
Preprocessing Cost Relations
=====================================

#### Computed strongly connected components 
0. recursive  : [f36/17,f48/17]
1. recursive  : [f15/20,f36_loop_cont/21,f78/20]
2. non_recursive  : [exit_location/1]
3. non_recursive  : [f83/11]
4. non_recursive  : [f15_loop_cont/12]
5. non_recursive  : [f0/11]

#### Obtained direct recursion through partial evaluation 
0. SCC is partially evaluated into f36/17
1. SCC is partially evaluated into f15/20
2. SCC is completely evaluated into other SCCs
3. SCC is completely evaluated into other SCCs
4. SCC is partially evaluated into f15_loop_cont/12
5. SCC is partially evaluated into f0/11

Control-Flow Refinement of Cost Relations
=====================================

### Specialization of cost equations f36/17 
* CE 37 is refined into CE [38] 
* CE 36 is refined into CE [39] 
* CE 35 is refined into CE [40] 
* CE 19 is refined into CE [41] 
* CE 28 is refined into CE [42] 
* CE 31 is refined into CE [43] 
* CE 34 is refined into CE [44] 
* CE 27 is refined into CE [45] 
* CE 30 is refined into CE [46] 
* CE 22 is refined into CE [47] 
* CE 20 is refined into CE [48] 
* CE 29 is refined into CE [49] 
* CE 33 is refined into CE [50] 
* CE 32 is refined into CE [51] 
* CE 26 is refined into CE [52] 
* CE 21 is refined into CE [53] 
* CE 25 is refined into CE [54] 
* CE 24 is refined into CE [55] 
* CE 23 is refined into CE [56] 


### Cost equations --> "Loop" of f36/17 
* CEs [43] --> Loop 38 
* CEs [44] --> Loop 39 
* CEs [50] --> Loop 40 
* CEs [51] --> Loop 41 
* CEs [42] --> Loop 42 
* CEs [46] --> Loop 43 
* CEs [49] --> Loop 44 
* CEs [41] --> Loop 45 
* CEs [45] --> Loop 46 
* CEs [47] --> Loop 47 
* CEs [48] --> Loop 48 
* CEs [52] --> Loop 49 
* CEs [53] --> Loop 50 
* CEs [54] --> Loop 51 
* CEs [55] --> Loop 52 
* CEs [56] --> Loop 53 
* CEs [38] --> Loop 54 
* CEs [40] --> Loop 55 
* CEs [39] --> Loop 56 

### Ranking functions of CR f36(A,B,C,D,E,F,G,H,J,M,N,O,P,Q,R,S,T) 
* RF of phase [38,39,40,41,42,43,44,45,46,47,48,49,50,51,52,53]: [E-J+1]

#### Partial ranking functions of CR f36(A,B,C,D,E,F,G,H,J,M,N,O,P,Q,R,S,T) 
* Partial RF of phase [38,39,40,41,42,43,44,45,46,47,48,49,50,51,52,53]:
  - RF of loop [38:1,39:1,40:1,41:1,42:1,43:1,44:1,45:1,46:1,47:1,48:1,49:1,50:1,51:1,52:1,53:1]:
    E-J+1
  - RF of loop [38:1,42:1,51:1,52:1]:
    C depends on loops [41:1,44:1,47:1,48:1,49:1,50:1,53:1] 
  - RF of loop [39:1,51:1]:
    -D+1 depends on loops [40:1,41:1,43:1,44:1,46:1,47:1,48:1,49:1,50:1,52:1,53:1] 
  - RF of loop [40:1,43:1,52:1]:
    B depends on loops [41:1,44:1,47:1,48:1,49:1,50:1,53:1] 
  - RF of loop [40:1,43:1,52:1,53:1]:
    D depends on loops [39:1,41:1,44:1,47:1,48:1,49:1,50:1,51:1] 
  - RF of loop [41:1,44:1,48:1,49:1,50:1,53:1]:
    -A+E+1
  - RF of loop [45:1]:
    C/2-1/2 depends on loops [41:1,44:1,47:1,48:1,49:1,50:1,53:1] 
  - RF of loop [46:1]:
    B-1 depends on loops [41:1,44:1,47:1,48:1,49:1,50:1,53:1] 
  - RF of loop [47:1]:
    -A/2-3/2
  - RF of loop [49:1]:
    -B+1 depends on loops [40:1,41:1,43:1,44:1,46:1,47:1,48:1,50:1,52:1,53:1] 


### Specialization of cost equations f15/20 
* CE 15 is refined into CE [57] 
* CE 14 is discarded (unfeasible) 
* CE 16 is refined into CE [58] 
* CE 2 is refined into CE [59,60] 
* CE 4 is refined into CE [61,62] 
* CE 5 is refined into CE [63,64] 
* CE 3 is refined into CE [65,66] 
* CE 10 is refined into CE [67] 
* CE 12 is refined into CE [68] 
* CE 11 is refined into CE [69] 
* CE 6 is refined into CE [70] 
* CE 8 is refined into CE [71] 
* CE 7 is refined into CE [72] 
* CE 13 is refined into CE [73] 
* CE 9 is refined into CE [74] 


### Cost equations --> "Loop" of f15/20 
* CEs [67] --> Loop 57 
* CEs [68] --> Loop 58 
* CEs [69] --> Loop 59 
* CEs [73] --> Loop 60 
* CEs [70] --> Loop 61 
* CEs [71] --> Loop 62 
* CEs [74] --> Loop 63 
* CEs [72] --> Loop 64 
* CEs [58] --> Loop 65 
* CEs [57] --> Loop 66 
* CEs [59,60] --> Loop 67 
* CEs [61,62] --> Loop 68 
* CEs [63,64] --> Loop 69 
* CEs [65] --> Loop 70 
* CEs [66] --> Loop 71 

### Ranking functions of CR f15(A,B,C,D,E,F,G,H,I,J,M,N,O,P,Q,R,S,T,U,V) 

#### Partial ranking functions of CR f15(A,B,C,D,E,F,G,H,I,J,M,N,O,P,Q,R,S,T,U,V) 
* Partial RF of phase [61,62,63,64]:
  - RF of loop [64:1]:
    -A+E+1
    -A+7*E-5


### Specialization of cost equations f15_loop_cont/12 
* CE 17 is refined into CE [75] 
* CE 18 is refined into CE [76] 


### Cost equations --> "Loop" of f15_loop_cont/12 
* CEs [75] --> Loop 72 
* CEs [76] --> Loop 73 

### Ranking functions of CR f15_loop_cont(A,B,C,D,E,F,G,H,I,J,K,L) 

#### Partial ranking functions of CR f15_loop_cont(A,B,C,D,E,F,G,H,I,J,K,L) 


### Specialization of cost equations f0/11 
* CE 1 is refined into CE [77,78,79,80,81,82,83,84,85,86,87,88,89,90] 


### Cost equations --> "Loop" of f0/11 
* CEs [89,90] --> Loop 74 
* CEs [77,78,79,80,81,82,83,84,85,86,87,88] --> Loop 75 

### Ranking functions of CR f0(A,B,C,D,E,F,G,H,I,J,M) 

#### Partial ranking functions of CR f0(A,B,C,D,E,F,G,H,I,J,M) 


Computing Bounds
=====================================

#### Cost of chains of f36(A,B,C,D,E,F,G,H,J,M,N,O,P,Q,R,S,T):
* Chain [[38,39,40,41,42,43,44,45,46,47,48,49,50,51,52,53],56]: 7*it(38)+2*it(41)+1*it(47)+3*it(48)+1*it(49)+2*it(51)+0
  Such that:aux(218) =< -A+E+1
aux(219) =< -A+N
aux(220) =< A+2*E-2*J+4
aux(221) =< A-2*J-N+2*T
aux(222) =< -A/2
aux(223) =< -A/2+N/2
aux(227) =< E-J+1
aux(228) =< -J+T
it(41) =< aux(218)
it(47) =< aux(218)
it(48) =< aux(218)
it(49) =< aux(218)
it(41) =< aux(219)
it(47) =< aux(219)
it(48) =< aux(219)
it(49) =< aux(219)
it(49) =< aux(220)
it(48) =< aux(221)
it(49) =< aux(221)
it(51) =< aux(221)
it(47) =< aux(222)
it(47) =< aux(223)
it(38) =< aux(227)
it(41) =< aux(227)
it(47) =< aux(227)
it(48) =< aux(227)
it(49) =< aux(227)
it(51) =< aux(227)
it(38) =< aux(228)
it(41) =< aux(228)
it(47) =< aux(228)
it(48) =< aux(228)
it(49) =< aux(228)
it(51) =< aux(228)

  with precondition: [F=0,H=0,M=2,R=1,S=1,G>=0,P>=0,N>=A,J>=G,T>=J+1,E+1>=N,E+1>=T,A+2*T>=2*J+N,E+3*A+6*T>=6*J+4*N+2,A+P+2*T>=2*J+C+N] 

* Chain [[38,39,40,41,42,43,44,45,46,47,48,49,50,51,52,53],55]: 7*it(38)+2*it(41)+1*it(47)+3*it(48)+1*it(49)+2*it(51)+0
  Such that:aux(218) =< -A+E+1
aux(219) =< -A+N
aux(220) =< A+2*E-2*J+4
aux(221) =< A+2*E-2*J-N+2
aux(222) =< -A/2
aux(223) =< -A/2+N/2
aux(229) =< E-J+1
it(41) =< aux(218)
it(47) =< aux(218)
it(48) =< aux(218)
it(49) =< aux(218)
it(41) =< aux(219)
it(47) =< aux(219)
it(48) =< aux(219)
it(49) =< aux(219)
it(49) =< aux(220)
it(48) =< aux(221)
it(49) =< aux(221)
it(51) =< aux(221)
it(47) =< aux(222)
it(47) =< aux(223)
it(38) =< aux(229)
it(41) =< aux(229)
it(47) =< aux(229)
it(48) =< aux(229)
it(49) =< aux(229)
it(51) =< aux(229)

  with precondition: [H=0,M=2,S=0,E+1=T,1>=F,1>=R,F>=0,G>=0,R>=0,N>=A,J>=G,E>=J,E+1>=N,3*A+7*E+4>=6*J+4*N,A+2*E+2>=2*J+F+N,A+R+2*E+1>=2*J+N,A+P+2*E+2>=2*J+C+F+N,A+P+R+2*E+1>=2*J+C+N] 

* Chain [[38,39,40,41,42,43,44,45,46,47,48,49,50,51,52,53],54]: 7*it(38)+2*it(41)+1*it(47)+3*it(48)+1*it(49)+2*it(51)+0
  Such that:aux(218) =< -A+E+1
aux(220) =< A+2*E-2*J+4
aux(222) =< -A/2
aux(219) =< -A/4+3/2*E-5/4*J+1
aux(223) =< -A/8+3/4*E-5/8*J+1/2
aux(230) =< E-J+1
aux(231) =< 2*E-2*J+2
aux(219) =< aux(231)
aux(223) =< aux(231)
it(41) =< aux(218)
it(47) =< aux(218)
it(48) =< aux(218)
it(49) =< aux(218)
it(41) =< aux(219)
it(47) =< aux(219)
it(48) =< aux(219)
it(49) =< aux(219)
it(49) =< aux(220)
it(48) =< aux(231)
it(49) =< aux(231)
it(51) =< aux(231)
it(47) =< aux(222)
it(47) =< aux(223)
it(38) =< aux(230)
it(41) =< aux(230)
it(47) =< aux(230)
it(48) =< aux(230)
it(49) =< aux(230)
it(51) =< aux(230)

  with precondition: [H=0,M=3,1>=F,F>=0,G>=0,E+1>=A,J>=G,E>=J] 

* Chain [54]: 0
  with precondition: [M=3,E>=0,F>=0,H>=0,1>=F+H,J>=G,G>=H] 


#### Cost of chains of f15(A,B,C,D,E,F,G,H,I,J,M,N,O,P,Q,R,S,T,U,V):
* Chain [[61,62,63,64]]...: 30*it(61)+1*it(64)+18*s(110)+2*s(152)+3*s(153)+1*s(154)+2*s(155)+7*s(156)+0
  Such that:it(64) =< -A+7*E
aux(261) =< -A+7*E+4
aux(232) =< E
aux(234) =< 3*E+5
aux(265) =< -A+E+1
aux(232) =< aux(265)
aux(235) =< aux(265)
it(64) =< aux(265)
aux(235) =< aux(261)
it(64) =< aux(261)
aux(237) =< aux(232)+1
aux(255) =< aux(232)*3+5
aux(233) =< aux(232)*2+2
aux(253) =< aux(232)-1
aux(234) =< aux(232)*3+5
aux(255) =< aux(234)+1
s(157) =< it(64)*aux(237)
s(159) =< it(64)*aux(233)
s(162) =< it(64)*aux(253)
s(160) =< it(64)*aux(255)
s(152) =< s(162)
s(153) =< s(162)
s(154) =< s(162)
s(152) =< aux(235)
s(153) =< aux(235)
s(154) =< aux(235)
s(154) =< s(160)
s(153) =< s(159)
s(154) =< s(159)
s(155) =< s(159)
s(156) =< s(157)
s(152) =< s(157)
s(153) =< s(157)
s(154) =< s(157)
s(155) =< s(157)
s(110) =< aux(235)

  with precondition: [E+1>=A,E>=0,H>=F,F>=0,1>=F,I=0] 

* Chain [[61,62,63,64],71]: 30*it(61)+1*it(64)+18*s(110)+2*s(152)+3*s(153)+1*s(154)+2*s(155)+7*s(156)+0
  Such that:it(64) =< -A+7*E
aux(261) =< -A+7*E+4
aux(232) =< E
aux(234) =< 3*E+5
aux(266) =< -A+E+1
aux(232) =< aux(266)
aux(235) =< aux(266)
it(64) =< aux(266)
aux(235) =< aux(261)
it(64) =< aux(261)
aux(237) =< aux(232)+1
aux(255) =< aux(232)*3+5
aux(233) =< aux(232)*2+2
aux(253) =< aux(232)-1
aux(234) =< aux(232)*3+5
aux(255) =< aux(234)+1
s(157) =< it(64)*aux(237)
s(159) =< it(64)*aux(233)
s(162) =< it(64)*aux(253)
s(160) =< it(64)*aux(255)
s(152) =< s(162)
s(153) =< s(162)
s(154) =< s(162)
s(152) =< aux(235)
s(153) =< aux(235)
s(154) =< aux(235)
s(154) =< s(160)
s(153) =< s(159)
s(154) =< s(159)
s(155) =< s(159)
s(156) =< s(157)
s(152) =< s(157)
s(153) =< s(157)
s(154) =< s(157)
s(155) =< s(157)
s(110) =< aux(235)

  with precondition: [F=0,I=0,M=3,H=G,1>=H,A>=1,C>=0,H>=0,E+1>=A,J>=H,E+H>=J] 

* Chain [[61,62,63,64],70]: 30*it(61)+1*it(64)+18*s(110)+2*s(152)+3*s(153)+1*s(154)+2*s(155)+7*s(156)+2*s(170)+3*s(172)+1*s(173)+2*s(174)+7*s(175)+0
  Such that:aux(259) =< -A+E+1
it(64) =< -A+7*E
aux(261) =< -A+7*E+4
aux(232) =< E
s(168) =< E+1
s(169) =< 2*E+2
s(164) =< 8*E+8
aux(267) =< -A+E
aux(268) =< -A+6*E+3
aux(269) =< 3*E+5
aux(260) =< aux(267)
aux(260) =< aux(268)
s(166) =< aux(268)
aux(234) =< aux(269)
s(164) =< aux(269)
s(166) =< s(169)
s(170) =< aux(267)
s(172) =< aux(267)
s(173) =< aux(267)
s(170) =< s(166)
s(172) =< s(166)
s(173) =< s(166)
s(173) =< s(164)
s(172) =< s(169)
s(173) =< s(169)
s(174) =< s(169)
s(175) =< s(168)
s(170) =< s(168)
s(172) =< s(168)
s(173) =< s(168)
s(174) =< s(168)
aux(232) =< aux(259)
aux(235) =< aux(259)
it(64) =< aux(259)
aux(235) =< aux(260)
it(64) =< aux(260)
aux(235) =< aux(261)
it(64) =< aux(261)
aux(237) =< aux(232)+1
aux(255) =< aux(232)*3+5
aux(233) =< aux(232)*2+2
aux(253) =< aux(232)-1
aux(234) =< aux(232)*3+5
aux(255) =< aux(234)+1
s(157) =< it(64)*aux(237)
s(159) =< it(64)*aux(233)
s(162) =< it(64)*aux(253)
s(160) =< it(64)*aux(255)
s(152) =< s(162)
s(153) =< s(162)
s(154) =< s(162)
s(152) =< aux(235)
s(153) =< aux(235)
s(154) =< aux(235)
s(154) =< s(160)
s(153) =< s(159)
s(154) =< s(159)
s(155) =< s(159)
s(156) =< s(157)
s(152) =< s(157)
s(153) =< s(157)
s(154) =< s(157)
s(155) =< s(157)
s(110) =< aux(235)

  with precondition: [F=0,I=0,M=3,H=G,1>=H,A>=1,C>=0,H>=0,E>=A,J>=H,E+H>=J] 

* Chain [[61,62,63,64],69]: 30*it(61)+1*it(64)+18*s(110)+2*s(152)+3*s(153)+1*s(154)+2*s(155)+7*s(156)+2*s(183)+3*s(185)+1*s(186)+2*s(187)+7*s(188)+0
  Such that:it(64) =< -A+7*E
aux(261) =< -A+7*E+4
aux(232) =< E
s(181) =< E+1
s(182) =< 2*E+2
aux(270) =< -A+E+1
aux(271) =< -A+6*E+4
aux(272) =< 3*E+5
aux(273) =< 8*E+8
aux(260) =< aux(270)
s(176) =< aux(270)
aux(260) =< aux(271)
s(179) =< aux(271)
aux(234) =< aux(272)
s(176) =< aux(272)
s(177) =< aux(272)
s(177) =< aux(273)
s(179) =< aux(273)
s(179) =< s(182)
s(183) =< s(176)
s(185) =< s(176)
s(186) =< s(176)
s(183) =< s(179)
s(185) =< s(179)
s(186) =< s(179)
s(186) =< s(177)
s(185) =< s(182)
s(186) =< s(182)
s(187) =< s(182)
s(188) =< s(181)
s(183) =< s(181)
s(185) =< s(181)
s(186) =< s(181)
s(187) =< s(181)
aux(232) =< aux(270)
aux(235) =< aux(270)
it(64) =< aux(270)
aux(235) =< aux(260)
it(64) =< aux(260)
aux(235) =< aux(261)
it(64) =< aux(261)
aux(237) =< aux(232)+1
aux(255) =< aux(232)*3+5
aux(233) =< aux(232)*2+2
aux(253) =< aux(232)-1
aux(234) =< aux(232)*3+5
aux(255) =< aux(234)+1
s(157) =< it(64)*aux(237)
s(159) =< it(64)*aux(233)
s(162) =< it(64)*aux(253)
s(160) =< it(64)*aux(255)
s(152) =< s(162)
s(153) =< s(162)
s(154) =< s(162)
s(152) =< aux(235)
s(153) =< aux(235)
s(154) =< aux(235)
s(154) =< s(160)
s(153) =< s(159)
s(154) =< s(159)
s(155) =< s(159)
s(156) =< s(157)
s(152) =< s(157)
s(153) =< s(157)
s(154) =< s(157)
s(155) =< s(157)
s(110) =< aux(235)

  with precondition: [F=0,I=0,M=3,H=G,1>=H,A>=1,C>=0,H>=0,E+1>=A,J>=H,E+H>=J] 

* Chain [[61,62,63,64],68]: 30*it(61)+1*it(64)+18*s(110)+2*s(152)+3*s(153)+1*s(154)+2*s(155)+7*s(156)+2*s(196)+3*s(198)+1*s(199)+2*s(200)+7*s(201)+0
  Such that:it(64) =< -A+7*E
aux(261) =< -A+7*E+4
aux(232) =< E
s(194) =< E+1
s(195) =< 2*E+2
aux(274) =< -A+E+1
aux(275) =< -A+6*E+4
aux(276) =< 3*E+5
aux(277) =< 8*E+8
aux(260) =< aux(274)
s(189) =< aux(274)
aux(260) =< aux(275)
s(192) =< aux(275)
aux(234) =< aux(276)
s(189) =< aux(276)
s(190) =< aux(276)
s(190) =< aux(277)
s(192) =< aux(277)
s(192) =< s(195)
s(196) =< s(189)
s(198) =< s(189)
s(199) =< s(189)
s(196) =< s(192)
s(198) =< s(192)
s(199) =< s(192)
s(199) =< s(190)
s(198) =< s(195)
s(199) =< s(195)
s(200) =< s(195)
s(201) =< s(194)
s(196) =< s(194)
s(198) =< s(194)
s(199) =< s(194)
s(200) =< s(194)
aux(232) =< aux(274)
aux(235) =< aux(274)
it(64) =< aux(274)
aux(235) =< aux(260)
it(64) =< aux(260)
aux(235) =< aux(261)
it(64) =< aux(261)
aux(237) =< aux(232)+1
aux(255) =< aux(232)*3+5
aux(233) =< aux(232)*2+2
aux(253) =< aux(232)-1
aux(234) =< aux(232)*3+5
aux(255) =< aux(234)+1
s(157) =< it(64)*aux(237)
s(159) =< it(64)*aux(233)
s(162) =< it(64)*aux(253)
s(160) =< it(64)*aux(255)
s(152) =< s(162)
s(153) =< s(162)
s(154) =< s(162)
s(152) =< aux(235)
s(153) =< aux(235)
s(154) =< aux(235)
s(154) =< s(160)
s(153) =< s(159)
s(154) =< s(159)
s(155) =< s(159)
s(156) =< s(157)
s(152) =< s(157)
s(153) =< s(157)
s(154) =< s(157)
s(155) =< s(157)
s(110) =< aux(235)

  with precondition: [F=0,I=0,M=3,H=G,1>=H,A>=1,C>=0,H>=0,E+1>=A,J>=H,E+H>=J] 

* Chain [[61,62,63,64],67]: 30*it(61)+1*it(64)+18*s(110)+2*s(152)+3*s(153)+1*s(154)+2*s(155)+7*s(156)+2*s(209)+3*s(211)+1*s(212)+2*s(213)+7*s(214)+0
  Such that:it(64) =< -A+7*E
aux(261) =< -A+7*E+4
aux(232) =< E
s(207) =< E+1
s(208) =< 2*E+2
aux(278) =< -A+E+1
aux(279) =< -A+6*E+4
aux(280) =< 3*E+5
aux(281) =< 8*E+8
aux(260) =< aux(278)
s(202) =< aux(278)
aux(260) =< aux(279)
s(205) =< aux(279)
aux(234) =< aux(280)
s(202) =< aux(280)
s(203) =< aux(280)
s(203) =< aux(281)
s(205) =< aux(281)
s(205) =< s(208)
s(209) =< s(202)
s(211) =< s(202)
s(212) =< s(202)
s(209) =< s(205)
s(211) =< s(205)
s(212) =< s(205)
s(212) =< s(203)
s(211) =< s(208)
s(212) =< s(208)
s(213) =< s(208)
s(214) =< s(207)
s(209) =< s(207)
s(211) =< s(207)
s(212) =< s(207)
s(213) =< s(207)
aux(232) =< aux(278)
aux(235) =< aux(278)
it(64) =< aux(278)
aux(235) =< aux(260)
it(64) =< aux(260)
aux(235) =< aux(261)
it(64) =< aux(261)
aux(237) =< aux(232)+1
aux(255) =< aux(232)*3+5
aux(233) =< aux(232)*2+2
aux(253) =< aux(232)-1
aux(234) =< aux(232)*3+5
aux(255) =< aux(234)+1
s(157) =< it(64)*aux(237)
s(159) =< it(64)*aux(233)
s(162) =< it(64)*aux(253)
s(160) =< it(64)*aux(255)
s(152) =< s(162)
s(153) =< s(162)
s(154) =< s(162)
s(152) =< aux(235)
s(153) =< aux(235)
s(154) =< aux(235)
s(154) =< s(160)
s(153) =< s(159)
s(154) =< s(159)
s(155) =< s(159)
s(156) =< s(157)
s(152) =< s(157)
s(153) =< s(157)
s(154) =< s(157)
s(155) =< s(157)
s(110) =< aux(235)

  with precondition: [F=0,I=0,M=3,H=G,1>=H,A>=1,C>=0,H>=0,E+1>=A,J>=H,E+H>=J] 

* Chain [[61,62,63,64],65]: 30*it(61)+1*it(64)+18*s(110)+2*s(152)+3*s(153)+1*s(154)+2*s(155)+7*s(156)+0
  Such that:it(64) =< -A+7*E
aux(261) =< -A+7*E+4
aux(232) =< E
aux(234) =< 3*E+5
aux(282) =< -A+E+1
aux(232) =< aux(282)
aux(235) =< aux(282)
it(64) =< aux(282)
aux(235) =< aux(261)
it(64) =< aux(261)
aux(237) =< aux(232)+1
aux(255) =< aux(232)*3+5
aux(233) =< aux(232)*2+2
aux(253) =< aux(232)-1
aux(234) =< aux(232)*3+5
aux(255) =< aux(234)+1
s(157) =< it(64)*aux(237)
s(159) =< it(64)*aux(233)
s(162) =< it(64)*aux(253)
s(160) =< it(64)*aux(255)
s(152) =< s(162)
s(153) =< s(162)
s(154) =< s(162)
s(152) =< aux(235)
s(153) =< aux(235)
s(154) =< aux(235)
s(154) =< s(160)
s(153) =< s(159)
s(154) =< s(159)
s(155) =< s(159)
s(156) =< s(157)
s(152) =< s(157)
s(153) =< s(157)
s(154) =< s(157)
s(155) =< s(157)
s(110) =< aux(235)

  with precondition: [F=0,I=0,M=3,H=G,1>=H,A>=1,C>=0,H>=0,E+1>=A,J>=H,E+H>=J] 

* Chain [[61,62,63,64],60,66]: 30*it(61)+1*it(64)+18*s(110)+2*s(152)+3*s(153)+1*s(154)+2*s(155)+7*s(156)+2*s(222)+1*s(223)+3*s(224)+1*s(225)+2*s(226)+7*s(227)+1
  Such that:it(64) =< -A+7*E
aux(261) =< -A+7*E+4
s(219) =< -A/2
aux(232) =< E
s(221) =< E+1
s(219) =< E-N/2+P/2+S/2+1
s(219) =< E-N/2+P/2+S/2+1/2
s(217) =< 2*E+N+4
s(215) =< 3*E-N+3
s(219) =< -N/2+P/2+S/2+V
aux(283) =< -A+E+1
aux(284) =< -A+N
aux(285) =< 2*E+2
aux(286) =< 3*E+5
aux(260) =< aux(283)
s(215) =< aux(283)
aux(260) =< aux(284)
s(216) =< aux(284)
s(216) =< aux(285)
aux(234) =< aux(286)
s(217) =< aux(286)
s(222) =< s(215)
s(223) =< s(215)
s(224) =< s(215)
s(225) =< s(215)
s(222) =< s(216)
s(223) =< s(216)
s(224) =< s(216)
s(225) =< s(216)
s(225) =< s(217)
s(224) =< aux(285)
s(225) =< aux(285)
s(226) =< aux(285)
s(223) =< s(219)
s(227) =< s(221)
s(222) =< s(221)
s(223) =< s(221)
s(224) =< s(221)
s(225) =< s(221)
s(226) =< s(221)
aux(232) =< aux(283)
aux(235) =< aux(283)
it(64) =< aux(283)
aux(235) =< aux(260)
it(64) =< aux(260)
aux(235) =< aux(261)
it(64) =< aux(261)
aux(237) =< aux(232)+1
aux(255) =< aux(232)*3+5
aux(233) =< aux(232)*2+2
aux(253) =< aux(232)-1
aux(234) =< aux(232)*3+5
aux(255) =< aux(234)+1
s(157) =< it(64)*aux(237)
s(159) =< it(64)*aux(233)
s(162) =< it(64)*aux(253)
s(160) =< it(64)*aux(255)
s(152) =< s(162)
s(153) =< s(162)
s(154) =< s(162)
s(152) =< aux(235)
s(153) =< aux(235)
s(154) =< aux(235)
s(154) =< s(160)
s(153) =< s(159)
s(154) =< s(159)
s(155) =< s(159)
s(156) =< s(157)
s(152) =< s(157)
s(153) =< s(157)
s(154) =< s(157)
s(155) =< s(157)
s(110) =< aux(235)

  with precondition: [F=0,I=0,M=4,R=0,T=0,U=1,H=G,E+1=V,1>=H,1>=S,A>=1,C>=0,H>=0,S>=0,N>=A,J>=H,E+1>=N,E+H>=J,P+S+2*E+1>=0] 

* Chain [[61,62,63,64],60,65]: 30*it(61)+1*it(64)+18*s(110)+2*s(152)+3*s(153)+1*s(154)+2*s(155)+7*s(156)+2*s(222)+3*s(224)+1*s(225)+2*s(226)+7*s(227)+1
  Such that:it(64) =< -A+7*E
aux(261) =< -A+7*E+4
aux(232) =< E
s(221) =< E+1
aux(288) =< 2*E+2
aux(289) =< -A+E+1
aux(290) =< 3*E+5
aux(287) =< aux(289)
aux(234) =< aux(290)
aux(287) =< aux(290)
s(216) =< aux(287)
s(216) =< aux(288)
s(222) =< aux(287)
s(224) =< aux(287)
s(225) =< aux(287)
s(222) =< s(216)
s(224) =< s(216)
s(225) =< s(216)
s(225) =< aux(290)
s(224) =< aux(288)
s(225) =< aux(288)
s(226) =< aux(288)
s(227) =< s(221)
s(222) =< s(221)
s(224) =< s(221)
s(225) =< s(221)
s(226) =< s(221)
aux(232) =< aux(289)
aux(235) =< aux(289)
it(64) =< aux(289)
aux(235) =< aux(261)
it(64) =< aux(261)
aux(237) =< aux(232)+1
aux(255) =< aux(232)*3+5
aux(233) =< aux(232)*2+2
aux(253) =< aux(232)-1
aux(234) =< aux(232)*3+5
aux(255) =< aux(234)+1
s(157) =< it(64)*aux(237)
s(159) =< it(64)*aux(233)
s(162) =< it(64)*aux(253)
s(160) =< it(64)*aux(255)
s(152) =< s(162)
s(153) =< s(162)
s(154) =< s(162)
s(152) =< aux(235)
s(153) =< aux(235)
s(154) =< aux(235)
s(154) =< s(160)
s(153) =< s(159)
s(154) =< s(159)
s(155) =< s(159)
s(156) =< s(157)
s(152) =< s(157)
s(153) =< s(157)
s(154) =< s(157)
s(155) =< s(157)
s(110) =< aux(235)

  with precondition: [F=0,I=0,M=3,H=G,1>=H,A>=1,C>=0,H>=0,E+1>=A,J>=H,E+H>=J] 

* Chain [[61,62,63,64],59,66]: 30*it(61)+1*it(64)+18*s(110)+2*s(152)+3*s(153)+1*s(154)+2*s(155)+7*s(156)+2*s(235)+3*s(237)+1*s(238)+2*s(239)+7*s(240)+1
  Such that:aux(234) =< 3*V+2
aux(291) =< -A+N
aux(292) =< -A+V
aux(293) =< -A+7*V
aux(294) =< -N+3*V+1
aux(295) =< N+2*V+3
aux(296) =< V
aux(297) =< 2*V+1
aux(298) =< 3*V+3
aux(260) =< aux(291)
aux(260) =< aux(292)
it(64) =< aux(293)
s(228) =< aux(294)
s(231) =< aux(294)
s(229) =< aux(295)
s(230) =< aux(295)
aux(232) =< aux(296)
s(229) =< aux(297)
s(231) =< aux(297)
s(228) =< aux(298)
s(230) =< aux(298)
s(235) =< s(228)
s(237) =< s(228)
s(238) =< s(228)
s(235) =< s(229)
s(237) =< s(229)
s(238) =< s(229)
s(238) =< s(230)
s(237) =< s(231)
s(238) =< s(231)
s(239) =< s(231)
s(240) =< aux(296)
s(235) =< aux(296)
s(237) =< aux(296)
s(238) =< aux(296)
s(239) =< aux(296)
aux(232) =< aux(292)
aux(235) =< aux(292)
it(64) =< aux(292)
aux(235) =< aux(260)
it(64) =< aux(260)
aux(235) =< aux(293)
aux(237) =< aux(232)+1
aux(255) =< aux(232)*3+5
aux(233) =< aux(232)*2+2
aux(253) =< aux(232)-1
aux(234) =< aux(232)*3+5
aux(255) =< aux(234)+1
s(157) =< it(64)*aux(237)
s(159) =< it(64)*aux(233)
s(162) =< it(64)*aux(253)
s(160) =< it(64)*aux(255)
s(152) =< s(162)
s(153) =< s(162)
s(154) =< s(162)
s(152) =< aux(235)
s(153) =< aux(235)
s(154) =< aux(235)
s(154) =< s(160)
s(153) =< s(159)
s(154) =< s(159)
s(155) =< s(159)
s(156) =< s(157)
s(152) =< s(157)
s(153) =< s(157)
s(154) =< s(157)
s(155) =< s(157)
s(110) =< aux(235)

  with precondition: [F=0,I=0,M=4,T=0,U=1,H=G,E+1=V,1>=H,1>=R,1>=S,A>=1,C>=0,H>=0,R>=0,S>=0,N>=A+1,J>=H,E+1>=N,E+H>=J,P+2*E+2>=R,P+S+2*E+1>=0] 

* Chain [[61,62,63,64],59,65]: 30*it(61)+1*it(64)+18*s(110)+2*s(152)+3*s(153)+1*s(154)+2*s(155)+7*s(156)+2*s(235)+3*s(237)+1*s(238)+2*s(239)+7*s(240)+1
  Such that:it(64) =< -A+7*E
aux(261) =< -A+7*E+4
aux(232) =< E
s(234) =< E+1
s(231) =< 2*E+2
aux(299) =< 2*E+3
aux(300) =< -A+E
aux(301) =< -A+E+1
aux(302) =< 3*E+5
aux(303) =< 3*E+6
aux(260) =< aux(300)
aux(260) =< aux(301)
s(229) =< aux(301)
aux(234) =< aux(302)
s(230) =< aux(302)
s(229) =< aux(303)
s(230) =< aux(303)
s(229) =< aux(299)
s(231) =< aux(299)
s(235) =< aux(300)
s(237) =< aux(300)
s(238) =< aux(300)
s(235) =< s(229)
s(237) =< s(229)
s(238) =< s(229)
s(238) =< s(230)
s(237) =< s(231)
s(238) =< s(231)
s(239) =< s(231)
s(240) =< s(234)
s(235) =< s(234)
s(237) =< s(234)
s(238) =< s(234)
s(239) =< s(234)
aux(232) =< aux(301)
aux(235) =< aux(301)
it(64) =< aux(301)
aux(235) =< aux(260)
it(64) =< aux(260)
aux(235) =< aux(261)
it(64) =< aux(261)
aux(237) =< aux(232)+1
aux(255) =< aux(232)*3+5
aux(233) =< aux(232)*2+2
aux(253) =< aux(232)-1
aux(234) =< aux(232)*3+5
aux(255) =< aux(234)+1
s(157) =< it(64)*aux(237)
s(159) =< it(64)*aux(233)
s(162) =< it(64)*aux(253)
s(160) =< it(64)*aux(255)
s(152) =< s(162)
s(153) =< s(162)
s(154) =< s(162)
s(152) =< aux(235)
s(153) =< aux(235)
s(154) =< aux(235)
s(154) =< s(160)
s(153) =< s(159)
s(154) =< s(159)
s(155) =< s(159)
s(156) =< s(157)
s(152) =< s(157)
s(153) =< s(157)
s(154) =< s(157)
s(155) =< s(157)
s(110) =< aux(235)

  with precondition: [F=0,I=0,M=3,H=G,1>=H,A>=1,C>=0,H>=0,E>=A,J>=H,E+H>=J] 

* Chain [[61,62,63,64],58,66]: 30*it(61)+1*it(64)+18*s(110)+2*s(152)+3*s(153)+1*s(154)+2*s(155)+7*s(156)+2*s(248)+1*s(249)+3*s(250)+1*s(251)+2*s(252)+7*s(253)+1
  Such that:it(64) =< -A+7*E
aux(261) =< -A+7*E+4
s(245) =< -A/2
aux(232) =< E
s(247) =< E+1
s(245) =< E-N/2+P/2-R/2+1
s(243) =< 2*E+N+4
s(245) =< -N/2+P/2-R/2+V
aux(304) =< -A+E+1
aux(305) =< -A+N
aux(306) =< 2*E+2
aux(307) =< 3*E+5
aux(308) =< 3*E-N+3
aux(262) =< aux(304)
s(241) =< aux(304)
aux(262) =< aux(305)
s(242) =< aux(305)
s(242) =< aux(306)
s(244) =< aux(306)
aux(234) =< aux(307)
s(243) =< aux(307)
s(241) =< aux(308)
s(244) =< aux(308)
s(248) =< s(241)
s(249) =< s(241)
s(250) =< s(241)
s(251) =< s(241)
s(248) =< s(242)
s(249) =< s(242)
s(250) =< s(242)
s(251) =< s(242)
s(251) =< s(243)
s(250) =< s(244)
s(251) =< s(244)
s(252) =< s(244)
s(249) =< s(245)
s(253) =< s(247)
s(248) =< s(247)
s(249) =< s(247)
s(250) =< s(247)
s(251) =< s(247)
s(252) =< s(247)
aux(232) =< aux(304)
aux(235) =< aux(304)
it(64) =< aux(304)
aux(235) =< aux(305)
it(64) =< aux(305)
aux(235) =< aux(261)
it(64) =< aux(261)
aux(235) =< aux(262)
it(64) =< aux(262)
aux(237) =< aux(232)+1
aux(255) =< aux(232)*3+5
aux(233) =< aux(232)*2+2
aux(253) =< aux(232)-1
aux(234) =< aux(232)*3+5
aux(255) =< aux(234)+1
s(157) =< it(64)*aux(237)
s(159) =< it(64)*aux(233)
s(162) =< it(64)*aux(253)
s(160) =< it(64)*aux(255)
s(152) =< s(162)
s(153) =< s(162)
s(154) =< s(162)
s(152) =< aux(235)
s(153) =< aux(235)
s(154) =< aux(235)
s(154) =< s(160)
s(153) =< s(159)
s(154) =< s(159)
s(155) =< s(159)
s(156) =< s(157)
s(152) =< s(157)
s(153) =< s(157)
s(154) =< s(157)
s(155) =< s(157)
s(110) =< aux(235)

  with precondition: [F=0,I=0,M=4,T=0,U=1,H=G,E+1=V,1>=H,1>=R,1>=S,A>=1,C>=0,H>=0,R>=0,S>=0,N>=A,J>=H,E+1>=N,E+H>=J,P+2*E+2>=R,P+S+2*E+1>=0] 

* Chain [[61,62,63,64],58,65]: 30*it(61)+1*it(64)+18*s(110)+2*s(152)+3*s(153)+1*s(154)+2*s(155)+7*s(156)+2*s(248)+3*s(250)+1*s(251)+2*s(252)+7*s(253)+1
  Such that:it(64) =< -A+7*E
aux(261) =< -A+7*E+4
aux(232) =< E
s(247) =< E+1
aux(310) =< 2*E+2
aux(311) =< -A+E+1
aux(312) =< 3*E+5
aux(309) =< aux(311)
aux(234) =< aux(312)
aux(309) =< aux(312)
s(242) =< aux(309)
s(242) =< aux(310)
s(248) =< aux(309)
s(250) =< aux(309)
s(251) =< aux(309)
s(248) =< s(242)
s(250) =< s(242)
s(251) =< s(242)
s(251) =< aux(312)
s(250) =< aux(310)
s(251) =< aux(310)
s(252) =< aux(310)
s(253) =< s(247)
s(248) =< s(247)
s(250) =< s(247)
s(251) =< s(247)
s(252) =< s(247)
aux(232) =< aux(311)
aux(235) =< aux(311)
it(64) =< aux(311)
aux(235) =< aux(261)
it(64) =< aux(261)
aux(237) =< aux(232)+1
aux(255) =< aux(232)*3+5
aux(233) =< aux(232)*2+2
aux(253) =< aux(232)-1
aux(234) =< aux(232)*3+5
aux(255) =< aux(234)+1
s(157) =< it(64)*aux(237)
s(159) =< it(64)*aux(233)
s(162) =< it(64)*aux(253)
s(160) =< it(64)*aux(255)
s(152) =< s(162)
s(153) =< s(162)
s(154) =< s(162)
s(152) =< aux(235)
s(153) =< aux(235)
s(154) =< aux(235)
s(154) =< s(160)
s(153) =< s(159)
s(154) =< s(159)
s(155) =< s(159)
s(156) =< s(157)
s(152) =< s(157)
s(153) =< s(157)
s(154) =< s(157)
s(155) =< s(157)
s(110) =< aux(235)

  with precondition: [F=0,I=0,M=3,H=G,1>=H,A>=1,C>=0,H>=0,E+1>=A,J>=H,E+H>=J] 

* Chain [[61,62,63,64],57,66]: 30*it(61)+1*it(64)+18*s(110)+2*s(152)+3*s(153)+1*s(154)+2*s(155)+7*s(156)+2*s(261)+1*s(262)+3*s(263)+1*s(264)+2*s(265)+7*s(266)+1
  Such that:it(64) =< -A+7*E
aux(261) =< -A+7*E+4
s(258) =< -A/2
s(258) =< -A/2+P/2+S/2+V
aux(232) =< E
s(260) =< E+1
s(258) =< E-N/2+P/2-R/2+1
s(258) =< E-N/2+P/2+S/2+1/2
s(256) =< 2*E+N+4
s(258) =< -N/2+P/2+S/2+V
aux(313) =< -A+E+1
aux(314) =< -A+N
aux(315) =< 2*E+2
aux(316) =< 3*E+5
aux(317) =< 3*E-N+3
aux(262) =< aux(313)
s(254) =< aux(313)
aux(262) =< aux(314)
s(255) =< aux(314)
s(255) =< aux(315)
s(257) =< aux(315)
aux(234) =< aux(316)
s(256) =< aux(316)
s(254) =< aux(317)
s(257) =< aux(317)
s(261) =< s(254)
s(262) =< s(254)
s(263) =< s(254)
s(264) =< s(254)
s(261) =< s(255)
s(262) =< s(255)
s(263) =< s(255)
s(264) =< s(255)
s(264) =< s(256)
s(263) =< s(257)
s(264) =< s(257)
s(265) =< s(257)
s(262) =< s(258)
s(266) =< s(260)
s(261) =< s(260)
s(262) =< s(260)
s(263) =< s(260)
s(264) =< s(260)
s(265) =< s(260)
aux(232) =< aux(313)
aux(235) =< aux(313)
it(64) =< aux(313)
aux(235) =< aux(314)
it(64) =< aux(314)
aux(235) =< aux(261)
it(64) =< aux(261)
aux(235) =< aux(262)
it(64) =< aux(262)
aux(237) =< aux(232)+1
aux(255) =< aux(232)*3+5
aux(233) =< aux(232)*2+2
aux(253) =< aux(232)-1
aux(234) =< aux(232)*3+5
aux(255) =< aux(234)+1
s(157) =< it(64)*aux(237)
s(159) =< it(64)*aux(233)
s(162) =< it(64)*aux(253)
s(160) =< it(64)*aux(255)
s(152) =< s(162)
s(153) =< s(162)
s(154) =< s(162)
s(152) =< aux(235)
s(153) =< aux(235)
s(154) =< aux(235)
s(154) =< s(160)
s(153) =< s(159)
s(154) =< s(159)
s(155) =< s(159)
s(156) =< s(157)
s(152) =< s(157)
s(153) =< s(157)
s(154) =< s(157)
s(155) =< s(157)
s(110) =< aux(235)

  with precondition: [F=0,I=0,M=4,T=0,U=1,H=G,E+1=V,1>=H,1>=R,1>=S,A>=1,C>=0,H>=0,R>=0,S>=0,N>=A,J>=H,E+1>=N,E+H>=J,P+2*E+2>=R,P+S+2*E+1>=0] 

* Chain [[61,62,63,64],57,65]: 30*it(61)+1*it(64)+18*s(110)+2*s(152)+3*s(153)+1*s(154)+2*s(155)+7*s(156)+2*s(261)+3*s(263)+1*s(264)+2*s(265)+7*s(266)+1
  Such that:it(64) =< -A+7*E
aux(261) =< -A+7*E+4
aux(232) =< E
s(260) =< E+1
aux(319) =< 2*E+2
aux(320) =< -A+E+1
aux(321) =< 3*E+5
aux(318) =< aux(320)
aux(234) =< aux(321)
aux(318) =< aux(321)
s(255) =< aux(318)
s(255) =< aux(319)
s(261) =< aux(318)
s(263) =< aux(318)
s(264) =< aux(318)
s(261) =< s(255)
s(263) =< s(255)
s(264) =< s(255)
s(264) =< aux(321)
s(263) =< aux(319)
s(264) =< aux(319)
s(265) =< aux(319)
s(266) =< s(260)
s(261) =< s(260)
s(263) =< s(260)
s(264) =< s(260)
s(265) =< s(260)
aux(232) =< aux(320)
aux(235) =< aux(320)
it(64) =< aux(320)
aux(235) =< aux(261)
it(64) =< aux(261)
aux(237) =< aux(232)+1
aux(255) =< aux(232)*3+5
aux(233) =< aux(232)*2+2
aux(253) =< aux(232)-1
aux(234) =< aux(232)*3+5
aux(255) =< aux(234)+1
s(157) =< it(64)*aux(237)
s(159) =< it(64)*aux(233)
s(162) =< it(64)*aux(253)
s(160) =< it(64)*aux(255)
s(152) =< s(162)
s(153) =< s(162)
s(154) =< s(162)
s(152) =< aux(235)
s(153) =< aux(235)
s(154) =< aux(235)
s(154) =< s(160)
s(153) =< s(159)
s(154) =< s(159)
s(155) =< s(159)
s(156) =< s(157)
s(152) =< s(157)
s(153) =< s(157)
s(154) =< s(157)
s(155) =< s(157)
s(110) =< aux(235)

  with precondition: [F=0,I=0,M=3,H=G,1>=H,A>=1,C>=0,H>=0,E+1>=A,J>=H,E+H>=J] 

* Chain [69]: 2*s(183)+3*s(185)+1*s(186)+2*s(187)+7*s(188)+0
  Such that:s(176) =< -A+E+1
s(177) =< A+2*E+4
s(179) =< -A/4+3/2*E+1
s(181) =< E+1
s(182) =< 2*E+2
s(179) =< s(182)
s(183) =< s(176)
s(185) =< s(176)
s(186) =< s(176)
s(183) =< s(179)
s(185) =< s(179)
s(186) =< s(179)
s(186) =< s(177)
s(185) =< s(182)
s(186) =< s(182)
s(187) =< s(182)
s(188) =< s(181)
s(183) =< s(181)
s(185) =< s(181)
s(186) =< s(181)
s(187) =< s(181)

  with precondition: [C=0,F=0,I=0,M=3,H=G,0>=D,1>=H,A>=1,B>=1,H>=0,E+1>=A,J>=H,E+H>=J] 

* Chain [67]: 2*s(209)+3*s(211)+1*s(212)+2*s(213)+7*s(214)+0
  Such that:s(202) =< -A+E+1
s(203) =< A+2*E+4
s(205) =< -A/4+3/2*E+1
s(207) =< E+1
s(208) =< 2*E+2
s(205) =< s(208)
s(209) =< s(202)
s(211) =< s(202)
s(212) =< s(202)
s(209) =< s(205)
s(211) =< s(205)
s(212) =< s(205)
s(212) =< s(203)
s(211) =< s(208)
s(212) =< s(208)
s(213) =< s(208)
s(214) =< s(207)
s(209) =< s(207)
s(211) =< s(207)
s(212) =< s(207)
s(213) =< s(207)

  with precondition: [F=0,I=0,M=3,H=G,1>=H,A>=1,C>=1,H>=0,E+1>=A,J>=H,E+H>=J] 

* Chain [65]: 0
  with precondition: [M=3,A>=1,F>=0,H>=0,E+1>=A,I>=F,1>=H+I,G>=H,H+I>=G,J>=H+I,C+2*J>=2*H+F,E+H+I>=J,C+G+2*J>=3*H+I] 

* Chain [60,66]: 2*s(222)+1*s(223)+3*s(224)+1*s(225)+2*s(226)+7*s(227)+1
  Such that:s(216) =< -A+N
s(215) =< -A+V
s(218) =< A-N+2*V
s(217) =< A+2*V+2
s(219) =< -A/2
s(220) =< -A/2+N/2
s(219) =< E-N/2+P/2+S/2+1
s(219) =< -N/2+P/2+S/2+V
s(221) =< V
s(222) =< s(215)
s(223) =< s(215)
s(224) =< s(215)
s(225) =< s(215)
s(222) =< s(216)
s(223) =< s(216)
s(224) =< s(216)
s(225) =< s(216)
s(225) =< s(217)
s(224) =< s(218)
s(225) =< s(218)
s(226) =< s(218)
s(223) =< s(219)
s(223) =< s(220)
s(227) =< s(221)
s(222) =< s(221)
s(223) =< s(221)
s(224) =< s(221)
s(225) =< s(221)
s(226) =< s(221)

  with precondition: [C=0,F=0,I=0,M=4,R=0,T=0,U=1,G=H,E+1=V,0>=D,1>=G,1>=S,A>=1,B>=1,G>=0,S>=0,N>=A,J>=G,E+1>=N,E+G>=J,A+P+S+2*E+1>=N] 

* Chain [60,65]: 2*s(222)+1*s(223)+3*s(224)+1*s(225)+2*s(226)+7*s(227)+1
  Such that:s(217) =< A+2*E+4
s(219) =< -A/2
s(220) =< -A/2+E/2+1/2
s(221) =< E+1
aux(287) =< -A+E+1
aux(288) =< 2*E+2
s(216) =< aux(287)
s(216) =< aux(288)
s(220) =< aux(288)
s(222) =< aux(287)
s(223) =< aux(287)
s(224) =< aux(287)
s(225) =< aux(287)
s(222) =< s(216)
s(223) =< s(216)
s(224) =< s(216)
s(225) =< s(216)
s(225) =< s(217)
s(224) =< aux(288)
s(225) =< aux(288)
s(226) =< aux(288)
s(223) =< s(219)
s(223) =< s(220)
s(227) =< s(221)
s(222) =< s(221)
s(223) =< s(221)
s(224) =< s(221)
s(225) =< s(221)
s(226) =< s(221)

  with precondition: [C=0,F=0,I=0,M=3,G=H,0>=D,1>=G,A>=1,B>=1,G>=0,E+1>=A,J>=G,E+G>=J] 

* Chain [57,66]: 2*s(261)+1*s(262)+3*s(263)+1*s(264)+2*s(265)+7*s(266)+1
  Such that:s(255) =< -A+N
s(254) =< -A+V
s(257) =< A-N+2*V
s(256) =< A+2*V+2
s(258) =< -A/2
s(259) =< -A/2+N/2
s(258) =< -C/2+E-N/2+P/2+S/2+1
s(258) =< -N/2+P/2+S/2+V
s(260) =< V
s(261) =< s(254)
s(262) =< s(254)
s(263) =< s(254)
s(264) =< s(254)
s(261) =< s(255)
s(262) =< s(255)
s(263) =< s(255)
s(264) =< s(255)
s(264) =< s(256)
s(263) =< s(257)
s(264) =< s(257)
s(265) =< s(257)
s(262) =< s(258)
s(262) =< s(259)
s(266) =< s(260)
s(261) =< s(260)
s(262) =< s(260)
s(263) =< s(260)
s(264) =< s(260)
s(265) =< s(260)

  with precondition: [F=0,I=0,M=4,T=0,U=1,G=H,E+1=V,1>=G,1>=R,1>=S,A>=1,C>=1,G>=0,R>=0,S>=0,N>=A,J>=G,E+1>=N,E+G>=J,A+P+2*E+3>=C+N+R,A+P+S+2*E+2>=C+N] 

* Chain [57,65]: 2*s(261)+1*s(262)+3*s(263)+1*s(264)+2*s(265)+7*s(266)+1
  Such that:s(256) =< A+2*E+4
s(258) =< -A/2
s(259) =< -A/2+E/2+1/2
s(260) =< E+1
aux(318) =< -A+E+1
aux(319) =< 2*E+2
s(255) =< aux(318)
s(255) =< aux(319)
s(259) =< aux(319)
s(261) =< aux(318)
s(262) =< aux(318)
s(263) =< aux(318)
s(264) =< aux(318)
s(261) =< s(255)
s(262) =< s(255)
s(263) =< s(255)
s(264) =< s(255)
s(264) =< s(256)
s(263) =< aux(319)
s(264) =< aux(319)
s(265) =< aux(319)
s(262) =< s(258)
s(262) =< s(259)
s(266) =< s(260)
s(261) =< s(260)
s(262) =< s(260)
s(263) =< s(260)
s(264) =< s(260)
s(265) =< s(260)

  with precondition: [F=0,I=0,M=3,G=H,1>=G,A>=1,C>=1,G>=0,E+1>=A,J>=G,E+G>=J] 


#### Cost of chains of f15_loop_cont(A,B,C,D,E,F,G,H,I,J,K,L):
* Chain [73]: 0
  with precondition: [A=3,F>=0] 

* Chain [72]: 0
  with precondition: [A=4,F>=0] 


#### Cost of chains of f0(A,B,C,D,E,F,G,H,I,J,M):
* Chain [75]: 1*aux(351)+0
  with precondition: [] 

* Chain [74]...: 1*aux(352)+0
  with precondition: [] 


Closed-form bounds of f0(A,B,C,D,E,F,G,H,I,J,M): 
-------------------------------------
* Chain [75] with precondition: [] 
    - Upper bound: inf 
    - Complexity: infinity 
* Chain [74]... with precondition: [] 
    - Upper bound: inf 
    - Complexity: infinity 

### Maximum cost of f0(A,B,C,D,E,F,G,H,I,J,M): inf 
Asymptotic class: infinity 
* Total analysis performed in 7306 ms.

