Local n-connectivity and approximate lifting

In this note the cotelescope construction of fibrant extension (Cathey, 1979) of compacta is used to study approximate lifting properties of some shape morphisms (shape fibrations (MardeSiC and Rushing, 1978) and shape absolutely soft maps (Zerkalov, 1987)). It is proved that for a shape fibration (

Su, J., On locally k-critically n-connected graphs, Discrete Mathematics 120 (1993) 183-190. Let 0 # W'g V(G). The graph G is called a W-locally k-critically n-connected graph or simply a W-locally (n, k)-graph, if for all V'G W with 1 V'I 6 k and each fragment F of G we have that K(G-V')=n-1 V' and

## Abstract A graph is locally connected if for each vertex ν of degree __≧2__, the subgraph induced by the vertices adjacent to ν is connected. In this paper we establish a sharp threshold function for local connectivity. Specifically, if the probability of an edge of a labeled graph of order __n_

## Abstract A class of multilocal functions called __n__‐local energies, which can serve as accuracy criteria on approximate wave functions, are defined. Their interpretation is discussed and their multilocal form is shown to be a result of the holistic character of the quantum description. The ana