T1(20,100) T2(30,250) T3(100,400) (execution time, deadline=peroid)

Now I want to constrict the deadlines as Di = f * Pi where Di is new deadline for ith task, Pi is the original period for ith task and f is the factor I want to figure out. What is the smallest value of f that the tasks will continue to meet their deadlines using rate monotonic scheduler?

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Your question in not very clear.. could you provide an example of input and relative output for a simple dataset? –  Haile Sep 30 '12 at 9:58

This schema will repeat (synchronize) every 2000 time units. During this period

• T1 must run 20 times, requiring 400 time units.
• T2 must run 8 times, requiring 240 time units.
• T3 must run 5 times, requiring 500 time units.

Total is 1140 time units per 2000 time unit interval.

f = 1140 / 2000 = 0.57

This assumes long-running tasks can be interrupted and resumed, to allow shorter-running tasks to run in between. Otherwise there will be no way for T1 to meet it's deadline once T3 has started.

T1(20,57)
T2(30,142.5)
T3(100,228)

These will repeat every 1851930 time units, and require the same time to complete.

A small simplification: When calculating factor, the period-time cancels out. This means you don't really need to calculate the period to get the factor:

Period = 2000
Required time = (Period / 100) * 20 + (Period / 250) * 30 + (Period / 400) * 100
f = Required time / Period = 20 / 100 + 30 / 250 + 100 / 400 = 0.57

f = Sum(Duration[i] / Period[i])

To calculate the period, you could do this:

Period(T1,T2) = lcm(100, 250) = 500
Period(T1,T2,T3) = lcm(500, 400) = 2000

where lcm(x,y) is the Least Common Multiple.

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I'm really not into this whole thing, but I'm interested; what do you mean by These will repeat every ....? –  iccthedral Sep 30 '12 at 11:19
If they all are scheduled to run simultaniusly at time 0, the next time they will run simultaniously will be at time 2000. –  Markus Jarderot Sep 30 '12 at 13:02
Okay, I was confused because of 1851930. Now I see that the lcm of real numbers can only be their product. –  iccthedral Sep 30 '12 at 13:17