Bailey, R. A. - School of Mathematical Sciences, Queen Mary, University of London

• MTH4106 Introduction to Statistics Notes 6 Spring 2011
• QUEEN MARY, UNIVERSITY OF LONDON MTH 4106 Introduction to Statistics
• QUEEN MARY, UNIVERSITY OF LONDON
• MTH4106 Introduction to Statistics Notes 15 Spring 2011
• QUEEN MARY, UNIVERSITY OF LONDON MTH 4106 Introduction to Statistics
• MAS 108 Probability I Notes 1 Autumn 2005
• MTH4106 Introduction to Statistics Test 2 1 April 2010, 15101550
• QUEEN MARY, UNIVERSITY OF LONDON MAS 314 Design of Experiments
• MTH 6104 Algebraic Structures II Notes 4 Autumn 2010
• Forward Look 1.1 Stages in a statistically designed experiment
• 4.1 Types of block If the plots are not all reasonably similar, we should group them into blocks in
• More about Latin Squares 9.1 Uses of Latin squares
• Chapter 13 Fractional Factorials
• Rectangular experiments: restricted randomization or row-column designs?
• Rectangular experiments: restricted randomization or row-column designs?
• Optimal Designs for Diallel Experiments R. A. Bailey
• Structure balance for experiments which are randomized in stages
• Crested products R. A. Bailey
• Design of dose-escalation trials R. A. Bailey
• Experiments in rectangular areas: restricted randomization or row-column designs?
• Statistical considerations in the construction of designs for two-colour microarray experiments
• Efficient designs for two-colour microarray experiments
• QUEEN MARY, UNIVERSITY OF LONDON MTH4106 Introduction to Statistics
• QUEEN MARY, UNIVERSITY OF LONDON MTH 4106 Introduction to Statistics
• QUEEN MARY, UNIVERSITY OF LONDON MTH 4106 Introduction to Statistics
• QUEEN MARY, UNIVERSITY OF LONDON MTH 4106 Introduction to Statistics
• QUEEN MARY, UNIVERSITY OF LONDON MTH 4106 Introduction to Statistics
• QUEEN MARY, UNIVERSITY OF LONDON MTH 4106 Introduction to Statistics
• QUEEN MARY, UNIVERSITY OF LONDON MTH 4106 Introduction to Statistics
• MTH4106 Introduction to Statistics Notes 1 Spring 2011
• MTH4106 Introduction to Statistics Notes 2 Spring 2011
• MTH4106 Introduction to Statistics Notes 3 Spring 2011
• MTH4106 Introduction to Statistics Notes 5 Spring 2011
• MTH4106 Introduction to Statistics Notes 7 Spring 2011
• MTH4106 Introduction to Statistics Notes 8 Spring 2011
• MTH4106 Introduction to Statistics Notes 10 Spring 2011
• MTH4106 Introduction to Statistics Notes 11 Spring 2011
• MTH4106 Introduction to Statistics Notes 12 Spring 2011
• MTH4106 Introduction to Statistics Notes 13 Spring 2011
• MTH4106 Introduction to Statistics Test 1 25 February 2010, 14101450
• MTH4106 Introduction to Statistics Test 1 24 February 2011, 14101450
• MTH4106 Introduction to Statistics Test 2 1 April 2011, 10101050
• MTH4106 Introduction to Statistics Test 2 1 April 2011, 10101050
• MTH 6104 Algebraic Structures II Notes 5 Autumn 2010
• MTH 6104 Algebraic Structures II Notes 6 Autumn 2010
• MTH 6104 Algebraic Structures II Notes 8 Autumn 2010
• QUEEN MARY, UNIVERSITY OF LONDON MTH6104 Algebraic Structures II
• QUEEN MARY, UNIVERSITY OF LONDON MTH 6104 Algebraic Structures II
• QUEEN MARY, UNIVERSITY OF LONDON MTH 6104 Algebraic Structures II
• QUEEN MARY, UNIVERSITY OF LONDON MTH 6104 Algebraic Structures II
• B. Sc. Examination by course unit 2009 MTH6104 Algebraic Structures II
• B. Sc. Examination 2008 MAS305 Algebraic Structures II
• QUEEN MARY, UNIVERSITY OF LONDON
• QUEEN MARY, UNIVERSITY OF LONDON MAS 108 Probability I
• QUEEN MARY, UNIVERSITY OF LONDON MAS 108 Probability I
• QUEEN MARY, UNIVERSITY OF LONDON MAS 108 Probability I
• QUEEN MARY, UNIVERSITY OF LONDON MAS 108 Probability I
• QUEEN MARY, UNIVERSITY OF LONDON MAS 108 Probability I
• MAS 108 Probability I Notes 2 Autumn 2005
• MAS 108 Probability I Notes 3 Autumn 2005
• MAS 108 Probability I Notes 7 Autumn 2005
• MAS 108 Probability I Notes 10 Autumn 2005
• MAS 108 Probability I Notes 11 Autumn 2005
• MAS 108 Probability I In-term Test 10 November 2004, 12:10pm12:55pm
• MAS 108 Probability I In-term Test 10 November 2004, 12:10pm12:55pm
• MAS 108 Probability I In-term Test 8 November 2002, 10:05am10:55am
• QUEEN MARY, UNIVERSITY OF LONDON MAS 305 Algebraic Structures II
• QUEEN MARY, UNIVERSITY OF LONDON MAS 305 Algebraic Structures II
• QUEEN MARY, UNIVERSITY OF LONDON MAS 305 Algebraic Structures II
• QUEEN MARY, UNIVERSITY OF LONDON MAS 305 Algebraic Structures II
• QUEEN MARY, UNIVERSITY OF LONDON MAS 305 Algebraic Structures II
• MAS 305 Algebraic Structures II Notes 2 Autumn 2006
• MAS 305 Algebraic Structures II Notes 3 Autumn 2006
• MAS 305 Algebraic Structures II Notes 5 Autumn 2006
• MAS 305 Algebraic Structures II Notes 7 Autumn 2006
• MAS 305 Algebraic Structures II Notes 11 Autumn 2006
• MAS 305 Algebraic Structures II Notes 13 Autumn 2006
• MAS 305 Algebraic Structures II Notes 14 Autumn 2006
• QUEEN MARY, UNIVERSITY OF LONDON MAS 314 Design of Experiments
• QUEEN MARY, UNIVERSITY OF LONDON MAS 314 Design of Experiments
• QUEEN MARY, UNIVERSITY OF LONDON MAS 314 Design of Experiments
• QUEEN MARY, UNIVERSITY OF LONDON MAS 314 Design of Experiments
• QUEEN MARY, UNIVERSITY OF LONDON MAS 314 Design of Experiments
• QUEEN MARY, UNIVERSITY OF LONDON MAS 314 Design of Experiments
• QUEEN MARY, UNIVERSITY OF LONDON MAS 314 Design of Experiments
• QUEEN MARY, UNIVERSITY OF LONDON MAS 314 Design of Experiments
• QUEEN MARY, UNIVERSITY OF LONDON MAS 314 Design of Experiments
• QUEEN MARY, UNIVERSITY OF LONDON MAS 314 Design of Experiments
• QUEEN MARY, UNIVERSITY OF LONDON MAS 314 Design of Experiments
• QUEEN MARY, UNIVERSITY OF LONDON MAS 314 Design of Experiments
• QUEEN MARY, UNIVERSITY OF LONDON
• QUEEN MARY, UNIVERSITY OF LONDON Association Schemes and Partially
• 1.3 Matrices Given a field F, the set F of functions from to F forms a vector space. Addi-
• The Bose-Mesner Algebra 2.1 Orthogonality
• The key fact for dealing with two or more matrices in A is that A is commuta-tive; that is, if M A and N A then MN = NM. This follows from Lemma 1.2.
• 2.5 Parameters of strongly regular graphs Let G be a strongly regular graph on n vertices. Put a1 = a, p1
• Partially Balanced Incomplete-Block Designs
• 3.3 Random variables This section is a very brief recall of the facts we need about random variables. I
• QUEEN MARY, UNIVERSITY OF LONDON
• 4.3 Orthogonal block structures Definition An orthogonal block structure on a set is a set F of pairwise or-
• QUEEN MARY AND WESTFIELD COLLEGE MAS 417 Association Schemes and Partially
• QUEEN MARY AND WESTFIELD COLLEGE MAS 417 Association Schemes and
• UNIVERSITY OF LONDON QUEEN MARY AND WESTFIELD COLLEGE
• Small Units inside Large Units 8.1 Experimental units bigger than observational units
• Chapter 11 Incomplete-Block Designs
• Chapter 12 Factorial Designs in Incomplete
• MAS 305 Algebraic Structures II Notes 6 Autumn 2006
• 1.4 Some special association schemes We have already met the trivial, group divisible and rectangular association schemes.
• MTH 6104 Algebraic Structures II Notes 2 Autumn 2010
• MAS 108 Probability I Test 11 November 2005, 16101655
• 1 Association Schemes 1 1.1 Partitions . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1
• QUEEN MARY, UNIVERSITY OF LONDON MAS 314 Design of Experiments
• Experiments on People and 7.1 Introduction
• MAS 108 Probability I Notes 5 Autumn 2005
• MAS 108 Probability I Solution to challenge problem Autumn 2005
• QUEEN MARY, UNIVERSITY OF LONDON MAS 108 Probability I
• MAS 305 Algebraic Structures II Notes 8 Autumn 2006
• QUEEN MARY, UNIVERSITY OF LONDON MTH 4106 Introduction to Statistics
• Row-Column Designs 6.1 Double blocking
• Design of dose-escalation trials R. A. Bailey
• MTH 6104 Algebraic Structures II Notes 1 Autumn 2010
• MAS 108 Probability I Test 11 November 2005, 16101655
• Efficient designs for two-colour microarray experiments
• Association Schemes 1.1 Partitions
• Design of dose-escalation trials R. A. Bailey
• QUEEN MARY, UNIVERSITY OF LONDON MAS 314 Design of Experiments
• QUEEN MARY, UNIVERSITY OF LONDON MAS 108 Probability I
• MTH4106 Introduction to Statistics Notes 4 Spring 2011
• QUEEN MARY, UNIVERSITY OF LONDON MAS 314 Design of Experiments
• MAS 305 Algebraic Structures II Notes 1 Autumn 2006
• Chapter 10 The Calculus of Factors
• 2.4 Techniques Given an association scheme in terms of its parameters of the first kind, we want
• QUEEN MARY, UNIVERSITY OF LONDON MTH 4106 Introduction to Statistics
• QUEEN MARY, UNIVERSITY OF LONDON MTH 4106 Introduction to Statistics
• Design of Comparative Experiments R. A. Bailey
• QUEEN MARY, UNIVERSITY OF LONDON MAS 305 Algebraic Structures II
• MTH4106 Introduction to Statistics Notes 14 Spring 2011
• QUEEN MARY, UNIVERSITY OF LONDON MAS 108 Probability I
• MTH 6104 Algebraic Structures II Notes 9 Autumn 2010
• B. Sc. Examination by course unit 2010 MTH6104 Algebraic Structures II
• QUEEN MARY, UNIVERSITY OF LONDON Association Schemes and Partially
• MAS 108 Probability I Notes 9 Autumn 2005
• QUEEN MARY, UNIVERSITY OF LONDON MAS 108 Probability I
• Resolved designs viewed as sets of partitions 1 Incomplete-block Designs
• Teaching mathematics: satnav or map? R. A. Bailey
• Block designs, spanning trees and resistance in electrical networks
• QUEEN MARY, UNIVERSITY OF LONDON MTH 4106 Introduction to Statistics
• QUEEN MARY AND WESTFIELD COLLEGE MAS 417 Association Schemes and
• QUEEN MARY, UNIVERSITY OF LONDON MAS 108 Probability I
• Factorial Treatment Structure 5.1 Treatment factors and their subspaces
• MAS 108 Probability I Notes on summation Autumn 2005
• 3.2. PARTIALLY BALANCED INCOMPLETE-BLOCK DESIGNS 55 3.2 Partially balanced incomplete-block designs
• B. Sc. Examination by Course Unit 2005 MAS 108 Probability I
• ANOVA and Statistical Models R. A. Bailey
• QUEEN MARY, UNIVERSITY OF LONDON MAS 305 Algebraic Structures II
• QUEEN MARY, UNIVERSITY OF LONDON MAS 108 Probability I
• QUEEN MARY, UNIVERSITY OF LONDON MAS 314 Design of Experiments
• B. Sc. Examination by course unit 2010 MTH4106 Introduction to Statistics
• QUEEN MARY, UNIVERSITY OF LONDON MAS 314 Design of Experiments
• MAS 108 Probability I Notes 4 Autumn 2005
• 3.7 Cyclic designs Let = Zt. For , a translate of is a set of the form
• QUEEN MARY, UNIVERSITY OF LONDON MTH 4106 Introduction to Statistics
• QUEEN MARY, UNIVERSITY OF LONDON MAS 108 Probability I
• QUEEN MARY, UNIVERSITY OF LONDON Association Schemes and Partially
• QUEEN MARY, UNIVERSITY OF LONDON MTH 4106 Introduction to Statistics
• MTH4106 Introduction to Statistics Test 1 24 February 2011, 14101450
• MAS 108 Probability I Notes 6 Autumn 2005
• QUEEN MARY, UNIVERSITY OF LONDON MAS 314 Design of Experiments
• QUEEN MARY, UNIVERSITY OF LONDON MAS 305 Algebraic Structures II
• MAS 108 Probability I Notes 8 Autumn 2005
• MAS 108 Probability I Continuous random variables Summary
• QUEEN MARY, UNIVERSITY OF LONDON MAS 108 Probability I
• Structure balance and ANOVA tables for experiments which are randomized in stages
• 2.3 The character table For i in K and e in E let C(i,e) be the eigenvalue of Ai on We and let D(e,i) be the
• QUEEN MARY, UNIVERSITY OF LONDON MAS 108 Probability I
• MAS 108 Probability I Discrete random variables Summary
• QUEEN MARY, UNIVERSITY OF LONDON MAS 314 Design of Experiments
• QUEEN MARY, UNIVERSITY OF LONDON MAS 314 Design of Experiments
• Some statistical issues in the design of experiments on animals or people
• 3.5. EFFICIENCY FACTORS 63 3.5 Efficiency factors
• Multiple randomizations R. A. Bailey
• QUEEN MARY, UNIVERSITY OF LONDON MTH 4106 Introduction to Statistics
• QUEEN MARY, UNIVERSITY OF LONDON MAS 314 Design of Experiments
• Conflicts between Optimality Criteria in Incomplete-Block Designs for Microarray
• MTH 6104 Algebraic Structures II Notes 7 Autumn 2010
• QUEEN MARY, UNIVERSITY OF LONDON MTH 4106 Introduction to Statistics
• QUEEN MARY, UNIVERSITY OF LONDON MTH 4106 Introduction to Statistics
• MAS 108 Probability I Notes 12 Autumn 2005
• Graphs from block designs: concurrence, distance, variance and electrical resistance
• MAS 305 Algebraic Structures II Notes 10 Autumn 2006
• Examination by course unit MAS314 Design of Experiments
• QUEEN MARY, UNIVERSITY OF LONDON MAS 314 Design of Experiments
• QUEEN MARY, UNIVERSITY OF LONDON MTH 4106 Introduction to Statistics
• Experiments on People and 6.1 Introduction
• Combining Association Schemes 4.1 Tensor products
• QUEEN MARY, UNIVERSITY OF LONDON MAS 314 Design of Experiments
• Simple treatment structure 3.1 Replication of control treatments
• QUEEN MARY, UNIVERSITY OF LONDON MTH 4106 Introduction to Statistics
• Theorem 2.6 Let A be the Bose-Mesner algebra of an association scheme on with s associate classes and adjacency matrices A0, A1, . .., As. Then R has s+1
• B. Sc. Examination by course unit 2010 MTH4106 Introduction to Statistics, Sample paper
• MAS 305 Algebraic Structures II Notes 12 Autumn 2006
• Teaching the principles of design of experiments R. A. Bailey
• QUEEN MARY, UNIVERSITY OF LONDON MTH 4106 Introduction to Statistics
• QUEEN MARY, UNIVERSITY OF LONDON MTH 4106 Introduction to Statistics
• QUEEN MARY, UNIVERSITY OF LONDON MAS 305 Algebraic Structures II
• QUEEN MARY AND WESTFIELD COLLEGE MAS 417 Association Schemes and Partially
• Unstructured Experiments 2.1 Completely randomized designs
• Families of Partitions 4.1 A partial order on partitions
• MTH4106 Introduction to Statistics Notes 9 Spring 2011
• QUEEN MARY, UNIVERSITY OF LONDON MAS 314 Design of Experiments
• MAS 305 Algebraic Structures II Notes 4 Autumn 2006
• MAS 305 Algebraic Structures II Notes 9 Autumn 2006
• QUEEN MARY, UNIVERSITY OF LONDON MAS 314 Design of Experiments
• QUEEN MARY, UNIVERSITY OF LONDON MAS 108 Probability I
• MTH 6104 Algebraic Structures II Notes 3 Autumn 2010
• B. Sc. Examination by course unit 2011 MTH4106 Introduction to Statistics
• Design and analysis of experiments testing for diversity in ecology
• Bad Statistics R. A. Bailey
• Conflicts between optimality criteria for block designs with low replication
• Using characters of Abelian groups, (and the design key), to construct designs for experiments
• Design of two-phase experiments R. A. Bailey
• Block designs on the edge R. A. Bailey
• Optimal design of experiments with very low average replication
• Conflicts between optimality criteria for block designs with low replication
• Conflicts between optimality criteria for block designs with low replication
• Conflicts between optimality criteria for block designs with low replication
• Circular designs balanced for neighbours at distances one and two
• John Ashworth Nelder 19242010 Contributions to Statistics
• From Rothamsted to Northwick Park: designing experiments to avoid bias and reduce variance
• ANOVA and Statistical Models R. A. Bailey
• Current issues in statistical theory and application: Panel discussion