Is there standard notation for
(1) exterior algebras
(2) free graded commutative algebras
(3) divided polynomial algebras ?
I've seen (and used) $\Lambda$, $\Gamma$, $\Delta$ etc. used for some or all of these things, and I have no idea if there is a consensus about which notation goes with which algebra.
It's pretty standard to use $\bigwedge(V)$ or $\Lambda(V)$ for the exterior algebra on a vector space $V$ and $\bigwedge^k(V)$ or $\Lambda^k(V)$ for the $k$-th graded part. For symmetric algebras $S(V)$ or $\mathrm{Sym}(V)$ etc. are frequent notations with again $S^k(V)$ or $\mathrm{Sym}^k(V)$ for the graded parts. I wouldn't say divided polynomial algebras come up often enough to have a standard notation; you could probably use the above notations for exterior or symmetric algebras without further comment and expect to be understood, but whatever notation you choose for divided polynomial algebras, you'd probably have to explain it.
$\bigwedge$(that is, \bigwedge) for exterior algebra as noted by Robin Chapman, it seems the use of$\Lambda$(in written or verbal form) is just a corruption of the wedge symbol. There is also an older tradition of writing something like$E(V)$for the exterior algebra of a vector space, but with the operation usually written as$v \wedge w$. The wedge has become standard $\endgroup$