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Equivalence Relations. Partial Ordering Relations

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Title: Equivalence Relations. Partial Ordering Relations


1
Equivalence Relations.Partial Ordering Relations
2
Equivalence Relation and Partition
  • Every equivalence relation on S gives rise to a
    partition of S by taking the family of subsets in
    the partition to be the equivalence classes of
    the equivalence relation.
  • If P is a partition of S, we can define a
    relation R on S by letting x R y mean that x and
    y lie in the same member of P.

3
Equivalence Relation and Partition
  • Let S1,2,3,4,5,6. Let A1,3,4, B2,6, and
    C5. Let some equivalence relation is defined
    on these sets. Evidently,
  • Then P A, B, C is a partition of
    S1,2,3,4,5,6.
  • Then we can establish a relation x R y means
    that x and y lie in the same member of P
  • R(1,1),(1,3),(1,4),(3,1),(3,3),(3,4),(4,1),(4,3
    ), (4,4), (2,2), (2,6), (6,2), (6,6), (5,5)

4
Equivalence Relation and Partition
  • Theorem.
  • An equivalence relation R on S gives rise to a
    partition P of S, in which the members of P are
    the equivalence classes of R.
  • A partition P of S induces an equivalence
    relation R in which any two elements x and y are
    related by R whenever they lie in the same member
    of P. Moreover, the equivalence classes of this
    relation are members of P.

5
Antisymmetric Relation
  • A relation R on a set S is called antisymmetric
    if, whenever x R y and y R x are both true, then
    xy.
  • Examples. Relations and on the set Z of
    integer numbers. If x y and y x then always
    xy. If x y and y x then always xy.

6
Partial Ordering Relations
  • A relation R on a set S is called a partial
    ordering relation, or simply a partial order, if
    the following 3 properties hold for this
    relation
  • R is reflexive, that is, x R x is true
    .
  • R is antisymmetric, that is
    .
  • R is transitive, that is
    .

7
Partial Ordering Relations. Examples
  • Relations and are partial orders on sets
    Z of integer numbers and R of real numbers.
  • Let SA,B,C, be a set whose elements are other
    sets. For define A R B if
    . R is reflexive ( ),
  • antisymmetric
  • and transitive
    .
  • Thus R is a partial order.

8
Partial Ordering Relations. Examples
  • Let us consider a set of n-dimensional binary
    vectors E2n(0,,0), (0,,01),,(1,,1). We
    say that vector x precedes to vector y
    if for all n components of these two vectors
    the following property holds
    . For example, if
    n3
    , but
    .
  • The relation is a partial order on the
    set of n-dimensional binary vectors.

9
Partial Ordering Relations. Examples
  • Let SA, B, C, D, E, F, G be a set of classes
    from some program curriculum. Let us define
    relation as follows x is related to y if class x
    is an immediate prerequisite for class y.
  • This relation is a partial order.

10
Lexicographic Order
  • If R1 is a partial order on set S1 and R2 is a
    partial order on set S2 then we can define the
    following relation R on the Cartesian product
    S1xS2. Let .
  • Then if and only
    if one of the following is true
  • R is called the lexicographic order on S1xS2

11
Lexicographic Order
  • The lexicographic order is also referred to as a
    dictionary order, because it corresponds to
    the sequence in which words are listed in a
    dictionary.
  • Theorem. If R1 is a partial order on set S1 and
    R2 is a partial order on set S2 then the
    lexicographic order is a partial order on the
    Cartesian product S1xS2.

12
Lexicographic Order
  • If then
    is a set of
  • n- dimensional binary vectors . The relation
    establishes a lexicographic order on E2n

13
Total (Linear) Order
  • A partial order R on set S is called a total
    order (or a linear order) on S if every pair of
    elements in S can be compared, that is
  • Relations and are total orders on sets Z
    of integer numbers and R of real numbers.
  • Relation is not a total order.

14
Minimal and Maximal Elements
  • Let R be a partial order on set S.
  • is called a minimal element of S with
    respect to R if the only element
    satisfying y R x is x itself
  • is called a maximal element of S with
    respect to R if the only element
    satisfying x R y is x itself

15
Minimal and Maximal Elements
  • In the set E2n of n-dimensional binary vectors
    (0,,0) is a minimal element and (1,,1) is a
    maximal element.
  • For n3 (0,0,0), (0,0,1), (0,1,0), (0,1,1),
    (1,0,0), (1,0,1), (1,1,0), (1,1,1)

16
Tolerance Relation
  • A relation R on a set S is called a tolerance
    relation, or simply a tolerance, if the following
    2 properties hold for this relation
  • R is reflexive, that is, x R x is true
  • R is symmetric, that is
  • Thus, a tolerance is not transitive.
  • Example. Let S be the set of all students in some
    university. Let x R y means that x takes the same
    class as y. R is a tolerance it is reflexive,
    symmetric, but not transitive.
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