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Continuing the Deep Space Nine saga—an original novel from New York Times bestselling author David R. George III! At the end of 2385, in a significant shift of its goals from military back to exploratory, Starfleet sent Captain Benjamin Sisko and the crew of the U.S.S. Robinson on an extended mission into the Gamma Quadrant. Tasked with a yearlong assignment to travel unknown regions, they set out to fulfill the heart of Starfleet’s charter: to explore strange new worlds, and to seek out new life and new civilizations. But now three months into the mission, their first contact with an alien species comes in the form of an unprovoked attack on the Robinson. With the ship’s crew suddenly incapacitated, seventy-eight of the 1,300 aboard are abducted—including Sisko’s daughter, Rebecca. But Rebecca had already been kidnapped years earlier by a Bajoran religious zealot, part of a sect believing that her birth fulfilled the prophecy of the arrival of the Infant Avatar. Does her disappearance now have anything to do with the harrowing events of the past? And for what purposes have these enemies taken Sisko’s daughter and the rest of the missing?
An all-new novel based upon the explosive Star Trek TV series! Aboard the Starship Shenzhou, Lieutenant Michael Burnham, a human woman raised and educated among Vulcans, is promoted to acting first officer. But if she wants to keep the job, she must prove to Captain Philippa Georgiou that she deserves to have it. She gets her chance when the Shenzhou must protect a Federation colony that is under attack by an ancient alien vessel that has surfaced from the deepest fathoms of the planet’s dark, uncharted sea. As the menace from this mysterious vessel grows stronger, Starfleet declares the colony expendable in the name of halting the threat. To save thousands of innocent lives, Burnham must infiltrate the alien ship. But to do so, she needs to face the truth of her troubled past, and seek the aid of a man she has tried to avoid her entire life—until now.
Collects Original Sin #3.1-3.4.
Refactoring is gaining momentum amongst the object oriented programming community. It can transform the internal dynamics of applications and has the capacity to transform bad code into good code. This book offers an introduction to refactoring.
Original Sin by Michael Jan Friedman Centuries after the death of the original Ellen Ripley, her clone has joined the fight against the Alien threat. With the help of an android named Call, a brutal hired gun named Johner, and a paraplegic mechanic named Vriess, she will battle an Alien horror, and discover the answer to a question that pierces the Alien mystery to its seething acid-chamber of a heart. DNA War by Diane Carey In a bleak galaxy, the hospitable planet Rosamond 6 is a rare find. But while it may look like an oasis among the stars, it harbors a fatal secret: it is infested with Aliens. Eager to prove her theory that the Aliens can be reasoned with, anthropologist Jocasta Malvaux has set up an observation post there. And something unexpected happens: the Aliens don't attack. But, why? Could it be that the monsters are evolving? Or is it a matter of time until every person on the planet must fight for their lives?
Who shot the Watcher? Uatu, the mysterious space-god who's been watching mankind from the moon for as long as we can remember is dead. Thus begins the greatest murder mystery in Marvel history! As Nick Fury leads the heroes of the Marvel Universe in an investigation, other forces are marshaling and other questions are arising. Why is Black Panther gathering a secret team of his own, including Emma Frost, the Punisher and Dr. Strange? Who is the Unseen? What was stolen from the Watcher's lair? Fury's cosmic manhunt leads to the far corners of the universe and beyond, but just when the Avengers think they've cornered their murderer everything explodes, unleashing the Marvel Universe's greatest secrets and rocking the heroes to their core! What did the Watcher see? What was the Original Sin? Collects: Point One #1 (Watcher story), Original Sin #0-8, Original Sins #1-5, Original Sin Annual #1, Original Sin: Secret Avengers Infinite Comic #1-2.
INTRODUCTION In 1827 Gauss presented to the Royal Society of Göttingen his important paper on the theory of surfaces, which seventy-three years afterward the eminent French geometer, who has done more than any one else to propagate these principles, characterizes as one of Gauss’s chief titles to fame, and as still the most finished andusefulintroductiontothestudyofinfinitesimalgeometry.∗ Thismemoirmay be called: General Investigations of Curved Surfaces, or the Paper of 1827, to distinguish it from the original draft written out in 1825, but not published until 1900. A list of the editions and translations of the Paper of 1827 follows. There are three editions in Latin, two translations into French, and two into German. The paper was originally published in Latin under the title: Ia. Disquisitiones generales circa superficies curvas auctore Carolo Friderico Gauss. Societati regiæ oblatæ D. 8. Octob. 1827, and was printed in: Commentationes societatis regiæ scientiarum Gottingensis recentiores, Commentationes classis mathematicæ. Tom. VI. (ad a. 1823–1827). Gottingæ, 1828, pages 99–146. This sixth volume is rare; so much so, indeed, that the British Museum Catalogue indicates that it is missing in that collection. With the signatures changed, and the paging changed to pages 1–50, Ia also appears with the title page added: Ib. Disquisitiones generales circa superficies curvas auctore Carolo Friderico Gauss. Gottingæ. Typis Dieterichianis. 1828. II. In Monge’s Application de l’analyse à la géométrie, fifth edition, edited by Liouville, Paris, 1850, on pages 505–546, is a reprint, added by the Editor, in Latin under the title: Recherches sur la théorie générale des surfaces courbes; Par M. C.-F. Gauss. IIIa. A third Latin edition of this paper stands in: Gauss, Werke, Her- ausgegeben von der Königlichen Gesellschaft der Wissenschaften zu Göttingen, Vol. 4, Göttingen, 1873, pages 217–258, without change of the title of the original paper (Ia). IIIb. The same, without change, in Vol. 4 of Gauss, Werke, Zweiter Abdruck, Göttingen, 1880. IV. A French translation was made from Liouville’s edition, II, by Captain Tiburce Abadie, ancien élève de l’École Polytechnique, and appears in Nouvelles Annales de Mathématique, Vol. 11, Paris, 1852, pages 195–252, under the title: Recherches générales sur les surfaces courbes; Par M. Gauss. This latter also appears under its own title. Va. Another French translation is: Recherches Générales sur les Surfaces Courbes. Par M. C.-F. Gauss, traduites en français, suivies de notes et d’études sur divers points de la Théorie des Surfaces et sur certaines classes de Courbes, par M. E. Roger, Paris, 1855.
This book presents a comprehensive overview of the bioactive potential, food applications, and health benefits of coloured cereal grains for researchers carrying out innovative studies.
Differential Galois theory is an important, fast developing area which appears more and more in graduate courses since it mixes fundamental objects from many different areas of mathematics in a stimulating context. For a long time, the dominant approach, usually called Picard-Vessiot Theory, was purely algebraic. This approach has been extensively developed and is well covered in the literature. An alternative approach consists in tagging algebraic objects with transcendental information which enriches the understanding and brings not only new points of view but also new solutions. It is very powerful and can be applied in situations where the Picard-Vessiot approach is not easily extended. This book offers a hands-on transcendental approach to differential Galois theory, based on the Riemann-Hilbert correspondence. Along the way, it provides a smooth, down-to-earth introduction to algebraic geometry, category theory and tannakian duality. Since the book studies only complex analytic linear differential equations, the main prerequisites are complex function theory, linear algebra, and an elementary knowledge of groups and of polynomials in many variables. A large variety of examples, exercises, and theoretical constructions, often via explicit computations, offers first-year graduate students an accessible entry into this exciting area.