Mathematics - Applied
The programme MSc in Applied Mathematics is one of two taught postgraduate programmes delivered by the School of Mathematical Sciences. It offers a broad range of topics in applied mathematics and is suitable for applicants from a wide variety of backgrounds. It is designed to cater not only for those who wish to develop an advanced level of mathematical knowledge and practical skills relevant to problem solving in diverse, real-world contexts but also for those that simply wish to develop their understanding and appreciation of a fundamental branch of mathematics.
The programme can be undertaken either full time over 3 semesters (approximately 18 months) or part time over 6 semesters (3 years) and is structured to suit both full-time students and those that are combining study with a career or family life. New entrants can start the programme either in September or January. The programme encourages students to engage in autonomous, self-directed learning whilst providing a supportive environment where lecturers and stage coordinators facilitate and mentor learning.
The programme will emphasise the use of mathematics to solve problems and will build students' mathematical knowledge and their ability to analyse problems and apply advanced mathematical techniques in a rigorous manner. Successful applicants will require a primary degree at second-class or higher classification and will be drawn from computing, engineering, mathematics, physics and other scientific and numerate backgrounds. Graduates of MSc Applied Mathematics will be flexible, highly-qualified, technical professionals with advanced analytical and problem-solving skills suitable to enter, and apply their knowledge in, a wide range of sectors and professions.
The programme is particularly suitable for international applicants and a pre-masters preparation year is also being developed.
Prospective applicants may, in addition, wish to consider and apply for MSc Mathematical Physics in the School of Mathematical Sciences.
The option of studying elements of the programme via distance learning or undertaking individual modules as Continuing Professional Development (CPD) modules may be available. Interested applicants should contact the programme coordinator (Chris.Hills@tudublin.ie) for details.
Students wishing to enrol should normally possess a minimum of the equivalent of an honours degree (level 8 on the NFQ) in mathematics, science, engineering or other numerate discipline at Grade 2.2 or higher where mathematics was studied as a significant component for approximately three years.
The relevance and mathematical content of an applicant's primary degree and other experience will be assessed by the admissions team for the programme whose decision is final. Attainment of the minimum entry requirements does not guarantee entry to the programme and all candidates will be assessed against the entry criteria, in the context of the available places on the programme, for their prior learning and on their ability to succeed.
The taught modules are assessed by a combination of written examinations and continuous assessment undertaken during the semester. Some modules may also involve practical tasks. The assessment of the project module is based upon the written work, feedback and participation during the module and a viva voce examination.
Examinations for Semester I modules take place in January and examinations for Semester II modules take place immediately following the end of teaching in May. Reassessment takes place in August. Students are required to attend the Institute and be available for examinations.
The programme MSc Applied Mathematics comprises ten taught modules (each of one semester duration accumulated over two semesters full time or four semesters part time) followed by a dissertation (studied over one semester full time or four semesters part time). The programme comprises a student work load of 90 ECTS credits and the project contributes 25 ECTS credits. All modules are core and learning is supported by the use of software, group learning, supported practical sessions, seminars and the student library and study facilities.
Exit awards of Postgraduate Diploma (60 ECTS credits) and Postgraduate Certificate (30 ECTS credits) are available.
The following topics are covered in the taught modules:
Methods for Applied Mathematics
Modern Applied Statistical Modelling
Algorithms & Approximation Theory
Classical Mechanics & Thermodynamics
Special Relativity & Tensor Calculus
Numerical Methods for Differential Equations
The project is a substantial piece of academic written work and will normally be based upon a topic closely related to modules on the programme and may include an extensive literature review. The Research Skills module provides an excellent preparation for the project module and students are supported in this module by an assigned academic supervisor and their peers.
6 semesters (3 years)
Mode of Study Part Time
Method of Delivery Classroom, Online
Each module is delivered over one semester. Part-time students undertake lectures and tutorials two or three evenings per week (from approximately 6.30pm). The Mathematical Laboratory and Research Skills modules combine initial face-to-face delivery on the third evening with online learning. Laboratory sessions to support modules and students' learning are also available on the third evening.
Commencement Date September 2020
Location City Centre: Grangegorman
Post Course Info
Graduates of the programme are extremely flexible and able to apply advanced mathematical techniques and mathematical problem-solving approaches to a wide variety of problems arising in careers in a diverse range of employment sectors.
In particular, graduates of this programme have enhanced technical and scientific capabilities, analytical and problem solving skills, and are well equipped for high-level careers in industry, commerce, the professions and the public sector. For example, graduates are well suited to careers in finance, information and communication technologies, data analysis, the public sector and teaching.
Applied Mathematics is a research strength of the School of Mathematical Sciences and there are also opportunities for graduates to undertake further research in the DIT or elsewhere. The project module provides a preparation for embarking upon a PhD or MPhil by research.