Glasnik matematički, Vol. 40 No. 2, 2005.
Izvorni znanstveni članak
A subshape spectrum for compacta
Nikica Uglešić
Branko Červar
Sažetak
A sequence of categories and functors between them are constructed. They form a subshape spectrum for compacta in the following sense: Each of these categories classifies compact ANR's just as the homotopy category does; the classification of compacta by the "finest" of these categories coincides with the shape type classification; moreover, the finest category contains a subcategory which is isomorphic to the shape category; there exists a functor of the shape category to each of these categories, as well as of a "finer" category to a "coarser" one; the functors commute according to the indices.
Further, a few applications of the "subshape spectrum theory" are demonstrated. It is shown that the S*-equivalence (a uniformization of the Mardesic S-equivalence) and the q*-equivalence (a uniformization of the Borsuk quasi-equivalence) admit the category characterizations within the subshape spectrum, and that the q*-equivalence implies (but is not equivalent to) the S*-equivalence.
Ključne riječi
Compactum; ANR; inverse sequence; limit; shape type; quasi-equivalence; S-equivalence
Hrčak ID:
386
URI
Datum izdavanja:
9.11.2005.
Posjeta: 1.307 *