Drawing on decades of professional practice and teaching experience, Steven L. Cantor's Professional and Practical Considerations for Landscape Design explains the field of landscape architecture, outlining with authority how to turn drawings of designs into creative, purposeful, and striking landscapes and landforms in today's world. This comprehensive guide consists of everything a young professional might encounter from conception through final project archiving, ensuring readers have both the tools necessary to keep up with advancements in the field and the practical business knowledge to build life-long partnerships. Each of the book's concise chapters emphasize a specific aspect of landscape architecture practice, from the administration of designs for contracts, areas of practice, human resources, marketing, construction materials, sustainability and ethics. Each chapter is written in a style that best suits the material. Alongside detailed definitions and practical "do's and don'ts" are 30 complex sample problems ranging in difficulty for both individuals and groups. An array of original photographs and clear examples in both black and white and color articulate standards and inspire future possibilities, featuring the work of Vicky Chan, founder of Avoid Obvious Architects, and Richard Alomar, Associate Professor of Landscape Architecture at Rutgers and co-founder of New York Urban Sketchers. By combining the author's unique depth of knowledge with real-world case studies from America, Asia, and Europe, Professional and Practical Considerations for Landscape Design is an up-to-date resource for every level of reader, from students in landscape architecture programs to professionals working in public or private practice, engineering, consulting, or contracting.
This book showcases new trends in the vital and changing field of landscape design. Important contemporary concerns affecting the landscape professional are considered: the impact of recent scientific research, historic preservation, populations with unique needs, international practices, and much more.
Filled with some of the most imaginative designs seen in recent landscape work, this comprehensive reference provides background information as well as a multitude of visual examples for the full range of project types.
Green Roofs defines the types of green roofs both extensive and intensive; introduces the vocabulary of green roofs; details the components available; describes the design and development process; lists recommended plant materials; and explains methods of installation, irrigation, and maintenance. Approximately 70 vivid and detailed case histories of major projects in Europe, where green roofs began, and contemporary examples throughout North America, copiously and beautifully illustrated with almost 400 images, make this book an invaluable guide to the state of the art."--BOOK JACKET.
This collection of essays, offered in honor of the distinguished career of prominent political philosophy professor Clifford Orwin, provides a wide context in which to consider the rise of “humanity” as one of the chief modern virtues. A relative of—and also a replacement for—formerly more prominent other-regarding virtues like justice and generosity, humanity and later compassion become the true north of the modern moral compass. Contributors to this volume consider various aspects of this virtue, by comparison with what came before and with attention to its development from early to late modernity, and up to the present.
Drawing on decades of professional practice and teaching experience, Steven L. Cantor's Professional and Practical Considerations for Landscape Design explains the field of landscape architecture, outlining with authority how to turn drawings of designs into creative, purposeful, and striking landscapes and landforms in today's world. This comprehensive guide consists of everything a young professional might encounter from conception through final project archiving, ensuring readers have both the tools necessary to keep up with advancements in the field and the practical business knowledge to build life-long partnerships. Each of the book's concise chapters emphasize a specific aspect of landscape architecture practice, from the administration of designs for contracts, areas of practice, human resources, marketing, construction materials, sustainability and ethics. Each chapter is written in a style that best suits the material. Alongside detailed definitions and practical "do's and don'ts" are 30 complex sample problems ranging in difficulty for both individuals and groups. An array of original photographs and clear examples in both black and white and color articulate standards and inspire future possibilities, featuring the work of Vicky Chan, founder of Avoid Obvious Architects, and Richard Alomar, Associate Professor of Landscape Architecture at Rutgers and co-founder of New York Urban Sketchers. By combining the author's unique depth of knowledge with real-world case studies from America, Asia, and Europe, Professional and Practical Considerations for Landscape Design is an up-to-date resource for every level of reader, from students in landscape architecture programs to professionals working in public or private practice, engineering, consulting, or contracting.
This book showcases new trends in the vital and changing field of landscape design. Important contemporary concerns affecting the landscape professional are considered: the impact of recent scientific research, historic preservation, populations with unique needs, international practices, and much more.
Green Roofs defines the types of green roofs both extensive and intensive; introduces the vocabulary of green roofs; details the components available; describes the design and development process; lists recommended plant materials; and explains methods of installation, irrigation, and maintenance. Approximately 70 vivid and detailed case histories of major projects in Europe, where green roofs began, and contemporary examples throughout North America, copiously and beautifully illustrated with almost 400 images, make this book an invaluable guide to the state of the art."--BOOK JACKET.
Publisher's Note: Products purchased from 3rd Party sellers are not guaranteed by the Publisher for quality, authenticity, or access to any online entitlements included with the product. Now updated online for the life of the edition, DeVita, Hellman, and Rosenberg's Cancer: Principles & Practice of Oncology, 11th Edition keeps you up to date in this fast-changing field. Every quarter, your eBook will be updated with late-breaking developments in oncology, including new drugs, clinical trials, and more.
This book is an outgrowth of a collection of 100 problems chosen to celebrate the 100th anniversary of the undergraduate math honor society Pi Mu Epsilon. Each chapter describes a problem or event, the progress made, and connections to entries from other years or other parts of mathematics. In places, some knowledge of analysis or algebra, number theory or probability will be helpful. Put together, these problems will be appealing and accessible to energetic and enthusiastic math majors and aficionados of all stripes. Stephan Ramon Garcia is WM Keck Distinguished Service Professor and professor of mathematics at Pomona College. He is the author of four books and over eighty research articles in operator theory, complex analysis, matrix analysis, number theory, discrete geometry, and other fields. He has coauthored dozens of articles with students, including one that appeared in The Best Writing on Mathematics: 2015. He is on the editorial boards of Notices of the AMS, Proceedings of the AMS, American Mathematical Monthly, Involve, and Annals of Functional Analysis. He received four NSF research grants as principal investigator and five teaching awards from three different institutions. He is a fellow of the American Mathematical Society and was the inaugural recipient of the Society's Dolciani Prize for Excellence in Research. Steven J. Miller is professor of mathematics at Williams College and a visiting assistant professor at Carnegie Mellon University. He has published five books and over one hundred research papers, most with students, in accounting, computer science, economics, geophysics, marketing, mathematics, operations research, physics, sabermetrics, and statistics. He has served on numerous editorial boards, including the Journal of Number Theory, Notices of the AMS, and the Pi Mu Epsilon Journal. He is active in enrichment and supplemental curricular initiatives for elementary and secondary mathematics, from the Teachers as Scholars Program and VCTAL (Value of Computational Thinking Across Grade Levels), to numerous math camps (the Eureka Program, HCSSiM, the Mathematics League International Summer Program, PROMYS, and the Ross Program). He is a fellow of the American Mathematical Society, an at-large senator for Phi Beta Kappa, and a member of the Mount Greylock Regional School Committee, where he sees firsthand the challenges of applying mathematics.
This textbook is aimed at newcomers to nonlinear dynamics and chaos, especially students taking a first course in the subject. The presentation stresses analytical methods, concrete examples, and geometric intuition. The theory is developed systematically, starting with first-order differential equations and their bifurcations, followed by phase plane analysis, limit cycles and their bifurcations, and culminating with the Lorenz equations, chaos, iterated maps, period doubling, renormalization, fractals, and strange attractors.
PART 1. BASIC NUMBER THEORY -- 1. Mod p Arithmetic, Group Theory and Cryptography -- 2. Arithmetic Functions -- 3. Zeta and L-Functions -- 4. Solutions to Diophantine Equations -- PART 2. CONTINUED FRACTIONS AND APPROXIMATIONS -- 5. Algebraic and Transcendental Numbers -- 6. The Proof of Roth's Theorem -- 7. Introduction to Continued Fractions -- PART 3. PROBABILISTIC METHODS AND EQUIDISTRIBUTION -- 8. Introduction to Probability -- 9. Applications of Probability: Benford's Law and Hypothesis Testing -- 10. Distribution of Digits of Continued Fractions -- 11. Introduction to Fourier Analysis -- 12. f n k g and Poissonian Behavior -- PART 4. THE CIRCLE METHOD -- 13. Introduction to the Circle Method -- 14. Circle Method: Heuristics for Germain Primes -- PART 5. RANDOM MATRIX THEORY AND L-FUNCTIONS -- 15. From Nuclear Physics to L-Functions -- 16. Random Matrix Theory: Eigenvalue Densities -- 17. Random Matrix Theory: Spacings between Adjacent Eigenvalues -- 18. The Explicit Formula and Density Conjectures -- Appendix A. Analysis Review -- Appendix B. Linear Algebra Review -- Appendix C. Hints and Remarks on the Exercises -- Appendix D. Concluding Remarks.
An integrated approach to fractals and point processes This publication provides a complete and integrated presentation of the fields of fractals and point processes, from definitions and measures to analysis and estimation. The authors skillfully demonstrate how fractal-based point processes, established as the intersection of these two fields, are tremendously useful for representing and describing a wide variety of diverse phenomena in the physical and biological sciences. Topics range from information-packet arrivals on a computer network to action-potential occurrences in a neural preparation. The authors begin with concrete and key examples of fractals and point processes, followed by an introduction to fractals and chaos. Point processes are defined, and a collection of characterizing measures are presented. With the concepts of fractals and point processes thoroughly explored, the authors move on to integrate the two fields of study. Mathematical formulations for several important fractal-based point-process families are provided, as well as an explanation of how various operations modify such processes. The authors also examine analysis and estimation techniques suitable for these processes. Finally, computer network traffic, an important application used to illustrate the various approaches and models set forth in earlier chapters, is discussed. Throughout the presentation, readers are exposed to a number of important applications that are examined with the aid of a set of point processes drawn from biological signals and computer network traffic. Problems are provided at the end of each chapter allowing readers to put their newfound knowledge into practice, and all solutions are provided in an appendix. An accompanying Web site features links to supplementary materials and tools to assist with data analysis and simulation. With its focus on applications and numerous solved problem sets, this is an excellent graduate-level text for courses in such diverse fields as statistics, physics, engineering, computer science, psychology, and neuroscience.
The essential lifesaver for students who want to master probability For students learning probability, its numerous applications, techniques, and methods can seem intimidating and overwhelming. That's where The Probability Lifesaver steps in. Designed to serve as a complete stand-alone introduction to the subject or as a supplement for a course, this accessible and user-friendly study guide helps students comfortably navigate probability's terrain and achieve positive results. The Probability Lifesaver is based on a successful course that Steven Miller has taught at Brown University, Mount Holyoke College, and Williams College. With a relaxed and informal style, Miller presents the math with thorough reviews of prerequisite materials, worked-out problems of varying difficulty, and proofs. He explores a topic first to build intuition, and only after that does he dive into technical details. Coverage of topics is comprehensive, and materials are repeated for reinforcement—both in the guide and on the book's website. An appendix goes over proof techniques, and video lectures of the course are available online. Students using this book should have some familiarity with algebra and precalculus. The Probability Lifesaver not only enables students to survive probability but also to achieve mastery of the subject for use in future courses. A helpful introduction to probability or a perfect supplement for a course Numerous worked-out examples Lectures based on the chapters are available free online Intuition of problems emphasized first, then technical proofs given Appendixes review proof techniques Relaxed, conversational approach
Elementary Introduction to the Lebesgue Integral is not just an excellent primer of the Lebesgue integral for undergraduate students but a valuable tool for tomorrow’s mathematicians. Since the early twentieth century, the Lebesgue integral has been a mainstay of mathematical analysis because of its important properties with respect to limits. For this reason, it is vital that mathematical students properly understand the complexities of the Lebesgue integral. However, most texts about the subject are geared towards graduate students, which makes it a challenge for instructors to properly teach and for less advanced students to learn. Ensuring that the subject is accessible for all readers, the author presents the text in a clear and concrete manner which allows readers to focus on the real line. This is important because Lebesgue integral can be challenging to understand when compared to more widely used integrals like the Riemann integral. The author also includes in the textbook abundant examples and exercises to help explain the topic. Other topics explored in greater detail are abstract measure spaces and product measures, which are treated concretely. Features: Comprehensibly written introduction to the Lebesgue integral for undergraduate students Includes many examples, figures and exercises Features a Table of Notation and Glossary to aid readers Solutions to selected exercises
Transition to Real Analysis with Proof provides undergraduate students with an introduction to analysis including an introduction to proof. The text combines the topics covered in a transition course to lead into a first course on analysis. This combined approach allows instructors to teach a single course where two were offered. The text opens with an introduction to basic logic and set theory, setting students up to succeed in the study of analysis. Each section is followed by graduated exercises that both guide and challenge students. The author includes examples and illustrations that appeal to the visual side of analysis. The accessible structure of the book makes it an ideal refence for later years of study or professional work. Combines the author’s previous works Elements of Advanced Mathematics with Foundations of Analysis Combines logic, set theory and other elements with a one-semester introduction to analysis. Author is a well-known mathematics educator and researcher Targets a trend to combine two courses into one
This textbook is aimed at newcomers to nonlinear dynamics and chaos, especially students taking a first course in the subject. The presentation stresses analytical methods, concrete examples, and geometric intuition. The theory is developed systematically, starting with first-order differential equations and their bifurcations, followed by phase plane analysis, limit cycles and their bifurcations, and culminating with the Lorenz equations, chaos, iterated maps, period doubling, renormalization, fractals, and strange attractors.
The first three editions of this popular textbook attracted a loyal readership and widespread use. Students find the book to be concise, accessible, and complete. Instructors find the book to be clear, authoritative, and dependable. The goal of this new edition is to make real analysis relevant and accessible to a broad audience of students with diverse backgrounds. Real analysis is a basic tool for all mathematical scientists, ranging from mathematicians to physicists to engineers to researchers in the medical profession. This text aims to be the generational touchstone for the subject and the go-to text for developing young scientists. In this new edition we endeavor to make the book accessible to a broader audience. This edition includes more explanation, more elementary examples, and the author stepladders the exercises. Figures are updated and clarified. We make the sections more concise, and omit overly technical details. We have updated and augmented the multivariable material in order to bring out the geometric nature of the topic. The figures are thus enhanced and fleshed out. Features A renewed enthusiasm for the topic comes through in a revised presentation A new organization removes some advanced topics and retains related ones Exercises are more tiered, offering a more accessible course Key sections are revised for more brevity
From the well-known stationer comes this complete guide to all the "paperwork" a wedding entails. Brides-to-be and their families will appreciate the detailed advice on both the contents and style of engagement announcements, wedding and reception invitations, at-home cards, and more. Includes samples.
Thank you for visiting our website. Would you like to provide feedback on how we could improve your experience?
This site does not use any third party cookies with one exception — it uses cookies from Google to deliver its services and to analyze traffic.Learn More.