Ergodic theorem says that $\displaystyle\lim_{n\rightarrow\infty}\frac{1}{n}\sum_{t=1}^nf(T^tx) = \displaystyle\int f\,\mathrm{d}\mu$ for $\mu$-almost every $x$. In many cases, the support of $\mu$ has zero Lebesgue measure.
My question is that, what if $f$ is uniformly continuous on a neighborhood of the trajectory, and $x$ is outside of the support of $\mu$? When can we have similar identities? Thanks a lot.
Axiom A diffeomorphisms have this property. The following result is due to Bowen and Ruelle.
Theorem
Let $X$ be a connected compact manifold and $T : X \rightarrow X$ be an Axiom A $C^2$ diffeomorphism: the non wandering set $\Omega$ of $T$ is an hyperbolic set and the periodic orbits of $T$ are dense in $\Omega$. Then there is a finite number of disjoint compact attractors $K_i$ included in $\Omega$, each of them supporting an ergodic probability measure $\mu_i$ called a Sinai-Ruelle-Bowen measure, such that the union of the bassins of attraction $B(K_i) = \{x\in X \mid d(T^n(x, K_i)\rightarrow 0\}$ is of full Lebesgue measure.
Moreover, for lebesgue almost $x\in B(K_i)$, for all $f : X\rightarrow \bf R$ uniformly continuous, $$ {1\over n}\sum_{k=1}^n f \circ T^k(x) \rightarrow \int f d\mu_i. $$
The set of Axiom A flows is open in the $C^2$ topology but is far from dense in the set of all $C^2$ diffeomorphisms on $X$ in general. There are extensions to non-uniformly hyperbolic systems of that result but also many counterexamples.
The theorem follows from the fact that a point in the bassin of $K_i$ is on the stable leaf of a point on $K_i$ so that the two Birkhoff means are asymptotic. As a result, the asymptotic behavior of the trajectories of a set of positive measure of points is dictated by the measure $\mu_i$ on the attractor, even if that measure is singular with respect to the Lebesgue measure.
The key word you are looking for is "physical measures", sometimes known as SRB measures (because of the result.that coudy mentions).
See https://link.springer.com/article/10.1023/A:1019762724717
A related notion you may find interesting is given here: https://arxiv.org/abs/1106.4074
A nice paper discussing related notions is the following https://link.springer.com/article/10.1007/BF01212280
