Rade T. Živaljević scite author profile

We provide a "toolkit" of basic lemmas for the comparison of homotopy types of homotopy colimits of diagrams of spaces over small categories. We show how this toolkit can be used in quite different fields of applications. We demonstrate this with respect to 1. Björner's "Generalized Homotopy Complementation Formula" [5], 2. the topology of toric varieties, 3. the study of homotopy types of arrangements of subspaces, 4. the analysis of homotopy types of subgroup complexes.

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The colored Tverberg's problem and complexes of injective functions

Živaljević

Vrecica²

1992

Journal of Combinatorial Theory, Series A

124

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Topology and combinatorics of partitions of masses by hyperplanes

Mani‐Levitska

Vrećica

Živaljević

2006

Advances in Mathematics

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An old problem in combinatorial geometry is to determine when one or more measurable sets in R d admit an equipartition by a collection of k hyperplanes [B. Grünbaum, Partitions of mass-distributions and convex bodies by hyperplanes, Pacific J. Math. 10 (1960) 1257-1261]. A related topological problem is the question of (non)existence of a map f : (S d ) k → S(U ), equivariant with respect to the Weyl group W k = B k := (Z/2) ⊕k S k , where U is a representation of W k and S(U ) ⊂ U the corresponding unit sphere. We develop general methods for computing topological obstructions for the existence of such equivariant maps. Among the new results is the well-known open case of 5 measures and 2 hyperplanes in R 8 [E.A. Ramos, Equipartitions of mass distributions by hyperplanes, Discrete Comput. Geom. 15 (1996) 147-167]. The obstruction in this case is identified as the element 2X ab ∈ H 1 (D 8 ; Z) ∼ = Z/4, where X ab is a generator, which explains why this result cannot be obtained by the parity count formulas of Ramos [loc. cit.] or the methods based on either Stiefel-Whitney classes or ideal valued cohomological index theory [E. Fadell, S. Husseini, An ideal-valued cohomological index theory with applications to Borsuk-Ulam and BourginYang theorems, Ergodic Theory Dynam. Systems 8 * (1988) 73-85].

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