8 Flashcards
Mathematical Analysis
The triangle inequality
Ix + yI ≤ IxI + IyI
Consequences:
- Ix - yI ≤ Ix - zI + Iy - zI
(because Ix - yI = I(x - z) + (z - y)I ≤ Ix - zI + Iz - yI) - for any two real numbers x, y,
Ix - yI ≥ IIxI - IyII
S ⊆ R is bounded above if and only if
Nb A⊆B means A has some or all elements of B
there is M ∈ R such that
for all x ∈ S; x ≤ M.
In this case, M is called an upper bound of/for/on S.
S ⊆ R is bounded below if and only if
there is m ∈ R such that
for all x ∈ S, x ≥ m.
In this case, m is called a lower bound of/on/for S.
A set is said simply to be bounded if it is
bounded above and bounded below
The Continuum property:
Every non-empty set of real numbers that is bounded above has a least upper bound
and any non-empty set of real numbers that is bounded below has a greatest lower bound.
For a non-empty subset S of R, if S is bounded above, the least upper bound of S (which exists, by the continuum property) is called the supremum of S, and
is denoted sup S. If S is bounded below, the greatest lower bound is called the infimum of S and is denoted inf S.
Note that the supremum and infimum of a set S (when they exist; i.e. when S is bounded above/below) need not belong to S.
