Imagine a couple guys moving into a house.
They have a truck full of boxes they need to offload into the house.
So they decide to split up the work.
It works well for a while. But then Peter shows up, and he offers to
help brother Paul. Suddenly, the sidewalk fills up with boxes before
Charlie can pick them up. He gets bummed about this and calls brothers
Conrad and Carl. But Conrad hurt his arm and Carl keeps playing with
his phone, so now:
Sometimes the producers (paul, peter) still outpace the consumers,
the sidewalk is full and the guys have to stand around holding boxes
Sometimes the consumers (charlie, conrad, carl) outpace the producers
and they're standing around the sidewalk instead of unpacking in house
So everyone makes a rule: check the sidewalk before you go there!
Unfortunately, it didn't help. Paul and Peter, emptying opposite ends
of the truck, both saw an almost full sidewalk, but clearly enough
space for one more box. So they both picked off a box, walked over,
then bonked into each other (race condition!).
Finally Quincy Queue shows up. He makes three new rules:
Paul/Peter: you both have to check with me to make sure there's
an empty spot before you dropoff:
Conrad/Carl/Charlie: you have to check with me to make
sure there's a box before you pick up:
And finally, because there's only one of me, I can't keep track
of this if more than one guy is messing with the line.So even
if I gave you a green light in step 1 or 2, you still need to
check to make sure no one else is on the line.
So Peter/Paul's final rules become:
(and Charlie/Carl/Conrad complementary)
If you think of
waitFor == decrement == P
nowSomeoneElseCanUse == increment == V
Then you'll have exactly the alogrithm on the wikipedia page.