Let $G\subset {\bf SU}(2,1)$ be a non-elementary complex hyperbolic Kleinian group. If $G$ preserves a complex line, then $G $ is $\mathbb {C}$-Fuchsian; if $ G $ preserves a Lagrangian plane, then $ G $ is $\mathbb {R}$-Fuchsian; $ G $ is Fuchsian if $ G $ is either $\mathbb {C}$-Fuchsian or $\mathbb {R}$-Fuchsian. In this paper, we prove that if the traces of all elements in $ G $ are real, then $ G $ is Fuchsian. This is an analogous result of Theorem V.G. 18 of B. Maskit, Kleinian Groups, Springer-Verlag, Berlin, 1988, in the setting of complex hyperbolic isometric groups. As an application of our main result, we show that $ G $ is conjugate to a subgroup of ${\bf S}(U(1)\times U(1,1))$ or ${\bf SO}(2,1)$ if each loxodromic element in $G $ is hyperbolic. Moreover, we show that the converse of our main result does not hold by giving a $\mathbb {C}$-Fuchsian group.
The main aim of the paper is to find a non-mimetic understanding of art in proper Plato’s thought which is known exactly for his formulation of the concept of “mime-sis” in the dialogue Republic. The author of the contribution presumes to find the non-mimetic understanding also in the dialogue Ion, in which the creation of art is presented as madness from inspiration. Plato’s Ion can be understood with the aid of Levinas’s notion of alterity, as well as of how it disturbs knowledge. This broad scheme does not exhaust the possibilities of similarities between both of the philosophers, and it opens the way to clarify singularities: Plato’s notion of magnetism, the rest of Divini-ty in art-work, the Levinasian concept of trace, or the concept of ambiguity.
We show that the index defined via a trace for Fredholm elements in a Banach algebra has the property that an index zero Fredholm element can be decomposed as the sum of an invertible element and an element in the socle. We identify the set of index zero Fredholm elements as an upper semiregularity with the Jacobson property. The Weyl spectrum is then characterized in terms of the index., Jacobus J. Grobler, Heinrich Raubenheimer, Andre Swartz., and Obsahuje seznam literatury