Let $M,N$ be $d$-dimensional Riemannian manifolds. Let $f:M \to N$, and suppose $f$ is continuous, differentiable almost everywhere (a.e ) and that $df$ is an orientation-preserving isometry a.e.
Question: Is it true that there exist a ball $B_{\epsilon}(p) \subseteq M$ such that $f|_{B_{\epsilon}(p)}$ is injective?
This is false. Let $M$ be the interval $(0,1)$. Let $\mu$ be a finite, purely singular measure (i.e., singular with respect to the Lebesgue measure) on $M$ that has no atoms and satisfies $\mu(I)>0$ for every nontrivial subinterval $I\subset (0,1)$ (an example of such $\mu$). Define $$f(x) = x - \mu((0,x))$$ This is a continuous function because $\mu$ is nonatomic. It has $f'=1$ almost everywhere, because a singular measure has zero derivative a.e. (stated here, with a reference to Folland's Real Analysis).
For every interval $I\subset (0,1)$, by virtue of $\mu(I)>0$ and $\mu$ being singular, there exist subintervals $J_1,J_2\subset I$ such that $\mu(J_1)>|J_1|$ and $\mu(J_2) <|J_2|$ where $|\cdot |$ stands for the length of intervals. This can be proved in general, but is easier to see for the specific example of $\mu$ linked above: $I$ contains a dyadic subinterval $D$, and after $n$ dyadic subdivisions of $D$ its leftmost child $D_n^{-}$ and rightmost child $D_n^+$ satisfy $\mu(D_n^+) = p^n\mu(D)$ and $\mu(D_n^-) = (1-p)^n \mu(D)$. Since both have length $|D|/2^n$, this yields the desired subintervals when $n$ is large enough.
Conclusion: $f$ is not monotone on $I$, and therefore is not injective on any subinterval on $M$.
This example can be promoted to higher dimensions by letting $F(x_1,x_2,\dots,x_d) = (f(x_1), x_2,\dots, x_d)$.
To get a positive result, you may want to assume that $f$ is Lipschitz continuous; then $f$ is a Sobolev map, and the theory of quasiregular maps implies that $f$ is discrete and open, hence a local homeomorphism outside of a branch set of topological dimension $\le d-2$. References:
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Question : Assume that $$f :B\rightarrow \mathbb{E}^2$$ is a map s.t.
(1) $B$ is a geodesic ball in $S^2(1)$ of radius $\varepsilon$
(2) $df$ is isometric a.e.
(3) a.e. orientation preserving
Then $f$ is not continuous
EXE : Gromov's map $S^2\rightarrow \mathbb{E}^2$ is not orientation preserving, since it can view as a limit of piecewise distance preserving maps that are not an a.e.-orientation-preserving maps.
Proof of Question : Assume that $f$ is continuous. Hence by considering following EXE, we conclude that it is volume preserving
Consider a triangulation $T_i$ of $B_\epsilon (p)$ where each $T_i$ is 2-dimensional geodesic triangle. Since $f$ is orientation preserving then $ f(T_i)$ are not overlapping except measure $0$-set.
Hence we have that $\gamma_i$ is a curve going to $\partial B_\epsilon(p)$ and $f\circ \gamma_i$ goes to $\partial f(B_\epsilon (p))$ s.t. $$\lim_i\ {\rm length}\ \gamma_i={\rm length}\ \partial B_\epsilon (p) \geq \lim_i\ {\rm length}\ f\circ \gamma_i $$ since $f$ is short.
Hence by isoperimetric inequality, it is a contradiction.
EXE : Consider a continuous map $ f: [0,1]^2\rightarrow \mathbb{E}^2$ s.t. assume that $c(t)=f(t,1)$ is a continuous curve whose image has 2-dimensional.
Hence note that curve $f(t,1-\varepsilon_n)$ where $\varepsilon_n\rightarrow 0$ has an arbitrary large length $l_n$ with $\lim_n\ l_n=\infty$ Hence $f$ is not isometric on $[0,1]\times [1-\varepsilon_n,1)$
