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Successful, thirty something, and still recovering from a painful divorce, Roger Paulson was eager to rebuild his life with love. So when the sexy blonde who called herself Johnnie Elaine Miller answered his personals ad in an upscale Washington, D.C. magazine, he couldn't believe his luck. Smart and vivacious, "Johnnie" was Roger's dreamgirl. But love was the last thing "Johnnie Miller" had in mind. On the run from prostitution charges, a brilliant con artist with dozens of false identities, she too had found her perfect match, the ultimate sucker she could manipulate with kind words and sex--then take for everything he was worth. But when Roger discovered his Ms. Right was really a hardened criminal, the heartbroken bachelor turned her in to the authorities. Beaten at her own game, the cool reserve of the con artist exploded in uncontrollable rage. Free on bail, a crazed "Johnnie" hunted Roger down--this time to exact a horrible revenge. An irresistible seductress, she lured him into her deadly trap, then slaughtered him in cold blood. Clifford L. Linedecker's Deadly White Female is the shocking true crime story of a beautiful seductress and murder most foul.
This book gives a complete global geometric description of the motion of the two di mensional hannonic oscillator, the Kepler problem, the Euler top, the spherical pendulum and the Lagrange top. These classical integrable Hamiltonian systems one sees treated in almost every physics book on classical mechanics. So why is this book necessary? The answer is that the standard treatments are not complete. For instance in physics books one cannot see the monodromy in the spherical pendulum from its explicit solution in terms of elliptic functions nor can one read off from the explicit solution the fact that a tennis racket makes a near half twist when it is tossed so as to spin nearly about its intermediate axis. Modem mathematics books on mechanics do not use the symplectic geometric tools they develop to treat the qualitative features of these problems either. One reason for this is that their basic tool for removing symmetries of Hamiltonian systems, called regular reduction, is not general enough to handle removal of the symmetries which occur in the spherical pendulum or in the Lagrange top. For these symmetries one needs singular reduction. Another reason is that the obstructions to making local action angle coordinates global such as monodromy were not known when these works were written.
Benjamin Smith Lyman (1835–1920) was an American geologist and mining engineer who worked for the Japanese government as a foreign expert in the 1870s. He is famous among linguists for an article about a set of Japanese morphophonemic alternations known as rendaku (sometimes translated as “sequential voicing”). Lyman published this article in 1894, several years after he returned to the United States, and it contains a version of what linguists today call Lyman’s Law. This book includes a brief biography of Lyman and explains how an amateur linguist was able to make such a lasting contribution to the field. It also reproduces Lyman’s 1894 article as well as his earlier article on the pronunciation system of Japanese, each followed by extensive commentary. In addition, it offers an English translation of a thorough critique of Lyman’s 1894 article, published in 1910 by the prominent Japanese linguist Ogura Shinpei. Lyman’s work on rendaku included much more than just Lyman’s Law, and the final chapter of this book assesses all his proposals from the standpoint of a modern researcher.
In 2006, HarperCollins announced the publication of a book in which O.J. Simpson told how he hypothetically would have committed the murders of Ron Goldman and Nicole Brown Simpson, a crime for which he was found not guilty. In response to public outrage, the book was never published. Here is the original manuscript of the book.
This monograph presents recent developments in spectral conditions for the existence of periodic and almost periodic solutions of inhomogenous equations in Banach Spaces. Many of the results represent significant advances in this area. In particular, the authors systematically present a new approach based on the so-called evolution semigroups with
This book includes significant recent research on robotic algorithms. It has been written by leading experts in the field. The 15th Workshop on the Algorithmic Foundations of Robotics (WAFR) was held on June 22–24, 2022, at the University of Maryland, College Park, Maryland. Each chapter represents an exciting state-of-the-art development in robotic algorithms that was presented at this 15th incarnation of WAFR. Different chapters combine ideas from a wide variety of fields, spanning and combining planning (for tasks, paths, motion, navigation, coverage, and patrol), computational geometry and topology, control theory, machine learning, formal methods, game theory, information theory, and theoretical computer science. Many of these papers explore new and interesting problems and problem variants that include human–robot interaction, planning and reasoning under uncertainty, dynamic environments, distributed decision making, multi-agent coordination, and heterogeneity.
Proceedings of the annual meeting of the Society in v. 1-11, 1925-34. After 1934 they appear in Its Bulletin.
Dedicated to the memory of Wolfgang Classical Intersection Theory (see for example Wei! [Wei]) treats the case of proper intersections, where geometrical objects (usually subvarieties of a non singular variety) intersect with the expected dimension. In 1984, two books appeared which surveyed and developed work by the individual authors, co workers and others on a refined version of Intersection Theory, treating the case of possibly improper intersections, where the intersection could have ex cess dimension. The first, by W. Fulton [Full] (recently revised in updated form), used a geometrical theory of deformation to the normal cone, more specifically, deformation to the normal bundle followed by moving the zero section to make the intersection proper; this theory was due to the author together with R. MacPherson and worked generally for intersections on algeb raic manifolds. It represents nowadays the standard approach to Intersection Theory. The second, by W. Vogel [Vogl], employed an algebraic approach to inter sections; although restricted to intersections in projective space it produced an intersection cycle by a simple and natural algorithm, thus leading to a Bezout theorem for improper intersections. It was developed together with J. Stiickrad and involved a refined version of the classical technique ofreduc tion to the diagonal: here one starts with the join variety and intersects with successive hyperplanes in general position, laying aside components which fall into the diagonal and intersecting the residual scheme with the next hyperplane; since all the hyperplanes intersect in the diagonal, the process terminates.