Let $X$ and $Y$ be metric space, $X$ be compact, $C(X,Y)$ denote the set of continuous functions from $X$ to $Y$ with uniform convergence on compacts topology, and $\operatorname{Lip}(X,Y)$ denote the subspace of Lipschitz functions from $X$ to $Y$. Under what conditions is $\operatorname{Lip}(X,Y)$ a dense subset of $C(X,Y)$?
I expect that there should be some “topological compatibility condition” between $X$ and $Y$, but this is purely (and likely unfounded) intuition.
Let $(X,\rho)$ be a compact metric space, and let $(Y,d)$ be a separable metric space. Then I claim that one can endow $X$ with a compatible metric $d$ such that every continuous $f:X\rightarrow Y$ can be uniformly approximated by a Lipschitz function.
Let $(f_n)_{n\geq 0}$ be a sequence of continuous functions such that every continuous $f:X\rightarrow Y$ can be uniformly approximated by some $f_n$. Let $(\alpha_n)_{n\geq 0}$ be a sequence of positive real numbers such that $\alpha_n\cdot\operatorname{Diam}(f_n[X])\rightarrow 0$. Then define a metric $d$ on $X$ by setting $$d(x,y)=\rho(x,y)+\sup_n\alpha_n\cdot d(f_n(x),f_n(y)).$$ Then the metric $d$ is compatible with the original topology on $X$. Furthermore, for each $n$, we have $d(f_n(x),f_n(y))\leq\alpha_n^{-1}\cdot d(x,y)$, so each $f_n$ is Lipschitz.
Let $X$ be the unit circle and let $Y$ be the Koch snowflake, both with euclidean metric inherited from $\mathbb{R}^2$. There is a continuous homeomorphism from $X$ onto $Y$, but there is no nonconstant Lipschitz function from $X$ to $Y$, because the image of $X$ under any Lipschitz function is rectifiable.
While in general one cannot expect density of Lipschitz mappings (as pointed out by Nik Weaver), the following classical result is in the positive direction. You can find a proof in Heinonen's book Lectures on analysis on metric spaces:
Theorem. If $f:X\to\mathbb{R}$ is a bounded and uniformly continuous function on a metric space, then there is a sequence of Lipschitz continuous functions $f_i:X\to\mathbb{R}$, $i=1,2,3,\dotsc$, such that $f_i\to f$ converges uniformly on $X$.
$X$ can be any metric space and compactness is not required. For that reason the argument based on the Stone–Weierstrass theorem mentioned in some comments cannot be applied here.
I claim that $X,Y$ are metric spaces with $X$ compact, and if $X$ or $Y$ is zero-dimensional, then every continuous function $f:X\rightarrow Y$ can be uniformly approximated by a locally constant function, and every locally constant function $f:X\rightarrow Y$ is Lipschitz.
Locally constant functions are Lipschitz
I claim that every locally constant function $f:X\rightarrow Y$ is Lipschitz whenever $X$ is compact. If $f:X\rightarrow Y$ is locally constant, then let $\mathcal{P}=\{f^{-1}[\{y\}]:y\in Y\}\setminus\{\emptyset\}$. Let $V=\bigcup_{C,D\in\mathcal{P},C\neq D}C\times D$. Then $V$ is compact, so $d|_V:V\rightarrow\mathbb{R}$ has a minimum value $\delta$, and necessarily $\delta>0$, and the function $d$ has a maximum value $M$.
If $x,y\in X$ and $x,y$ belong to different blocks of $\mathcal{P}$, then $d(x,y)\geq\delta$ while $d(f(x),f(y))\leq M$, so $d(f(x),f(y))\leq d(x,y)\cdot\frac{M}{\delta}$ in this case. In fact, $d(f(x),f(y))\leq d(x,y)\cdot\frac{M}{\delta}$ whenever $x,y\in X$.
When $X$ is zero-dimensional.
Let $f:X\rightarrow Y$ be a continuous function. Let $\epsilon>0$. Then the cover $\{f^{-1}(B_\epsilon(y))|y\in Y\}$ has a refinement $\mathcal{P}$ which is a partition of $X$ into clopen sets. Now, for each $C\in\mathcal{P}$, let $y_C\in Y$ be an element with $C\subseteq f^{-1}(B_\epsilon(y_C))$. Then let $g:X\rightarrow Y$ be the function where $g[C]=\{y_C\}$ whenever $C\in\mathcal{P}$.
Then whenever $x\in C\in\mathcal{P}$, we have $g(x)=y_C$ while $f(x)\in B_\epsilon(y_C)$, so $d(f(x),g(x))<\epsilon$ while $g$ is locally constant.
when $Y$ is zero-dimensional
Suppose that $Y$ is zero-dimensional. Let $f:X\rightarrow Y$ be continuous. Then $f[Y]$ is compact. Therefore let $\epsilon>0$. Consider the cover $\{f[Y]\cap B_{\epsilon/2}(y)\mid y\in Y\}$. Then there is a partition $\mathcal{P}$ of $f[Y]$ into sets that are clopen in $f[Y]$ but where $\mathcal{P}$ refined the cover $\{f[Y]\cap B_{\epsilon/2}(y)\mid y\in Y\}$. In particular, each set in $\mathcal{P}$ has diameter less than $\epsilon$.
For each $C\in\mathcal{P}$, let $y_C\in Y$, and let $g:X\rightarrow Y$ be the function where $g(x)=y_C$ whenever $f(x)\in C$. Then whenever $f(x)\in C$, we have $g(x)=y_C\in C$ as well, so $d(f(x),g(y))<\epsilon$. Therefore, $g$ is a locally constant continuous function with $d(f,g)<\epsilon$.
