Condition for Equivalence of Norms that induce Banach Spaces

Theorem
Let $\Bbb F \in \set {\R, \C}$.

Let $X$ be a vector space over $\Bbb F$.

Let $\norm \cdot_1$ and $\norm \cdot_2$ be norms on $X$ such that $\struct {X, \norm \cdot_1}$ and $\struct {X, \norm \cdot_2}$ are Banach spaces such that:


 * $\norm x_2 \le C \norm x_1$ for all $x \in X$ and some real number $C > 0$.

Then $\norm \cdot_1$ and $\norm \cdot_2$ are equivalent.

Proof
Consider $I : \struct {X, \norm \cdot_1} \to \struct {X, \norm \cdot_2}$ defined by:


 * $I x = x$ for each $x \in X$.

Then for $x, y \in X$ and $\lambda \in \Bbb F$.

Then we have:


 * $\map I {\lambda x + y} = \lambda x + y = \lambda I x + I y$

so $I$ is linear.

Similarly, we have:


 * $\norm {I x}_2 = \norm x_2 \le C \norm x_1$

so $I$ is a bounded linear transformation.

Clearly $I$ is a bijection, so by the Banach Isomorphism Theorem, the inverse $I^{-1} : \struct {X, \norm \cdot_2} \to \struct {X, \norm \cdot_1}$ is bounded.

So, there exists a real number $C' > 0$ such that:


 * $\norm {I x}_1 = \norm x_1 \le C' \norm x_2$

Then we have:


 * $\norm x_1 \le C' \norm x_2 \le C C' \norm x_1$

so that:


 * $\ds \frac 1 {C'} \norm x_1 \le \norm x_2 \le C \norm x_1$

for $C, C' > 0$.

So $\norm \cdot_1$ and $\norm \cdot_2$ are equivalent.