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Relations. Binary Relations a relation between elements of two sets is a subset of their Cartesian product (of ordered pairs). Note the di ff erence between.

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Presentation on theme: "Relations. Binary Relations a relation between elements of two sets is a subset of their Cartesian product (of ordered pairs). Note the di ff erence between."— Presentation transcript:

1 Relations

2 Binary Relations a relation between elements of two sets is a subset of their Cartesian product (of ordered pairs). Note the di ff erence between a relation and a function: in a relation, each a ∈ A can map to multiple elements in B. Thus, relations are generalizations of functions. If an ordered pair (a, b) ∈ R then we say that a is related to b. We may also use the notation aRb.

3 Relations

4 Relations (Graph View)

5 Relations (on a set)

6 Reflexivity

7 Symmetry I

8 Symmetry II

9 Symmetric Relations

10 Transitivity

11

12 Combining Relations

13 Composition and Powers

14 Power Examples

15 Equivalence Relations

16 Equivalence Classes I

17 Equivalence Classes II

18 Partitions I

19 Partitions II

20 Matrix Interpretation

21 Equivalence Relations (Example-I)

22 Equivalence Relations (Example-II)

23 Equivalence Relations (Example-III)

24 Equivalence Relations (Example-IV)

25 Partial Order I

26 Partial Order II

27 Equivalence Relations (Example-IV)

28 Definition

29 Comparability

30 Total Orders

31 Hasse Diagram

32 Hasse Diagram Example

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