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Introduction to the mathematics of discrete structures with emphasis on structures for computer science.
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<strong>UTSA Department of Mathematics</strong>
  
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To edit tables in each course below, you can use [https://tableconvert.com/mediawiki-to-excel MediaWiki-to-Excel converter] and/or the [https://tableconvert.com/excel-to-mediawiki Excel-to-MediaWiki converter]
  
'''Catalog entry'''
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== Undergraduate Studies ==
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===STEM Core===
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* [[MAT1073]] College Algebra for Scientists and Engineers
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* [[MAT1093]] Precalculus
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* [[MAT1193]] Calculus for Biosciences
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* [[MAT1214]] Calculus I (4 credit hours)
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* [[MAT1224]] Calculus II (4 credit hours)
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* [[MAT2214]] Calculus III (4 credit hours)
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* [[MAT2233]] Linear Algebra
  
''Prerequisite'': Algebra and Number Systems (MAT 1313), or Discrete Mathematical Structures (CS 2233/2231), or instructor consent.
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===Data & Applied Science Core===
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* [[MDC1213]] Mathematics, Data, AI and the Modern World
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* [[MAT1213]] Calculus I (3 credit hours)
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* [[MAT1223]] Calculus II (3 credit hours)
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* [[MAT2213]] Calculus III (3 credit hours)
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* [[MAT2243]] Applied Linear Algebra (3 credit hours)
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* [[MAT4133]]/[[MAT5133]] Mathematical Biology
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* [[MAT4143]]/[[MAT5143]] Mathematical Physics
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* [[MAT4373]]/[[MAT5373]] Mathematical Statistics I (discrete & continuous PDFs)
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* [[MAT4383]]/[[MAT5383]] Mathematical Statistics II (statistical inference)
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* [[MDC4413]] Data Analytics
  
''Contents'':
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===Math Major===
(1) Propositional logic: Axioms and Rules of Inference. Limitations of propositional logic: Informal introduction to quantifiers and syllogisms.
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* [[MAT1313]] Algebra and Number Systems
(2) Predicate Logic: Existential and universal quantification, free variables and substitutions. Discussion of the various axiomatic systems for first-order logic (including axioms and rules of inference). The power and the limitations of axiomatic systems for logic: Informal discussion of the completeness and incompleteness theorems.
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* [[MAT2313]] Combinatorics and Probability
(3) Sets and boolean algebras: Operations on sets. Correspondence between finitary set operations and propositional logic. Correspondence between infinitary operations and quantifiers. The power and limitations of the language of set theory: Informal discussion of the set-theoretic paradoxes and the need for axiomatic systems for set theory.
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* [[MAT3003]] Discrete Mathematics
(4) Relations: Special relations: Equivalence relations, partially ordered sets, maximum/minimum, maximal/minimal elements, least upper bounds and greatest lower bounds, totally ordered sets.
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* <s>[[MAT3013]] Foundations of Mathematics </s> Replaced by MAT3003 Discrete Mathematics
(5) Functions: Operations of functions, direct image and inverse image.
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* [[MAT3213]] Foundations of Analysis
(6) Well-ordered sets: Correspondence between well-ordering relations and induction. Correspondence between well-ordering relations and choice functions.
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* [[MAT3233]] Abstract Algebra I
(7) Introduction to computability. Classical models of computation (recursive functions, and Turing models). Limitations of computation (the Halting Problem, fast-growing functions). Contemporary models of computation.
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* [[MAT3613]] Differential Equations I
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* [[MAT3623]] Differential Equations II
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* [[MAT3633]] Numerical Analysis
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* [[MAT3223]] Complex Variables
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* [[MAT4213]] Real Analysis I
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* [[MAT4223]] Real Analysis II
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* [[MAT4233]] Abstract Algebra II
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* [[MAT4273]] Topology
  
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===Business===
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* [[MAT1053]] Algebra for Business
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* [[MAT1133]] Calculus for Business
  
'''Sample textbooks''':
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===Math for Liberal Arts===
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* [[MAT1043]] Introduction to Mathematics
  
[1] Gordon Pace, ''Mathematics of Discrete Structures foe Computer Science'', Springer, 2012
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=== Elementary Education ===
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* [[MAT1023]] College Algebra
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* [[MAT1153]] Essential Elements in Mathematics I
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* [[MAT1163]] Essential Elements in Mathematics II
  
[2] Vladlen Koltun, ''Discrete Structures Lecture Notes, Stanford University'', 2008. Freely available [https://web.stanford.edu/class/cs103x/cs103x-notes.pdf here.]
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=== General Math Studies===
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* [[MAT3233]] Modern Algebra
  
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== Graduate Studies ==
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=== Core M.Sc. Studies ===
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Core courses, common across all M.Sc. tracks, must be at least 50% of the credit 30 hours needed to obtain a M.Sc. degree. The following courses add up to 15 credit hours.
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* Two courses in the Analysis and Algebra sequences in the following combinations:
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** [[MAT5173]] Algebra  I & [[MAT5183]] Algebra II.
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** [[MAT5203]] Analysis I  & [[MAT5213]] Analysis II
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** [[MAT5173]] Algebra &  [[MAT5203]] Analysis I.
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* [[MAT5283]] Linear Algebra (fall odd years)
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* [[MAT5423]] Discrete Mathematics I (fall even years)
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* [[MAT4373]]/[[MAT5373]] Mathematical Statistics I  (fall even years)
  
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=== Qualifying Examination Tracks  ===
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* [[MAT5183]] Algebra II (fall, even years) (Pure, Applied tracks)
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* [[MAT5123]] Cryptography (spring even years) (Pure, Applied tracks)
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* [[MAT5323]] Cryptography II (spring odd years) (Pure, Applied tracks))
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* [[MAT5213]] Analysis II (spring even years)  (Pure track)
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* [[MAT5113]] Computing for Mathematics (spring even years)  (Pure, Applied tracks)
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* [[MAT5433]] Discrete Mathematics II (spring odd years)  (Pure, Applied tracks)
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* [[MAT4383]]/[[MAT5383]] Mathematical Statistics II  (fall even years)  (Applied tracks)
  
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=== M.Sc. Track in Pure Mathematics  ===
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* [[MAT4423/MAT5443]] Logic and Computability
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* [[MAT5243]] General Topology
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* [[MAT5253]] General Topology II
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* [[MAT5323]] Cryptography II
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* [[MAT5183]] Algebra II
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* [[MAT5223]] Theory of Functions of a Complex Variable
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* [[MAT5343]] Differential Geometry
  
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=== M.Sc. Track in Applied & Industrial Mathematics ===
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* [[MAT4153]]/[[MAT5153]] Data Analytics
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* [[AIM 5113]] Introduction to Industrial Mathematics
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* [[MAT 5113]] Computing for Mathematics
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* [[MAT 5653]] Differential Equations I
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* [[MAT 5673]] Partial Differential Equations
  
 
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=== M.Sc. in Mathematics Education ===
 
 
==Topics List==
 
{| class="wikitable sortable"
 
! Week !! Topic !! Sections from Pace's book !! !! Sections from Pace's book !! Prerequisites.
 
|-
 
|  1 
 
|| [[Propositional logic]]
 
|| 2.1-2.4
 
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* Proofs
 
* boolean models
 
* connections between boolean models and proofs
 
|| MAT1313 or CS2233/2231, or equivalent.
 
|-
 
|  2 
 
|| [[Completeness and soundness]]
 
|| 2.5
 
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* Completeness and soundness of propositional logic
 
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|-
 
|  5-6 
 
|| [[Predicate calculus]]
 
|| 3.1-3.5
 
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* Limits of propositional logic
 
* free variables and substitution.
 
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|-
 
|  7 
 
|| [[Sets and boolean algebras]]
 
|| 4.1-4.5
 
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* Set comprehension.
 
* Finitary and general operations on sets.
 
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|-
 
|  8 
 
|| [[Sets and boolean algebras]]
 
|| 4.6
 
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* Boolean algebras and boolean rings.
 
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|-
 
|  9 
 
|| [[Relations]]
 
|| 5.1-5.7
 
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* Relations and sets
 
* Inverse of a relation and composition of relations
 
* Beyond binary relations
 
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|-
 
|  10 
 
|| [[Classifying Relations]]
 
|| 6.1-6.3
 
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* Totality
 
* Surjectivity
 
* Injectivity
 
* Functionality
 
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|-
 
|  11-12 
 
|| [[Discrete structures]]
 
|| 7.1-8.4
 
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* Graphs
 
* Semigroups
 
* groups
 
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|-
 
|  13-14 
 
|| [[Reasoning about programs]]
 
|| 10.1-10.4
 
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* Algorithms
 
* Program semantics
 
* Uncomputability
 
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|}
 

Revision as of 16:57, 24 March 2023

UTSA Department of Mathematics

To edit tables in each course below, you can use MediaWiki-to-Excel converter and/or the Excel-to-MediaWiki converter

Undergraduate Studies

STEM Core

Data & Applied Science Core

Math Major

Business

Math for Liberal Arts

  • MAT1043 Introduction to Mathematics

Elementary Education

  • MAT1023 College Algebra
  • MAT1153 Essential Elements in Mathematics I
  • MAT1163 Essential Elements in Mathematics II

General Math Studies

Graduate Studies

Core M.Sc. Studies

Core courses, common across all M.Sc. tracks, must be at least 50% of the credit 30 hours needed to obtain a M.Sc. degree. The following courses add up to 15 credit hours.

Qualifying Examination Tracks

  • MAT5183 Algebra II (fall, even years) (Pure, Applied tracks)
  • MAT5123 Cryptography (spring even years) (Pure, Applied tracks)
  • MAT5323 Cryptography II (spring odd years) (Pure, Applied tracks))
  • MAT5213 Analysis II (spring even years) (Pure track)
  • MAT5113 Computing for Mathematics (spring even years) (Pure, Applied tracks)
  • MAT5433 Discrete Mathematics II (spring odd years) (Pure, Applied tracks)
  • MAT4383/MAT5383 Mathematical Statistics II (fall even years) (Applied tracks)

M.Sc. Track in Pure Mathematics

M.Sc. Track in Applied & Industrial Mathematics

M.Sc. in Mathematics Education