# MATHS 731 : Functional Analysis

## Science

### Course Prescription

Provides the mathematical foundations behind some of the techniques used in applied mathematics and mathematical physics; it explores how many phenomena in physics can be described by the solution of a partial differential equation, for example the heat equation, the wave equation and Schrödinger's equation. Recommended preparation: MATHS 730 and 750.

### Course Overview

This course builds upon the topics from MATHS 332 and MATHS 333, as well as, the topics in MATHS 730 and MATHS 750. It provides the basis of modern Analysis, as developed in the 20th Century. Anyone contemplating a career in Analysis/Functional Analysis should complete this course. In terms of specific content the course covers:  Finite Dimensional Banach spaces; Hilbert Spaces; The Hahn-Banach Theorem (including Separation Theorems); Open Mapping Theorem; Closed Graph Theorem and Uniform Boundedness Theorem.  The course also covers aspects of  Banach Algebras, including the Gelfand Transform and also covers the Spectral Mapping Theorem for compact normal operator  defined on Hilbert spaces.

### Course Requirements

Prerequisite: MATHS 332 and 333

### Capabilities Developed in this Course

 Capability 1: Disciplinary Knowledge and Practice Capability 2: Critical Thinking Capability 3: Solution Seeking Capability 4: Communication and Engagement

### Learning Outcomes

By the end of this course, students will be able to:
1. Understand and explain in written form the fundamentals results of functional analysis (Capability 1)
2. Apply the fundamental tools of functional analysis to solve some concrete problems in analysis (Capability 2 and 3)
3. Describe precisely some of the major theorems in functional analysis (Capability 1 and 4)
4. Apply the fundamental tools of functional analysis to solve some abstract problems in analysis (Capability 1, 2, 3 and 4)

### Assessments

Assessment Type Percentage Classification
Assignments 30% Individual Coursework
Final Exam 70% Individual Coursework
1 2 3 4
Assignments
Final Exam
The grade for this course is determined by either  70% Exam mark  and 30% Assignments or 100% Exam mark, which ever is  higher.

### Key Topics

Banach spaces and Banach Algebras

### Special Requirements

Must obtain at least 35% in the final exam.

This course is a standard 15 point course and students are expected to spend 10 hours per week involved in each 15 point course that they are enrolled in.

For this course, you can expect 36 hours of lectures, 72 hours of reading and thinking about the content and 12 hour of work on assignments and/or test preparation.

### Delivery Mode

#### Campus Experience

Attendance is expected for scheduled Lectures. Lectures will be available as recordings, assuming the lecture rooms have recording facilities.  The course will not include live online events. Attendance on campus is required for the exam. The activities for the course are scheduled as a standard weekly timetable.

### Learning Resources

Course materials are made available in a learning and collaboration tool called Canvas which also includes reading lists and lecture recordings (where available).

Please remember that the recording of any class on a personal device requires the permission of the instructor.

Course book

### Student Feedback

During the course Class Representatives in each class can take feedback to the staff responsible for the course and staff-student consultative committees.

At the end of the course students will be invited to give feedback on the course and teaching through a tool called SET or Qualtrics. The lecturers and course co-ordinators will consider all feedback.

Your feedback helps to improve the course and its delivery for all students.

The University of Auckland will not tolerate cheating, or assisting others to cheat, and views cheating in coursework as a serious academic offence. The work that a student submits for grading must be the student's own work, reflecting their learning. Where work from other sources is used, it must be properly acknowledged and referenced. This requirement also applies to sources on the internet. A student's assessed work may be reviewed against online source material using computerised detection mechanisms.

### Class Representatives

The content and delivery of content in this course are protected by copyright. Material belonging to others may have been used in this course and copied by and solely for the educational purposes of the University under license.

You may copy the course content for the purposes of private study or research, but you may not upload onto any third party site, make a further copy or sell, alter or further reproduce or distribute any part of the course content to another person.

### Inclusive Learning

All students are asked to discuss any impairment related requirements privately, face to face and/or in written form with the course coordinator, lecturer or tutor.

Student Disability Services also provides support for students with a wide range of impairments, both visible and invisible, to succeed and excel at the University. For more information and contact details, please visit the Student Disability Services’ website

### Special Circumstances

If your ability to complete assessed coursework is affected by illness or other personal circumstances outside of your control, contact a member of teaching staff as soon as possible before the assessment is due.

If your personal circumstances significantly affect your performance, or preparation, for an exam or eligible written test, refer to the University’s aegrotat or compassionate consideration page .

This should be done as soon as possible and no later than seven days after the affected test or exam date.

### Learning Continuity

In the event of an unexpected disruption, we undertake to maintain the continuity and standard of teaching and learning in all your courses throughout the year. If there are unexpected disruptions the University has contingency plans to ensure that access to your course continues and course assessment continues to meet the principles of the University’s assessment policy. Some adjustments may need to be made in emergencies. You will be kept fully informed by your course co-ordinator/director, and if disruption occurs you should refer to the university website for information about how to proceed.

The delivery mode may change depending on COVID restrictions. Any changes will be communicated through Canvas.

### Student Charter and Responsibilities

The Student Charter assumes and acknowledges that students are active participants in the learning process and that they have responsibilities to the institution and the international community of scholars. The University expects that students will act at all times in a way that demonstrates respect for the rights of other students and staff so that the learning environment is both safe and productive. For further information visit Student Charter .

### Disclaimer

Elements of this outline may be subject to change. The latest information about the course will be available for enrolled students in Canvas.

In this course students may be asked to submit coursework assessments digitally. The University reserves the right to conduct scheduled tests and examinations for this course online or through the use of computers or other electronic devices. Where tests or examinations are conducted online remote invigilation arrangements may be used. In exceptional circumstances changes to elements of this course may be necessary at short notice. Students enrolled in this course will be informed of any such changes and the reasons for them, as soon as possible, through Canvas.

Published on 28/10/2021 08:25 p.m.