TY - JOUR A1 - Ahmad, Ruhel A1 - Wolber, Wanja A1 - Eckardt, Sigrid A1 - Koch, Philipp A1 - Schmitt, Jessica A1 - Semechkin, Ruslan A1 - Geis, Christian A1 - Heckmann, Manfred A1 - Brüstle, Oliver A1 - McLaughlin, John K. A1 - Sirén, Anna-Leena A1 - Müller, Albrecht M. T1 - Functional Neuronal Cells Generated by Human Parthenogenetic Stem Cells JF - PLoS One N2 - Parent of origin imprints on the genome have been implicated in the regulation of neural cell type differentiation. The ability of human parthenogenetic (PG) embryonic stem cells (hpESCs) to undergo neural lineage and cell type-specific differentiation is undefined. We determined the potential of hpESCs to differentiate into various neural subtypes. Concurrently, we examined DNA methylation and expression status of imprinted genes. Under culture conditions promoting neural differentiation, hpESC-derived neural stem cells (hpNSCs) gave rise to glia and neuron-like cells that expressed subtype-specific markers and generated action potentials. Analysis of imprinting in hpESCs and in hpNSCs revealed that maternal-specific gene expression patterns and imprinting marks were generally maintained in PG cells upon differentiation. Our results demonstrate that despite the lack of a paternal genome, hpESCs generate proliferating NSCs that are capable of differentiation into physiologically functional neuron-like cells and maintain allele-specific expression of imprinted genes. Thus, hpESCs can serve as a model to study the role of maternal and paternal genomes in neural development and to better understand imprinting-associated brain diseases. KW - methylation KW - derivation KW - blastocysts KW - pluripotent KW - differentiation KW - lines KW - brain development KW - in-vitro KW - mice KW - specification Y1 - 2012 U6 - http://nbn-resolving.de/urn/resolver.pl?urn:nbn:de:bvb:20-opus-130268 VL - 7 IS - 8 ER - TY - THES A1 - Staab, Patricia T1 - Geometrische Eigenschaften von Spiraltypflächen T1 - Geometrical Properties of Spiral Type Surfaces N2 - Spiraltypflächen sind Minimalflächen des dreidimensionalen euklidischen Raums, die sich durch hohe Symmetrie gegenüber komplexen Ähnlichkeitsabbildungen der Minimalkurve auszeichnen. Ihren Namen verdanken Sie folgender Eigenschaft: Sie und ihre komplex Homothetischen sind die einzigen auf Spiralflächen abwickelbaren Minimalflächen. Bekannte Spiraltypflächen sind die Spiralminimalflächen (zugleich Minimal- und Spiralflächen) und die Bourflächen (auf Rotationsflächen abwickelbare Minimalflächen). Das Katenoid und die Enneperfläche sind spezielle Bourflächen. In dieser Arbeit werden die Spiraltypflächen auf ihre geometrischen Eigenschaften untersucht. Wir stellen ihre Periodizitäten und Symmetrien fest und versuchen, ausgezeichnete Flächenkurven auf ihnen zu finden. Wir verwenden eine globale Weierstraß-Darstellung der Spiraltypflächen. In dieser Darstellung ergeben die Flächen eine Schar mit einem komplexen Scharparameter. Anhand dieser Darstellung leiten wir sämtliche Symmetrien der Spiraltypflächen zu linearen Ähnlichkeitsabbildungen der Minimalkurve her. Als Spezialfälle erhalten wir die Symmetrien unter Assoziationen und Derivationen (Drehung der Minimalkurve um einen imaginären Drehwinkel), sowie die reellen Symmetrien (Dreh-, Spiegel- und Strecksymmetrien). Unter den Spiraltypflächen gibt es nur zwei translationssymmetrische Flächen. Die Umorientierung einer Spiraltypfläche entspricht (bis auf komplexe Homothetie) dem Vorzeichenwechsel des Flächenparameters. Im Übrigen kann durch einfache Spiegelungen an den Koordinatenebenen beziehungsweise Drehungen um die Koordinatenachsen das Vorzeichen von Real- beziehungsweise Imaginärteil des Flächenparameters umgekehrt werden. Schließlich stellen wir noch ausgezeichnete Flächenkurven auf den Spiraltypflächen vor: Krümmungslinien, Asymptotenlinien und Geodätische, sowie als deren Verallgemeinerungen die Pseudokrümmungslinien und Pseudogeodätischen. N2 - Spiral type surfaces are minimal surfaces of the three-dimensional euclidean space, which are highly symmetric under similarity transformations of the corresponding complex minimal curve. They are named "spiral type" because these surfaces and their complex homothetics are the only minimal surfaces applicable to spiral surfaces. Well-known spiral type surfaces are the spiral minimal surfaces (which are both minimal and spiral) and the Bour surfaces (which are applicable to surfaces of revolution). The catenoid and the Enneper surface are Bour surfaces. In this paper we examine the geometrical properties of spiral type surfaces. We state their periodicities and symmetries and present special curves on these surfaces. We introduce a global Enneper-Weierstrass parameterization of the spiral type surfaces. Hence, the surfaces can be classified using a complex parameter. From this representation we can derive all symmetries under similarity transformations of the minimal curve. These symmetries contain the associations and derivations (i. e. rotations by imaginary angles) of minimal curves and the real mappings (especially rotations, reflections and central dilations). There are only two spiral type surfaces which are symmetric under translations. A change of orientation of a spiral type surface is equivalent to a combination of complex homothety and negation of the surface parameter. Anyway the sign of the real and imaginary part of the surface parameter can be changed by a simple reflection in a coordinate plane or a rotation around a coordinate axis. Finally we present special curves on spiral type surfaces: lines of curvature, asymptotic curves, geodesics, and the generalizations: pseudo curvature lines and pseudo geodesics. KW - Spiraltypfläche KW - Symmetrie KW - Minimalflächen KW - Minimalkurven KW - Spiraltypflächen KW - Spiralflächen KW - mittlere Krümmung KW - Derivation KW - Symmetrien KW - Pseudogeodätische KW - Minimal surfaces KW - minimal curves KW - spiral type surfaces KW - spiral surfaces KW - mean curvature KW - derivation KW - symmetries KW - pseudo geodesics Y1 - 2002 U6 - http://nbn-resolving.de/urn/resolver.pl?urn:nbn:de:bvb:20-opus-3727 ER - TY - JOUR A1 - Luraghi, Silvia A1 - Inglese, Guglielmo A1 - Kölligan, Daniel T1 - The passive voice in ancient Indo-European languages: inflection, derivation, periphrastic verb forms JF - Folia Linguistica N2 - The IE languages developed different strategies for the encoding of the passive function. In some language branches, the middle voice extended to the passive function to varying extents. In addition, dedicated derivational formations arose in a number of languages, such as the Greek -ē-/-thē- aorist and the Indo-Aryan -ya-presents. Periphrastic formations involving a verbal adjective or a participle are also widely attested, and played an important role in the building of the passive paradigm in e.g. Romance and Germanic languages. As the periphrastic passive is also attested in Hittite alongside passive use of the middle, both strategies seem to be equally ancient. Some minor strategies include lexical passives and the extensive lability of verbs. A survey of possible strategies provides evidence for the rise of a disparate number of morphemes and constructions, and for their ongoing incorporation into the inflectional paradigms (paradigmaticization) of given languages, thus adding to our knowledge about cross-linguistic sources of passive morphology and grammaticalization processes involved. KW - ancient Indo-European languages KW - derivation KW - inflection KW - middle voice KW - passive KW - periphrastic forms Y1 - 2021 U6 - http://nbn-resolving.de/urn/resolver.pl?urn:nbn:de:bvb:20-opus-247034 SN - 0165-4004 SN - 1614-7308 VL - 55 IS - s42-s2 SP - 339 EP - 391 ER -