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Given a set of tasks:

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

1 Answer 1

up vote 2 down vote accepted

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.

The updated deadlines are:

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

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