HepLean Documentation

Mathlib.Order.Bounds.Defs

Definitions about upper/lower bounds #

In this file we define:

def upperBounds {α : Type u_1} [LE α] (s : Set α) :
Set α

The set of upper bounds of a set.

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    def lowerBounds {α : Type u_1} [LE α] (s : Set α) :
    Set α

    The set of lower bounds of a set.

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      def BddAbove {α : Type u_1} [LE α] (s : Set α) :

      A set is bounded above if there exists an upper bound.

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        def BddBelow {α : Type u_1} [LE α] (s : Set α) :

        A set is bounded below if there exists a lower bound.

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          def IsLeast {α : Type u_1} [LE α] (s : Set α) (a : α) :

          a is a least element of a set s; for a partial order, it is unique if exists.

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            def IsGreatest {α : Type u_1} [LE α] (s : Set α) (a : α) :

            a is a greatest element of a set s; for a partial order, it is unique if exists.

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              def IsLUB {α : Type u_1} [LE α] (s : Set α) :
              αProp

              a is a least upper bound of a set s; for a partial order, it is unique if exists.

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                def IsGLB {α : Type u_1} [LE α] (s : Set α) :
                αProp

                a is a greatest lower bound of a set s; for a partial order, it is unique if exists.

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                  def IsCofinal {α : Type u_1} [LE α] (s : Set α) :

                  A set is cofinal when for every x : α there exists y ∈ s with x ≤ y.

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