In differential geometry, there exists an immersion of a curve into a sphere whose image is dense. I wanted to know if this paradox still exists in algebraic geometry. I think the answer should be no.
Let $A \rightarrow B$ be an injective homomorphism of rings of finite type. Suppose that $A$ and $B$ are Noetherian domains. Is it true that $$ \mathrm{dim}\,A \leq \mathrm{dim}\,B \quad ?$$
I made a bit of progress.
If $A$ and $B$ are finite type $k$-algebras then the statement is true. In this case, the injection $A \rightarrow B$ gives an injection of their fields of fractions $R(A) \rightarrow R(B)$. But then $\mathrm{dim}\,A = \mathrm{tr\,deg}_k R(A)$, $\mathrm{dim}\,B = \mathrm{tr\,deg}_k R(A)$ and $\mathrm{tr\,deg}_k R(B) \leq \mathrm{tr\,deg}_k R(B)$.
If the corresponding morphism $\mathrm{Spec}\, B \rightarrow \mathrm{Spec}\, A$ is closed then the statement follows from Lemma 02JX. This makes me think that there may be an issue if the map is not closed.
