & Gamble used Donovan's design ideas to create Pampers.

Another diaper design was created by Valerie Hunter Gordon (née de Ferranti), who patented it in 1948^{[13] [14]}.

Paddi picture for wiki high res

Child carriers

Snugli and Weego were invented by nurse and peacekeeper Ann Moore first in the 1960s.

Pertussis

A pioneering female American doctor, medical researcher and an outspoken voice in the pediatric community, the supercentenarian Leila Alice Denmark (1898–2012) is credited as co-developer of the pertussis (whooping cough) vaccine.

Astronomy and astrophysics

Harvard Stellar Classification Scheme

The first classification of stars based on their temperature, created by Annie Jump Cannon, used in publications up to 1924.

Pulsars

Rapidly rotating neutron stars discovered by Jocelyn Bell Burnell in 1967.

The Galaxy Rotation Problem

A major piece of evidence for the presence of dark matter in the Universe, discovered by Vera Rubin from observations of galactic rotation curves in the 1970s.

Stars luminosity

Henrietta Swan Leavitt was an American astronomer who discovered the relation between the luminosity and the period of Cepheid variable stars at the beginning of 20th century.

Radio astronomy

Ruby Violet Payne-Scott was an Australian pioneer in radiophysics and radio astronomy as well as the first female radio astronomer^[15] discovering Type I and Type III solar radio bursts.

Physics

Radiation

Marie Curie (born Maria Salomea Skłodowska) was the first woman to receive a Nobel prize for her works on radiations and, up until today, the only woman to receive two Nobel prizes (among them, one Nobel prize in chemistry for discoveries on Polonium and Radium). She is the sole laureate to be recognized within two distinct scientific areas.

Fanny Gates further investigated the properties of radiation. Together with Ernest Rutherford, she amassed evidence that radioactivity was not the result of of any simple chemical or physical processes.^[16] In particular, Gates showed that radioactivity could not be destroyed by heat or ionization due to chemical reactions, and that radioactive materials differ from phosphorescent materials both qualitatively and quantitatively.^[17]

Radon

In 1901, Harriet Brooks and Ernest Rutherford contributed to the discovery of the element Radon by finding evidence that the “emanation” emitted by thorium compounds was likely to be a gas ^[18]. This follows work in 1899 by Pierre and Marie Curie, who observed that the gas emitted by radium remained radioactive for a month.^[19]

Kinetic energy

Emilie du Châtelet (born Gabrielle Émilie Le Tonnelier de Breteuil) translated Isaac Newton's Principia Mathematica from Latin to French during the 18th century. She carried out physics experiments, popularizing the work of Leibniz. She demonstrated that the kinetic energy of an object was proportional to its mass and the square of its velocity, and postulated a conservation law for the total energy of a system.

Heavy elements in cosmic radiation

As a graduate student, Phyllis S. Freier found evidence for the existence of elements heavier than helium in cosmic radiation.Her work was published in Physical Review in 1948 with co-authors Edward J. Lofgren, Edward P. Ney, and Frank Oppenheimer.^[20]

Beta particles are electrons

Gertrude Scharff Goldhaber and her husband Maurice Goldhaber showed that beta particles were identical to electrons ^[21].

Top quark

Melissa Franklin's team at Fermilab found some of the first evidence for the existence of the top quark.^[22]

Nuclear shell

Maria Goeppert Mayer, a German immigrant to the US who studied at Johns Hopkins during the Great Depression, persisted in her studies even when no university would employ her and became a chemical physicist. Her most-famous contribution to modern physics was discovering the nuclear shell of the atomic nucleus, for which she won the Nobel Prize in 1963.

Chirped pulse amplification

Donna Strickland received the 2018 Nobel Prize in Physics for the discovery of chirped pulse amplification, a technique which "paved the way towards the shortest and most intense laser pulses ever created by mankind." ^[23]

Chemistry

Kevlar

A powerful para-aramid synthetic fiber, developed by Stephanie Kwolek at DuPont in 1965.

Polonium and Radium

The discoveries of elements radium and polonium were made by Polish chemist Marie Curie through the deep study of their nature and their compounds.

Rhenium

Rhenium, a d-block transition metal with Atomic number 75, was first isolated by Ida Noddack and her husband. The existence of this element was predicted by Dmitri Mendeleev. Ida Noddack was nominated three times for the Nobel Prize in Chemistry.

Seaborgium

Carol Alonso was a co discoverer of Seaborgium, a synthetic chemical element with symbol Sg and atomic number 106. ^[24]

Scotchgard

This stain repellent and durable water repellent was co-invented by chemists Patsy Sherman and Samuel Smith while working for 3M.

Langmuir–Blodgett film

The technique for making Langmuir–Blodgett film, which involves immersing a substrate into a solution to deposit a monolayer of molecules onto a substrate, was co-invented by Katharine Burr Blodgett and Irving Langmuir while working for General Electric.

Zeolite Y

Zeolite Y, a molecular sieve used to catalyse fractional distillation in petroleum refining, was invented by Edith M. Flanigen while working for Union Carbide. Flanigen also co-invented a synthetic emerald and was the first female recipient of the Perkin Medal in 1992.

Synthetic Radiochemistry

Irene Joliot-Curie was awarded the 1935 Nobel Prize in Chemistry for synthesis of new radioactive elements for application in medicine. The prize was shared jointly with her husband Jean Frederic Joliot.

Structure of Benzene

The planar structure of Benzene, an important cyclic aromatic hydrocarbon, was determined by Kathleen Lonsdale using X-ray crystallography. The nature of the chemical bonds had been a mystery for many years. Alongside Marjory Stephenson, Kathleen Lonsdale was one of the first two women to be elected a Fellow of The Royal Society.

Structure of Vitamin B12

The chemical structure was determined by Dorothy Hodgkin using crystallographic data. She was awarded the Nobel Prize in Chemistry for her work on Vitamin B12 and other complex molecules.

Electron Microscopy

The in-situ atomic-resolution environmental transmission electron microscope (ETEM) was created by Pratibha Gai in 2009. This microscope allows for visualisation of chemical reactions at the atomic scale. Dame Gai decided not to patent her device, the culmination of 20 years' work, in order to further the advancement of science.

Photocatalysis

In 2015, Deepika Kurup invented a photocatalytic composite material that removes 100% of faecal coliform bacteria from contaminated water. Deepika has won the Discovery Education 3M Young Scientist Challenge award and The US Stockholm Junior Water Prize for her work.

Surface Chemistry (Surface Science)

Agnes Pockels pioneered the new discipline of Surface Chemistry from her kitchen after being denied formal science training due to her gender. She created the Pockels Trough to measure surface tension, published several papers and was credited by Lord Rayleigh and Irving Langmuir.

Mass Spectrometry

Sybil M. Rock developed the mathematical techniques used in analysing the results from mass spectrometers and devised many of the procedures for mixture analysis.

Geology

Earth's inner core

Discovered in 1936 by Danish seismologist Inge Lehmann.

Solar energy

House solar heating

Hungarian-American MIT inventor Mária Telkes and American architect Eleanor Raymond created, in 1947, the Dover Sun House, the first house powered by solar energy.

Household

Square-bottom paper bag

In 1868, Margaret Knight invented a machine that folded and glued flat-bottomed brown paper bags familiar to shoppers today. She obtained 87 US patents that include lid-removing pliers, a numbering machine, a window frame and sash, and variants on rotary engines^[25].

Dishwasher

Josephine Cochrane developed in 1887 the first commercially successful dishwasher, together with mechanic George Butters.

Improved ironing board

In 1892 Sarah Boone obtained a patent in the United States for improvements to the ironing board, allowing for better quality ironing for shirt sleeves.^[26]

Central heating

In 1919, Alice Parker invented a system of gas-powered central heating. While her particular design was never built, it was the first time an inventor had conceived of using natural gas to heat a personal home, which inspired the future central heating systems.

Automatic Rotimaker

In 2008 Pranoti Nagarkar-Israni invented a kitchen robot called Rotimatic, which makes rotis, tortillas, pizza crusts and puris in under a minute. She has obtained 6 patents. The product makes use of artificial intelligence and Internet of Things to understand user requirements and improve itself after each use.

Correction fluid

Bette Nesmith Graham, the founder of the Liquid Paper company, invented one of the first forms of correction fluid in 1956.^[27]

Cosmetics

Hot comb

The hot comb was an invention developed in France as a way for women with coarse curly hair to achieve a fine straight look traditionally modeled by historical Egyptian women.^[28] However, it was Annie Malone who first patented this tool, while her protégé and former worker, Madam C. J. Walker widened the teeth.^[29]

Vehicle appliances

Windscreen wiper

Mary Anderson is credited for inventing the first functional windscreen wiper in 1903. Two other inventors, Robert Douglass and John Apjohn, also patented windscreen cleaning devices in the same year.

Car Heater

Margaret A. Wilcox invented the first car heater, which directed air from over the engine to warm the chilly toes of aristocratic 19th-century motorists, was invented by Margaret A. Wilcox in 1893. She also invented a combined clothes and dish washer. ^[30]

Airplane mufflers

Eldorado Jones is credited with inventing a light-weight electric iron, travel size iron board, and airplane mufflers in 1919.

Underwater telescope

Patented by Sarah Mather in 1845, this permitted sea-going vessels to survey the depths of the ocean.^[31][32] It used a camphine lamp in a glass globe that was sunk in the water. The device allowed examination of the hull and other details from a person on the deck of a boat.^[33] In 1864 Sarah Mather improved her invention to detect Confederate underwater warships.^[34]

Computing

Written computer program

During a nine-month period in 1842–43, Ada Lovelace translated the memoir of Italian mathematician Luigi Menabrea. The memoir covered the Analytical Engine. The translation contained Note G which completely detailed a method for calculating Bernoulli numbers using the Analytical Engine. This note is recognized by some historians as the world's first written computer program.^[35]

Written compiler

The first compiler was written by Grace Hopper, in 1952, for the A-0 programming language. She also helped to popularize the idea of machine-independent programming languages which led to the development of COBOL, one of the first high-level programming languages.

Written languages

Nine coding languages were invented by women: ARC assembly language by Kathleen Booth in 1950, Address by Kateryna Yushchenko in 1955, COBOL by Grace Hopper along with other members of the Conference on Data System Languages in 1959, FORMAC by Jean Sammet in 1962, Logo by Cynthia Solomon in 1967 with members of her team, CLU by Barbara Liskov in 1974, Smalltalk by Adele Goldberg, Diana Merry, and four main other team members at Xerox PARC in 1980, BBC BASIC by Sophie Wilson in 1981, Coq by Christine Paulin-Mohring along with eight development team members of the Lab in 1991. More generally speaking, women have strongly impacted the data processing domain especially women in computing.

Mathematics

Daubechies wavelet

Ingrid Daubechies introduced the Daubechies wavelet and contributed to the development of the CDF wavelet, important tools in image compression.

You can't hear the shape of a drum.

In 1966 Mark Kac asked whether the shape of a drum could be determined by the sound it makes (whether a Riemannian manifold is determined by the spectrum of its Laplace-Beltrami operator). John Milnor observed that a theorem due to Witt implied the existence of a pair of 16-dimensional tori that have the same spectrum but different shapes. However, the problem in two dimensions remained open until 1992, when Carolyn S. Gordon with coauthors Webb and Wolpert, constructed a pair of regions in the Euclidean plane that have different shapes but identical eigenvalues (see figure on right). ^[36]

Cauchy–Kovalevskaya theorem

In mathematics, the Cauchy–Kowalevski theorem (also written as the Cauchy–Kovalevskaya theorem) is the main local existence and uniqueness theorem for analytic partial differential equations associated with Cauchy initial value problems. A special case was proven by Augustin Cauchy (1842), and the full result by Sophia Kovalevskaya (1875). ^{[37] [38]}

Kovalevskaya top

In classical mechanics, the precession of a rigid body such as a top under the influence of gravity is not, in general, an integrable problem. There are however three (or four) famous cases that are integrable, the Euler, the Lagrange, and the Kovalevskaya top.^[39][40] The Kovalevskaya top^[41][42] is a special symmetric top with a unique ratio of the moments of inertia which satisfy the relation

That is, two moments of inertia are equal, the third is half as large, and the center of gravity is located in the plane perpendicular to the symmetry axis (parallel to the plane of the two equal points).

QR algorithm

In numerical linear algebra, the QR algorithm is an eigenvalue algorithm: that is, a procedure to calculate the eigenvalues and eigenvectors of a matrix. The QR algorithm was developed in the late 1950s by John G. F. Francis and by Vera N. Kublanovskaya, working independently.^[43][44][45] The basic idea is to perform a QR decomposition, writing the matrix as a product of an orthogonal matrix and an upper triangular matrix, multiply the factors in the reverse order, and iterate.

Navier–Stokes equations

Olga Ladyzhenskaya provided the first rigorous proofs of the convergence of a finite difference method for the Navier–Stokes equations. Ladyzhenskaya was on the shortlist for potential recipients for the 1958 Fields Medal^[46], ultimately awarded to Klaus Roth and René Thom. ^[47]

Braid Groups are Linear

Ruth Lawrence's 1990 paper, "Homological representations of the Hecke algebra", in Communications in Mathematical Physics, introduced, among other things, certain novel linear representations of the braid group — known as Lawrence–Krammer representation. In papers published in 2000 and 2001, Daan Krammer and Stephen Bigelow established the faithfulness of Lawrence's representation. This result goes by the phrase "braid groups are linear."^[48]

Recursion Theory

Rózsa Péter was one of the founders of recursion theory, a branch of mathematical logic, of computer science, and of the theory of computation that originated in the 1930s with the study of computable functions and Turing degrees. The field has since expanded to include the study of generalized computability and definability. In these areas, recursion theory overlaps with proof theory and effective descriptive set theory. ^[49][50]

Hilbert's tenth problem

Hilbert's tenth problem is the tenth on the list of mathematical problems that the German mathematician David Hilbert posed in 1900. It is the challenge to provide a general algorithm which, for any given Diophantine equation (a polynomial equation with integer coefficients and a finite number of unknowns) can decide whether the equation has a solution with all unknowns taking integer values.

For example, the Diophantine equation has an integer solution: . By contrast, the Diophantine equation has no such solution.

Hilbert's tenth problem has been solved, and it has a negative answer: such a general algorithm does not exist. This is the result of combined work of Martin Davis, Yuri Matiyasevich, Hilary Putnam and Julia Robinson which spans 21 years, with Yuri Matiyasevich completing the theorem in 1970.^[51] The theorem is now known as Matiyasevich's theorem or the MRDP theorem.

Optimal design

In the design of experiments, optimal designs (or optimum designs^[52]) are a class of experimental designs that are optimal with respect to some statistical criterion. The creation of this field of statistics has been credited to Danish statistician Kirstine Smith.^[53][54]

Three-gap theorem

The three-gap theorem states that if one places n points on a circle, at angles of θ, 2θ, 3θ ... from the starting point, then there will be at most three distinct distances between pairs of points in adjacent positions around the circle. When there are three distances, the larger of the three always equals the sum of the other two.^[55] Unless θ is a rational multiple of π, there will also be at least two distinct distances.

This result was conjectured by Hugo Steinhaus, and proved in the 1950s by Vera T. Sós, János Surányi, and Stanisław Świerczkowski. Its applications include the study of plant growth and musical tuning systems, and the theory of Sturmian words. ^[56]

Noether normalization lemma

The Noether normalization lemma is a result of commutative algebra, introduced by Emmy Noether in 1926.^[57] It states that for any field k, and any finitely generated commutative k-algebra A, there exists a nonnegative integer d and algebraically independent elements y₁, y₂, ..., y_d in A such that A is a finitely generated module over the polynomial ring S:=k[y₁, y₂, ..., y_d].

The theorem has a geometric interpretation. Suppose A is integral. Let S be the coordinate ring of the d-dimensional affine space , and A as the coordinate ring of some other d-dimensional affine variety X. Then the inclusion map S → A induces a surjective finite morphism of affine varieties . The conclusion is that any affine variety is a branched covering of affine space.

The Noether normalization lemma is an important step to proving Hilbert's Nullstellensatz.

Noether's theorem

Noether's (first)^[58] theorem states that every differentiable symmetry of the action of a physical system has a corresponding conservation law. The theorem was proven by mathematician Emmy Noether in 1915 and published in 1918,^[59] although a special case was proven by E. Cosserat & F. Cosserat in 1909.^[60] The action of a physical system is the integral over time of a Lagrangian function (which may or may not be an integral over space of a Lagrangian density function), from which the system's behavior can be determined by the principle of least action.

Noether's theorem is used in theoretical physics and the calculus of variations. A generalization of the formulations on constants of motion in Lagrangian and Hamiltonian mechanics (developed in 1788 and 1833, respectively), it does not apply to systems that cannot be modeled with a Lagrangian alone (e.g. systems with a Rayleigh dissipation function). In particular, dissipative systems with continuous symmetries need not have a corresponding conservation law.

Noether's theorem can be stated informally

If a system has a continuous symmetry property, then there are corresponding quantities whose values are conserved in time.^[61]

Noether's second theorem

In mathematics and theoretical physics, Noether's second theorem relates symmetries of an action functional with a system of differential equations.^[62] The action S of a physical system is an integral of a so-called Lagrangian function L, from which the system's behavior can be determined by the principle of least action.

isomorphism theorems

In mathematics, specifically abstract algebra, the isomorphism theorems are three theorems that describe the relationship between quotients, homomorphisms, and subobjects. Versions of the theorems exist for groups, rings, vector spaces, modules, Lie algebras, and various other algebraic structures. In universal algebra, the isomorphism theorems can be generalized to the context of algebras and congruences.

The isomorphism theorems were formulated in some generality for homomorphisms of modules by Emmy Noether in her paper Abstrakter Aufbau der Idealtheorie in algebraischen Zahl- und Funktionenkörpern which was published in 1927 in Mathematische Annalen. Less general versions of these theorems can be found in work of Richard Dedekind and previous papers by Noether.

Three years later, B.L. van der Waerden published his influential Algebra, the first abstract algebra textbook that took the groups-rings-fields approach to the subject. Van der Waerden credited lectures by Noether on group theory and Emil Artin on algebra, as well as a seminar conducted by Artin, Wilhelm Blaschke, Otto Schreier, and van der Waerden himself on ideals as the main references. The three isomorphism theorems, called homomorphism theorem, and two laws of isomorphism when applied to groups, appear explicitly.

Lasker–Noether theorem

In mathematics, the Lasker–Noether theorem states that every Noetherian ring is a Lasker ring, which means that every ideal can be decomposed as an intersection, called primary decomposition, of finitely many primary ideals (which are related to, but not quite the same as, powers of prime ideals). The theorem was first proven by Emanuel Lasker (1905) for the special case of polynomial rings and convergent power series rings, and was proven in its full generality by Emmy Noether (1921).

The Lasker–Noether theorem is an extension of the fundamental theorem of arithmetic, and more generally the fundamental theorem of finitely generated abelian groups to all Noetherian rings. The Lasker–Noether theorem plays an important role in algebraic geometry, by asserting that every algebraic set may be uniquely decomposed into a finite union of irreducible components.

Albert–Brauer–Hasse–Noether theorem

In algebraic number theory, the Albert–Brauer–Hasse–Noether theorem states that a central simple algebra over an algebraic number field K which splits over every completion K_v is a matrix algebra over K. The theorem is an example of a local-global principle in algebraic number theory and leads to a complete description of finite-dimensional division algebras over algebraic number fields in terms of their local invariants. It was proved independently by Richard Brauer, Helmut Hasse, and Emmy Noether and by Abraham Adrian Albert.

The earthquake flow on Teichmüller space is ergodic.

Fields medalist Maryam Mirzakhani proved the long-standing conjecture that William Thurston's earthquake flow on Teichmüller space is ergodic.

Wireless transmission

Torpedoes Radio guidance device

Austrian-American Hollywood actress Hedy Lamarr, together with musicist and author George Antheil, developed a radio guidance system for Allied torpedoes which used spread spectrum and frequency hopping technology to defeat the threat of jamming by the Axis powers.^[63] Though the US Navy did not adopt the technology until the 1960s, the principles of their work are now incorporated into modern Wi-Fi, CDMA and Bluetooth technology.

Food and food appliances

Chocolate-chip cookies

Invented by Ruth Graves Wakefield in 1938.

Pizza saver

Patented in 1985 by Carmela Vitale of Dix Hills, New York.

Biology

DNA structure

Rosalind Franklin was a British molecular biologist who was instrumental in the discovery of the structure of deoxyribonucleic acid (DNA) in 1951. At King's College London where she applied X-ray diffraction to the study of biological materials, she performed several X-ray radiographs of the DNA.

The Cori cycle (lactic acid cycle)

Gerty Cori, together with Carl Ferdinand Cori, discovered the Cori cycle, the metabolic pathway in which lactate produced by anaerobic glycolysis in the muscles moves to the liver and is converted to glucose, which then returns to the muscles and is metabolized back to lactate.^[64]

Radioimmunoassay

Rosalyn Sussman Yalow developed the radioimmunoassay, an immunoassay that uses radiolabeled molecules in a stepwise formation of [immune complexes at the Veterans Administration Hospital in the Bronx, New York. This technique is used to accurately measure levels of substances such as hormones which are found in small concentrations in the body. ^[65]

Transposable elements

Barbara McClintock discovered transposable elements (also known as transposons and jumping genes), DNA sequences which change their position within the genome. Transposons make up a large fraction of the DNA in eukaryotic cells (44% if the human genome ^[66] and 90% of the maize genome ^[67][68]) and play an important role in genome function and evolution. .^[69] In Oxytricha, which has a unique genetic system, these elements play a critical role in development.^[70]

Nerve growth factor

Rita Levi-Montalcini and colleague Stanley Cohen discovered nerve growth factor, a neurotrophic factor and neuropeptide primarily involved in the regulation of growth, maintenance, proliferation, and survival of certain target neurons. This discovery was recognized with the Nobel Prize in Physiology or Medicine in 1986. ^[71]

Gap genes

Christiane Nüsslein-Volhard and colleague Eric Wieschaus were the first to describe gap genes, genes involved in the development of segmentation in Drosophila embryogenesis. This work was foundational to our understanding of the genetic control of embryonic development.^[72]

Telomerase

Elizabeth Blackburn, Carol W. Greider, and Jack W. Szostak co-discovered the enzyme telomerase, which replenishes the telomere, a structure found at the ends of chromosomes which protects the DNA in the rest of the chromosome from damage.^[73]

grid cell firing rate across space

Grid cells

May-Britt Moser, together with Edvard Moser and their students Torkel Hafting, Marianne Fyhn and Sturla Molden, discovered grid cells, cells which contribute to the brain's positioning and navigation system. The grid cells of a freely moving animal fire when the animal is near the vertices of a hexagonal grid in the environment.^[74]

Psychology

Myers–Briggs Type Indicator (MBTI)

Katharine Cook Briggs and her daughter Isabel Briggs Myers invented this psychological test, where participants answer an introspective self-report questionnaire. The result takes the form of 16 types, indicating the psychological preferences of the participant.

See also

• Women in science
• Women's history
• List of women's firsts
• History of women in engineering

References