APP MTH 3001 - Applied Probability III

North Terrace Campus - Semester 1 - 2022

Many processes in the real world involve some random variation superimposed on a deterministic structure. For example, the experiment of flipping a coin is best studied by treating the outcome as a random one. Mathematical probability has its origins in games of chance with dice and cards, from the fifteenth and sixteenth centuries. This course aims to provide a basic tool kit for modelling and analysing discrete-time problems in which there is a significant probabilistic component. We will consider Markov chain examples in the course including population branching processes (with application to genetics), random walks (with application to games), and more general discrete time examples using Martingales. Topics covered are: basic probability and measure theory, discrete time Markov chains, hitting probabilities and hitting time theorems, population branching processes, homogeneous random walks on the line, solidarity properties and communicating classes, necessary and sufficient conditions for transience and positive recurrence, global balance, partial balance, reversibility, Martingales, stopping times and stopping theorems with a link to Brownian motion.

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Course Details

Course Code	APP MTH 3001
Course	Applied Probability III
Coordinating Unit	Mathematical Sciences
Term	Semester 1
Level	Undergraduate
Location/s	North Terrace Campus
Units	3
Contact	Up to 3 hours per week
Available for Study Abroad and Exchange	Y
Prerequisites	(MATHS 1012 and MATHS 2103) or (MATHS 2201 and MATHS 2202) or (MATHS 2106 and MATHS 2107)
Assumed Knowledge	Knowledge of Markov Chains such as would be obtained from MATHS 2103
Assessment	Ongoing assessment, exam

Course Staff

Course Coordinator: Jasper Barr

Course Timetable

The full timetable of all activities for this course can be accessed from .

Course Learning Outcomes

demonstrate understanding of the mathematical basis of discrete-time Markov chains and martingales
demonstrate the ability to formulate discrete-time Markov chain models for relevant practical systems
demonstrate the ability to apply the theory developed in the course to problems of an appropriate level of difficulty
demonstrate the ability to conduct a group project applying the theory developed in this course
develop an appreciation of the role of applied probability in mathematical modelling
demonstrate skills in communicating mathematics orally and in writing

最新糖心Vlog Graduate Attributes

This course will provide students with an opportunity to develop the Graduate Attribute(s) specified below:

最新糖心Vlog Graduate Attribute	Course Learning Outcome(s)
Attribute 1: Deep discipline knowledge and intellectual breadth Graduates have comprehensive knowledge and understanding of their subject area, the ability to engage with different traditions of thought, and the ability to apply their knowledge in practice including in multi-disciplinary or multi-professional contexts.	1,2,3,4
Attribute 2: Creative and critical thinking, and problem solving Graduates are effective problems-solvers, able to apply critical, creative and evidence-based thinking to conceive innovative responses to future challenges.	1,2,3,4
Attribute 3: Teamwork and communication skills Graduates convey ideas and information effectively to a range of audiences for a variety of purposes and contribute in a positive and collaborative manner to achieving common goals.	4,5,6
Attribute 4: Professionalism and leadership readiness Graduates engage in professional behaviour and have the potential to be entrepreneurial and take leadership roles in their chosen occupations or careers and communities.	3,4,5,6
Attribute 5: Intercultural and ethical competency Graduates are responsible and effective global citizens whose personal values and practices are consistent with their roles as responsible members of society.	4,6
Attribute 8: Self-awareness and emotional intelligence Graduates are self-aware and reflective; they are flexible and resilient and have the capacity to accept and give constructive feedback; they act with integrity and take responsibility for their actions.	4

Learning Resources

Required Resources

None.

Recommended Resources

There are many good books on probability and statistics in the Barr Smith Library, with the following texts being recommended for this course.

1. "Probability and Random Processes" (Oxford, 2001).
2. "Introduction to Probability Models" by Sheldon Ross (Academic Press, 2010).
3. "An introduction to Stochastic Modelling" by Taylor and Karlin (Academic Press, 1998).
4. "A First Course in Stochastic Processes" by Karlin and Taylor (Academic Press, 1975).
5. "Elementary Probability Theory with Stochastic Processes" by Kai Lai Chung (Springer-Verlag, 1975).
6. "An Introduction to Probability Theory and its Applications" by Feller (Wiley, 1968).
7. "Introduction to Stochastic Models" by Roe Goodman (2nd edition, Dover, 2006).
8. "Markov chains" by James Norris (Cambridge, 1997).

For other texts on probability and statistics, try browsing books with call numbers beginning with 519.2.

Online Learning

This course uses MyUni exclusively for providing electronic resources, such as notes, videos, quizzes, assignments and solutions et cetera.

Learning & Teaching Modes

Each week, lecture notes will be provided, designed to be read in advance of viewing videos. Videos will consist of the lecturer explaining key material and examples from the lecture notes.

The videos will be supported by two weekly classes, a tutorial and a workshop. In the workshop the lecturer will guide you through the week’s material, incorporating active learning exercises, whilst the tutorial is focused on practicing problems to reinforce this learning.

Five written assignments, five online quizzes and a mid-semester test provide the assessment opportunities for students to strengthen their understanding of the theory and their skills in applying it, and gauge and demonstrate their progress and understanding.

The group project allows students to develop their teamwork and communication skills, and apply their knowledge to a challenging problem in a practical environment.

Interaction with the lecturer is encouraged during contact hours.

Workload

The information below is provided as a guide to assist students in engaging appropriately with the course requirements.

Activity	Quantity	Workload hours
Weekly online materials	12 weeks	68
Tutorials	12	24
Workshops	12	12
Mid-semester test	1	1
Online quizzes	5	5
Assignments	5	20
Group project	1	25
Total		155

Learning Activities Summary

**Topics Schedule**
Week 1	Basic probability theory	Sample space and events. Laws of large numbers and the central limit theorem and their interpretation.
Week 2	Basic probability theory.	Algebras and sigma-algebras of events and probability measure.
Week 3	Discrete time Markov chains	Definition of a discrete time Markov chain (DTMC). Random walks.
Week 4	Discrete time Markov chains	Hitting probabilities and hitting times. Classification of states.
Week 5	Discrete time Markov chains	Recurrence and transience.
Week 6	Discrete time Markov chains	Irreducible DTMCs. Branching processes. Periodicity.
Week 7	Discrete time Markov chains	Limiting behaviour. Long term behaviour and global balance.
Week 8	Discrete time Markov chains.	Partial balance. Time reversal and reversibility.
Week 9	Martingales	Definition of a martingale. Fair games, branching processes and random walks.
Week 10	Martingales	Stopping times and optional stopping theorem. Dominated martingales and Optional stopping times.
Week 11	Martingales	Two dimensional random walks. Identifying martingales.
Week 12	Martingales and Brownian motion	Sub-martingales, super-martingales and construction of martingales. Motivation and definition of Brownian motion with examples. Review.

Tutorials will cover the content of the previous week, while the first tutorial in Week 1 will focus on revision.

The 最新糖心Vlog's policy on Assessment for Coursework Programs is based on the following four principles:

Assessment must encourage and reinforce learning.
Assessment must enable robust and fair judgements about student performance.
Assessment practices must be fair and equitable to students and give them the opportunity to demonstrate what they have learned.
Assessment must maintain academic standards.

Assessment Summary

Assessment task	When due	Weighting	Learning outcomes
Examination	Examination period	35%	All
Assignments	Weeks 2, 4, 6, 10 and 12	20%	All
Group project	Week 10	20%	All
Mid-semester test	Week 8	15%	All
Quizzes	Weeks 3, 5, 7, 9 and 11	10%	All

Assessment Related Requirements

An aggregate score of 50% is required in order to pass this course.

Assessment Detail

Assessment task	Set	Due	Weighting
Assignment 1	Week 1	Week 2	4%
Quiz 1	Week 3	Week 3	2%
Assignment 2	Week 3	Week 4	4%
Quiz 2	Week 5	Week 5	2%
Assignment 3	Week 5	Week 6	4%
Quiz 3	Week 7	Week 7	2%
Mid-semester test	Week 8	Week 8	15%
Quiz 4	Week 9	Week 9	2%
Assignment 4	Week 9	Week 10	4%
Group project	Week 2	Week 10	20%
Quiz 5	Week 11	Week 11	2%
Assignment 5	Week 11	Week 12	4%
Exam	Exam period		35%

Submission

Assignments must be submitted on time and online via MyUni. Late assignments will not be accepted. Students may be excused from an assignment for medical or compassionate reasons. In such cases, documentation is required and the lecturer must be notified as soon as possible.

The final written project report must be submitted on time and online via MyUni. You must also submit a PDF version of the report and all source code via email to the lecturer. Late project reports will not be accepted.

Course Grading

Grades for your performance in this course will be awarded in accordance with the following scheme:

M10 (Coursework Mark Scheme)
Grade	Mark	Description
FNS		Fail No Submission
F	1-49	Fail
P	50-64	Pass
C	65-74	Credit
D	75-84	Distinction
HD	85-100	High Distinction
CN		Continuing
NFE		No Formal Examination
RP		Result Pending

Further details of the grades/results can be obtained from Examinations.

Grade Descriptors are available which provide a general guide to the standard of work that is expected at each grade level. More information at Assessment for Coursework Programs.

Final results for this course will be made available through .

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SELTs are an important source of information to inform individual teaching practice, decisions about teaching duties, and course and program curriculum design. They enable the 最新糖心Vlog to assess how effectively its learning environments and teaching practices facilitate student engagement and learning outcomes. Under the current SELT Policy (http://www.adelaide.edu.au/policies/101/) course SELTs are mandated and must be conducted at the conclusion of each term/semester/trimester for every course offering. Feedback on issues raised through course SELT surveys is made available to enrolled students through various resources (e.g. MyUni). In addition aggregated course SELT data is available.
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Maintained by:	Course Outlines Administrator

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