Definition of a morphism of locally ringed spaces
Given any sheaf $\mathcal{O}$ on a space $X$, a continuous map $f:X\to Y$, and a point $x\in X$, there is a canonical map $(f_*\mathcal{O})_{f(x)}\to\mathcal{O}_x$. Indeed, an element of $(f_*\mathcal{O})_{f(x)}$ is represented by a section of $f_*\mathcal{O}$ over some open set $V$ containing $f(x)$, which is just a section of $\mathcal{O}$ over $f^{-1}(V)$, which then determines an element of $\mathcal{O}_x$. It is easy to see that this correspondence is compatible with restriction and hence induces a well-defined map $(f_*\mathcal{O})_{f(x)}\to\mathcal{O}_x$.
In your case, taking $\mathcal{O}=\mathcal{O}_X$, this is the map you are looking for.
There is another way to describe $f^{\#}_x: \mathcal{O}_{Y,f(x)}\rightarrow \mathcal{O}_{X,x}$
Let $(X, \mathcal{O}_X)$ and $(Y,\mathcal {O}_Y)$ be two schemes.
A map between between $(X, \mathcal{O}_X)$ and $(Y,\mathcal {O}_Y)$ is a pair
1)$f:X\rightarrow Y$ and
2)$f^{\#}:\mathcal{O}_Y\rightarrow f_{*}\mathcal{O}_X$
such that the induced map $f_x^{\#}: \mathcal O_{Y,f(x)} \rightarrow \mathcal O_{X,x}$ is a local homomorphism of rings.
Let us try to write down the induced map-
Note, $\mathcal{O}_{Y,f(x)}=\varinjlim_{ f(x)\in V}\mathcal{O}_Y(V)$
Now by 2) we have map $f^{\#} (V):\mathcal{O}_Y(V)\rightarrow f_{*}\mathcal{O}_X(V)=\mathcal {O}_X(f^{-1}(V))$
Now, as $f(x)\in V \implies x\in f^{-1}(V)$. Therefore, there exist maps $g_x(f^{-1}(V)):\mathcal {O}_X(f^{-1}(V))\rightarrow \mathcal{O}_{X,x}$ (property of direct limit)
Therefore the composition of this two maps
$\mathcal{O}_Y(V)\xrightarrow{f^{\#} (V)}\mathcal {O}_X(f^{-1}(V))\xrightarrow{g_x(f^{-1}(V))} \mathcal{O}_{X.x}$
Now, by the universal property of direct limit of $\mathcal{O}_{Y,f(x)}$ one gets an induced map from $\mathcal{O}_{Y,f(x)}\rightarrow \mathcal{O}_{X,x}$ which is the desired map $f^{\#}_x$ which we need to be local ring homomoorphsim
Universal Property of direct limit cum definition: Let $\{M_\lambda, f_{\lambda \mu}\}_{\lambda \in I}$ where $f_{\lambda \mu}:M_\lambda \rightarrow M_\mu$ for all $\lambda \leq \mu$ be a directed system of rings. A ring $M$ is said to be the directed limit of the directed system if
There exists maps $g_{\lambda}:M_\lambda \rightarrow M$ for all $\lambda\in I$ such that $g_\lambda=g_\mu \circ f_{\lambda \mu}$ for all $\lambda\leq \mu$
If there exists another ring $M'$ with maps $g'_{\lambda}:M_\lambda \rightarrow M'$ for all $\lambda\in I$ such that $g'_\lambda=g'_\mu \circ f_{\lambda \mu}$ for all $\lambda\leq \mu$
Then there exists a unique map from $M\rightarrow M'$