40 CHAPTER 2 STRATEGIES FOR INVESTIGATING PROBLEMS
more on its intended audience than anything else. For example, many professional
mathematicians would accept "Maximize balanced wires!" as a complete and clear
solution to the Affinnative Action problem (Example 2.1. 9 on page 21).
This book is much more concerned with the process of investigation and discovery
than with polished mathematical argument. Nevertheless, a brilliant idea is useless
if it cannot be communicated to anyone else. Furthennore, fluency in mathematical
argument will help you to steer and modify your investigations.^6
At the very least, you should be comfortable with three distinct styles of argument:
straightforward deduction (also known as "direct proof'), argument by contradiction,
and mathematical induction. We shall explore them below, but first, a few brief notes
about style.Common Abbreviations and Stylistic Conventions
- Most good mathematical arguments start out with clear statements of the hy
pothesis and conclusion. The successful end of the argument is usually marked
with a symbol. We use the Halmos symbol, but some other choices are the ab
breviations
QED for the Latin quod erat demonstrandum ("which was to be demon
strated") or the English "quite elegantly done";
AWD for "and we're done";
W^5 for "which was what we wanted."- Like ordinary exposition, mathematical arguments should be complete sen
tences with nouns and verbs. Common mathematical verbs are
¥, �, 2, <, >, E, C, =*, �.
(The last four mean "is an element of," "is a subset of," "implies" and "is
equivalent to," respectively.) - Complicated equations should always be displayed on a single line, and labeled
if referred to later. For example:
1: e-x
2
dx = Vi, (3)
- Often, as you explore the penultimate step of an argument (or sub-argument),
you want to mark this off to your audience clearly. The abbreviations TS and
ISTS ("to show" and "it is sufficient to show") are particularly useful for this
purpose. - A nice bit of notation, borrowed from computer science and slowly becoming
more common in mathematics, is ":=" for "is defined to be." For example,
A := B + C introduces a new variable A and defines it to be the sum of the
already defined variables Band C. Think of the colon as the point of an arrow;
we always distinguish between left and right. The thing on the left side of(^6) This section is deliberately brief. If you would like a more leisurely treatment of logical argument and
methods of proof, including mathematical induction, we recommend Chapters 0 and 4 .1 of (15).