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SLR Parsing

SLR Parsing. Aggelos Kiayias Computer Science & Engineering Department The University of Connecticut 371 Fairfield Road, Box U-155 Storrs, CT 06269-1155. aggelos@cse.uconn.edu http://www.cse.uconn.edu/~akiayias. Items. SLR (Simple LR parsing)

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SLR Parsing

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  1. SLR Parsing Aggelos Kiayias Computer Science & Engineering Department The University of Connecticut 371 Fairfield Road, Box U-155 Storrs, CT 06269-1155 aggelos@cse.uconn.edu http://www.cse.uconn.edu/~akiayias

  2. Items • SLR (Simple LR parsing) • DEF A LR(0) item is a production with a “marker.”E.g. S  aA.Beintuition: it indicates how much of a certain productionwe have seen already (up to the point of the marker) • CENTRAL IDEA OF SLR PARSING: construct a DFA that recognizes viable prefixes of the grammar. • Intuition: Shift/Reduce actions can be decided based on this DFA (what we have seen so far & what are our next options). • Use “LR(0) Items” for the creation of this DFA.

  3. Basic Operations • Augmented Grammar: E’  E E  E + T | T T  T * F | F F  ( E ) | id CLOSURE OPERATION of a set of Items: Function closure(I) { J=I; repeat for each A .B in J and each produtcion B of G such that B. is not in J: ADD B. to J until … no more items can be added to J return J } EXAMPLE consider I={ E’.E } E  E + T | T T  T * F | F F  ( E ) | id

  4. GOTO function • Definition.Goto(I,X) = closure of the set of all items A X. where A .X belongs to I • Intuitively: Goto(I,X) set of all items that “reachable” from the items of I once X has been “seen.” • E.g. consider I={E’ E. , E E.+T} and compute Goto(I,+)Goto(I,+) = { E E+.T, T  .T * F , T  .F , F  .( E ) , F  .id }

  5. The Canonical Collections of Items for G Procedure Items(G’:augmented grammar) { C:={ closure [S’  .S] } repeat for each set of items I in C and each grammar symbol X such that goto(I,X) is not empty and not in C do add goto(I,X) to C until no more sets of items can be added to C } I0 E’  .EE  .E + T E  .T T  .T * F T .F F  .( E ) F  .id I1 E’  E.E  E. + T I2 E  T. T  T. * F E’  EE  E + T | T T  T * F | F F  ( E ) | id …I11

  6. The DFA For Viable Prefixes E I0 • States = Canonical Collection of Sets of Items • Transitions defined by the Goto Function. • All states final except I0 + T * I1 I2 I3 I7 F I3 … … Look p. 226 Intuition: Imagine an NFA with states all the items in the grammar and transitions to be of the form: “A .X” goes to “A X.” with an arrowlabeled “X” Then the closure used in the Goto functions Essentially transforms this NFA into the DFA above

  7. Example • S’  S • S  aABe • A  Abc • A  b • B  d Start with I0 = closure(S’ .S)

  8. 2nd Example E’  EE  E + T | T T  T * F | F F  ( E ) | id

  9. Relation to Parsing • An item A  1.2 is valid for a viable prefix1 if we have a rightmost derivation that yields Aw which in one step yields 12w • An item will be valid for many viable prefixes. • Whether a certain item is valid for a certain viable prefix it helps on our decision whether to shift or reduce when  1 is on the stack. • If 2 looks like we still need to shift. • If 2= it looks like we should reduce A  1 • It could be that two valid items maytell us different things.

  10. Valid Items for Viable Prefixes • E+T* is a viable prefix (and the DFA will be at state I7 after reading it) • Indeed: E’=>E=>E+T=>E+T*F is a rightmost derivation, T*F is the handle of E+T*F, thus E+T*F is a viable prefix, thus E+T* is also. • Examine state I7 … it containsT  T*.FF  .(E)F  .id • i.e., precisely the items valid for E+T*:E’=>E=>E+T=>E+T*FE’=>E=>E+T=>E+T*F=>E+T*(E)E’=>E=>E+T=>E+T*F=>E+T*id • There are no other valid items for for the viableprefix E+T*

  11. SLR Parsing Table Construction Input: the augmented grammar G’ Output: The SLR Parsing table functions ACTION & GOTO • Construct C={I0,..,In} the collections of LR(0) items for G’ • “State i” is constructed from Ii If [A  .a] is in Ii and goto(Ii,a)=Ik then we set ACTION[i,a] to be “shift k” (a is a terminal) If [A  .] is in Ii then we set ACTION[i,a] to reduce “A” for all a in Follow(A) --- (note: A is not S’) If [S’  S.] is in Ii then we set ACTION[i,$] = accept 3. The goto transitions for state i are constructed as follows for all A, if goto(Ii,A)=Ik then goto[i,A]=k 4. All entries not defined by rules (2) and (3) are made “error” 5. The initial state of the parser is the one constructed from the set of items I0

  12. Example. I0 E’  .E E  .E + T E  .T T  .T * F T .F F  .( E ) F  .id I1 E’  E. E  E. + T I2 E  T. T  T. * F Since F  .( E ) is in I0 And Goto(I0,( )=I4 we set ACTION(0, ( )=s4 Since E’  E. is in I1 We set ACTION(1,$)=acc Since E  T. is in I2 and Follow(E)={$,+,) } We set ACTION(2,$)=rE T ACTION(2,+)=rE T ACTION(2,))=rE T Goto(I0, E)=I1 Goto(I0,T)=I2 Goto(I0,( )=I4 I4 F  (.E) E  .E + T E  .T T  .T * F T .F F  .( E ) F  .id Follow(T)=Follow(F)={ ) , + , * , $ }

  13. 3rd example – SLR Table Construction S  AB | a A  aA | b B  a

  14. Conflicts • Shift/Reduce • Reduce/Reduce Sometimes unambiguous grammars produce multiply defined labels (s/r, r/r conflicts)in the SLR table.

  15. Conflict Example S’  S S  L = R | R L  * R | id R  L

  16. Conflict Example S’  SS  L = R | R L  * R | id R  L I0 = {S’  .S , S  .L = R , S  .R , L  .* R , L . id , R  .L}I1 = {S’  S. } I2 = {S  L . = R , R  L . }I3 = {S  R.}I4 = {L  *.R , R  .L , L  .* R , L . id} I5 = {L  id. } I6 = {S  L = . R , R  .L , L  .* R , L . id} I7 = {L  *R. } I8 = {R  L. } I9 = {S  L = R. } action[2, = ] ? s 6 (because of S  L . = R ) r R  L (because of R  L . and = follows R)

  17. But Why? • Let’s consider a string that will exhibit the conflict. id=id • What is the correct move? (recall: grammar is non-ambig.) • R=id is not a right sentential form!!! • Even though in general = might follow R … but it does not in this case. • …Actually it does only when R is preceded by * • SLR finds a conflict because using Follow + LR(0) items as the guide to find when to reduce is not the best method. $0 id=id$ s5 $0id5 =id$ r L id $0L2 =id$ conflict…

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