chanter 4
sequ(nces, JUiiaand mandelbrot
sets, and power
- series
Overview
In 1980 Benoit Mandelbrot led a team of mathematicians in producing some
stunning computer graphics from very simple rules for manipulating complex
numbers. This event marked the beginning of a new branch of mathematics,
known as fractal geometry, that has some amazing applications. Many of the
tools needed to appreciate Mandelbrot's work are contained in this chapter. We
look at extensions to the complex domain of sequences and series, ideas that are
part of a standard calculus course.
4.1 Sequences and Series
In formal terms, a complex sequence is a function whose domain is the positive
integers and whose range is a subset of the complex numbers. The following are
examples of sequences:
f (n) = (2- ~) + (s+ ~)i (n= 1, 2, 3, ... );
g(n)= ei"." (n=l,2,3, ... );
h(k) =5+3i+(
1~i)k (k=l,2,3, ... ); and
(1 i)n
r(n) =4
+ Z (n= 1, 2, 3, ... ).
(4-1)(4-2)(4-3)(4-4)For convenience, at times we use the term sequence rather than complex
sequence. If we want a function s to represent an arbit rary sequence, we can
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