106,168 research outputs found

    Umgebungen von Reichenberg / A. Baur & A. Lang scr. G. Pellischek sculp.

    No full text
    UMGEBUNGEN VON REICHENBERG / A. BAUR & A. LANG SCR. G. PELLISCHEK SCULP. Special-Karte des Koenigreiches Boehmen (-) Umgebungen von Reichenberg / A. Baur & A. Lang scr. G. Pellischek sculp. (Nro. 3) ( -

    Two contributions to the representation theory of algebraic groups

    No full text
    Let V be a �nite dimensional complex vector space. A subset X in V has the separation property if the following holds: For any pair l, m of linearly independent linear functions on V there is a point x in X such that l(x) = 0 and m(x) 6= 0. We study the the case where V = C[x; y]n is an irreducible representation of SL2. The subsets we are interested in are the closures of SL2{orbits Of of forms in C[x; y]n. We give an explicit description of those orbits that have the separation property: The closure of Of has the separation property if and only if the form f contains a linear factor of multiplicity one. In the second part of this thesis we study tensor products V� V� of irreducible G{representations (where G is a reductive complex algebraic group). In general, such a tensor product is not irreducible anymore. It is a fundamental question how the irreducible components are embedded in the tensor product. A special component of the tensor product is the so-called Cartan component V�+� which is the component with the maximal highest weight. It appears exactly once in the decomposition. Another interesting subset of V� V� is the set of decomposable tensors. The following question arises in this context: Is the set of decomposable tensors in the Cartan component of such a tensor product given as the closure of the G{orbit of a highest weight vector? If this is the case we say that the Cartan component is small. We show that in general, Cartan components are small. We present what happens for G = SL2 and G = SL3 and discuss the representations of the special linear group in detail

    G-0480: College Ward, Utah, John E. and Lyda Baur residence. Built 1919

    No full text
    G-0480: College Ward, Utah, John E. and Lyda Baur residence. Built 191

    Beweislast

    No full text

    Beweislast

    No full text

    Iustum (Gerechtigkeit)

    No full text

    Beleidigung

    No full text

    Beleidigung

    No full text
    corecore