Edward L. Bueler and Igor Prokhorenkov
\def\lap{\triangle} This paper constructs a Hodge theory of noncompact topologically tame manifolds $M$. The main result is an isomorphism between the de~Rham cohomology with compact supports of $M$ and the kernel of the Hodge--Witten--Bismut Laplacian $\lap_\mu$ associated to a measure $d\mu$ which has sufficiently rapid growth at infinity on $M$. This follows from the construction of a space of forms associated to $\lap_\mu$ which satisfy an ``extension by zero'' property. The ``extension by zero'' property is proved for manifolds with cylindrical ends possessing gaussian growth measures.