Discrete mathematics Discrete ie no continuous Set theory, Combinatorics, Graphs, Modern Algebra(Abstract algebra, Algebraic structures), Logic, classic probability, number theory, Automata and Formal Languages, Computability and decidability etc
Discrete mathematics Discrete i.e. no continuous Set theory, Combinatorics, Graphs, Modern Algebra(Abstract algebra, Algebraic structures), Logic, classic probability, number theory, Automata and Formal Languages, Computability and decidability etc
Before the 18th century, Discrete, quantity and space astronomy, physics Example: planetary orbital, Newton 's laws in Three Dimensions continuous mathematics: calculus Equations of Mathematical Physics, Functions of Real Variable Functions of complex variable Discrete ? stagnancy
Before the 18th century, Discrete, quantity and space astronomy, physics Example: planetary orbital, Newton's Laws in Three Dimensions continuous mathematics: calculus, Equations of Mathematical Physics, Functions of Real Variable,Functions of complex Variable Discrete ? stagnancy
in the thirties of the twentieth century Turing Machines Finite Discrete Data Structures and Algorithm Design Database Compilers Design and Analysis of Algorithms Computer Networks Software information security and cryptography the theory of computation New generation computers
in the thirties of the twentieth century, Turing Machines Finite Discrete Data Structures and Algorithm Design Database Compilers Design and Analysis of Algorithms Computer Networks Software information security and cryptography the theory of computation New generation computers
Set theory Introductory Combinatorics, Graphs, Algebtaic structures, ogIc This term: Set theory, Introductory Combinatorics Graphs, Algebtaic structures(Group, Ring, Field) Next term: Algebtaic structures(Lattices and Boolean Algebras) ogIc
Set theory, Introductory Combinatorics, Graphs, Algebtaic structures, Logic. This term: Set theory, Introductory Combinatorics , Graphs, Algebtaic structures(Group,Ring,Field). Next term: Algebtaic structures(Lattices and Boolean Algebras), Logic
每周一交作业,作业成绩占总成绩的 10% 平时不定期的进行小测验,占总成绩的 20% 期中考试成绩占总成绩的20%;期终考 试成绩占总成绩的50%
每周一交作业,作业成绩占总成绩的 10%; 平时不定期的进行小测验,占总成绩的 20%; 期中考试成绩占总成绩的20%;期终考 试成绩占总成绩的50%
1离散数学及其应用(英文版第5版) 作者: Kenneth H. rosen著出版社:机械工业出 版社 2组合数学(英文版·第4版)—经典原版书库 作者:(美)布鲁迪( Brualdi,R.A.)著出版社: 机械工业出版社 3离散数学暨组合数学(英文影印版) Discrete Mathematics with Combinatorics James A Anderson, University of South Carolina, Spartanburg 大学计算机教育国外著名教材系列(影印 版)清华大学出版社
1.离散数学及其应用(英文版·第5版) 作者:Kenneth H.Rosen 著出版社:机械工业出 版社 2.组合数学(英文版·第4版)——经典原版书库 作者:(美)布鲁迪(Brualdi,R.A.) 著出版社: 机械工业出版社 3,离散数学暨组合数学(英文影印版) Discrete Mathematics with Combinatorics James A.Anderson,University of South Carolina,Spartanburg 大学计算机教育国外著名教材系列(影印 版) 清华大学出版社
I Introduction to Set Theory The objects of study of Set Theory are sets. As sets are fundamental objects that can be used to define all other concepts in mathematics. Georg Cantor(1845--1918) is a German mathematician Cantor's 1874 paper, On a Characteristic Property of All Real Algebraic Numbers marks the birth of set theory. paradox
ⅠIntroduction to Set Theory The objects of study of Set Theory are sets. As sets are fundamental objects that can be used to define all other concepts in mathematics. Georg Cantor(1845--1918) is a German mathematician. Cantor's 1874 paper, "On a Characteristic Property of All Real Algebraic Numbers", marks the birth of set theory. paradox
twentieth century axiomatic set theory naive set theory Concept Relation. function. cardinal number paradox
twentieth century axiomatic set theory naive set theory Concept Relation,function,cardinal number paradox
Chapter 1 Basic Concepts of Sets 1.1 Sets and subsets What are sets? A collection of different objects is called a set SA The individual objects in this collection are called the elements of the set We write“teA” to say that t is an element ofa, and we write“tgA” to say that t is not an element ofA
Chapter 1 Basic Concepts of Sets 1.1 Sets and Subsets What are Sets? A collection of different objects is called a set S,A The individual objects in this collection are called the elements of the set We write “tA” to say that t is an element of A, and We write “tA” to say that t is not an element of A
Example: The set of all integers, Z Then3∈Z,-8∈Z,6.5gZ These sets, each denoted using a boldface letter, play an important role in discrete mathematics: N=0, 1, 2,, the set of natural number FF(,2, -1, 0, 1, 2 ., the set of integers F=Z=1, 2, ., the set of positive integers Z=1, -2,, the set of negative integers Q={p/qlp∈Z2q∈Z,q≠0}, the set of rational numbers Q, the set of positive rational numbers Q, the set of negative rational numbers
Example:The set of all integers, Z. Then 3Z, -8Z, 6.5Z These sets, each denoted using a boldface letter, play an important role in discrete mathematics: N={0,1,2,…}, the set of natural number I=Z={…,-2,-1,0,1,2,…}, the set of integers I +=Z+={1,2,…}, the set of positive integers I -=Z-={-1,-2,…}, the set of negative integers Q={p/q|pZ,qZ,q0}, the set of rational numbers Q+ , the set of positive rational numbers Q- , the set of negative rational numbers