[see also: little, minor, slight, below]
......, where $C$ can be made arbitrarily small by taking ...... [Not: “arbitrary small”]
for all sufficiently small $h$
However small a neighbourhood of $x$ we take, the image will be ...... [= No matter how small]
The other values are significantly smaller than $x$.
Therefore, $F$ is not $\langle$no$\rangle$ smaller than $G$.
Thus $A$ is the smallest algebra with this property.
There is a smallest algebra with this property.
Then $B$ contains a unique element of smallest norm.
Go to the list of words starting with: a
b
c
d
e
f
g
h
i
j
k
l
m
n
o
p
q
r
s
t
u
v
w
y
z