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Showing 25 course outlines from 19204 matches

9476

MATHS 315

: Mathematical Logic
2020 Semester Two (1205)
Logic addresses the foundations of mathematical reasoning. It models the process of mathematical proof by providing a setting and the rules of deduction. Builds a basic understanding of first order predicate logic, introduces model theory and demonstrates how models of a first order system relate to mathematical structures. The course is recommended for anyone studying high level computer science or mathematical logic.
Subject: Mathematics
Prerequisite: B+ or higher in COMPSCI 225 or MATHS 254 or 255 or PHIL 222
9477

MATHS 320

: Algebraic Structures
2025 Semester Two (1255)
This is a framework for a unified treatment of many different mathematical structures. It concentrates on the fundamental notions of groups, rings and fields. The abstract descriptions are accompanied by numerous concrete examples. Applications abound: symmetries, geometry, coding theory, cryptography and many more. This course is recommended for those planning graduate study in pure mathematics.
Subject: Mathematics
Prerequisite: MATHS 250, 254
9478

MATHS 320

: Algebraic Structures
2024 Semester Two (1245)
This is a framework for a unified treatment of many different mathematical structures. It concentrates on the fundamental notions of groups, rings and fields. The abstract descriptions are accompanied by numerous concrete examples. Applications abound: symmetries, geometry, coding theory, cryptography and many more. This course is recommended for those planning graduate study in pure mathematics.
Subject: Mathematics
Prerequisite: MATHS 250, 254
9479

MATHS 320

: Algebraic Structures
2023 Semester Two (1235)
This is a framework for a unified treatment of many different mathematical structures. It concentrates on the fundamental notions of groups, rings and fields. The abstract descriptions are accompanied by numerous concrete examples. Applications abound: symmetries, geometry, coding theory, cryptography and many more. This course is recommended for those planning graduate study in pure mathematics.
Subject: Mathematics
Prerequisite: MATHS 250, 254
9480

MATHS 320

: Algebraic Structures
2022 Semester Two (1225)
This is a framework for a unified treatment of many different mathematical structures. It concentrates on the fundamental notions of groups, rings and fields. The abstract descriptions are accompanied by numerous concrete examples. Applications abound: symmetries, geometry, coding theory, cryptography and many more. This course is recommended for those planning graduate study in pure mathematics.
Subject: Mathematics
Prerequisite: MATHS 250, and MATHS 254 or 255
9481

MATHS 320

: Algebraic Structures
2021 Semester Two (1215)
This is a framework for a unified treatment of many different mathematical structures. It concentrates on the fundamental notions of groups, rings and fields. The abstract descriptions are accompanied by numerous concrete examples. Applications abound: symmetries, geometry, coding theory, cryptography and many more. This course is recommended for those planning graduate study in pure mathematics.
Subject: Mathematics
Prerequisite: MATHS 250, and MATHS 254 or 255
9482

MATHS 320

: Algebraic Structures
2020 Semester Two (1205)
This is a framework for a unified treatment of many different mathematical structures. It concentrates on the fundamental notions of groups, rings and fields. The abstract descriptions are accompanied by numerous concrete examples. Applications abound: symmetries, geometry, coding theory, cryptography and many more. This course is recommended for those planning graduate study in pure mathematics.
Subject: Mathematics
Prerequisite: MATHS 250, and MATHS 254 or 255
9483

MATHS 326

: Combinatorics
2025 Semester One (1253)
Combinatorics is a branch of mathematics that studies collections of objects that satisfy specified criteria. An important part of combinatorics is graph theory, which is now connected to other disciplines including bioinformatics, electrical engineering, molecular chemistry and social science. The use of combinatorics in solving counting and construction problems is covered using topics that include algorithmic graph theory, codes and incidence structures, and combinatorial complexity.
Subject: Mathematics
Prerequisite: MATHS 254, or 250 and a B+ or higher in COMPSCI 225
9484

MATHS 326

: Combinatorics
2024 Semester One (1243)
Combinatorics is a branch of mathematics that studies collections of objects that satisfy specified criteria. An important part of combinatorics is graph theory, which is now connected to other disciplines including bioinformatics, electrical engineering, molecular chemistry and social science. The use of combinatorics in solving counting and construction problems is covered using topics that include algorithmic graph theory, codes and incidence structures, and combinatorial complexity.
Subject: Mathematics
Prerequisite: MATHS 254, or 250 and a B+ or higher in COMPSCI 225
9485

MATHS 326

: Combinatorics
2023 Semester One (1233)
Combinatorics is a branch of mathematics that studies collections of objects that satisfy specified criteria. An important part of combinatorics is graph theory, which is now connected to other disciplines including bioinformatics, electrical engineering, molecular chemistry and social science. The use of combinatorics in solving counting and construction problems is covered using topics that include algorithmic graph theory, codes and incidence structures, and combinatorial complexity.
Subject: Mathematics
Prerequisite: MATHS 250 or 254, and a B+ or higher in COMPSCI 225
9486

MATHS 326

: Combinatorics
2022 Semester One (1223)
Combinatorics is a branch of mathematics that studies collections of objects that satisfy specified criteria. An important part of combinatorics is graph theory, which is now connected to other disciplines including bioinformatics, electrical engineering, molecular chemistry and social science. The use of combinatorics in solving counting and construction problems is covered using topics that include algorithmic graph theory, codes and incidence structures, and combinatorial complexity.
Subject: Mathematics
Prerequisite: MATHS 254 or 255, or MATHS 250 and a B+ or higher in COMPSCI 225
9487

MATHS 326

: Combinatorics
2021 Semester One (1213)
Combinatorics is a branch of mathematics that studies collections of objects that satisfy specified criteria. An important part of combinatorics is graph theory, which is now connected to other disciplines including bioinformatics, electrical engineering, molecular chemistry and social science. The use of combinatorics in solving counting and construction problems is covered using topics that include algorithmic graph theory, codes and incidence structures, and combinatorial complexity.
Subject: Mathematics
Prerequisite: MATHS 254 or 255, or MATHS 250 and a B+ or higher in COMPSCI 225, or a B+ or higher in both COMPSCI 225 and MATHS 208
9488

MATHS 326

: Combinatorics
2020 Semester One (1203)
Combinatorics is a branch of mathematics that studies collections of objects that satisfy specified criteria. An important part of combinatorics is graph theory, which is now connected to other disciplines including bioinformatics, electrical engineering, molecular chemistry and social science. The use of combinatorics in solving counting and construction problems is covered using topics that include algorithmic graph theory, codes and incidence structures, and combinatorial complexity.
Subject: Mathematics
Prerequisite: MATHS 254 or 255, or COMPSCI 225 and a B+ or higher in MATHS 208, or COMPSCI 225 and MATHS 250
9489

MATHS 328

: Algebra and Applications
2025 Semester One (1253)
The goal of this course is to show the power of algebra and number theory in the real world. It concentrates on concrete objects like polynomial rings, finite fields, groups of points on elliptic curves, studies their elementary properties and shows their exceptional applicability to various problems in information technology including cryptography, secret sharing, and reliable transmission of information through an unreliable channel.
Subject: Mathematics
Prerequisite: MATHS 250 and 254, or a B+ or higher in COMPSCI 225 and 15 points from MATHS 250, 253
9490

MATHS 328

: Algebra and Applications
2024 Semester One (1243)
The goal of this course is to show the power of algebra and number theory in the real world. It concentrates on concrete objects like polynomial rings, finite fields, groups of points on elliptic curves, studies their elementary properties and shows their exceptional applicability to various problems in information technology including cryptography, secret sharing, and reliable transmission of information through an unreliable channel.
Subject: Mathematics
Prerequisite: MATHS 250 and 254, or a B+ or higher in COMPSCI 225 and 15 points from MATHS 250, 253
9491

MATHS 328

: Algebra and Applications
2023 Semester One (1233)
The goal of this course is to show the power of algebra and number theory in the real world. It concentrates on concrete objects like polynomial rings, finite fields, groups of points on elliptic curves, studies their elementary properties and shows their exceptional applicability to various problems in information technology including cryptography, secret sharing, and reliable transmission of information through an unreliable channel.
Subject: Mathematics
Prerequisite: MATHS 250 and 254, or a B+ or higher in COMPSCI 225 and 15 points from MATHS 250, 253
9492

MATHS 328

: Algebra and Applications
2022 Semester One (1223)
The goal of this course is to show the power of algebra and number theory in the real world. It concentrates on concrete objects like polynomial rings, finite fields, groups of points on elliptic curves, studies their elementary properties and shows their exceptional applicability to various problems in information technology including cryptography, secret sharing, and reliable transmission of information through an unreliable channel.
Subject: Mathematics
Prerequisite: MATHS 250, and 254 or 255, or a B+ or higher in COMPSCI 225 and 15 points from MATHS 250, 253
9493

MATHS 328

: Algebra and Applications
2021 Semester One (1213)
The goal of this course is to show the power of algebra and number theory in the real world. It concentrates on concrete objects like polynomial rings, finite fields, groups of points on elliptic curves, studies their elementary properties and shows their exceptional applicability to various problems in information technology including cryptography, secret sharing, and reliable transmission of information through an unreliable channel.
Subject: Mathematics
Prerequisite: MATHS 250, and MATHS 254 or 255, or a B+ or higher in COMPSCI 225 and 15 points from MATHS 208, 250, 253
9494

MATHS 328

: Algebra and Applications
2020 Semester One (1203)
The goal of this course is to show the power of algebra and number theory in the real world. It concentrates on concrete objects like polynomial rings, finite fields, groups of points on elliptic curves, studies their elementary properties and shows their exceptional applicability to various problems in information technology including cryptography, secret sharing, and reliable transmission of information through an unreliable channel.
Subject: Mathematics
Prerequisite: MATHS 250, and MATHS 254 or 255, or a B+ or higher in COMPSCI 225 and 15 points from MATHS 208, 250, 253
9495

MATHS 332

: Real Analysis
2025 Semester Two (1255)
A standard course for every student intending to advance in pure mathematics. It develops the foundational mathematics underlying calculus, it introduces a rigorous approach to continuous mathematics and fosters an understanding of the special thinking and arguments involved in this area. The main focus is analysis in one real variable with the topics including real fields, limits and continuity, Riemann integration and power series.
Subject: Mathematics
Prerequisite: MATHS 250, 254
9496

MATHS 332

: Real Analysis
2024 Semester Two (1245)
A standard course for every student intending to advance in pure mathematics. It develops the foundational mathematics underlying calculus, it introduces a rigorous approach to continuous mathematics and fosters an understanding of the special thinking and arguments involved in this area. The main focus is analysis in one real variable with the topics including real fields, limits and continuity, Riemann integration and power series.
Subject: Mathematics
Prerequisite: MATHS 250, 254
9497

MATHS 332

: Real Analysis
2023 Semester Two (1235)
A standard course for every student intending to advance in pure mathematics. It develops the foundational mathematics underlying calculus, it introduces a rigorous approach to continuous mathematics and fosters an understanding of the special thinking and arguments involved in this area. The main focus is analysis in one real variable with the topics including real fields, limits and continuity, Riemann integration and power series.
Subject: Mathematics
Prerequisite: MATHS 250, 254
9498

MATHS 332

: Real Analysis
2022 Semester Two (1225)
A standard course for every student intending to advance in pure mathematics. It develops the foundational mathematics underlying calculus, it introduces a rigorous approach to continuous mathematics and fosters an understanding of the special thinking and arguments involved in this area. The main focus is analysis in one real variable with the topics including real fields, limits and continuity, Riemann integration and power series.
Subject: Mathematics
Prerequisite: MATHS 250 and 254 or 255
9499

MATHS 332

: Real Analysis
2021 Semester Two (1215)
A standard course for every student intending to advance in pure mathematics. It develops the foundational mathematics underlying calculus, it introduces a rigorous approach to continuous mathematics and fosters an understanding of the special thinking and arguments involved in this area. The main focus is analysis in one real variable with the topics including real fields, limits and continuity, Riemann integration and power series.
Subject: Mathematics
Prerequisite: MATHS 250, and MATHS 254 or 255 or an A or higher in MATHS 253 and 260
9500

MATHS 332

: Real Analysis
2020 Semester Two (1205)
A standard course for every student intending to advance in pure mathematics. It develops the foundational mathematics underlying calculus, it introduces a rigorous approach to continuous mathematics and fosters an understanding of the special thinking and arguments involved in this area. The main focus is analysis in one real variable with the topics including real fields, limits and continuity, Riemann integration and power series.
Subject: Mathematics
Prerequisite: MATHS 250, and MATHS 254 or 255 or an A or higher in MATHS 253 and 260