A
ring is an algebraic system that supports unlimited addition, subtraction, and multiplication, with all the familiar laws (such as the distributive laws a(x+y)=ax+ay and (x+y)b=xb+yb) holding except that there may possibly be a,b pairs for which ab=ba does not hold. The ordinary integers are an example of a ring (where, however, ab=ba does always hold).
A ring has the left-cancellation property if ax=ay implies x=y for all nonzero a and all x and y, and has the right-cancellation property if xb=yb implies x=y for all nonzero b and all x and y.
Your mission should you choose to accept it: Prove that a ring has the left-cancellation property if and only if it has the right-cancellation property.
Assume we have LCP (left-cancellation property). In order to prove RCP, say we have x≠y such that xb=yb. We must prove b=0:
xb=yb
follows
(x-y)b=0
follows
(x-y)(b+b)=(x-y)b
follows
b+b=b
follows
b=0
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Posted by JLo
on 2006-07-20 16:30:52 |
Solution
