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This volume consists of papers written by eminent scientists from the international mathematical community, who present the latest information concerning the problem of Plateau after its classical solution by Jesse Douglas and Tibor Radó. The contributing papers provide insight and perspective on various problems in modern topics of Calculus of Variations, Global Differential Geometry and Global Nonlinear Analysis as related to the problem of Plateau.
Substances possessing heterogeneous microstructure on the nanometer and micron scales are scientifically fascinating and technologically useful. Examples of such substances include liquid crystals, microemulsions, biological matter, polymer mixtures and composites, vycor glasses, and zeolites. In this volume, an interdisciplinary group of researchers report their developments in this field. Topics include statistical mechanical free energy theories which predict the appearance of various microstructures, the topological and geometrical methods needed for a mathematical description of the subparts and dividing surfaces of heterogeneous materials, and modern computer-aided mathematical models and graphics for effective exposition of the salient features of microstructured materials.
A travelogue full of adventure, A Place to Belong is the story of a young teenage boy's search for self worth and faith in a cruel world. Paul Miller was eight years old when his parents took him on a mystifying, zigzagging journey, from Detroit to Florida, to California and back again. His father's tenuous grip on reality becomes as changeable as the landscapes they travel through. Paul's simple questions are ignored or answered by the back of his Father's hand. Paul jumps the roof-tops of Detroit slums, butts heads with the gangs of Los Angeles and gets caught up in a world of petty theft. Life hangs by bus fare, the surprising kindness of a loving family, a filthy motorist with a penchant for young boys, the kiss of a young girl. Along the way, Noah, a wise fisherman, shows Paul that God isn't some imperious judge sitting on top of a throne, but can become your best friend, a buddy you can talk to. " But can such a simple view account for all the misery Paul experiences?" In this captivating and at turns humorous story, a young man travels into the depths of despair and back again to find a place he can call home. "I got hooked and couldn't stop. This is a splendidly written story and quite a story to tell. So candid, unpretentious, and courageous." David Morris, Senior Editor Guideposts Books. "Miller tells a remarkable story, one that is in a sense an American Angela's Ashes but with the added element of faith as a factor in surviving an incredibly rough childhood." Michael Wilt, Editor, Nimble Spirit.
The analysis of Euclidean space is well-developed. The classical Lie groups that act naturally on Euclidean space-the rotations, dilations, and trans lations-have both shaped and guided this development. In particular, the Fourier transform and the theory of translation invariant operators (convolution transforms) have played a central role in this analysis. Much modern work in analysis takes place on a domain in space. In this context the tools, perforce, must be different. No longer can we expect there to be symmetries. Correspondingly, there is no longer any natural way to apply the Fourier transform. Pseudodifferential operators and Fourier integral operators can playa role in solving some of the problems, but other problems require new, more geometric, ideas. At a more basic level, the analysis of a smoothly bounded domain in space requires a great deal of preliminary spadework. Tubular neighbor hoods, the second fundamental form, the notion of "positive reach", and the implicit function theorem are just some of the tools that need to be invoked regularly to set up this analysis. The normal and tangent bundles become part of the language of classical analysis when that analysis is done on a domain. Many of the ideas in partial differential equations-such as Egorov's canonical transformation theorem-become rather natural when viewed in geometric language. Many of the questions that are natural to an analyst-such as extension theorems for various classes of functions-are most naturally formulated using ideas from geometry.
This textbook introduces geometric measure theory through the notion of currents. Currents, continuous linear functionals on spaces of differential forms, are a natural language in which to formulate types of extremal problems arising in geometry, and can be used to study generalized versions of the Plateau problem and related questions in geometric analysis. Motivating key ideas with examples and figures, this book is a comprehensive introduction ideal for both self-study and for use in the classroom. The exposition demands minimal background, is self-contained and accessible, and thus is ideal for both graduate students and researchers.
The object of these 2 volumes of collected papers is to provide insight and perspective on various research problems and theories in modern topics of Calculus of Variations, Complex Analysis, Real Analysis, Differential Equations, Geometry and their Applications, related to the work of Constantin Carathéodory. This work will be of interest both to researchers following the development of new results, and to people seeking an introduction in these fields.