A geometric characterization of the groups Suz and HS

Let \(R(, \mathscr{N}, \ldots\) be the space of bounded non-degenerate representations \(\pi: \alpha \rightarrow, 1\), where \(\alpha\) is a nuclear \(C^{*}\)-algebra and, 1 an injective von Neumann algebra with separable predual. We prove that \(R(\mathscr{\mathscr { C } , , 1 )}\) ) is an homogene

## Abstract The structure of the bispyridinium oximes, toxogonin, HS‐3, HS‐6 and HI‐6, used as antidotes in organophosphorus poisoning, is confirmed by ^13^C NMR spectroscopy. The ^13^C NMR spectra of the corresponding monopyridinium precursors substantiate the signal assignment in the bispyridiniu

In this paper, we obtain a quantitative characterization of all finite simple groups. Let π t G denote the set of indices of maximal subgroups of group G and let P G be the smallest number in π t G . We have the following theorems. Theorem 2. Let N and G be finite simple groups. If N divides G , P