- Roots xk(y) of a formal power series with applications to graph enumeration
- MTH6128 Number Theory Assignment 5 For handing in on 14 February 2011
- THEOREM OF THE DAY Euclid's Infinity of Primes There are infinitely many prime numbers.
- Peter J. Cameron Queen Mary, University of London, Mile End
- MTH6128 Number Theory Notes 1 Spring 2011
- Submitted exclusively to the London Mathematical Society doi:10.1112/0000/000000
- MTHM024/MTH714U Group Theory Notes 3 Autumn 2010
- MTH6104 Algebraic Structures II Problem Sheet 6 Solutions
- Solutions to odd-numbered exercises Peter J. Cameron, Introduction to Algebra, Chapter 2
- The algebra of an age Peter J. Cameron
- Submitted exclusively to the London Mathematical Society DOI: 10.1112/S0000000000000000
- Random strongly regular graphs? Peter J. Cameron
- MTHM024/MTH714U Group Theory Problem Sheet 6 Solutions
- A Markov chain for Steiner triple systems Peter J. Cameron
- Base size and separation number Peter J. Cameron
- THEOREM OF THE DAY The Remainder Theorem If a polynomial f(x) is divided by (x -) then the remainder is f().
- Ranks and signatures of adjacency matrices Institute for Studies in Theoretical Physics and Mathematics (IPM),
- Synchronization 6: Examples Peter J. Cameron
- A New Proof of Pappus's Theorem Jeremy J. Carroll
- Permutations Peter J. Cameron
- 1 General theory 1 1.1 History . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1
- Graph homomorphisms III: Models Combinatorics Study Group Notes 3, October 2006
- MTHM6104 Algebraic Structures II Notes 14 Autumn 2010
- Sum-free subsets of a square draft, December 2002
- Graphs and finite transformation monoids pjc, January 2009
- THEOREM OF THE DAY The Green-Tao Theorem on Primes in Arithmetic Progression For any positive integer k there exist
- Solutions to Exercises Chapter 10: Ramsey's Theorem
- Exterior powers and Clifford In this chapter, various algebraic constructions (exterior products and Clifford al-
- Chapter 3 solutions 3.1 (a) Yes; (b) No; (c) No; (d) No; (e) Yes; (f) Yes; (g) Yes; (h) No; (i) Yes.
- MTH6128 Number Theory Assignment 2 For handing in on 24 January 2011
- MTHM024/MTH714U Group Theory Problem Sheet 8 9 December 2010
- A prolific construction of strongly regular graphs with the n-e.c. property
- Roots xk(y) of a formal power series with applications to graph enumeration
- Generating a group by a transversal Peter J. Cameron
- MTHM024/MTH714U Group Theory Problem Sheet 8 Solutions
- Solutions to Exercises Chapter 9: Finite geometry
- Solutions to Exercises Chapter 11: Graphs
- The power graph of a finite group Peter J. Camerona,
- On the automorphism group of the m-coloured random graph
- Stories about groups and sequences Peter J. Cameron
- Solutions to odd-numbered exercises Peter J. Cameron, Introduction to Algebra, Chapter 1
- Sets, Logic and Categories Solutions to Exercises: Chapter 3
- Peter Cameron Queen Mary,
- MTH6128 Number Theory Assignment 7 For handing in on 7 March 2011
- Chapter 2 solutions 2.1. (a) No; (b) No; (c) Yes; (d) Yes; (e) No; (f) Yes; (g) Yes; (h) No; (i) Yes; (j) No.
- Product action Peter J. Cameron, Daniele A. Gewurz, Francesca Merola2
- Bibliography [A] V. I. Arnol'd, Huygens & Barrow, Newton & Hooke, Birkhauser, Basel,
- Notes on primitive lambda-roots Peter J. Cameron and D. A. Preece
- Solutions to odd-numbered exercises Peter J. Cameron, Introduction to Algebra, Chapter 3
- MTHM6104 Algebraic Structures II Notes 13 Autumn 2010
- Topology in permutation groups Peter J. Cameron
- The power graph of a finite group Peter J. Camerona,
- THEOREM OF THE DAY Galois' Theorem on Finite Fields A finite field with n elements exists if and only if n = pk
- Orbits on n-tuples Ross Applegate and Peter J. Cameron
- MTH6128 Number Theory Solutions to Coursework 1
- THEOREM OF THE DAY Gruenberg's Theorem on Nilpotent Groups A finitely generated, torsion-free, nilpotent group is a
- Putting problem sheets on the Web in PDF format
- Synchronization 4: Graph homomorphisms Peter J. Cameron
- Aspects of infinite permutation groups Peter J. Cameron
- Sudoku, Mathematics and Statistics Peter J. Cameron
- Problems from BCC22 Edited by Peter J. Cameron
- Problems from the First AngloHungarian Groups and Geometry meeting
- Problems from the Sixteenth British Combinatorial Conference
- Automorphisms and enumeration of switching classes of tournaments
- Fixed points and cycles Peter J. Cameron
- SGDs with doubly transitive automorphism group Peter J. Cameron
- INDEPENDENCE ALGEBRAS PETER J. CAMERON and CSABA SZAB '
- Permutation codes Peter J. Cameron
- Finite geometry and permutation groups: some polynomial links
- MTHM024/MTH714U Group Theory Problem Sheet 2 14 October 2010
- MTH6128 Number Theory Assignment 10 For handing in on 28 March 2011
- Semiregular automorphisms of vertex-transitive cubic graphs
- Problems on Discrete Metric Spaces Edited by Peter J. Cameron
- Notes on matroids and codes Peter J. Cameron
- Polynomial aspects of codes, matroids and permutation groups
- MTH6128 Number Theory Solutions to Assignment 4
- Roots xk(y) of a formal power series with applications to graph enumeration
- THEOREM OF THE DAY The Prime Number Theorem The number of primes not exceeding x is asymptotic to x/ log x.
- Buekenhout geometries Francis Buekenhout introduced an approach to geometry which has the advan-
- Synchronization 7: Representation theory Peter J. Cameron
- MTHM604 Algebraic Structures II Notes 11 Autumn 2010
- MTH6128 Number Theory Notes 6 Spring 2011
- Nick Wormald: Properties of graphs of large girth It has long been known that there is a simple procedure for converting deter-
- Some measures of finite groups related to permutation bases
- Problems on groups Peter J. Cameron
- Solutions to Exercises Chapter 2: On numbers and counting
- Embedding partial Steiner triple systems so that their automorphisms extend
- Synchronization 1: Introduction Peter J. Cameron
- Fibonacci notes Peter J. Cameron and Dima G. FonDerFlaass
- GROUP ACTIONS ON AMORPHOUS SETS PETER J. CAMERON AND SAM TARZI
- Solutions to odd-numbered exercises Peter J. Cameron, Introduction to Algebra, Chapter 4
- Introduction to Algebra Peter J. Cameron
- Random mappings with exchangeable Jennie C. Hansen
- Orbit-counting polynomials for graphs and Peter J. Cameron 1
- Automorphisms of graphs Peter J. Cameron
- An extremal problem related to biplanes Peter J. Cameron
- MTH6104 Algebraic Structures II Problem Sheet 4 Solutions
- MTH6128 Number Theory Solutions to Assignment 9
- Roots xk(y) of a formal power series with applications to graph enumeration
- MTH6128 Number Theory Solutions to Assignment 6
- DECOMPOSABLE FUNCTORS AND THE EXPONENTIAL PRINCIPLE, II
- Decompositions of complete multipartite graphs Peter J. Cameron
- Oligomorphic permutation groups Peter J. Cameron
- Cores of symmetric graphs Peter J. Cameron
- Filters, topologies and groups from the random graph
- Problems from CGCS Luminy, May 2007
- What is a design? How should we classify R. A. Bailey and Peter J. Cameron
- A design and a geometry for the group Fi22 P. J. Cameron
- Posets, homomorphisms and homogeneity Peter J. Cameron and D. Lockett
- Limits of cubes Peter J. Cameron a
- The complexity of the Weight Problem for permutation and matrix groups
- Random preorders and alignments Peter Cameron1
- Sudoku, gerechte designs, resolutions, affine space, spreads, reguli, and Hamming codes
- Random preorders Peter Cameron and Dudley Stark
- Godel's Theorem Peter J. Cameron
- Min-wise independent families with respect to any linear order
- Designs on the Web R. A. Bailey a
- Self-dual, not self-polar A. E. Brouwer a
- Antiflag-transitive collineation groups P. J. Cameron and W. M. Kantor
- Matrix groups Peter J. Cameron
- Permutation groups generated by short Peter J. Cameron
- Coherent configurations, association schemes and permutation groups
- Association schemes and permutation groups Priscila P. Alejandro a,1,2, R. A. Bailey b, and Peter J. Cameron b
- Designs Mutually unbiased bases 2-designs from bases Open problems Optimal complex projective designs
- Block intersection polynomials (and their applications to
- Group action morphisms in backtrack search Christopher W. Monteith
- Constructions of Lotto Designs CombinatoricsCombinatorics Study Group MeetingStudy Group Meeting --Friday, 1 December 2006Friday, 1 December 2006
- Graph homomorphisms Peter J. Cameron
- Graph homomorphisms II: some examples Combinatorics Study Group Notes 2, October 2006
- Counting problems from infinite permutation groups Peter J. Cameron
- CAUSAL SET BIBLIOGRAPHY 2001 Nov 20 Short links are to the e-print archive at http://arXiv.org/.
- Partially ordered sets Thomas Britz and Peter Cameron
- Borcherds' proof of the moonshine conjecture pjc, after V. Nikulin
- This document is the first part of my autobiography; maybe the story will be carried on later, who knows? I have no interest in telling personal stories; all I
- Matrices with zero row and column sum pjc, January 2008
- It is common now in academic circles to lament the decline in the teaching of geometry in our schools and universities, and the resulting loss of "geometric in-
- Projective planes Projective and affine planes are more than just spaces of smallest (non-trivial)
- Various topics This chapter collects some topics, any of which could be expanded into an entire
- Polar spaces Now we begin on our second major theme, polar spaces. This chapter corresponds
- The geometry of the Mathieu groups The topic of this chapter is something of a diversion, but is included for two rea-
- Solutions to Exercises Chapter 1: What is Combinatorics?
- Solutions to Exercises Chapter 3: Subsets, partitions, permutations
- Solutions to Exercises Chapter 5: The Principle of Inclusion and Exclusion
- Solutions to Exercises Chapter 6: Latin squares and SDRs
- Solutions to Exercises Chapter 8: Steiner triple systems
- Fibonacci notes Peter J. Cameron and Dima G. Fon-Der-Flaass
- The ErdosKoRado theorem What is the size of the largest intersecting family of k-subsets of an n-set? There
- Sets, Logic and Categories Solutions to Exercises: Chapter 1
- Sets, Logic and Categories Solutions to Exercises: Chapter 4
- Solutions to odd-numbered exercises Peter J. Cameron, Introduction to Algebra, Chapter 6
- Solutions to odd-numbered exercises Peter J. Cameron, Introduction to Algebra, Chapter 7
- Notes on permutation characters pjc, may 2001
- Sudoku: Is it Mathematics? Peter J. Cameron
- Review of Number Theoretic Density and Logical Limit Laws by Stanley N. Burris
- Review of The Mathematician's Brian by David Ruelle and How Mathematicians Think by William Byers
- Review of Before Sudoku: The World of Magic Squares by Sey-mour S. Block and Santiago A. Tavares, Oxford University Press,
- MTH6128 Number Theory Notes 2 Spring 2011
- MTH6128 Number Theory Notes 7 Spring 2011
- MTH6128 Number Theory Notes 8 Spring 2010
- MTH6128 Number Theory Notes 9 Spring 2010
- MTH6128 Number Theory Notes 10 Spring 2010
- MTH6128 Number Theory Assignment 1 For handing in on 17 January 2011
- MTH6128 Number Theory Solutions to Coursework 2
- MTH6128 Number Theory Assignment 3 For handing in on 31 January 2011
- MTH6128 Number Theory Assignment 4 For handing in on 7 February 2011
- MTH6128 Number Theory Solutions to Assignment 5
- MTH6128 Number Theory Solutions to Assignment 7
- MTH6128 Number Theory Solutions to Assignment 8
- MTH6128 Number Theory Solutions to Assignment 10
- B. Sc. Examination by course unit 2010 MTH6128 Number Theory
- MTHM024/MTH714U Group Theory Notes 1 Autumn 2010
- MTHM024/MTH714U Group Theory Notes 4 Autumn 2010
- MTHM024/MTH714U Group Theory Notes 6 Autumn 2010
- MTHM024/MTH714U Group Theory Notes 9 Autumn 2010
- MTHM024/MTH714U Group Theory Problem Sheet 2 Solutions
- MTHM024/MTH714U Group Theory Problem Sheet 3 21 October 2010
- MTHM024/MTH714U Group Theory Problem Sheet 3 Solutions
- MTHM024/MTH714U Group Theory Problem Sheet 4 28 October 2010
- MTHM024/MTH714U Group Theory Problem Sheet 4 Solutions
- MTHM024/MTH714U Group Theory Problem Sheet 5 4 November 2010
- MTHM024/MTH714U Group Theory Problem Sheet 4 Solutions
- MTHM024/MTH714U Group Theory Problem Sheet 7 Solutions
- MTH6104 Algebraic Structures II Supplementary Notes Autumn 2010
- MTHM6104 Algebraic Structures II Notes 10 Autumn 2010
- MTH6104 Algebraic Structures II Problem Sheet 9 Solutions
- MTHM604 Algebraic Structures II Assignment 10 For handing in on 15 December 2010
- MTH6104 Algebraic Structures II Problem Sheet 10 Solutions
- MTH6104 Algebraic Structures II Supplementary problems
- Alexandre V. Borovik Mathematics
- Synchronization 5: Graphs and monoids Peter J. Cameron
- Synchronization 8: The infinite Peter J. Cameron
- Chapter 1 solutions B means that every element of A is in B, and B
- Cage on zero Curiously enough, the twelve-tone system has no zero in it. Given
- On subsets of a finite vector space in which every subset of basis size is a basis
- Robert Woodrow (Calgary) The family of intervals of a binary structure on a set S satisfies well known
- Peter Cameron: Algebraic properties of chromatic roots This is a report of a working group at the Isaac Newton Institute in the first
- Combinatorics: when mathematics meets engineering
- Totally frustrated states: A physics-like generalisation of graph colouring
- The Combinatorics of Finite Metric Spaces and the (Re-)Construction of Phylogenetic Trees.
- THEOREM OF THE DAY The Pythagorean Theorem Consider a triangle with angles , and and opposite sides a, b, and c,
- THEOREM OF THE DAY Theorem (Fermat's Little Theorem) If p is a prime number, then
- THEOREM OF THE DAY Lagrange's Four-squares Theorem Any non-negative integer, n, may be written as a sum of four
- THEOREM OF THE DAY Gauss's Law of Quadratic Reciprocity For a positive integer a and odd prime p not a multiple of a, let
- THEOREM OF THE DAY Fermat's Last Theorem (Wiles) If x, y, z and n are integers satisfying
- THEOREM OF THE DAY Khinchin's Continued Fraction Theorem There is a constant K such that, for almost all real num-
- THEOREM OF THE DAY The First Isomorphism Theorem Let G and H be groups and f : G H a homomorphism of G to H
- THEOREM OF THE DAY The Second and Third Isomorphism Theorems Suppose H is a subgroup of G and K is a normal
- THEOREM OF THE DAY The Albert-Brauer-Hasse-Noether Main Theorem Every finite-dimensional noncommutative division
- THEOREM OF THE DAY The Skolem-Noether Theorem Let R, S be finite dimensional algebras, R simple and S central simple. If
- MTHM6104 Algebraic Structures II Notes 12 Autumn 2010
- Graph Entropy, Network Coding and Guessing November 25, 2007
- MTHM024/MTH714U Group Theory Supplementary Problem Sheet
- CAUSAL SET GLOSSARY 2001 Nov 20 order = poset = ordered set = partially ordered set
- MTH6128 Number Theory Notes 4 Spring 2011
- The Rado graph and the Urysohn space Peter J. Cameron
- MTHM024/MTH714U Group Theory Notes 2 Autumn 2010
- Infinite Families of Non-embeddable Quasi-residual Menon Designs
- Partition backtrack methods for more complicated group actions
- MTH6128 Number Theory Assignment 6 For handing in on 28 February 2011
- Synchronization 2: Permutation groups Peter J. Cameron
- A Markov chain for certain triple systems Peter J. Cameron
- Combinatorics of optimal designs R. A. Bailey and Peter J. Cameron
- Solutions to Exercises Chapter 7: Extremal set theory
- 1. The random graph Consider the following two countably in nite graphs.
- Solutions to odd-numbered exercises Peter J. Cameron, Introduction to Algebra, Chapter 5
- THEOREM OF THE DAY The Fundamental Theorem of Arithmetic Every integer greater than one can be expressed uniquely
- Coordinatisation of projective In this chapter, we describe axiom systems for projective (and affine) spaces. The
- Roots xk(y) of a formal power series , with applications to graph
- 3-designs from PSL(2, q) P. J. Cameron a,1
- Some counting problems related to permutation groups
- Transitive permutation groups without semiregular Peter J. Cameron
- I think it may be time to revisit the following puzzle which has bothered me for several years. We begin with an observation by Boston et al. [1].
- The Probabilistic Method June 6, 2003
- MTHM024/MTH714U Group Theory Problem Sheet 6 18 November 2010
- Queen Mary, University of London BSc Examination by Course Units
- CSG notes, October/November 2004 Tutte polynomial and cycle index
- Asymptotic enumeration of 2-covers and line Peter Cameron, Thomas Prellberg and Dudley Stark
- Combinatorics of inverse semigroups This is an exposition of some results explained to me by Abdullahi Umar,
- John P. McSorley Department of Mathematics, Southern Illinois University
- Altitude and chromatic number pjc, May 2004
- MTH6128 Number Theory Solutions to Assignment 3
- The Klein quadric and triality Low-dimensional hyperbolic quadrics possess a remarkably rich structure; the
- MTH6104 Algebraic Structures II Problem Sheet 5 Solutions
- On monochromatic solutions of equations in groups Peter J. Cameron Javier Cilleruelo Oriol Serra
- MTHM024/MTH714U Group Theory Notes 5 Autumn 2010
- On the Subgroup Distance Problem Christoph Buchheim 1
- Making PDF files for the web These notes are to accompany `Putting problem
- Production of Teaching Material for Undergraduates
- MTH6104 Algebraic Structures II Problem Sheet 7 Solutions
- MTH6104 Algebraic Structures II Supplementary Notes 2 Autumn 2010
- MTHM024/MTH714U Group Theory Revision Notes Autumn 2010
- MTHM024/MTH714U Group Theory Notes 8 Autumn 2010
- Problems on rings Peter J. Cameron
- Homogeneous Cayley objects Peter J. Cameron
- A family of balanced incomplete-block designs with repeated blocks on which general linear
- MTH6104 Algebraic Structures II Problem Sheet 8 Solutions
- Orbital chromatic and flow roots P. J. Cameron and K. K. Kayibi
- Algebraic properties of chromatic roots Peter J. Cameron
- GENERALIZED PIGEONHOLE PROPERTIES OF GRAPHS AND ORIENTED GRAPHS
- The power graph of a finite group, II Peter J. Cameron
- Review of The Unfinished Game: Pascal, Fermat and the Seventeenth-Century Letter that Made the World Modern by Keith Devlin
- MTHM024/MTH714U Group Theory Problem Sheet 7 25 November 2010
- Permutations Peter J. Cameron
- The algebra of an age Peter J. Cameron
- Problems on Discrete Metric Spaces Edited by Peter J. Cameron
- Fibonacci notes Peter J. Cameron and Dima G. Fon-Der-Flaass
- An extremal problem related to biplanes Peter J. Cameron
- Permutation groups whose non-identity elements have k fixed points
- Problems from the First Anglo-Hungarian Groups and Geometry meeting
- Strongly regular graphs Peter J. Cameron
- A generalisation of t-designs Peter J. Cameron 1
- MTH6128 Number Theory Notes 3 Spring 2011
- Extending partial permtations draft, pjc, January 2004
- Peter J. Cameron Sets, Logic and Categories
- Synchronization: Exercises, problems, Peter J. Cameron
- Putting problem sheets on the Web in PDF format
- Solutions to odd-numbered exercises Peter J. Cameron, Introduction to Algebra, Chapter 8
- Finite geometry after Aschbacher's Theorem: PGL(n; q) from a Kleinian viewpoint
- Codes, matroids and trellises Peter J. Cameron
- Permutation groups whose non-identity elements have k xed points
- Multi-letter Youden rectangles from quadratic forms Peter J. Cameron
- An Overview of Network Information Flow sunyun@dcs.qmul.ac.uk
- MTH6128 Number Theory Assignment 8 For handing in on 14 March 2011
- MTH6128 Number Theory Notes 5 Spring 2010
- Solutions to Exercises Chapter 4: Recurrence relations and generating
- Block intersection polynomials Peter J. Cameron and Leonard H. Soicher
- MTHM024/MTH714U Group Theory Notes 7 Autumn 2010
- Codes, matroids and trellises Peter J. Cameron
- Finite geometry after Aschbacher's Theorem: PGL (n, q) from a Kleinian viewpoint
- Some counting problems related to permutation groups
- SGDs with doubly transitive automorphism group Peter J. Cameron
- A NOTE ON HIGHER-DIMENSIONAL MAGIC MATRICES Peter J. Cameron
- FIVE LECTURES ON GENERALIZED PERMUTATION REPRESENTATIONS
- A Web-based Resource for Design Theory 1 Description of the project
- Synchronization 3: Synchronizing and separating groups Peter J. Cameron
- Sets, Logic and Categories Solutions to Exercises: Chapter 2
- Homomorphism-homogeneous relational Peter J. Cameron
- THEOREM OF THE DAY The Chinese Remainder Theorem Suppose n1, n2, . . . , nr are mutually coprime positive integers (that is,
- Counting false entries in truth tables of bracketed formulae connected by implication
- Projective spaces In this chapter, we describe projective and affine spaces synthetically, in terms of
- Publishing and assessing mathematics Peter J. Cameron
- On the single-orbit conjecture for uncoverings-by-bases
- The number of equivalence classes of symmetric sign patterns
- THEOREM OF THE DAY The Wedderburn-Artin Theorem Any finite dimensional semisimple algebra is isomorphic to a direct
- Axioms for polar spaces The axiomatisation of polar spaces was begun by Veldkamp, completed by Tits,
- INDEPENDENCE ALGEBRAS PETER J. CAMERON and CSABA SZABO'
- Automorphisms and enumeration of switching classes of tournaments
- Fixed points and cycles Peter J. Cameron
- 1. The random graph Consider the following two countably infinite graphs.
- Stories about groups and sequences Peter J. Cameron
- Homogeneous Cayley objects Peter J. Cameron
- Scenes from mathematical life Peter J. Cameron
- Root systems and optimal block designs Peter J. Cameron
- THEOREM OF THE DAY The CameronFon-Der-Flaass IBIS Theorem Let G be a permutation group acting on a set . Then
- THEOREM OF THE DAY Sims' Conjecture (1968, proved 1983) There is a function f which, for any finite permutation group G
- Conference matrices Peter Cameron
- Well-quasi-ordering Binary Matroids The Graph Minors Project of Robertson and Seymour is one of the highlights
- THEOREM OF THE DAY Praeger's Theorem on Bounded Movement Let G be a permutation group acting without fixed points
- THEOREM OF THE DAY The McIverNeumann Half-n Bound Let be a set of order n, n 3, and let G be a permutation group
- THEOREM OF THE DAY Lagrange's Theorem If G is a finite group and H is a subgroup of G then the order of H divides the
- THEOREM OF THE DAY Theorem (The Orbit Counting Lemma) Let G be a finite permutation group on set . For g G, let
- THEOREM OF THE DAY Cayley's Theorem A finite group of order n is isomorphic to a subgroup of the symmetric group on n
- THEOREM OF THE DAY Neumann's Separation Lemma Let G be a permutation group acting on an infinite set with no finite
- M. Sc. Examination by course unit 2011 MTHM024 Group Theory
- Matroid Representation Over Infinite Fields General Theme
- Well-quasi-ordering Binary Matroids Jim Geelen, Bert Gerards, and Geoff Whittle
- Conference matrices Peter J. Cameron
- MTHM024/MTH714U Group Theory Notes 0 Autumn 2011
- MTHM024/MTH714U Group Theory Solutions 1 October 2011
- Combinatorics entering the third millennium Peter J. Cameron
- B. Sc. Examination by course unit 2011 MTH6128 Number Theory
- B. Sc. Examination by course unit 2010 MTH6128 Number Theory
- MTH6128 Number Theory Preliminary exercise sheet Not for assessment
- B. Sc. Examination by course unit 2012 MTH6128 Number Theory
- B. Sc. Examination by course unit 2009 MTH6128 Number Theory