الصفحة 1
الصفحة 1
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Object-Oriented Programming Languages : Interpretation

This comprehensive examination of the main approaches to object-oriented language explains the key features of the languages in use today. Class-based, prototypes and Actor languages are all looked at and compared in terms of their semantic concepts. In providing such a wide-ranging comparison, this book provides a unique overview of the main approaches to object-oriented languages.

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Noncommutative Geometry and Number Theory : Where Arithmetic meets Geometry and Physics

This volume collects and presents up-to-date research topics in arithmetic and noncommutative geometry and ideas from physics that point to possible new connections between the fields of number theory, algebraic geometry and noncommutative geometry. The articles collected in this volume present new noncommutative geometry perspectives on classical topics of number theory and arithmetic such as modular forms, class field theory, the theory of reductive p-adic groups, Shimura varieties, the local Lfactors of arithmetic varieties. They also show how arithmetic appears naturally in noncommutative geometry and in physics, in the residues of Feynman graphs, in the properties of noncommutative tori, and in the quantum Hall effect.

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Investing in Private Equity Partnerships : The Role of Monitoring and Reporting

Private equity has become an important asset class for institutional investors. As the asset class grows and investors get more experienced, the debate concerning transparency and governance of private equity funds has intensified. Fund investors demand more disclosure from private equity fund managers. Are these calls justified? What information do fund investors need? How can private equity fund investors manage their exposure to the asset class effectively? Kay Müller presents an in-depth analysis into the monitoring activities of institutional investors and explores their information requirements by interviewing leading European private equity fund investors. He contrasts these results with the actual reporting by fund managers and reveals essential information gaps based on a disclosure study of private equity fund reports. Since effective and open communication supports long-lasting and trusted partnerships, these findings provide important guidance on how to improve the relationships between investors and fund managers in the private equity industry.

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Introduction to Modern Number Theory: Fundamental Problems, Ideas and Theories

"Introduction to Modern Number Theory" surveys from a unified point of view both the modern state and the trends of continuing development of various branches of number theory. Motivated by elementary problems, the central ideas of modern theories are exposed. Some topics covered include non-Abelian generalizations of class field theory, recursive computability and Diophantine equations, zeta- and L-functions. This substantially revised and expanded new edition contains several new sections, such as Wiles' proof of Fermat's Last Theorem, and relevant techniques coming from a synthesis of various theories. Moreover, the authors have added a part dedicated to arithmetical cohomology and noncommutative geometry, a report on point counts on varieties with many rational points, the recent polynomial time algorithm for primality testing, and some others subjects.

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Diabetes drug notes

Diabetes is becoming more common in both older and younger generations and in keeping with this escalation in cases, there are an ever increasing number of drugs and drug classes that are suitable to treat hyperglycaemia. In a unique blend of diabetes practice, clinical pharmacology, and cardiovascular medicine, Diabetes Drug Notes describes the principles of clinical pharmacology with regards to diabetes prescribing. Each drug class for the treatment of diabetes is covered in detail, along with the effect on the cardiovascular and renal systems caused by each drug. Building upon the success of their "Drug Notes" series for Practical Diabetes and their "Drugs for Diabetes" series in the British Journal of Cardiology, the team of experts focuses on the glycaemic management of type 1 and type 2 diabetes, with other effects of antidiabetic drugs covered as well.

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Concepts and Semantics of Programming Languages 2 : Modular and Object-oriented Constructs with OCaml, Python, C++, Ada and Java

Explores the syntactical constructs of the most common programming languages, and sheds a mathematical light on their semantics, providing also an accurate presentation of the material aspects that interfere with coding. Presents an original semantic model, collectively taking into account all of the constructs and operations of modules and classes: visibility, import, export, delayed definitions, parameterization by types and values, extensions, etc. The model serves for the study of Ada and OCaml modules, as well as C header files. It can be deployed to model object and class features, and is thus used to describe Java, C++, OCaml and Python classes.

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Algebra ; Vol. I : Fields and Galois Theory

The present textbook is a lively, problem-oriented and carefully written introduction to classical modern algebra. The first volume focuses on field extensions. Galois theory and its applications are treated more thoroughly than in most texts. It also covers basic applications to number theory, ring extensions and algebraic geometry.The main focus of the second volume is on additional structure of fields and related topics. Much material not usually covered in textbooks appears here, including real fields and quadratic forms, diophantine dimensions of a field, the calculus of Witt vectors, the Schur group of a field, and local class field theory.

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Algebra : Fields with structure, algebras and advanced topics

The present textbook is a lively, problem-oriented and carefully written introduction to classical modern algebra. The author leads the reader through interesting subject matter, while assuming only the background provided by a first course in linear algebra. The first volume focuses on field extensions. Galois theory and its applications are treated more thoroughly than in most texts. It also covers basic applications to number theory, ring extensions and algebraic geometry. The main focus of the second volume is on additional structure of fields and related topics. Much material not usually covered in textbooks appears here, including real fields and quadratic forms, the Tsen rank of a field, the calculus of Witt vectors, the Schur group of a field, and local class field theory.

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Advanced Design Techniques for RF Power Amplifiers

Main aim is to provide the reader with a deep analysis of theoretical aspects, modelling, and design strategies of RF high-efficiency power amplifiers. Advanced Design Techniques for RF Power Amplifiers begins with an analytical review of current state of the problem. Then it moves to the theoretical analysis of BJT class-F power amplifier near transition frequency and presents the necessary realization conditions. The next part concerns the practical verification and demonstration of the theoretical results. It is followed by the part devoted to the output networks of high-efficiency power ampifiers. The novel type of photonic band-gap structure providing improved characteristics both in the pass and stop bands is proposed. Finally, the fifth-harmonic peaking class F power amplifier design based on the above structure is presented.

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