MAYBE * Step 1: DependencyPairs MAYBE + Considered Problem: - Strict TRS: active(c()) -> mark(b()) active(f(X1,X2,X3)) -> f(X1,active(X2),X3) active(f(b(),X,c())) -> mark(f(X,c(),X)) f(X1,mark(X2),X3) -> mark(f(X1,X2,X3)) f(ok(X1),ok(X2),ok(X3)) -> ok(f(X1,X2,X3)) proper(b()) -> ok(b()) proper(c()) -> ok(c()) proper(f(X1,X2,X3)) -> f(proper(X1),proper(X2),proper(X3)) top(mark(X)) -> top(proper(X)) top(ok(X)) -> top(active(X)) - Signature: {active/1,f/3,proper/1,top/1} / {b/0,c/0,mark/1,ok/1} - Obligation: innermost runtime complexity wrt. defined symbols {active,f,proper,top} and constructors {b,c,mark,ok} + Applied Processor: DependencyPairs {dpKind_ = DT} + Details: We add the following dependency tuples: Strict DPs active#(c()) -> c_1() active#(f(X1,X2,X3)) -> c_2(f#(X1,active(X2),X3),active#(X2)) active#(f(b(),X,c())) -> c_3(f#(X,c(),X)) f#(X1,mark(X2),X3) -> c_4(f#(X1,X2,X3)) f#(ok(X1),ok(X2),ok(X3)) -> c_5(f#(X1,X2,X3)) proper#(b()) -> c_6() proper#(c()) -> c_7() proper#(f(X1,X2,X3)) -> c_8(f#(proper(X1),proper(X2),proper(X3)),proper#(X1),proper#(X2),proper#(X3)) top#(mark(X)) -> c_9(top#(proper(X)),proper#(X)) top#(ok(X)) -> c_10(top#(active(X)),active#(X)) Weak DPs and mark the set of starting terms. * Step 2: UsableRules MAYBE + Considered Problem: - Strict DPs: active#(c()) -> c_1() active#(f(X1,X2,X3)) -> c_2(f#(X1,active(X2),X3),active#(X2)) active#(f(b(),X,c())) -> c_3(f#(X,c(),X)) f#(X1,mark(X2),X3) -> c_4(f#(X1,X2,X3)) f#(ok(X1),ok(X2),ok(X3)) -> c_5(f#(X1,X2,X3)) proper#(b()) -> c_6() proper#(c()) -> c_7() proper#(f(X1,X2,X3)) -> c_8(f#(proper(X1),proper(X2),proper(X3)),proper#(X1),proper#(X2),proper#(X3)) top#(mark(X)) -> c_9(top#(proper(X)),proper#(X)) top#(ok(X)) -> c_10(top#(active(X)),active#(X)) - Weak TRS: active(c()) -> mark(b()) active(f(X1,X2,X3)) -> f(X1,active(X2),X3) active(f(b(),X,c())) -> mark(f(X,c(),X)) f(X1,mark(X2),X3) -> mark(f(X1,X2,X3)) f(ok(X1),ok(X2),ok(X3)) -> ok(f(X1,X2,X3)) proper(b()) -> ok(b()) proper(c()) -> ok(c()) proper(f(X1,X2,X3)) -> f(proper(X1),proper(X2),proper(X3)) top(mark(X)) -> top(proper(X)) top(ok(X)) -> top(active(X)) - Signature: {active/1,f/3,proper/1,top/1,active#/1,f#/3,proper#/1,top#/1} / {b/0,c/0,mark/1,ok/1,c_1/0,c_2/2,c_3/1,c_4/1 ,c_5/1,c_6/0,c_7/0,c_8/4,c_9/2,c_10/2} - Obligation: innermost runtime complexity wrt. defined symbols {active#,f#,proper#,top#} and constructors {b,c,mark,ok} + Applied Processor: UsableRules + Details: We replace rewrite rules by usable rules: active(c()) -> mark(b()) active(f(X1,X2,X3)) -> f(X1,active(X2),X3) active(f(b(),X,c())) -> mark(f(X,c(),X)) f(X1,mark(X2),X3) -> mark(f(X1,X2,X3)) f(ok(X1),ok(X2),ok(X3)) -> ok(f(X1,X2,X3)) proper(b()) -> ok(b()) proper(c()) -> ok(c()) proper(f(X1,X2,X3)) -> f(proper(X1),proper(X2),proper(X3)) active#(c()) -> c_1() active#(f(X1,X2,X3)) -> c_2(f#(X1,active(X2),X3),active#(X2)) active#(f(b(),X,c())) -> c_3(f#(X,c(),X)) f#(X1,mark(X2),X3) -> c_4(f#(X1,X2,X3)) f#(ok(X1),ok(X2),ok(X3)) -> c_5(f#(X1,X2,X3)) proper#(b()) -> c_6() proper#(c()) -> c_7() proper#(f(X1,X2,X3)) -> c_8(f#(proper(X1),proper(X2),proper(X3)),proper#(X1),proper#(X2),proper#(X3)) top#(mark(X)) -> c_9(top#(proper(X)),proper#(X)) top#(ok(X)) -> c_10(top#(active(X)),active#(X)) * Step 3: PredecessorEstimation MAYBE + Considered Problem: - Strict DPs: active#(c()) -> c_1() active#(f(X1,X2,X3)) -> c_2(f#(X1,active(X2),X3),active#(X2)) active#(f(b(),X,c())) -> c_3(f#(X,c(),X)) f#(X1,mark(X2),X3) -> c_4(f#(X1,X2,X3)) f#(ok(X1),ok(X2),ok(X3)) -> c_5(f#(X1,X2,X3)) proper#(b()) -> c_6() proper#(c()) -> c_7() proper#(f(X1,X2,X3)) -> c_8(f#(proper(X1),proper(X2),proper(X3)),proper#(X1),proper#(X2),proper#(X3)) top#(mark(X)) -> c_9(top#(proper(X)),proper#(X)) top#(ok(X)) -> c_10(top#(active(X)),active#(X)) - Weak TRS: active(c()) -> mark(b()) active(f(X1,X2,X3)) -> f(X1,active(X2),X3) active(f(b(),X,c())) -> mark(f(X,c(),X)) f(X1,mark(X2),X3) -> mark(f(X1,X2,X3)) f(ok(X1),ok(X2),ok(X3)) -> ok(f(X1,X2,X3)) proper(b()) -> ok(b()) proper(c()) -> ok(c()) proper(f(X1,X2,X3)) -> f(proper(X1),proper(X2),proper(X3)) - Signature: {active/1,f/3,proper/1,top/1,active#/1,f#/3,proper#/1,top#/1} / {b/0,c/0,mark/1,ok/1,c_1/0,c_2/2,c_3/1,c_4/1 ,c_5/1,c_6/0,c_7/0,c_8/4,c_9/2,c_10/2} - Obligation: innermost runtime complexity wrt. defined symbols {active#,f#,proper#,top#} and constructors {b,c,mark,ok} + Applied Processor: PredecessorEstimation {onSelection = all simple predecessor estimation selector} + Details: We estimate the number of application of {1,3,6,7} by application of Pre({1,3,6,7}) = {2,8,9,10}. Here rules are labelled as follows: 1: active#(c()) -> c_1() 2: active#(f(X1,X2,X3)) -> c_2(f#(X1,active(X2),X3),active#(X2)) 3: active#(f(b(),X,c())) -> c_3(f#(X,c(),X)) 4: f#(X1,mark(X2),X3) -> c_4(f#(X1,X2,X3)) 5: f#(ok(X1),ok(X2),ok(X3)) -> c_5(f#(X1,X2,X3)) 6: proper#(b()) -> c_6() 7: proper#(c()) -> c_7() 8: proper#(f(X1,X2,X3)) -> c_8(f#(proper(X1),proper(X2),proper(X3)),proper#(X1),proper#(X2),proper#(X3)) 9: top#(mark(X)) -> c_9(top#(proper(X)),proper#(X)) 10: top#(ok(X)) -> c_10(top#(active(X)),active#(X)) * Step 4: RemoveWeakSuffixes MAYBE + Considered Problem: - Strict DPs: active#(f(X1,X2,X3)) -> c_2(f#(X1,active(X2),X3),active#(X2)) f#(X1,mark(X2),X3) -> c_4(f#(X1,X2,X3)) f#(ok(X1),ok(X2),ok(X3)) -> c_5(f#(X1,X2,X3)) proper#(f(X1,X2,X3)) -> c_8(f#(proper(X1),proper(X2),proper(X3)),proper#(X1),proper#(X2),proper#(X3)) top#(mark(X)) -> c_9(top#(proper(X)),proper#(X)) top#(ok(X)) -> c_10(top#(active(X)),active#(X)) - Weak DPs: active#(c()) -> c_1() active#(f(b(),X,c())) -> c_3(f#(X,c(),X)) proper#(b()) -> c_6() proper#(c()) -> c_7() - Weak TRS: active(c()) -> mark(b()) active(f(X1,X2,X3)) -> f(X1,active(X2),X3) active(f(b(),X,c())) -> mark(f(X,c(),X)) f(X1,mark(X2),X3) -> mark(f(X1,X2,X3)) f(ok(X1),ok(X2),ok(X3)) -> ok(f(X1,X2,X3)) proper(b()) -> ok(b()) proper(c()) -> ok(c()) proper(f(X1,X2,X3)) -> f(proper(X1),proper(X2),proper(X3)) - Signature: {active/1,f/3,proper/1,top/1,active#/1,f#/3,proper#/1,top#/1} / {b/0,c/0,mark/1,ok/1,c_1/0,c_2/2,c_3/1,c_4/1 ,c_5/1,c_6/0,c_7/0,c_8/4,c_9/2,c_10/2} - Obligation: innermost runtime complexity wrt. defined symbols {active#,f#,proper#,top#} and constructors {b,c,mark,ok} + Applied Processor: RemoveWeakSuffixes + Details: Consider the dependency graph 1:S:active#(f(X1,X2,X3)) -> c_2(f#(X1,active(X2),X3),active#(X2)) -->_1 f#(ok(X1),ok(X2),ok(X3)) -> c_5(f#(X1,X2,X3)):3 -->_1 f#(X1,mark(X2),X3) -> c_4(f#(X1,X2,X3)):2 -->_2 active#(f(b(),X,c())) -> c_3(f#(X,c(),X)):8 -->_2 active#(c()) -> c_1():7 -->_2 active#(f(X1,X2,X3)) -> c_2(f#(X1,active(X2),X3),active#(X2)):1 2:S:f#(X1,mark(X2),X3) -> c_4(f#(X1,X2,X3)) -->_1 f#(ok(X1),ok(X2),ok(X3)) -> c_5(f#(X1,X2,X3)):3 -->_1 f#(X1,mark(X2),X3) -> c_4(f#(X1,X2,X3)):2 3:S:f#(ok(X1),ok(X2),ok(X3)) -> c_5(f#(X1,X2,X3)) -->_1 f#(ok(X1),ok(X2),ok(X3)) -> c_5(f#(X1,X2,X3)):3 -->_1 f#(X1,mark(X2),X3) -> c_4(f#(X1,X2,X3)):2 4:S:proper#(f(X1,X2,X3)) -> c_8(f#(proper(X1),proper(X2),proper(X3)),proper#(X1),proper#(X2),proper#(X3)) -->_4 proper#(c()) -> c_7():10 -->_3 proper#(c()) -> c_7():10 -->_2 proper#(c()) -> c_7():10 -->_4 proper#(b()) -> c_6():9 -->_3 proper#(b()) -> c_6():9 -->_2 proper#(b()) -> c_6():9 -->_4 proper#(f(X1,X2,X3)) -> c_8(f#(proper(X1),proper(X2),proper(X3)) ,proper#(X1) ,proper#(X2) ,proper#(X3)):4 -->_3 proper#(f(X1,X2,X3)) -> c_8(f#(proper(X1),proper(X2),proper(X3)) ,proper#(X1) ,proper#(X2) ,proper#(X3)):4 -->_2 proper#(f(X1,X2,X3)) -> c_8(f#(proper(X1),proper(X2),proper(X3)) ,proper#(X1) ,proper#(X2) ,proper#(X3)):4 -->_1 f#(ok(X1),ok(X2),ok(X3)) -> c_5(f#(X1,X2,X3)):3 -->_1 f#(X1,mark(X2),X3) -> c_4(f#(X1,X2,X3)):2 5:S:top#(mark(X)) -> c_9(top#(proper(X)),proper#(X)) -->_1 top#(ok(X)) -> c_10(top#(active(X)),active#(X)):6 -->_2 proper#(c()) -> c_7():10 -->_2 proper#(b()) -> c_6():9 -->_1 top#(mark(X)) -> c_9(top#(proper(X)),proper#(X)):5 -->_2 proper#(f(X1,X2,X3)) -> c_8(f#(proper(X1),proper(X2),proper(X3)) ,proper#(X1) ,proper#(X2) ,proper#(X3)):4 6:S:top#(ok(X)) -> c_10(top#(active(X)),active#(X)) -->_2 active#(f(b(),X,c())) -> c_3(f#(X,c(),X)):8 -->_2 active#(c()) -> c_1():7 -->_1 top#(ok(X)) -> c_10(top#(active(X)),active#(X)):6 -->_1 top#(mark(X)) -> c_9(top#(proper(X)),proper#(X)):5 -->_2 active#(f(X1,X2,X3)) -> c_2(f#(X1,active(X2),X3),active#(X2)):1 7:W:active#(c()) -> c_1() 8:W:active#(f(b(),X,c())) -> c_3(f#(X,c(),X)) 9:W:proper#(b()) -> c_6() 10:W:proper#(c()) -> c_7() The following weak DPs constitute a sub-graph of the DG that is closed under successors. The DPs are removed. 9: proper#(b()) -> c_6() 10: proper#(c()) -> c_7() 7: active#(c()) -> c_1() 8: active#(f(b(),X,c())) -> c_3(f#(X,c(),X)) * Step 5: Failure MAYBE + Considered Problem: - Strict DPs: active#(f(X1,X2,X3)) -> c_2(f#(X1,active(X2),X3),active#(X2)) f#(X1,mark(X2),X3) -> c_4(f#(X1,X2,X3)) f#(ok(X1),ok(X2),ok(X3)) -> c_5(f#(X1,X2,X3)) proper#(f(X1,X2,X3)) -> c_8(f#(proper(X1),proper(X2),proper(X3)),proper#(X1),proper#(X2),proper#(X3)) top#(mark(X)) -> c_9(top#(proper(X)),proper#(X)) top#(ok(X)) -> c_10(top#(active(X)),active#(X)) - Weak TRS: active(c()) -> mark(b()) active(f(X1,X2,X3)) -> f(X1,active(X2),X3) active(f(b(),X,c())) -> mark(f(X,c(),X)) f(X1,mark(X2),X3) -> mark(f(X1,X2,X3)) f(ok(X1),ok(X2),ok(X3)) -> ok(f(X1,X2,X3)) proper(b()) -> ok(b()) proper(c()) -> ok(c()) proper(f(X1,X2,X3)) -> f(proper(X1),proper(X2),proper(X3)) - Signature: {active/1,f/3,proper/1,top/1,active#/1,f#/3,proper#/1,top#/1} / {b/0,c/0,mark/1,ok/1,c_1/0,c_2/2,c_3/1,c_4/1 ,c_5/1,c_6/0,c_7/0,c_8/4,c_9/2,c_10/2} - Obligation: innermost runtime complexity wrt. defined symbols {active#,f#,proper#,top#} and constructors {b,c,mark,ok} + Applied Processor: EmptyProcessor + Details: The problem is still open. MAYBE