MathDB

3. Is there a real-valued function

Af

, defined on the space of the functions, continuous on

[0,1]

, such that

f(x)\leq g(x)

and

f(x)\not\equiv g(x)

inply

Af< Ag

? Is this also true if the functions

f(x)

are required to be monotonically increasing (rather than continuous) on

[0,1]

? (R.4)

Problem Statement