Pure mathematics
Pure Mathematics research involves the study of fundamental mathematical structures to increase our understanding of mathematics itself, and its role in science and technology.
Based within the School of Mathematical Sciences, our Pure Mathematics researchers seek to strengthen the fundamental structures of mathematics by discovering new mathematical results and links to other areas. Pure Mathematics research is particularly important in the area of physics, with major impact in:
 string theory
 topological phases of matter
 Einstein's general relativity theory
 the relation between classical and quantum mechanics.
Our Pure Mathematics research into finite geometry also has important potential applications in cryptography.

Research Impact
Pure Mathematics researchers in the University’s Institute for Geometry and its Applications focus on fundamental questions in geometry and their relevance to other areas. Geometry lies at the core of modern mathematics, with deep implications in all other mathematical disciplines. If a mathematical problem can be viewed from a geometric angle, we can use geometric intuition to solve it in unexpected ways. This applies, for example, to analysis, cryptography and representation theory.
Symmetry also plays an important role throughout science and mathematics, particularly in geometry, and is underpinned by the mathematical theory of groups. Many of our researchers work on lie theory, the theory of continuous groups of symmetries, such as rotation symmetries.
Higher geometry is a synthesis of classical differential geometry with structures and ideas coming from category theory. Part of the motivation for considering this merger is the physicist’s notion of string theory, which is a possible ‘theory of everything’.
Other areas that we are active in include:
 homotopy theory
 complex and geometric analysis
 Ktheory and operator algebras
 index theory.
In the last decade there has been an extraordinary confluence of ideas in mathematics and theoretical physics, brought about by pioneering discoveries in geometry and analysis. Geometry now pervades modern technology, with medical imaging and information security being just two prominent examples.
The Pure Mathematics research group has received significant recognition for its valuable contributions, including a Laureate Fellowship and several other prestigious awards from the Australian Research Council in recent years. Two group members have won the Medal of the Australian Mathematical Society.

Our researchers
We have expertise across a wide range of areas. Many of our researchers are available to assist with research project supervision for Master of Philosophy and Doctor of Philosophy students.
Research team Expertise Dr David Baraglia Differential geometry; Algebraic and complex geometry; Moduli spaces and gauge theory Dr Sue Barwick Finite projective geometry; Unitals; The Desarguesian plane Dr Guanheng Chen SeibergWitten theory; Floer homology; Lowdimensional topology Professor Mike Eastwood Differential geometry; Representation theory; Several complex variables Professor Finnur Larusson Complex geometry; Complex analysis; Homotopy theory Dr Thomas Leistner Lorentzian geometry; Conformal geometry; Lie groups Dr David Roberts Category theory; Differentiable stacks; Topos theory Dr Danny Stevenson Higher category theory; Abstract homotopy theory; Gerbes and nonabelian cohomology Dr Guo Chuan Thiang Mathematical physics; Ktheory and homology; Operator algebras Professor Mathai Varghese Index theory; Noncommutative geometry; Mathematical physics Dr Raymond Vozzo Differential geometry; Higher geometry; Algebraic topology To enquire about consulting or working with us on a research project, please contact our lead researcher within the School of Mathematical Sciences:
Dr David Baraglia
Senior Lecturer, School of Mathematical Sciences
Higher Degrees by Research
Whether you intend to work in research or industry, a higher degree by research can give you a competitive edge throughout your career. Find out more about studying a Master of Philosophy or Doctor of Philosophy.