HOT TOPIC: Which AFL teams should REALLY make the finals?

This segment is a follow-up to my talks at the University's Open Days in Burnie and Launceston. The talks dealt with the lack of balance in the Premiership rounds of the AFL football competition--each team plays 7 other teams twice and the remaining 8 teams just once. I proposed a scoring method which takes into account the different strengths of the teams played (which make some wins more meritorious than others). Here this is called the "power score".

Exactly the same mathematical technique involved is also extremely useful and important in many applications-- there are examples in production scheduling, logistics management, fisheries stock research, structural engineering and lots of other areas too.  Good reasons to stick with Maths through your school career!

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http://www.austms.org.au/Jobs/

Research interests

Qualifications

Courses taught:

What students said about these units...
 
 

Publications

1. Representations of inverse monoids by partial automorphisms, Semigroup Forum 61 (2000) 357—362.  Abstract
2. The ubiquity of power functions, Biometrical Journal 41 (1999) 111—118.  Abstract
3. Green's relations in some categories of strong graph homomorphisms, Semigroup Forum 58 (1999) 445—451.  Abstract
4. Dual symmetric inverse monoids and representation theory, Journal of the Australian Mathematical Society (Series A) 64 (1998) 345—367 (with J E Leech).  Abstract
5. Development staff characteristics and service stability in leading Australian-owned Information Technology firms, in Purvis, M., ed., Software Engineering: Education and Practice, IEEE Computer Society Press, Los Alamitos, 1998, 96—103 (with G R Lowry and G W Morgan).
6. Identifying excellence in leading Australian - owned Information Technology firms: five emerging themes, in Seventh Australasian Conference on Information Systems, Australian Computer Society / ACIS, Hobart, Australia, 1996, 419-429 (with G R Lowry and G W Morgan).
7. Normal bands and their inverse semigroups of bicongruences, Journal of Algebra 185 (1996) 502-526.  Abstract
8. Organisational characteristics, cultural qualities and excellence in leading Australian-owned Information Technology firms, in 1996 Information Systems Conference of New Zealand, Palmerston North, New Zealand, IEEE Computer Society Press, Los Alamitos, 1996, 72-84 (with G R Lowry and G W Morgan).
9. Inverse semigroups of bicongruences on algebras, particularly semilattices, in Almeida, J. et alii, eds., Lattices, Semigroups and Universal Algebra, Plenum Press, 1990, 59-66.
10. Scheduling sports competitions with a given distribution of times, Discrete Applied Mathematics 22 (1988/89) 9-19 (with D C Blest).
11. Computing the maximum generalized inverse of a Boolean matrix, Linear Algebra and its Applications 16 (1977) 203-207.
12. Divisibility in categories of a class which includes the category of binary relations, Glasgow Mathematical Journal 17 (1976) 22-30.
13. On inverses of products of idempotents in regular semigroups, Journal of the Australian Mathematical Society 13 (1972) 335 - 337.
14. Divisibility of binary relations, Bulletin of the Australian Mathematical Society 5 (1971) 75 - 86 (with G B Preston).

About Me

A continuing thread in my work is the interplay between the properties of semigroups and of categories with which they are related. The unifying idea here is the search for ‘algebraic invariants’ of objects, which may express the symmetries of the object (perhaps, for example, a fractal), or how it is related to other objects. In particular, I am interested in the ways inverse semigroups of partial symmetries carry information about the associated object. There are as many research projects in this area as there are different kinds of objects!

For recreation, I enjoy coffee and cake; balancing the conflicting demands of home and work, career and family, teaching and research; bicycling when the weather is fine; and playing (bass clarinet) in the University's Community Music Programme. My Erdös number is 3.

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