Cheryl Elisabeth Praeger (born 7 September 1948,

Toowoomba Toowoomba ( ), nicknamed 'The Garden City' and 'T-Bar', is a city on the border of South East Queensland and Darling Downs regions of Queensland, Australia. It is located west of Queensland's capital, Brisbane. The urban population of Toowoom ...

Queensland Queensland ( , commonly abbreviated as Qld) is a States and territories of Australia, state in northeastern Australia, and is the second-largest and third-most populous state in Australia. It is bordered by the Northern Territory, South Austr ...

) is an Australian mathematician. Praeger received BSc (1969) and MSc degrees from the

University of Queensland The University of Queensland is a Public university, public research university located primarily in Brisbane, the capital city of the Australian state of Queensland. Founded in 1909 by the Queensland parliament, UQ is one of the six sandstone ...

(1974), and a doctorate from the

University of Oxford The University of Oxford is a collegiate university, collegiate research university in Oxford, England. There is evidence of teaching as early as 1096, making it the oldest university in the English-speaking world and the List of oldest un ...

in 1973 under direction of

Peter M. Neumann Peter Michael Neumann OBE (28 December 1940 – 18 December 2020) was a British mathematician. His fields of interest included the history of mathematics and Galois theory. Biography Born in December 1940, Neumann was a son of the German-bo ...

. She has published widely and has advised 27 PhD students (as of March 2018). She is currently Emeritus Professor of Mathematics at the

University of Western Australia University of Western Australia (UWA) is a public research university in the Australian state of Western Australia. The university's main campus is in Crawley, Western Australia, Crawley, a suburb in the City of Perth local government area. UW ...

. She is best known for her works in

group theory In abstract algebra, group theory studies the algebraic structures known as group (mathematics), groups. The concept of a group is central to abstract algebra: other well-known algebraic structures, such as ring (mathematics), rings, field ( ...

algebraic graph theory Algebraic graph theory is a branch of mathematics in which algebraic methods are applied to problems about graphs. This is in contrast to geometric, combinatoric, or algorithmic approaches. There are three main branches of algebraic graph the ...

and

combinatorial design Combinatorial design theory is the part of combinatorial mathematics that deals with the existence, construction and properties of systems of finite sets whose arrangements satisfy generalized concepts of ''balance'' and/or ''symmetry''. These co ...

Education

Praeger completed her high school education at

Brisbane Girls Grammar School Brisbane Girls Grammar School is an independent non-denominational secondary day school for girls, located in Spring Hill, an inner suburb of Brisbane, Queensland, Australia. Founded in 1875, the school is one of eight grammar schools in Queen ...

. After graduating high school, Praeger went to the government vocational guidance section to inquire about how she could further study mathematics. The vocational guidance officer she spoke with tried to discourage her from studying mathematics further, suggesting she become a teacher or a nurse because two other girls who came to him wanting to study maths were not able to pass their courses. He reluctantly showed her an engineering course description, but she felt it did not have enough mathematics. So she left without getting much information that day, but did continue on to receive her bachelor's and master's degrees from the

. Having met several women on the mathematics staff during her undergraduate studies, the prospect of becoming a mathematician did not seem strange to her. During her first and second years she did honours studies in mathematics and physics, choosing to continue in mathematics after her second year. After completing her education at University of Queensland she was offered a research scholarship at

Australian National University The Australian National University (ANU) is a public university, public research university and member of the Group of Eight (Australian universities), Group of Eight, located in Canberra, the capital of Australia. Its main campus in Acton, A ...

(ANU) but chose instead to take the Commonwealth Scholarship to the

and attended St Anne's College. At that point she knew she wanted to study algebra. After earning her doctorate in 1973, she obtained a research fellowship at ANU. She had her first opportunity at teaching regular classes at the

University of Virginia The University of Virginia (UVA) is a Public university#United States, public research university in Charlottesville, Virginia, United States. It was founded in 1819 by Thomas Jefferson and contains his The Lawn, Academical Village, a World H ...

during the semester she worked there. Afterwards, she returned to ANU, where she met her future husband, John Henstridge, who was studying statistics. She was later offered a short-term position at the

, which turned into a long term position, where she currently works today. In 1989 she received the degree of Doctor of Science from the University of Western Australia for her work on permutation groups and algebraic graph theory.

Career

Her career has been largely spent in the Department of Mathematics and Statistics at the University of Western Australia. She was appointed full professor in 1983 and was head of the Department of Mathematics 1992–1994, inaugural dean of postgraduate research studies 1996–1998, chair Promotions and Tenure Committee 2000–2004, deputy dean of the Faculty of Engineering Computing and Mathematics 2003–2006, ARC Professorial Fellow 2007. and ARC Federation Fellow in 2009. Praeger has supervised over 30 graduate students and in 1997 she supervised the Honours research work of

Akshay Venkatesh Akshay Venkatesh (born 21 November 1981) is an Indian Australian mathematician and a professor (since 15 August 2018) at the School of Mathematics at the Institute for Advanced Study. His research interests are in the fields of counting, equ ...

who went on to win a 2018

Fields Medal The Fields Medal is a prize awarded to two, three, or four mathematicians under 40 years of age at the International Congress of Mathematicians, International Congress of the International Mathematical Union (IMU), a meeting that takes place e ...

, commonly regarded as the highest prize in mathematics. During her career, Praeger has been invited to speak at many conferences, including ones in

Croatia Croatia, officially the Republic of Croatia, is a country in Central Europe, Central and Southeast Europe, on the coast of the Adriatic Sea. It borders Slovenia to the northwest, Hungary to the northeast, Serbia to the east, Bosnia and Herze ...

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USA The United States of America (USA), also known as the United States (U.S.) or America, is a country primarily located in North America. It is a federal republic of 50 states and a federal capital district, Washington, D.C. The 48 contiguous ...

, UK,

South Korea South Korea, officially the Republic of Korea (ROK), is a country in East Asia. It constitutes the southern half of the Korea, Korean Peninsula and borders North Korea along the Korean Demilitarized Zone, with the Yellow Sea to the west and t ...

Singapore Singapore, officially the Republic of Singapore, is an island country and city-state in Southeast Asia. The country's territory comprises one main island, 63 satellite islands and islets, and one outlying islet. It is about one degree ...

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Hong Kong Hong Kong)., Legally Hong Kong, China in international treaties and organizations. is a special administrative region of China. With 7.5 million residents in a territory, Hong Kong is the fourth most densely populated region in the wor ...

Morocco Morocco, officially the Kingdom of Morocco, is a country in the Maghreb region of North Africa. It has coastlines on the Mediterranean Sea to the north and the Atlantic Ocean to the west, and has land borders with Algeria to Algeria–Morocc ...

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USSR The Union of Soviet Socialist Republics. (USSR), commonly known as the Soviet Union, was a List of former transcontinental countries#Since 1700, transcontinental country that spanned much of Eurasia from 1922 until Dissolution of the Soviet ...

Belgium Belgium, officially the Kingdom of Belgium, is a country in Northwestern Europe. Situated in a coastal lowland region known as the Low Countries, it is bordered by the Netherlands to the north, Germany to the east, Luxembourg to the southeas ...

Iran Iran, officially the Islamic Republic of Iran (IRI) and also known as Persia, is a country in West Asia. It borders Iraq to the west, Turkey, Azerbaijan, and Armenia to the northwest, the Caspian Sea to the north, Turkmenistan to the nort ...

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the Philippines The Philippines, officially the Republic of the Philippines, is an archipelagic country in Southeast Asia. Located in the western Pacific Ocean, it consists of 7,641 islands, with a total area of roughly 300,000 square kilometers, which ar ...

, and

Japan Japan is an island country in East Asia. Located in the Pacific Ocean off the northeast coast of the Asia, Asian mainland, it is bordered on the west by the Sea of Japan and extends from the Sea of Okhotsk in the north to the East China Sea ...

Awards, honours and memberships

Praeger is a Fellow of the

Australian Academy of Science The Australian Academy of Science was founded in 1954 by a group of distinguished Australians, including Australian Fellows of the Royal Society of London. The first president was Sir Mark Oliphant. The academy is modelled after the Royal Soci ...

, former president of the

Australian Mathematical Society The Australian Mathematical Society (AustMS) was founded in 1956 and is the national society of the mathematics profession in Australia. One of the society's listed purposes is to promote the cause of mathematics in the community by representing ...

(1992–1994 and first female president of the society). She was appointed as a Member of the

Order of Australia The Order of Australia is an Australian honours and awards system, Australian honour that recognises Australian citizens and other persons for outstanding achievement and service. It was established on 14 February 1975 by Elizabeth II, Monarch ...

in 1999 and promoted to Companion in 2021. Awards and honours include: * Certificate of Merit of the Royal Humane Society of New South Wales for "actions involving a drowning, rescue at Batemans Bay on the 23rd November 1974" (1976). * Honorary Doctor of Science from the

Prince of Songkla University The Prince of Songkla University (PSU; ; ) is a public university in southern Thailand. Established in 1967, it is the first university in southern Thailand. It was named by King Bhumibol Adulyadej in honor of Prince Mahidol Adulyadej, Prince ...

, Thailand (1993). * Fellow of the

(1996). * Member of the

for her service to mathematics in Australia, especially through research and professional associations (1999). *

Centenary Medal The Centenary Medal is an award which was created by the Australian Government in 2001. It was established to commemorate the centenary of the Federation of Australia and to recognise "people who made a contribution to Australian society or g ...

of the Australian Government (2003). * Doctor Honoris Causis from the

Université Libre de Bruxelles The (French language, French, ; lit. Free University of Brussels; abbreviated ULB) is a French-speaking research university in Brussels, Belgium. It has three campuses: the ''Solbosch'' campus (in the City of Brussels and Ixelles), the ''Plain ...

, Belgium (2005). * Western Australian Scientist of the Year (2009). * Moyal Medal of

Macquarie University Macquarie University ( ) is a Public university, public research university in Sydney, New South Wales, Australia. Founded in 1964 by the New South Wales Government, it was the third university to be established in the Sydney metropolitan area. ...

, Australia (2011; the first female recipient of the Medal since its establishment in 2000). * 2011 Euler Medal of the

Institute of Combinatorics and its Applications The Institute of Combinatorics and its Applications (ICA) is an international scientific organization formed in 1990 to increase the visibility and influence of the Combinatorics, combinatorial community. In pursuit of this goal, the ICA sponsors ...

(presented in 2017). * Fellow of the

American Mathematical Society The American Mathematical Society (AMS) is an association of professional mathematicians dedicated to the interests of mathematical research and scholarship, and serves the national and international community through its publications, meetings, ...

(2012). *

Thomas Ranken Lyle Medal The Thomas Ranken Lyle Medal is awarded at most every two years by the Australian Academy of Science to a mathematician or physicist for his or her outstanding research accomplishments.

of the Australian Academy of Science (2013; the first female recipient of the Medal since its establishment in 1935). *

George Szekeres Medal The George Szekeres Medal is awarded by the Australian Mathematical Society for outstanding research contributions over a fifteen-year period. This award, established in 2001, was given biennially in even-numbered years until 2021 and has since bee ...

of the

(2014; the first female recipient of the Medal since its establishment in 2002). * Honorary Member of the

London Mathematical Society The London Mathematical Society (LMS) is one of the United Kingdom's Learned society, learned societies for mathematics (the others being the Royal Statistical Society (RSS), the Institute of Mathematics and its Applications (IMA), the Edinburgh ...

(2014). * Honorary doctorate in Mathematics Education by

Yazd University Yazd University (YU, , ''Daneshgah-e Yazd'') is a public research university in Yazd, Iran. It is a major state-funded research center in central Iran and the academic center of Yazd province and was the first comprehensive institute of higher e ...

, Iran (2015). *

Mehdi Behzad Mehdi Behzad (Persian:مهدی بهزاد; born April 22, 1936) is an Iranian mathematician specializing in graph theory. He introduced his total coloring theory (also known as "Behzad's conjecture" or "the total chromatic number conjecture") dur ...

Prize of the Iranian Mathematical Society, for management in mathematics (2015). * Honorary Doctor of Science from the

University of Saint Andrews The University of St Andrews (, ; abbreviated as St And in post-nominals) is a public university in St Andrews, Scotland. It is the oldest of the four ancient universities of Scotland and, following the universities of Oxford and Cambridge, t ...

, Scotland (2015). * Inducted into the Western Australian Science Hall of Fame (2015). * Inducted into the Western Australian Women's Hall of Fame (2015). * Honorary Doctor of Mathematics from the

, Australia (2017). * Honorary Doctor from the

University of Primorska University of Primorska ( Slovenian ''Univerza na Primorskem'', Italian ''Università del Litorale'') is a public university in Slovenia. It is located in Koper, Izola, and Portorož and is named for the Slovenian Littoral region, where it i ...

, Slovenia (2018). * Prime Minister's Prize for Science (2019). * Kirk Distinguished Visiting Fellow at the

Isaac Newton Institute The Isaac Newton Institute for Mathematical Sciences is an international research institute for mathematics and its applications at the University of Cambridge. It is named after one of the university's most illustrious figures, the mathematician ...

in Cambridge (2020). * Companion of the

for "eminent service to mathematics, and to tertiary education, as a leading academic and researcher, to international organisations, and as a champion of women in STEM careers". This is Australia's highest civic honour. (2021) * Inaugural

Ruby Payne-Scott Medal and Lecture The Ruby Payne-Scott Medal and Lecture for women in science is a distinguished career award that acknowledges outstanding Australian women researchers in the biological sciences or physical science. It is conferred by the Australian Academy of Sc ...

of the Australian Academy of Science (2021). * Appointed a Fellow of the International Science Council (2023). * Honorary Fellow of the

(2024). Since 2014, the Women in Mathematics Special Interest Group of the Australian Mathematical Society bestows the Cheryl E. Praeger Travel Awards to female mathematicians. Since 2017 the Australian Mathematics Trust has awarded the Cheryl Praeger Medal to the best performing female contestants in the

Australian Mathematics Competition The Australian Mathematics Competition is a mathematics competition run by the Australian Maths Trust for students from year 3 to year 12, in Australia, and their equivalent grades in other countries. History The forerunner of the competition, ...

. Praeger has also held memberships with the

Combinatorial Mathematics Society of Australasia The Combinatorial Mathematics Society of Australasia (CMSA) is a professional society of mathematicians working in the field of combinatorics. It is the primary combinatorics society for Australasia, consisting of Australia, New Zealand and neigh ...

, Australian Mathematics Trust,

, and the

. Her past affiliations have not been limited to academia.

Other activities

Praeger has been a member of the Curriculum Development Council of the Commonwealth Schools Commission, the Prime Ministers Science Advisory Council, WISET Advisory Committee to the Federal Minister for Science on participation of women in Science, Engineering, and Technology, UWA Academy of Young Mathematicians Lectures, the Western Australian School Mathematics Enrichment Course Tutor, and Data Analysis Australia Pty Ltd. She has also served on the Australian Federation of University Women (Western Australian Branch) and the Nedlands Primary School Council. Between 1992 and 2019 she was a board member of the

Australian Mathematics Trust The Australian Mathematics Competition is a mathematics competition run by the Australian Maths Trust for students from year 3 to year 12, in Australia, and their equivalent grades in other countries. History The forerunner of the competition, ...

. From 2001 to 2019 she chaired the Australian

Mathematical Olympiad A mathematical olympiad is a mathematical competition where participants are examined by problem solving and may win medals depending on their performance. Usually aimed at pre-university students, much of olympiad mathematics consists of elemen ...

Committee. From 2020 to 2025 she was a member of the National Science and Technology Council that provides advice to the prime minister and the minister for science. Between 2007 and 2014 Praeger was a member of the executive committee of the

International Mathematical Union The International Mathematical Union (IMU) is an international organization devoted to international cooperation in the field of mathematics across the world. It is a member of the International Science Council (ISC) and supports the International ...

and between 2013 and 2016 a vice president of the

International Commission on Mathematical Instruction The International Commission on Mathematical Instruction (ICMI) is a commission of the International Mathematical Union and is an internationally acting organization focusing on mathematics education. ICMI was founded in 1908 at the International ...

. Between 2014 and 2018 Praeger was foreign secretary of the

. She was elected as a Member-at-Large of the executive board of the Association of Academies and Societies of Sciences in Asia (AASSA) for 2016–18 and accepted an invitation to chair the AASSA Committee of Women in Science and Engineering (WISE). She was a Member of the executive committee of the Inter Academy Partnership - Science, 2017–19. Between 2019 and 2022 she was a member of the Committee for Freedom and Responsibility in Science of the

International Science Council The International Science Council (ISC) is an international non-governmental organization that unites scientific bodies at various levels across the social and natural sciences. The ISC was formed with its inaugural general assembly on 4 July 20 ...

. Praeger promotes the involvement of women in mathematics by encouraging girls in primary and secondary schools with lectures, workshops, conferences and through the Family Maths Program Australia (FAMPA), which she was key in implementing in local primary schools. She is a past Patron of the Mathematical Association of Western Australia.

Personal life

In August 1975 Praeger married John Henstridge in

Brisbane Brisbane ( ; ) is the List of Australian capital cities, capital and largest city of the States and territories of Australia, state of Queensland and the list of cities in Australia by population, third-most populous city in Australia, with a ...

. They have two children, James (1979) and Tim (1982). In addition to holding a doctorate in mathematics, she also holds an

Associate in Music, Australia The Associate in Music, Australia (AMusA) is a diploma awarded by the Australian Music Examinations Board (AMEB). It is awarded by examination to outstanding candidates in the fields of musical performance, music theory and musicianship. It is ...

(AMusA) in piano performance and was a member of the University of Western Australia

Collegium Musicum The Collegium Musicum was one of several types of musical societies that arose in Germany, German and German-Switzerland, Swiss cities and towns during the Protestant Reformation, Reformation and thrived into the mid-18th century. Generally, whil ...

between 1977 and 1985. She has been a member of the

Uniting Church in Australia The Uniting Church in Australia (UCA) is a united church in Australia. The church was founded on 22 June 1977 when most Wiktionary:congregation, congregations of the Methodist Church of Australasia, about two-thirds of the Presbyterian Church o ...

, Nedlands Parish since 1977, functioned as an elder from 1981 to 1987, and as an organist/pianist since 1985. She lists keyboard music among her stronger interests along with sailing, hiking, and cycling.

Research

Praeger published her first research paper in1970 while she was still an undergraduate. Since then she has become one of the most highly cited authors in pure mathematics, with (as of May 2025) over 480 publications total. She is known as a collaborator, with over 200 co-authors. Praeger's research is centred around the mathematics of

symmetry Symmetry () in everyday life refers to a sense of harmonious and beautiful proportion and balance. In mathematics, the term has a more precise definition and is usually used to refer to an object that is Invariant (mathematics), invariant und ...

, including key work in

(especially

group actions In mathematics, a group action of a group G on a set S is a group homomorphism from G to some group (under function composition) of functions from S to itself. It is said that G acts on S. Many sets of transformations form a group under funct ...

and

permutation groups In mathematics, a permutation group is a group ''G'' whose elements are permutations of a given set ''M'' and whose group operation is the composition of permutations in ''G'' (which are thought of as bijective functions from the set ''M'' to its ...

combinatorics Combinatorics is an area of mathematics primarily concerned with counting, both as a means and as an end to obtaining results, and certain properties of finite structures. It is closely related to many other areas of mathematics and has many ...

analysis of algorithms In computer science, the analysis of algorithms is the process of finding the computational complexity of algorithms—the amount of time, storage, or other resources needed to execute them. Usually, this involves determining a function that r ...

and complexity,

discrete mathematics Discrete mathematics is the study of mathematical structures that can be considered "discrete" (in a way analogous to discrete variables, having a bijection with the set of natural numbers) rather than "continuous" (analogously to continuous f ...

and

geometry Geometry (; ) is a branch of mathematics concerned with properties of space such as the distance, shape, size, and relative position of figures. Geometry is, along with arithmetic, one of the oldest branches of mathematics. A mathematician w ...

. Major areas and results include: * She has co-authored eleven papers with

Peter Cameron Peter Cameron may refer to: * Peter Cameron (entomologist) (1847–1912), English entomologist who specialised in Hymenoptera * Peter Cameron (mathematician) (born 1947), Australian mathematician, joint winner of the 2003 Euler Medal * Peter Camero ...

, including the proof of

Sims conjecture In mathematics, the Sims conjecture is a result in group theory, originally proposed by Charles Sims. He conjectured that if G is a primitive permutation group on a finite set S and G_\alpha denotes the stabilizer of the point \alpha in S, then the ...

in 1983. This was an early application of the

classification of finite simple groups In mathematics, the classification of finite simple groups (popularly called the enormous theorem) is a result of group theory stating that every List of finite simple groups, finite simple group is either cyclic group, cyclic, or alternating gro ...

. * With

Jan Saxl Jan Saxl (5 June 1948 – 2 May 2020) was a Czech-British mathematician, and a professor at the University of Cambridge. He was known for his work in finite group theory, particularly on consequences of the classification of finite simple groups ...

and

Martin Liebeck Martin Liebeck (born 23 September 1954) is a professor of Pure Mathematics at Imperial College London whose research interests include group theory and algebraic combinatorics.permutation group In mathematics, a permutation group is a group ''G'' whose elements are permutations of a given set ''M'' and whose group operation is the composition of permutations in ''G'' (which are thought of as bijective functions from the set ''M'' to ...

primitive permutation group In mathematics, a permutation group ''G'' acting on a non-empty finite set ''X'' is called primitive if ''G'' acts transitively on ''X'' and the only partitions the ''G''-action preserves are the trivial partitions into either a single set or in ...

simple group SIMPLE Group Limited is a conglomeration of separately run companies that each has its core area in International Consulting. The core business areas are Legal Services, Fiduciary Activities, Banking Intermediation and Corporate Service. The d ...

s, and

almost simple group In mathematics, a group (mathematics), group is said to be almost simple if it contains a non-abelian group, abelian simple group and is contained within the automorphism group of that simple group – that is, if it fits between a (non-abelian) sim ...

s. Together they co-authored "On the O'Nan Scott Theorem for primitive permutation groups". It pertains to the

, namely the classification of finite primitive permutation groups. The paper contains a complete self-contained proof of the theorem. * Praeger later went on to generalise the O'Nan–Scott Theorem to quasiprimitive groups. An O'Nan-Scott Theorem for Finite Quasiprimitive Permutation Groups and an Application to 2-Arc Transitive Graphs, Journal of the London Mathematical Society, Volume s2-47, 1993, Pages 227–239 * Praeger introduced normal quotients of graphs which allows the finite simple groups classification to be applied to analyse symmetric graphs and

edge-transitive graph In the mathematical field of graph theory, an edge-transitive graph is a graph such that, given any two edges and of , there is an automorphism of that maps to . In other words, a graph is edge-transitive if its automorphism group acts t ...

s as well as

Cayley graph In mathematics, a Cayley graph, also known as a Cayley color graph, Cayley diagram, group diagram, or color group, is a Graph (discrete mathematics), graph that encodes the abstract structure of a group (mathematics), group. Its definition is sug ...

s. It is now a standard tool in

. * With Peter M Neumann she developed and analysed the first randomised algorithm to recognise finite special

linear group In mathematics, a matrix group is a group ''G'' consisting of invertible matrices over a specified field ''K'', with the operation of matrix multiplication. A linear group is a group that is isomorphic to a matrix group (that is, admitting a ...

s. This led to the international matrix group recognition project and was extended to all finite classical groups by Praeger and Alice Niemeyer. * She has co-authored several papers on

symmetric graph In the mathematical field of graph theory, a graph is symmetric or arc-transitive if, given any two ordered pairs of adjacent vertices (u_1,v_1) and (u_2,v_2) of , there is an automorphism :f : V(G) \rightarrow V(G) such that :f(u_1) = u_2 a ...

s and

distance-transitive graph In the mathematical field of graph theory, a distance-transitive graph is a graph such that, given any two vertices and at any distance , and any other two vertices and at the same distance, there is an automorphism of the graph that carri ...

s with

Tony Gardiner Tony Gardiner (17 May 1947 – 22 January 2024) was a British mathematician who until 2012 held the position of Reader in Mathematics and Mathematics Education at the University of Birmingham. He was responsible for the foundation of the United ...

Selected publications

* with Martin Liebeck, Jan Saxl
''The maximal factorizations of the finite simple groups and their automorphism groups''
American Mathematical Society 1990 * with Leonard Soicher
''Low rank representations and graphs for sporadic groups''
Cambridge University Press 1997 * with Jason Fulman, Peter Neumann: ''A generating function approach to the enumeration of matrices in classical groups over finite fields'', American Mathematical Society 2005 * with Martin Liebeck, Jan Saxl
''Regular subgroups of primitive permutation groups''
American Mathematical Society 2010 * with Csaba Schneider
Groups and Cartesian Decompositions''
Cambridge University Press 2018

References

External links

Personal web page

Mathematics Genealogy Project page for Cheryl Praeger

Agnes Scott College Agnes Scott College is a Private university, private Women's Colleges in the Southern United States, women's Liberal arts colleges in the United States, liberal arts college in Decatur, Georgia. The college enrolls approximately 1,000 undergra ...

*
Summary of Cheryl Praeger's career

– by

Bernhard Neumann Bernhard Hermann Neumann (15 October 1909 – 21 October 2002) was a German-born British-Australian mathematician, who was a leader in the study of group theory. Early life and education After gaining a D.Phil. from Friedrich-Wilhelms Universi ...

in 1999.
Theorems by Cheryl Praeger at Theorem of the Day
*

University of New South Wales The University of New South Wales (UNSW) is a public research university based in Sydney, New South Wales, Australia. It was established in 1949. The university comprises seven faculties, through which it offers bachelor's, master's and docto ...

{{DEFAULTSORT:Praeger, Cheryl 1948 births Living people 20th-century Australian mathematicians 21st-century Australian mathematicians Group theorists Combinatorialists Members of the Order of Australia Companions of the Order of Australia Fellows of the Australian Academy of Science Fellows of the American Mathematical Society People from Toowoomba University of Queensland alumni Alumni of the University of Oxford Academic staff of the University of Western Australia 20th-century Australian women mathematicians 21st-century women mathematicians People educated at Brisbane Girls Grammar School University of Western Australia alumni