Fractal Cosmos: The Art of Mathematical Design [Paperback]

Jeff Berkowitz (Author)

Book Description

ISBN-10: 1569370648 | ISBN-13: 978-1569370643 | Publication Date: January 1998 | Edition: Revised

Simple mathematical formulas are transformed into strikingly beautiful computer generated designs. The dynamic interplay between order and chaos is explored in 350 color images in this unique coffee table book that explains the mechanics of mathematical art. Berkowitz is perhaps the world's most widely recognized fractal artist. Fractal Cosmos is the first art book to feature fractal imagery and the largest collection of fractal art published anywhere.

Product Details

• Paperback: 212 pages
• Publisher: Amber Lotus; Revised edition (January 1998)
• Language: English
• ISBN-10: 1569370648
• ISBN-13: 978-1569370643
• Product Dimensions: 11.7 x 8.8 x 0.5 inches
• Shipping Weight: 1.4 pounds
• Average Customer Review: 4.2 out of 5 stars  See all reviews (6 customer reviews)
• Amazon Best Sellers Rank: #1,348,629 in Books (See Top 100 in Books)

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Customer Reviews

Most Helpful Customer Reviews

9 of 9 people found the following review helpful:

5.0 out of 5 stars A fractal survey with beauty, intrigue and educational value, February 17, 2001

By 

Mr. Roger H. Geyer "outcast_searcher" (Lexington, KY USA) - See all my reviews
(REAL NAME)   

This review is from: Fractal Cosmos: The Art of Mathematical Design (Paperback)

I'm really pleased with this book. To me, this is the IDEAL coffee table book on fractals.

Chapter one is the obligatory brief history of fractal image generation, including Mandelbrot, population growth, and citing quite a few popular books on the subject.

The heart of the book is the eye candy, presented in bright colors on high quality paper, with a bare minimum of mathematical labeling to maximize the "art appreciation" aspect of the viewing. This is divided into 5 chapters of somewhat like families of fractals, with brief but informative introductions. If you want a lot of beautiful fractal images that vary widely - you'll certainly get that here.

Chapter 2 gives many images of the Mandelbrot set. Chapter 3 explores various polynomials, powers, roots, and rational expressions. This clearly answered my early layman's question "What about other types of simple equations?" Chapter 4 then goes into exponentials, logarithms, trigonometrics, and various combinations. Chapter 5 then shows 3-d compositions, with many fractal skies, mountains, trees, and landscapes, plus the fractal spheres looking so much like moons or planets. Finally, chapter 6 does some interesting "studies" where you get treated to a page at a time of (6) images with very similar equations, where he alters some variable. Examples: the amount of zooming (up to 169 quintillion - with little loss in image detail), or iterating c by small amounts (like .005 to .01).

At this point I thought - very nice book, but I felt a little let down by so little INFORMATION passed along about WHAT these pictures were. The appendices changed all that!

Appendix A gives a nice explanation, complete with examples and graphs, of how to generate Julia Set fractal images. Appendix B is a 2 page selected bibliography, including both books and papers.

Appendix C lists and briefly explains 20 "Important Formulae for Complex Numbers". Having this would have saved me buying a book about complex numbers when I first discovered fractals, since it implies what the "rules" are.

Appendix D is REALLY KEY - for chapters 1-4, it lists nice mathematical data, and in almost all cases this includes: the image type, the equation, the complex constant, the screen parms, the blowup parms, and the maximum number of iterations. Here then, is HOW these beauties were created. For chapter 5, he doesn't list this, and for chapter 6, since they're studies, the detail varies, but is pretty good overall. To me, this takes the book from "very nice" to "awesome" because the layman can now get a better grasp on things and pursue what interests him/her.

Finally, unlabeled, but apparently Appendix E in my mind, he provides and index to the images BY EQUATION. A very nice cross reference to those thinking of exploring further in the literature or on their PC's.

So the "heavy math" type likely won't find much new here. For the rest of us, who just want some art, some (layman's)meaning/education, or both, aside from parts of "The Beauty of Fractals" this was without peer.

1 of 1 people found the following review helpful:

4.0 out of 5 stars Great intro to fractals, March 3, 2009

By 

Larry A. Cox "Tony C." (Charleston, IL United States) - See all my reviews
(REAL NAME)   

Amazon Verified Purchase

This review is from: Fractal Cosmos: The Art of Mathematical Design (Paperback)

There's not a lot of easily understandable information, but WOW! The pictures are great!

3.0 out of 5 stars 333 color plates, graphical potential of fractals, album-like, August 30, 2009

By 

Eugene Tenenbaum "reluctant reader" (Bronx, NY USA) - See all my reviews
(VINE VOICE)    (REAL NAME)   

Amazon Verified Purchase

This review is from: Fractal Cosmos: The Art of Mathematical Design (Paperback)

This unique album-like beautifully published on 212 pages of glossy paper includes 333 color plates of computer generated images of fractals and fractal compositions. They reveal the graphical potential of fractals and are a visual introduction to their graphical application. Most of them could be found in a smaller size on the Web using the keyword lifesmith. The book's text is concise and includes a step-by-step explanation that extends from a typical school knowledge. Its simple instructions allow to recreate the fractals on computer. The whole content is easily accessible to non-experts, and it is good even for just casual browsing through. The book comprises an introduction to fractals on 4 pages; 5 chapters of images with a different type of fractals and one page description in each; 4 appendices dedicated to generating fractals (5 pages), bibliography (2 pages), formulae (1), and fractal data for each plate except the compositions (47 pages); and an index of equations on 5 pages.
TABLE OF CONTENTS
Preface vii
Acknowledgments ix
CHAPTER ONE
Introduction to Fractals 1-1
CHAPTER TWO
Mandeibrot/Julia Set Fractals of the Equation f(z) = z2 + c 2-1
CHAPTER THREE
Mandeibrot/Julia Set Fractals of Polynomials, Powers,
Roots, and Rational Expressions 3-1
CHAPTER FOUR
Mandeibrot/Julia Set Fractals of Exponentials, Logarithms,
Trigonometrics, and Combinations Thereof 4-1
CHAPTER FIVE
Three-Dimensional Fractal Compositions 5-1
CHAPTER SIX
Special Image Studies in Fractals 6-1
APPENDIX A
Generating Julia Set Fractals A-1
APPENDIX B
Selected Bibliography B-1
APPENDIX C
Important Formulae for Complex Numbers C-1
APPENDIX D
Supplemental Fractal Data for Color Plates D-1
INDEX BY EQUATION I-1