Locally $n$-connected compacta and $UV^n$-maps

Abstract: We provide a machinery for transferring some properties of metrizable $ANR$-spaces to metrizable $LC^n$-spaces. As a result, we show that for complete metrizable spaces the properties $ALC^n$, $LC^n$ and $WLC^n$ coincide to each other. We also provide the following spectral characterizations of $ALC^n$ and cell-like compacta: A compactum $X$ is $ALC^n$ if and only if $X$ is the limit space of a $\sigma$-complete inverse system $S={X_\alpha, p^{{\beta}_\alpha,} \alpha<\beta<\tau}$ consisting of compact metrizable $LC^n$-spaces $X_\alpha$ such that all bonding projections $p^{{\beta}_\alpha$,} as a well all limit projections $p_\alpha$, are $UV^n$-maps. A compactum $X$ is a cell-like (resp., $UV^n$) space if and only if $X$ is the limit space of a $\sigma$-complete inverse system consisting of cell-like (resp., $UV^n$) metric compacta.