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21	EXISTENCE-THEOREMS FOR PARABOLIC DIFFERENTIAL EQUATIONS WITH FUNCTIONS WHICH DEPEND ON PAST HISTORY Milligan, Alfred William, 1939- January 1973 (has links) No description available. Differential equations, Parabolic. Existence theorems.
22	Structural stability of periodic systems Chen, Mingxiang 12 1900 (has links) No description available. Periodic functions Differential equations, Parabolic
23	Ranges of vector measures and valuations Kuhn, Zuzana 12 1900 (has links) No description available. Lyapunov functions Differential equations, Parabolic
24	Fine and parabolic limits Mair, Bernard A. January 1982 (has links) In this thesis, an integral representation theorem is obtained for non-negative solutions of the heat equation on X = (//R)('n-1) x (0,(INFIN)) x (0,T) and their boundary behaviour is investigated by using the abstract Fatou-Naim-Doob theorem. The boundary behaviour of positive solutions of the equation Lu = 0 on Y = (//R)('n) x (0,T), where L is a uniformly parabolic second-order differential operator in divergence form is also studied. / In particular, the notion of semi-thinness is introduced for the corresponding potential theories on X and Y and relationships between fine, semi-fine and parabolic limits are obtained. / Results of Kemper specialised to X are obtained by means of fine convergence and a Carleson-type local Fatou theorem is obtained for solutions of Lu = 0 on a union of parabolic regions. Heat equation. Differential equations, Parabolic.
25	Theorie einer pseudoparabolischen partiellen Differentialgleichung zur Modelliurung der Lösemittelaufnahme in Polymerfeststoffen Düll, Wolf-Patrick. January 2004 (has links) Thesis (doctoral)--Rheinische Friedrich-Wilhelms-Universität Bonn, 2004. / Includes bibliographical references (p. 74-76).
26	Difference methods for ordinary differential equations with applications to parabolic equations Doedel, Eusebius Jacobus January 1976 (has links) The first chapter of the thesis is concerned with the construction of finite difference approximations to boundary value problems in linear nth order ordinary differential equations. This construction is based upon a local collocation procedure with polynomials, which is equivalent to a method of undetermined coefficients. It is shown that the coefficients of these finite difference approximations can be expressed as the determinants of matrices of relatively small dimension. A basic theorem states that these approximations are consistent, provided only that a certain normalization factor does not vanish. This is the case for compact difference equations and for difference equations with only one collocation point. The order of consistency may be improved by suitable choice of the collocation points. Several examples of known, as well as new difference approximations are given. Approximations to boundary conditions are also treated in detail. The stability theory of H. O. Kreiss is applied to investigate the stability of finite difference schemes based upon these approximations. A number of numerical examples are also given. In the second chapter it is shown how the construction method of the first chapter can be extended to initial value problems for systems of linear first order ordinary differential equations. Specific examples are 'included and the well-known stability theory for these difference equations is summarized. It is then shown how these difference methods may be applied to linear parabolic partial differential equations in one space variable after first discretizing in space by a suitable method from the first chapter. The stability of such difference schemes for parabolic equations is investigated using an eigenvalue-eigenvector analysis. In particular, the effect of various approximations to the boundary conditions is considered. The relation of this analysis to the stability theory of J. M. Varah is indicated. Numerical examples are also included. / Science, Faculty of / Mathematics, Department of / Graduate Differential equations, Parabolic Difference equations
27	Fine and parabolic limits Mair, Bernard A. January 1982 (has links) No description available. Differential equations, Parabolic. Heat equation.
28	Discrete Riemann Maps and the Parabolicity of Tilings Repp, Andrew S. 14 May 1998 (has links) The classical Riemann Mapping Theorem has many discrete analogues. One of these, the Finite Riemann Mapping Theorem of Cannon, Floyd, Parry, and others, describes finite tilings of quadrilaterals and annuli. It relates to several combinatorial moduli, similar in nature to the classical modulus. The first chapter surveys some of these discrete analogues. The next chapter considers appropriate extensions to infinite tilings of half-open quadrilaterals and annuli. In this chapter we prove some results about combinatorial moduli for such tilings. The final chapter considers triangulations of open topological disks. It has been shown that one can classify such triangulations as either parabolic or hyperbolic, depending on whether an associated combinatorial modulus is infinite or finite. We obtain a criterion for parabolicity in terms of the degrees of vertices that lie within a specified distance of a given base vertex. / Ph. D. Tilings Parabolic Modulus Riemann Map
29	Auslegung von Parabolrinnen für Solarkraftwerke im Originalmaßstab Forman, Patrick, Stallmann, Tobias, Mark, Peter, Schnell, Jürgen 21 July 2022 (has links) Das Erkenntnistransferprojekt baut auf die im SPP-Projekt „Leichte Verformungsoptimierte Schalentragwerke aus mikrobewehrtem UHPC am Beispiel von Parabolrinnen solarthermischer Kraftwerke“ (s. S. 536 ff .) erzielten Ergebnisse der ersten Förderperiode auf. Der Fokus liegt auf der Entwicklung von linienartig verstärkten, vollwandigen Parabolschalen mit zur bestehenden Kraftwerkstechnik passenden EuroTrough-Rinnenabmessungen. Es sollten die bisherigen Erkenntnisse zusammen mit professionellen Anwendungspartnern vorwettbewerblich ausgebaut werden, so dass sie Grundlage für eine Serienfertigung bilden können. Dementsprechend setzten sich die Kooperationspartner aus dem Deutschen Zentrum für Luft- und Raumfahrt DLR (Systemführer für linienfokussierende Solarkraftwerke), der Fa. Solarlite CSP (Hersteller von Solaranlagen in Parabolrinnentechnik), der INNOGRATION GmbH (Hersteller von Stahlbetonfertigteilen) und der Fa. Dyckerhoff Zement (Hersteller von Ausgangsstoffen für Hochleistungsbetone) zusammen. info:eu-repo/classification/ddc/624 ddc:624
30	Reciprocity in vector acoustics Deal, Thomas J. 03 1900 (has links) Approved for public release; distribution is unlimited / Reissued 30 May 2017 with Second Reader’s non-NPS affiliation added to title page. / The scalar reciprocity equation commonly stated in underwater acoustics relates pressure fields and monopole sources. It is often used to predict the pressure measured by a hydrophone for multiple source locations by placing a source at the hydrophone location and calculating the field everywhere for that source. That method, however, does not work when calculating the orthogonal components of the velocity field measured by a fixed receiver. This thesis derives a vector-scalar reciprocity equation that accounts for both monopole and dipole sources. This equation can be used to calculate individual components of the received vector field by altering the source type used in the propagation calculation. This enables a propagation model to calculate the received vector field components for an arbitrary number of source locations with a single model run for each received field component instead of requiring one model run for each source location. Application of the vector-scalar reciprocity principle is demonstrated with analytic solutions for a range-independent environment and with numerical solutions for a range-independent and a range-dependent environment using a parabolic equation model. / Electronics Engineer, Naval Undersea Warfare Center reciprocity vector field parabolic equation acoustic dipole

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