Prest, Mike - Department of Mathematics, University of Manchester

• Sheaves of rings of definable scalars Department of Mathematics
• ZIEGLER SPECTRA OVER SERIAL RINGS AND COALGEBRAS
• STABILITY, SIMPLICITY AND THE MODEL THEORY OF BILINEAR FORMS
• MATH32012 Commutative Algebra 1 Background: what you should have seen al-
• 13 Solutions for Section 6 Exercise 6.2 Draw up the group table for S3. List, giving each as a product of
• MODELTHEORETIC IMAGINARIES AND ZIEGLER
• Locally Finitely Presented Categories of Sheaves Mike Prest and Alexandra Ralph,
• MATH32012: Commutative Algebra Solutions to Exercises for Section 6
• MATH32012: Commutative Algebra Solutions to Exercises for Section 4
• 11 Solutions for Section 4 Exercise 4.5 What are the irreducible elements of the polynomial ring R[X]?
• MATH32012: Commutative Algebra Exercises, with solutions, for Section 1
• 5 Grobner bases Throughout this section K will be a field and K[X] = K[X1, . . . , Xt] is a poly-
• 14 Solutions for Section 7 Exercise 7.5 Show that the centre of G is a normal subgroup.
• 10 Solutions for Section 3 Exercise 3.9 Determine the ideals of Z24 and match these up with the ideals
• Intermediate Model Theory (Notes by Josephine de la Rue and Marco Ferreira)
• MATH32012: Commutative Algebra Solutions to Exercises for Section 5
• 3 Factorisation into irreducibles Consider the factorisation of a non-zero, non-invertible integer n as a product
• THE UNIVERSITY OF MANCHESTER ALGEBRAIC STRUCTURES 2
• 4 Ideals in commutative rings 4.1 Noetherian rings
• 6 Field extensions and algebraically closed fields 6.1 Algebraically closed fields
• 7 Zero sets and ideals 7.1 Zero sets of ideals
• MATH30212: Commutative Algebra Exercises, with solutions, for Section 3
• MATH32012: Commutative Algebra Solutions to Exercises for Section 7
• MATH32012: Commutative Algebra Assessment 2: Solutions
• 12 Solutions for Section 5 Exercise 5.8 We have K = Q, f = X4
• Purity, Spectra and Localisation: typos, corrections and Typos and small corrections
• Positive Imaginaries and Coherent Affine Functors
• Model Theory in Additive Categories School of Mathematics
• ONE-DIRECTED INDECOMPOSABLE PURE INJECTIVE MODULES OVER STRING ALGEBRAS
• Algebraic Structures 2: Practice Exam This is a practice exam in the sense that the questions are the kind of thing you can expect to see
• 8 Appendix: Polynomial Rings Throughout we suppose, unless otherwise specified, that R is a commutative
• MATH32012: Commutative Algebra Exercises, with solutions, for Section 2
• PURE-INJECTIVE MODULES OVER TUBULAR ALGEBRAS AND STRING
• 8 Solutions for Section 1 The amount of detail in the solutions varies: sometimes it's just a sketch; some-
• MATH20212: Algebraic Structures 2 This follows on from Algebraic Structures 1 MATH20201, so some basic
• MATH20212: Algebraic Structures 2 This file contains just the exercises from the notes.
• 9 Solutions for Section 2 Exercise 2.1 Show that isomorphism is an equivalence relation on rings. (Of
• ZIEGLER SPECTRA OF VALUATION A thesis submitted to the University of Manchester
• MATH19730 Part 1 Section2 Trigonometry
• MATH19730/19740 Part 1 Mathematics I (formerly known as MATH19731/19741)
• MATH19730 Part 1 Exercise Sheet 8 Solutions
• MATH19730 Part 1 Section 1 Algebra and Graphs
• MATH19730 Part 1 Exercise Sheet 1 Graphs
• MATH19730 Part 1 Section 3 Probability and Statistics
• MATH19730 Part 1 Exercise Sheet 4 Probability
• MATH19730 Part 1 Exercise Sheet 5 Probability Distributions
• MATH19730 Part 1 Exercise Sheet 6 Solutions
• MATH19730 Part 1 Exercise Sheet 3 Solutions
• MATH19730 Part 1 Section 4 Differentiation
• MATH19730 Part 1 Exercise Sheet 6
• MATH19730 Part 1 Exercise Sheet 2 Solutions
• MATH19730 Part 1 Section 5 Integration
• Categories of imaginaries for additive structures Department of Mathematics
• MATH19730 Part 1 Exercise Sheet 7 Solutions
• MATH19730 Part 1 Exercise Sheet 2 Powers and logarithms
• MATH19730 Part 1 Exercise Sheet 1 Solutions
• 3 Beth trees: Solutions 1. Use Beth trees to determine whether or not each of the following is true
• 7 A Hilbert-style system: Exercises 1. Show, using the Hilbert-style calculus (which should be used for all the
• 4 Normal forms: Solutions 1. Find a disjunctive normal form for each of the following propositional terms
• ESSENTIALLY ALGEBRAIC THEORIES AND LOCALIZATIONS IN
• Spectra of small abelian categories Mike Prest,
• MATH19730 Mathematics Extra questions on probability and statistics
• arXiv:1112.0799v1[math.RT]4Dec2011 THE GABRIELROITER FILTRATION OF THE ZIEGLER
• 2 Valuations: Exercises 1. Draw up truth tables for each of the following propositional terms.
• MATH20302 Propositional Logic 2012 Coursework 1
• 2 Valuations: Solutions 1. Draw up truth tables for each of the following propositional terms.
• Abelian categories and definable additive Mike Prest,
• 1 Propositional terms: Exercises 1. Suppose that
• 1 Propositional terms: Solutions 1. Suppose that
• 6 Interpolation: Solutions 1. You are given that (p r) (q r) |= (s p) (s q). Find an
• MATH20302 Propositional Logic School of Mathematics
• Interpolation Suppose that s and t are propositional terms and that s |= t, equivalently s t
• 5 Adequate sets of connectives: Solutions 1. Show that {, } is an adequate set of connectives.
• Categories of imaginaries for definable additive Mike Prest,