MATH321-25S1 (C) Semester One 2025

Rings and Fields

15 points

Details:
Start Date: Monday, 17 February 2025
End Date: Sunday, 22 June 2025
Withdrawal Dates
Last Day to withdraw from this course:
  • Without financial penalty (full fee refund): Sunday, 2 March 2025
  • Without academic penalty (including no fee refund): Sunday, 11 May 2025

Description

An introduction to fields and rings, including applications to coding theory and the impossibility of constructions such as ‘squaring the circle’.

This course formally introduces rings and fields, which have been encountered at 100- and 200-level in special situations, and investigates their algebraic structure. It gives a deeper understanding of these algebraic concepts and thus provides a thorough grounding in the algebraic theory which underpins modern applications like cryptography, error-correcting codes, number theory or finite mathematics. If you are interested in any of these subjects or if you want to see how algebraic theory can be applied to solve certain geometric construction problems or prove their impossibility, then this is the course to take.

The topics covered by this course are:

• fundamentals of ring theory: subrings, ideals, factor rings, ring homomorphisms;  
• special rings: integral domains and polynomial rings and factorizations of elements therein;  
• fundamentals of field theory: field extensions, constructions of fields, in particular finite fields, and their uses, like the impossibility of certain geometric constructions such as trisecting the angle.

Learning Outcomes

  • Students successfully completing this course should:

  • understand a range of basic algebraic concepts.
  • have developed a high level of competence at core algebraic skills.
  • be able to confidently apply algebraic concepts in practical settings.
  • be able to present clear and logical mathematical arguments.

      • University Graduate Attributes

      This course will provide students with an opportunity to develop the Graduate Attributes specified below:

      Critically competent in a core academic discipline of their award

      Students know and can critically evaluate and, where applicable, apply this knowledge to topics/issues within their majoring subject.

      Employable, innovative and enterprising

      Students will develop key skills and attributes sought by employers that can be used in a range of applications.

Prerequisites

15 points from (MATH220, MATH203, EMTH211) and a further 15 points from (MATH201, MATH202, MATH203, MATH220, MATH240, EMTH210, EMTH211). RP: MATH220 and MATH203

Restrictions

MATH439, MATH311

Recommended Preparation

Timetable 2025

Students must attend one activity from each section.

Lecture A
Activity Day Time Location Weeks
01 Wednesday 12:00 - 13:00 Link 309 Lecture Theatre
17 Feb - 23 Feb
Lecture B
Activity Day Time Location Weeks
01 Thursday 10:00 - 11:00 Link 309 Lecture Theatre
17 Feb - 6 Apr
28 Apr - 1 Jun
Lecture C
Activity Day Time Location Weeks
01 Monday 15:00 - 16:00 Jack Erskine 446
24 Feb - 6 Apr
28 Apr - 1 Jun
Tutorial A
Activity Day Time Location Weeks
01 Friday 12:00 - 13:00 Jack Erskine 441
17 Feb - 30 Mar
28 Apr - 1 Jun

Examinations, Quizzes and Formal Tests

Test A
Activity Day Time Location Weeks
01 Friday 12:00 - 13:00 Jack Erskine 441
31 Mar - 6 Apr

Course Coordinator

Geertrui Van de Voorde

Assessment

Tutorial Attendance 5%
Assignment 20%
Test  25%
Final Exam 50%

To obtain a pass (C- or better), you must obtain at least 40% in the exam.

Textbooks / Resources

Recommended Reading

Joseph Gallian; Contemporary Abstract Algebra ; 10th (or earlier edition); Taylor & Francis Ltd, 2021.

Course links

Library portal
LEARN

Indicative Fees

Domestic fee $897.00

International fee $5,188.00

* All fees are inclusive of NZ GST or any equivalent overseas tax, and do not include any programme level discount or additional course-related expenses.

For further information see Mathematics and Statistics .

All MATH321 Occurrences

  • MATH321-25S1 (C) Semester One 2025
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