人类的发明智慧，常常源于自然
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※编辑推荐※
☆ 精彩案例追寻仿生故事，通俗语言揭秘仿生发明
☆ 高清标本照片+手绘原理图，轻松看懂仿生发明的科学基础
☆ 丰富模块涵盖物种信息，贯穿历史文化与奇思妙想
☆ 当自然赋予科技灵感，方知自然之智慧与慷慨
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※内容简介※
亿万年来，大自然中种类繁多的植物和动物经过优胜劣汰的进化过程，形成了千奇百怪的形态和功能，这些多样性中包含了大量可以帮助解决技术问题的方法。于是，懂得观察的工程师、建筑师和科学家就向慷慨的大自然学习那些简单而有效的想法，进而发展出了仿生学……
本书以精彩案例讲述植物和动物如何启发了发明家、工程师、建筑师、科学家，也讲述了仿生学如何成为现代科学研究中最有前景的学科之一。在每一个对页里，左页介绍一种植物或动物启发一种或多种仿生发明的故事，另有多个小模块，向我们展示了这种植物或动物的物种信息、奇特策略以及由它们引发的“想象出的发明”；右页则是该植物或动物的标本照片，以及由插画师蒂特瓦内（Titwane）绘制的发明原理图。
日新月异的科技可能已经将书中所称的“我们或许能够发明”和“正在研究”变成了现实，而“目前已得到广泛应用”或许已经过时。但无论如何，这些仿生发明的故事依然充满趣味，我们从中看到的大自然的巧妙与慷慨，也永不过时。更多关于仿生学的妙趣有待读者朋友们在阅读过程中悉心发现。
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※获奖记录※
2017年豆瓣年度图书科学·新知榜单第5

本书作者为奥地利学者耿爱德，分为上、下两册。全书重点论述了中国的金属硬币，分为银部、金部、铜部三编，对中国货币之流通、种类、市场分布、产地、外汇市场等方面进行了论述，勾勒了中国货币发展脉络，对后人解读、研究中国货币，尤其是金属货币助益良多。

The acclaimed author of Founding Gardeners reveals the forgotten life of Alexander von Humboldt, the visionary German naturalist whose ideas changed the way we see the natural world—and in the process created modern environmentalism.
Alexander von Humboldt (1769–1859) was an intrepid explorer and the most famous scientist of his age. In North America, his name still graces four counties, thirteen towns, a river, parks, bays, lakes, and mountains. His restless life was packed with adventure and discovery, whether he was climbing the highest volcanoes in the world or racing through anthrax-infected Siberia or translating his research into bestselling publications that changed science and thinking. Among Humboldt’s most revolutionary ideas was a radical vision of nature, that it is a complex and interconnected global force that does not exist for the use of humankind alone.
Now Andrea Wulf brings the man and his achievements back into focus: his daring expeditions and investigation of wild environments around the world and his discoveries of similarities between climate and vegetation zones on different continents. She also discusses his prediction of human-induced climate change, his remarkable ability to fashion poetic narrative out of scientific observation, and his relationships with iconic figures such as Simón Bolívar and Thomas Jefferson. Wulf examines how Humboldt’s writings inspired other naturalists and poets such as Darwin, Wordsworth, and Goethe, and she makes the compelling case that it was Humboldt’s influence that led John Muir to his ideas of natural preservation and that shaped Thoreau’s Walden.
With this brilliantly researched and compellingly written book, Andrea Wulf shows the myriad fundamental ways in which Humboldt created our understanding of the natural world, and she champions a renewed interest in this vital and lost player in environmental history and science.

This revised and enlarged fifth edition features four new chapters, which contain highly original and delightful proofs for classics such as the spectral theorem from linear algebra, some more recent jewels like the non-existence of the Borromean rings and other surprises. From the Reviews ...Inside PFTB (Proofs from The Book) is indeed a glimpse of mathematical heaven, where clever insights and beautiful ideas combine in astonishing and glorious ways. There is vast wealth within its pages, one gem after another...Aigner and Ziegler...write: ...all we offer is the examples that we have selected, hoping that our readers will share our enthusiasm about brilliant ideas, clever insights and wonderful observations. I do... Notices of the AMS, August 1999 ...This book is a pleasure to hold and to look at: ample margins, nice photos, instructive pictures and beautiful drawings ...It is a pleasure to read as well: the style is clear and entertaining, the level is close to elementary, the necessary background is given separately and the proofs are brilliant...LMS Newsletter, January 1999 Martin Aigner and Gunter Ziegler succeeded admirably in putting together a broad collection of theorems and their proofs that would undoubtedly be in the Book of Erdos. The theorems are so fundamental, their proofs so elegant and the remaining open questions so intriguing that every mathematician, regardless of speciality, can benefit from reading this book... SIGACT News, December 2011.

Euclid presents the essential of mathematics in a manner which has set a high standard for more than 2000 years. This book, an explanation of the nature of mathematics from its most important early source, is for all lovers of mathematics with a solid background in high school geometry, whether they be students or university professors.

Traditional logic as a part of philosophy is one of the oldest scientific disciplines and can be traced back to the Stoics and to Aristotle. Mathematical logic, however, is a relatively young discipline and arose from the endeavors of Peano, Frege, and others to create a logistic foundation for mathematics. It steadily developed during the twentieth century into a broad discipline with several sub-areas and numerous applications in mathematics, informatics, linguistics and philosophy. This book treats the most important material in a concise and streamlined fashion. The third edition is a thorough and expanded revision of the former. Although the book is intended for use as a graduate text, the first three chapters can easily be read by undergraduates interested in mathematical logic. These initial chapters cover the material for an introductory course on mathematical logic, combined with applications of formalization techniques to set theory. Chapter 3 is partly of descriptive nature, providing a view towards algorithmic decision problems, automated theorem proving, non-standard models including non-standard analysis, and related topics. The remaining chapters contain basic material on logic programming for logicians and computer scientists, model theory, recursion theory, Godel's Incompleteness Theorems, and applications of mathematical logic. Philosophical and foundational problems of mathematics are discussed throughout the text. Each section of the seven chapters ends with exercises some of which of importance for the text itself. There are hints to most of the exercises in a separate file Solution Hints to the Exercises which is not part of the book but is available from the author's website.

If one had looked for a potential global city in Europe in the 1540s, the most likely candidate would have been Antwerp, which had emerged as the center of the German and Spanish silver exchange as well as the Portuguese spice and Spanish sugar trades. It almost certainly would not have been London, an unassuming hub of the wool and cloth trade with a population of around 75,000, still trying to recover from the onslaught of the Black Plague. But by 1700 London’s population had reached a staggering 575,000—and it had developed its first global corporations, as well as relationships with non-European societies outside the Mediterranean. What happened in the span of a century and half? And how exactly did London transform itself into a global city?
London’s success, Robert K. Batchelor argues, lies not just with the well-documented rise of Atlantic settlements, markets, and economies. Using his discovery of a network of Chinese merchant shipping routes on John Selden’s map of China as his jumping-off point, Batchelor reveals how London also flourished because of its many encounters, engagements, and exchanges with East Asian trading cities. Translation plays a key role in Batchelor’s study—translation not just of books, manuscripts, and maps, but also of meaning and knowledge across cultures—and Batchelor demonstrates how translation helped London understand and adapt to global economic conditions. Looking outward at London’s global negotiations, Batchelor traces the development of its knowledge networks back to a number of foreign sources and credits particular interactions with England’s eventual political and economic autonomy from church and King.
London offers a much-needed non-Eurocentric history of London, first by bringing to light and then by synthesizing the many external factors and pieces of evidence that contributed to its rise as a global city. It will appeal to students and scholars interested in the cultural politics of translation, the relationship between merchants and sovereigns, and the cultural and historical geography of Britain and Asia.

What separates your mind from an animal's? Maybe you think it's your ability to design tools, your sense of self, or your grasp of past and future – all traits that have helped us define ourselves as the planet's preeminent species. But in recent decades, these claims have been eroded, or even disproven, by a revolution in the study of animal cognition: take the octopuses that use coconut shells as tools; the elephants that classify humans by age, gender, and language; or Ayumu, the young male chimpanzee at Kyoto University whose flash memory puts that of humans to shame. Based on research involving crows, dolphins, parrots, sheep, wasps, bats, whales, and of course chimpanzees and bonobos, Frans de Waal demonstrates that we have grossly underestimated both the scope and the depth of animal intelligence. He offers a firsthand account of how science has stood traditional behaviorism on its head by revealing how smart animals really are.

Genetic algorithms are founded upon the principle of evolution, i.e., survival of the fittest. Hence evolution programming techniques, based on genetic algorithms, are applicable to many hard optimization problems, such as optimization of functions with linear and nonlinear constraints, the traveling salesman problem, and problems of scheduling, partitioning, and control. The importance of these techniques is still growing, since evolution programs are parallel in nature, and parallelism is one of the most promising directions in computer science.
The book is self-contained and the only prerequisite is basic undergraduate mathematics. This third edition has been substantially revised and extended by three new chapters and by additional appendices containing working material to cover recent developments and a change in the perception of evolutionary computation.

A perennial bestseller by eminent mathematician G. Polya, "How to Solve It" will show anyone in any field how to think straight. In lucid and appealing prose, Polya reveals how the mathematical method of demonstrating a proof or finding an unknown can be of help in attacking any problem that can be "reasoned" out - from building a bridge to winning a game of anagrams. Generations of readers have relished Polya's deft - indeed, brilliant - instructions on stripping away irrelevancies and going straight to the heart of the problem. In this best-selling classic, George Polya revealed how the mathematical method of demonstrating a proof or finding an unknown can be of help in attacking any problem that can be "reasoned" out - from building a bridge to winning a game of anagrams.Generations of readers have relished Polya's deft instructions on stripping away irrelevancies and going straight to the heart of a problem. "How to Solve It" popularized heuristics, the art and science of discovery and invention. It has been in print continuously since 1945 and has been translated into twenty-three different languages. Polya was one of the most influential mathematicians of the twentieth century. He made important contributions to a great variety of mathematical research: from complex analysis to mathematical physics, number theory, probability, geometry, astronomy, and combinatorics. He was also an extraordinary teacher - he taught until he was ninety - and maintained a strong interest in pedagogical matters throughout his long career.In addition to "How to Solve It", he published a two-volume work on the topic of problem solving, "Mathematics of Plausible Reasoning", also with Princeton. Polya is one of the most frequently quoted mathematicians, and the following statements from "How to Solve It" make clear why: "My method to overcome a difficulty is to go around it." "Geometry is the science of correct reasoning on incorrect figures." "In order to solve this differential equation you look at it till a solution occurs to you."