This book provides a lucid survey of the major viewpoints in social psychology concerning people's self-awareness (or lack of it), their explanations of their own actions, and their cognitive illusions and self-misunderstandings. In this readable but scholarly review, John McClure examines the major approaches to social cognition developed in America and Europe, including orthodox models that draw on information-processing and behavioral concepts, and innovative approaches that draw on hermeneutic or interpretive models, discourse analysis, and, in particular, critical theory. The book...
This book provides a lucid survey of the major viewpoints in social psychology concerning people's self-awareness (or lack of it), their explanations ...
This is the first volume of a comprehensive and up-to-date treatment of quadratic optimal control theory for partial differential equations over a finite or infinite time horizon, and related differential (integral) and algebraic Riccati equations. The authors describe both continuous theory and numerical approximation. They use an abstract space, operator theoretic approach, based on semigroups methods and unifying across a few basic classes of evolution. The various abstract frameworks are motivated by, and ultimately directed to, partial differential equations with boundary/point control....
This is the first volume of a comprehensive and up-to-date treatment of quadratic optimal control theory for partial differential equations over a fin...
The book is devoted to the study of classical combinatorial structures such as random graphs, permutations, and systems of random linear equations in finite fields. The author shows how the application of the generalized scheme of allocation in the study of random graphs and permutations reduces the combinatorial problems to classical problems of probability theory on the summation of independent random variables. He offers recent research by Russian mathematicians, including a discussion of equations containing an unknown permutation, and the first English-language presentation of techniques...
The book is devoted to the study of classical combinatorial structures such as random graphs, permutations, and systems of random linear equations in ...
Discrete mathematics is an important tool for the investigation of various models of functioning of technical devices, especially in the field of cybernetics. Here the author presents some complex problems of discrete mathematics in a simple and unified form using an original, general combinatorial scheme. Professor Sachkov's aim is to focus attention on results that illustrate the methods described. A distinctive aspect of the book is the large number of asymptotic formulae derived. Professor Sachkov begins with a discussion of block designs and Latin squares before proceeding to treat...
Discrete mathematics is an important tool for the investigation of various models of functioning of technical devices, especially in the field of cybe...
Traditional game theory has been successful at developing strategy in games of incomplete information: when one player knows something that the other does not. But it has little to say about games of complete information, for example, tic-tac-toe, solitaire and hex. The main challenge of combinatorial game theory is to handle combinatorial chaos, where brute force study is impractical. In this comprehensive volume, Jozsef Beck shows readers how to escape from the combinatorial chaos via the fake probabilistic method, a game-theoretic adaptation of the probabilistic method in combinatorics....
Traditional game theory has been successful at developing strategy in games of incomplete information: when one player knows something that the other ...
Lattice theory evolved as part of algebra in the nineteenth century through the work of Boole, Peirce and Schroder, and in the first half of the twentieth century through the work of Dedekind, Birkhoff, Ore, von Neumann, Mac Lane, Wilcox, Dilworth, and others. In Semimodular Lattices, Manfred Stern uses successive generalizations of distributive and modular lattices to outline the development of semimodular lattices from Boolean algebras. He focuses on the important theory of semimodularity, its many ramifications, and its applications in discrete mathematics, combinatorics, and algebra. The...
Lattice theory evolved as part of algebra in the nineteenth century through the work of Boole, Peirce and Schroder, and in the first half of the twent...
This is the first comprehensive exposition of the application of spherical harmonics to prove geometric results. The author presents all the necessary tools from classical theory of spherical harmonics with full proofs. Groemer uses these tools to prove geometric inequalities, uniqueness results for projections and intersection by planes or half-spaces, stability results, and characterizations of convex bodies of a particular type, such as rotors in convex polytopes. Results arising from these analytical techniques have proved useful in many applications, particularly those related to...
This is the first comprehensive exposition of the application of spherical harmonics to prove geometric results. The author presents all the necessary...
This book provides an integrated treatment of the theory of nonnegative matrices and some related classes of positive matrices, concentrating on connections with game theory, combinatorics, inequalities, optimization and mathematical economics. The authors have chosen the wide variety of applications, which include price fixing, scheduling, and the fair division problem, both for their elegant mathematical content and for their accessibility to students with minimal preparation. They present many new results in matrix theory for the first time in book form, while they present more standard...
This book provides an integrated treatment of the theory of nonnegative matrices and some related classes of positive matrices, concentrating on conne...
The Hardy-Littlewood method is a means of estimating the number of integer solutions of equations and was first applied to Waring's problem on representations of integers by sums of powers. This introduction to the method deals with its classical forms and outlines some of the more recent developments. Now in its second edition it has been fully updated; the author has made extensive revisions and added a new chapter to take account of major advances by Vaughan and Wooley. The reader is expected to be familiar with elementary number theory and postgraduate students should find it of great use...
The Hardy-Littlewood method is a means of estimating the number of integer solutions of equations and was first applied to Waring's problem on represe...
This book provides a self-contained comprehensive exposition of the theory of dynamical systems. The book begins with a discussion of several elementary but crucial examples. These are used to formulate a program for the general study of asymptotic properties and to introduce the principal theoretical concepts and methods. The main theme of the second part of the book is the interplay between local analysis near individual orbits and the global complexity of the orbit structure. The third and fourth parts develop the theories of low-dimensional dynamical systems and hyperbolic dynamical...
This book provides a self-contained comprehensive exposition of the theory of dynamical systems. The book begins with a discussion of several elementa...