172,397 research outputs found

    Finding Aid for Catherine Schlosser Baier Collection, 1960-2023

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    Catherine Schlosser Baier was born in Arkansaw, Wisconsin in 1921 and raised on a farm with four siblings. Baier graduated from UW-Stout in 1943 with a degree in Home Economics. She lived in Durand, Wisconsin for fifty years. During this time, Baier focused on genealogical research into the Schlosser family. She passed away on November 12, 2017.Clippings, pamphlets, and narratives documenting the lives of the Schlosser family

    C. Tresmontant, Le Christ hébreu, 1992

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    Jacques Schlosser. C. Tresmontant, Le Christ hébreu, 1992. In: Revue des Sciences Religieuses, tome 70, fascicule 2, 1996. p. 287

    C. Reynier, Évangile et mystère. Les enjeux théologiques de l'épître aux Ephésiens, Coll. «Lectio divina » 149, 1992

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    Jacques Schlosser. C. Reynier, Évangile et mystère. Les enjeux théologiques de l'épître aux Ephésiens, Coll. «Lectio divina » 149, 1992. In: Revue des Sciences Religieuses, tome 70, fascicule 3, 1996. pp. 400-401

    C. Reynier, Évangile et mystère. Les enjeux théologiques de l'épître aux Ephésiens, Coll. «Lectio divina » 149, 1992

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    Jacques Schlosser. C. Reynier, Évangile et mystère. Les enjeux théologiques de l'épître aux Ephésiens, Coll. «Lectio divina » 149, 1992. In: Revue des Sciences Religieuses, tome 70, fascicule 3, 1996. pp. 400-401

    S. Uinzio, C. Di Santé, V. Fusco, G. Ravasi, R. Fabris, F. Rossi de Gasperis, Israele e le genti (RdT Books), 1991

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    Jacques Schlosser. S. Uinzio, C. Di Santé, V. Fusco, G. Ravasi, R. Fabris, F. Rossi de Gasperis, Israele e le genti (RdT Books), 1991. In: Revue des Sciences Religieuses, tome 70, fascicule 3, 1996. p. 407

    H. Schlosser, Gruindzüge der neueren Privatrechtsgasehichte — ein Studienbuch, wyd. 3

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    Recenzja: Hans Schlosser, Grundzüge der neueren Privatrechtsgeschichte — ein Studienbuch, wyd. 3, C. F. Müller, Verlag, Heidelberg 1979, ss. XIV, 177. Uni-Taschenbücher 882

    INTEGRAL REPRESENTATION OF SUPEROSCILLATIONS VIA COMPLEX BOREL MEASURES AND THEIR CONVERGENCE

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    In the last decade there has been a growing interest in superoscil-lations in various fields of mathematics, physics and engineering. However, while in applications as optics the local oscillatory behaviour is the important property, some convergence to a plane wave is the standard characterizing fea-ture of a superoscillating function in mathematics and quantum mechanics. Also there exists a certain discrepancy between the representation of super-oscillations either as generalized Fourier series, as certain integrals or via spe-cial functions. The aim of this work is to close these gaps and give a general definition of superoscillations, covering the well-known examples in the exist-ing literature. Superoscillations will be defined as sequences of holomorphic functions, which admit integral representations with respect to complex Borel measures and converge to a plane wave in the space A1(C) of entire functions of exponential type

    Einführung in die Politikwissenschaft

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    Einführung in die Politikwissenschaft / von Dirk Berg-Schlosser und Theo Stammen. - 7., durchges. und erw. Aufl. - München : Beck, 2003. - IX, 371 S. - (C. H. Beck Studium) [1. Aufl. 1974

    INTERPOLATION BETWEEN DOMAINS OF POWERS OF OPERATORS IN QUATERNIONIC BANACH SPACES

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    In contrast to the classical complex spectral theory, where thespectrum is related to the invertibility of lambda - A : D(A) subset of X-C -> X-C, in the noncommutative quaternionic S-spectral theory one uses the invertibility of the second order polynomial T-2 - 2 Re (s)T+ |s|(2 ): D(T-2) subset of X -> X to define the S-spectrum, where X is a quaternionic Banach space. In this paper we will consider quaternionic operators T, for which at least one ray {te(i omega)| t > 0} ,omega is an element of [0,pi], i is an element of S is contained in the S-resolvent set, and the inverse operator (T-2-2Re(s)T+|s|(2))(-1 )admits certain decay properties on this ray. Utilizing the K-interpolation method, we then demonstrate that the domain D(T-k)of the k-th power of T is an intermediate space between D(T-n) and D(T-m), whenever n < k < m is an element of N-0. Moreover, also a characterization of the interpolation space (X, D(T-n))(theta,p), theta is an element of (0,1), p is an element of [1,infinity], in is given in terms of integrability conditions on the pseudoS-resolvent Q(s)(-1)(T)
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