Operating Systems , 132. Practical Session 5, Synchronization. 1. Motivation. Multiprocessing needs some tools for managing shared resources Printers Files Data Bases. 2. Conditions for a good Solution.
An Image/Link below is provided (as is) to download presentationDownload Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author.Content is provided to you AS IS for your information and personal use only. Download presentation by click this link.While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server.During download, if you can't get a presentation, the file might be deleted by the publisher.
E N D
Presentation Transcript
Operating Systems, 132
Practical Session 5, Synchronization 1
Motivation Multiprocessing needs some tools for managing shared resources Printers Files Data Bases 2
Conditions for a good Solution Mutual Exclusion – No two processes are in the critical section(CS) at the same time Deadlock Freedom – If processes are trying to enter the CS onewill eventually enter it Starvation Freedom – When a process tries to enter its CS, it will eventually succeed 3
Solution Archetypes Busy wait Wastes CPU Priority inversion with busy waiting (*):Task L (low priority) runs and gains exclusive use of resource R. H (high priority) task is introduced and attempts to acquire R and must therefore wait. Note that since H is busy waiting it may still be scheduled (its state remains runnable). Result: L can’t run and release R because H is of higher priority and is scheduled to run before it. H on the other hand can’t proceed past its busy wait loop. Deadlock! Sleep & Wake up Also prone to priority inversion but will not deadlock.Can you think of a scenario? 4
Peterson’s Solution N=2; interested[0]=interested[1]=FALSE; int turn; /* Should be named NOT_MY_TURN */ int interested[N]; /* all initially 0 (FALSE) */ voidenter_region(int process){ /* who is entering 0 or 1 ? */int other = 1- process; /* opposite of process */interested[process] = TRUE; /* signal that you're interested */turn = process; /* set flag – NOT my turn */while (turn == process && interested[other] == TRUE); /* null statement */ } voidleave_region(int process){ /* who is leaving 0 or 1 ? */interested[process] = FALSE; /* departure from critical region */ } 5
Peterson’s Solution Process = 0 Process = 1 interested[0]=interested[1]=FALSE int turn; int interested[2]; voidenter_region(…){ int other = 1; interested[0] = TRUE; turn = 0; while (turn == 0 && interested[1] == TRUE); } voidleave_region(…){ interested[0] = FALSE;} interested[0]=interested[1]=FALSE int turn; int interested[2]; voidenter_region(…){ int other = 0;interested[1] = TRUE; turn = 1; while (turn == 1 && interested[0] == TRUE); } voidleave_region(…){interested[1] = FALSE;} 6
Question 1 N=1; interested[0]=interested[1]=FALSE; int turn; /* Should be named NOT_MY_TURN */ int interested[N]; /* all initially 0 (FALSE) */ void enter_region(int process){ /* who is entering 0 or 1 ? */int other = 1- process; /* opposite of process */ turn = process;/* set flag – NOT my turn */interested[process] = TRUE; /* signal that you're interested */while (turn == process && interested[other] == TRUE); /* null statement */ } void leave_region(int process){ /* who is leaving 0 or 1 ? */interested[process] = FALSE; /* departure from critical region */ } Consider the following variant of Peterson’s solution where the two red lines are swapped. Does this variant solve the mutual exclusion problem? 7
Peterson’s Solution Process = 0 Process = 1 voidenter_region(…){ int other = 1; turn = 0;interested[0] = TRUE; while (turn == 0 && interested[1] == TRUE); } voidleave_region(…){ interested[0] = FALSE;} interested[0]=interested[1]=FALSE int turn; int interested[2]; voidenter_region(…){ int other = 0;turn = 1; interested[1] = TRUE;while (turn == 1 && interested[0] == TRUE); } voidleave_region(…){interested[1] = FALSE;} 8
Answer We will get a mutual exclusion violation: P1 does turn:=1; P0 does turn:=0; P0 does interested[0]:=true; P0 does while(turn == 0 && interested [1]); // (#t and #f) #f P0 enters the CS. P1 does interested [1]:=true; P1 does while(turn == 1 && interested [0]); // (#f and #t) #f P1 enters the CS. now both processes are in the critical section. 9
Question 2 Assume the while statement in Peterson's solution is changed to: while (turn != process && interested[other] == TRUE) Describe a scheduling scenario in which we will receive a mutual exclusion violation and one in which we will NOT receive a Mutual Exclusion violation. 10
Question 2 N=2; interested[0]=interested[1]=FALSE; int turn; /* Should be named NOT_MY_TURN */ int interested[N]; /* all initially 0 (FALSE) */ voidenter_region(int process){ /* who is entering 0 or 1 ? */int other = 1- process; /* opposite of process */interested[process] = TRUE; /* signal that you're interested */turn = process; /* set flag – NOT my turn */ while (turn != process && interested[other] == TRUE) /* null statement */ } voidleave_region(int process){ /* who is leaving 0 or 1 ? */interested[process] = FALSE; /* departure from critical region */ } 11
Peterson’s Solution Process = 0 Process = 1 voidenter_region(…){ int other = 1; interested[0] = TRUE; turn = 0; while (turn != 0 && interested[1] == TRUE); } voidleave_region(…){ interested[0] = FALSE;} interested[0]=interested[1]=FALSE int turn; int interested[2]; voidenter_region(…){ int other = 0;interested[1] = TRUE; turn = 1; while (turn != 1 && interested[0] == TRUE); } voidleave_region(…){interested[1] = FALSE;} 12
Answer for Q.2 No mutual exclusion violation: One enters and exits and only afterwards the second receives a time quanta. P0 – interested[0]=true, P0 – turn = 0, P1- interested[1]=true, P1 – turn =1, P1 passes while loop and enters CS, P0 – stuck in while loop. 3. Many more…. 13
Answer for Q.2 Mutual exclusion violation: Process A executes: `interested [process] = TRUE', `turn = process‘ and falls through the while loop shown above. While in the critical section, the timer fires and process B executes: `interested [process] = TRUE', `turn = process' and falls through the while loop shown above. Both processes are in the critical section. 14
Question 3 (from midterm of 2005) Prove Dekker’s algorithm for the Critical Section problem. That is, show that there are no mutual exclusion violations, no deadlocks and no starvation problem.
Answer Q.3 No mutual exclusion violations – (no two processes will be in the CS at the same time) Falsely assume that both p0 and p1 are in the critical section. Further assume WLG that p0 entered the CS first. The last change p0 introduced on the algorithm’s variables, before existing the outer loop (line 5), was the assignment flag[0]=true. Following our assumption, p1 followed p0 into the CS which means that it must have exited its outer loop. This, however, is only possible if flag[0]=false which is a contradiction to our initial assumption. 18
Answer Q.3 No starvation – (any process attempting to enter the CS will eventually succeed) WLG assume p0 is attempting to enter the CS and is somewhere in the while loop of line 5 (otherwise it will enter the CS). p1 can be in several different states: Not in the CS In the CS In its while loop with turn=0 In its while loop with turn=1 19
Answer Q.3 Case 1 – a process not in the CS will not prevent other processes from entering it Any process which is not in the CS and does not want to enter it turns off its flag flag[i]=false (line 12 or init). This implies that any other process wishing to enter the CS will find the condition on the outer while loop (line 5, “while(flag[1])”) unsatisfied and will be able to enter the CS without having to examine the value of turn. 20
Answer Q.3 Case 2 – p1 is in the CS After a finite amount of time p1 will exit the CS and will set the value of turn to turn=0. If it stays out then we are back to case 1. Otherwise, if there is no preemption p1 may try to enter the CS and we have to consider case 3 (p1 is in its while loop with turn=0). 21
Answer Q.3 Case 3 – p1 is in its while loop with turn=0 Since the value of turn is 0, and no process can change it (p0 is attempting to enter the CS and will only be able to change turn’s value after it leaves the CS), p1 will eventually be held by the inner while loop (line 8) after setting flag[1]=false. At some point, p0 will receive CPU time. Since the value of turn is 0, it will proceed to its outer while loop (line 5). At this point the outer loop condition will not hold it, since flag[1]=false (by p1), and p0 will proceed to the CS. 22
Answer Q.3 Case 4 – p1 is in its while loop with turn=1 If the value of turn is 1, then p1 will revolve in its outer while loop (line 5). It will continue going through it as long as flag[0]=true. At some point, p0 will receive CPU time. Since the value of turn is 1, it will proceed to its inner while loop (line 8) after setting flag[0]=false. At this point the outer loop condition will not hold p1, and we will be back to case 2 or 3 (for which we have shown that p0 may eventually enter the CS). 23
Answer Q.3 No Deadlock No need to prove! Follows from the fact that there’s no starvation. 24
Lamport’s Bakery Algorithm int value[N]={0, 0,…,0}; /* processes get “waiting numbers” */ int busy[N]={FALSE,…, FALSE}; /* just a flag... */ voidenter_region(inti ) /* process i entering.. */ { busy[i] = TRUE; /* guard the value selection */ value[i] = max(value[0], value[1], …, value[N-1]) + 1; /* LAST in line … */ busy[i] = FALSE; for(k=0; k < N; k ++){ while (busy[k] == TRUE) ; /* wait before checking */ while((value[k] != 0) && ((value[k], k) < (value[i], i))); /* wait */ } } void leave_region(inti ) { value[i ] = 0; } 25
Question 4 Assume we have the following atomic command: voidswap(bool *a, bool*b) {booltemp = *a; *a = *b; *b = temp;} Solve the N processes mutual exclusion problem using the swap command. 26
Answer Q.4 void swap(bool *a, bool *b) { bool temp = *a; *a = *b; *b = temp;} bool lock = FALSE; bool waiting[N] = {FALSE, FALSE, …, FALSE}; voidenter(int i) { waiting[i] = TRUE;bool key = TRUE;while (TRUE) { swap(&key, &lock);if ( !waiting[i] || !key) break; } } voidleave(inti) { waiting[i]= FALSE ; intj = (i + 1) % N;while ( (j != i) && waiting[j]==FALSE ) { j = (j + 1) % N; }if (j == i) { lock = FALSE; } else { waiting[j] = FALSE; }} The idea:Seek the next (chronologically ordered) interested process. If such a process exist, grant it the ability to enter the CS. Otherwise reset the lock so that other processes will be able to enter the CS at a later time. The idea:Use a local variable “key” which will be set to true. Let all processes swap it with current lock and compete over this line. Only the first process to grab it will have a value of false to the lock. This process will enter the CS. 27
Question 5a – midterm 2010 Let A be an n processes (finite) mutual exclusion algorithm which is applied with the following guarantee: whenever A is used, any process will attempt to access the critical section only once. Prove or disprove the following claim: A is a starvation free algorithm if and only if it is a deadlock free algorithm.
Answer Q.5a The first part of the proof is trivial: starvation freedom also implies deadlock freedom. What about the second one? Assume that there are n processes and that A is free of deadlocks. Now, let us falsely assume that A is not a starvation free algorithm and contradict this assumption. If A is not a starvation free algorithm, then there must exist some process pi which goes through infinitely many steps but still can’t enter the CS.
Answer Q.5a, continued While pigoes through its steps other processes manage to enter the CS (we assumed deadlock freedom). As each process pj may only enter the CS once, at some point all n-1 processes will go through (in and out of) the CS and we will be left with pi. At this point, piis the only process attempting to enter the CS. Following our initial assumption, there can be no deadlocks and pi will enter the CS. This contradicts our false assumption that A is not a starvation free algorithm. QED
Test-and-set(w) do atomically prev:=w w:=1 return prev Question Q.5b – midterm 2010 Consider the following simple algorithm similar to that shown in class: Is this algorithm deadlock free? Prove or disprove by providing an accurate scenario which leads to a deadlock. 1 intlock initially 0 2 boolean interested[n] initially {false,…,false} Code for procss i{0,…,n-1} 3 interested[i]:=true 4 await((test-and-set(lock)=0) OR (interested[i] =false)) 5 Critical Section 6 j:=(i+1) modulo n 7 while (j ≠ i) AND (interested[j] = false) 8 j:=(j+1) modulo n 9 if (j=i) 10 lock:=0 11 else 12 interested[j]:=false 13 interested[i]=false
Answer Q.5b The following scenario results in a deadlock: A process p0 is executed and executes all lines up until the beginning of line 13.(Note that ‘lock’ is freed) Another process p1 is executed and allowed to run all the way through the CS. At this point p1iterates through the other processes and identifies that ‘interested[0]=true’. As a result p1resets the value ‘interested[0]:=false’ (line 12) and does not free the lock. It then proceeds to line 13 and exits. p0runs line 13. At this point the system is in a state of deadlock. Any process attempting to enter the CS will be stopped by line 4.