/**
 * Example taken from "A Term Rewriting Approach to the Automated Termination
 * Analysis of Imperative Programs" (http://www.cs.unm.edu/~spf/papers/2009-02.pdf)
 * and converted to Java.
 */

public class PastaA4 {
    public static void main(String[] args) {
        Random.args = args;
        int x = Random.random();
        int y = Random.random();

        while (x > y) {
            y++;
        }
    }
}


public class Random {
  static String[] args;
  static int index = 0;

  public static int random() {
    String string = args[index];
    index++;
    return string.length();
  }
}

(1) JBC2FIG (SOUND transformation)

Constructed FIGraph.

(3) FIGtoITRSProof (SOUND transformation)

Transformed FIGraph SCCs to IDPs. Logs:

---

Log for SCC 0:

Generated 7 rules for P and 2 rules for R.

Combined rules. Obtained 1 rules for P and 0 rules for R.

Filtered ground terms:

550_0_main_Load(x1, x2, x3, x4) → 550_0_main_Load(x2, x3, x4)
Cond_550_0_main_Load(x1, x2, x3, x4, x5) → Cond_550_0_main_Load(x1, x3, x4, x5)

Filtered duplicate args:

550_0_main_Load(x1, x2, x3) → 550_0_main_Load(x2, x3)
Cond_550_0_main_Load(x1, x2, x3, x4) → Cond_550_0_main_Load(x1, x3, x4)

Combined rules. Obtained 1 rules for P and 0 rules for R.

Finished conversion. Obtained 1 rules for P and 0 rules for R. System has predefined symbols.

(5) IDPNonInfProof (SOUND transformation)

The constraints were generated the following way:
The DP Problem is simplified using the Induction Calculus [NONINF] with the following steps:
Note that final constraints are written in bold face.


For Pair 550_0_MAIN_LOAD(x1, x0) → COND_550_0_MAIN_LOAD(&&(>=(x1, 0), <(x1, x0)), x1, x0) the following chains were created:

• We consider the chain 550_0_MAIN_LOAD(x1[0], x0[0]) → COND_550_0_MAIN_LOAD(&&(>=(x1[0], 0), <(x1[0], x0[0])), x1[0], x0[0]), COND_550_0_MAIN_LOAD(TRUE, x1[1], x0[1]) → 550_0_MAIN_LOAD(+(x1[1], 1), x0[1]) which results in the following constraint:
  

  (1)    (&&(>=(x1[0], 0), <(x1[0], x0[0]))=TRUE∧x1[0]=x1[1]∧x0[0]=x0[1] ⇒ 550_0_MAIN_LOAD(x1[0], x0[0])≥NonInfC∧550_0_MAIN_LOAD(x1[0], x0[0])≥COND_550_0_MAIN_LOAD(&&(>=(x1[0], 0), <(x1[0], x0[0])), x1[0], x0[0])∧(U^Increasing(COND_550_0_MAIN_LOAD(&&(>=(x1[0], 0), <(x1[0], x0[0])), x1[0], x0[0])), ≥))

  
  
  We simplified constraint (1) using rules (IV), (IDP_BOOLEAN) which results in the following new constraint:
  

  (2)    (>=(x1[0], 0)=TRUE∧<(x1[0], x0[0])=TRUE ⇒ 550_0_MAIN_LOAD(x1[0], x0[0])≥NonInfC∧550_0_MAIN_LOAD(x1[0], x0[0])≥COND_550_0_MAIN_LOAD(&&(>=(x1[0], 0), <(x1[0], x0[0])), x1[0], x0[0])∧(U^Increasing(COND_550_0_MAIN_LOAD(&&(>=(x1[0], 0), <(x1[0], x0[0])), x1[0], x0[0])), ≥))

  
  
  We simplified constraint (2) using rule (POLY_CONSTRAINTS) which results in the following new constraint:
  

  (3)    (x1[0] ≥ 0∧x0[0] + [-1] + [-1]x1[0] ≥ 0 ⇒ (U^Increasing(COND_550_0_MAIN_LOAD(&&(>=(x1[0], 0), <(x1[0], x0[0])), x1[0], x0[0])), ≥)∧[(-1)bni_10 + (-1)Bound*bni_10] + [(2)bni_10]x0[0] + [(-1)bni_10]x1[0] ≥ 0∧[(-1)bso_11] ≥ 0)

  
  
  We simplified constraint (3) using rule (IDP_POLY_SIMPLIFY) which results in the following new constraint:
  

  (4)    (x1[0] ≥ 0∧x0[0] + [-1] + [-1]x1[0] ≥ 0 ⇒ (U^Increasing(COND_550_0_MAIN_LOAD(&&(>=(x1[0], 0), <(x1[0], x0[0])), x1[0], x0[0])), ≥)∧[(-1)bni_10 + (-1)Bound*bni_10] + [(2)bni_10]x0[0] + [(-1)bni_10]x1[0] ≥ 0∧[(-1)bso_11] ≥ 0)

  
  
  We simplified constraint (4) using rule (POLY_REMOVE_MIN_MAX) which results in the following new constraint:
  

  (5)    (x1[0] ≥ 0∧x0[0] + [-1] + [-1]x1[0] ≥ 0 ⇒ (U^Increasing(COND_550_0_MAIN_LOAD(&&(>=(x1[0], 0), <(x1[0], x0[0])), x1[0], x0[0])), ≥)∧[(-1)bni_10 + (-1)Bound*bni_10] + [(2)bni_10]x0[0] + [(-1)bni_10]x1[0] ≥ 0∧[(-1)bso_11] ≥ 0)

  
  
  We simplified constraint (5) using rule (IDP_SMT_SPLIT) which results in the following new constraint:
  

  (6)    (x1[0] ≥ 0∧x0[0] ≥ 0 ⇒ (U^Increasing(COND_550_0_MAIN_LOAD(&&(>=(x1[0], 0), <(x1[0], x0[0])), x1[0], x0[0])), ≥)∧[bni_10 + (-1)Bound*bni_10] + [bni_10]x1[0] + [(2)bni_10]x0[0] ≥ 0∧[(-1)bso_11] ≥ 0)

  
  
  

For Pair COND_550_0_MAIN_LOAD(TRUE, x1, x0) → 550_0_MAIN_LOAD(+(x1, 1), x0) the following chains were created:

• We consider the chain COND_550_0_MAIN_LOAD(TRUE, x1[1], x0[1]) → 550_0_MAIN_LOAD(+(x1[1], 1), x0[1]) which results in the following constraint:
  

  (7)    (COND_550_0_MAIN_LOAD(TRUE, x1[1], x0[1])≥NonInfC∧COND_550_0_MAIN_LOAD(TRUE, x1[1], x0[1])≥550_0_MAIN_LOAD(+(x1[1], 1), x0[1])∧(U^Increasing(550_0_MAIN_LOAD(+(x1[1], 1), x0[1])), ≥))

  
  
  We simplified constraint (7) using rule (POLY_CONSTRAINTS) which results in the following new constraint:
  

  (8)    ((U^Increasing(550_0_MAIN_LOAD(+(x1[1], 1), x0[1])), ≥)∧[1 + (-1)bso_13] ≥ 0)

  
  
  We simplified constraint (8) using rule (IDP_POLY_SIMPLIFY) which results in the following new constraint:
  

  (9)    ((U^Increasing(550_0_MAIN_LOAD(+(x1[1], 1), x0[1])), ≥)∧[1 + (-1)bso_13] ≥ 0)

  
  
  We simplified constraint (9) using rule (POLY_REMOVE_MIN_MAX) which results in the following new constraint:
  

  (10)    ((U^Increasing(550_0_MAIN_LOAD(+(x1[1], 1), x0[1])), ≥)∧[1 + (-1)bso_13] ≥ 0)

  
  
  We simplified constraint (10) using rule (IDP_UNRESTRICTED_VARS) which results in the following new constraint:
  

  (11)    ((U^Increasing(550_0_MAIN_LOAD(+(x1[1], 1), x0[1])), ≥)∧0 = 0∧0 = 0∧[1 + (-1)bso_13] ≥ 0)

  
  
  

To summarize, we get the following constraints P_≥ for the following pairs.

• 550_0_MAIN_LOAD(x1, x0) → COND_550_0_MAIN_LOAD(&&(>=(x1, 0), <(x1, x0)), x1, x0)
  
  • (x1[0] ≥ 0∧x0[0] ≥ 0 ⇒ (U^Increasing(COND_550_0_MAIN_LOAD(&&(>=(x1[0], 0), <(x1[0], x0[0])), x1[0], x0[0])), ≥)∧[bni_10 + (-1)Bound*bni_10] + [bni_10]x1[0] + [(2)bni_10]x0[0] ≥ 0∧[(-1)bso_11] ≥ 0)
    
  
  
• COND_550_0_MAIN_LOAD(TRUE, x1, x0) → 550_0_MAIN_LOAD(+(x1, 1), x0)
  
  • ((U^Increasing(550_0_MAIN_LOAD(+(x1[1], 1), x0[1])), ≥)∧0 = 0∧0 = 0∧[1 + (-1)bso_13] ≥ 0)
    
  
  

The constraints for P_> respective P_bound are constructed from P_≥ where we just replace every occurence of "t ≥ s" in P_≥ by "t > s" respective "t ≥ c". Here c stands for the fresh constant used for P_bound.
Using the following integer polynomial ordering the resulting constraints can be solved
Polynomial interpretation over integers[POLO]:

POL(TRUE) = 0   
POL(FALSE) = 0   
POL(550_0_MAIN_LOAD(x₁, x₂)) = [-1] + [2]x₂ + [-1]x₁   
POL(COND_550_0_MAIN_LOAD(x₁, x₂, x₃)) = [-1] + [2]x₃ + [-1]x₂   
POL(&&(x₁, x₂)) = [-1]   
POL(>=(x₁, x₂)) = [-1]   
POL(0) = 0   
POL(<(x₁, x₂)) = [-1]   
POL(+(x₁, x₂)) = x₁ + x₂   
POL(1) = [1]   

The following pairs are in P_>:

COND_550_0_MAIN_LOAD(TRUE, x1[1], x0[1]) → 550_0_MAIN_LOAD(+(x1[1], 1), x0[1])

The following pairs are in P_bound:

550_0_MAIN_LOAD(x1[0], x0[0]) → COND_550_0_MAIN_LOAD(&&(>=(x1[0], 0), <(x1[0], x0[0])), x1[0], x0[0])

The following pairs are in P_≥:

550_0_MAIN_LOAD(x1[0], x0[0]) → COND_550_0_MAIN_LOAD(&&(>=(x1[0], 0), <(x1[0], x0[0])), x1[0], x0[0])

There are no usable rules.

(8) IDependencyGraphProof (EQUIVALENT transformation)

The approximation of the Dependency Graph [LPAR04,FROCOS05,EDGSTAR] contains 0 SCCs with 1 less node.

(11) IDependencyGraphProof (EQUIVALENT transformation)

The approximation of the Dependency Graph [LPAR04,FROCOS05,EDGSTAR] contains 0 SCCs with 1 less node.