חידה קריפטמטית היא תרגיל מתמטי שבו הספרות של מספרים מיוצגים על ידי אותיות (או סמלים). כל אות מייצגת . המטרה היא למצוא את הספרות כך שמשוואה מתמטית נתונה אומת:
CP
+ IS
+ FUN
--------
= TRUEהקצאה של אותיות לספרות מפיקה את המשוואה הבאה:
23
+ 74
+ 968
--------
= 1065יש תשובות אחרות לבעיה הזו. נראה לך איך למצוא את כל הפתרונות.
יצירת מודל של הבעיה
כמו בכל בעיית אופטימיזציה, נתחיל בזיהוי המשתנים מגבלות בפועל. המשתנים הם האותיות, שיכולות לקבל כל ספרה עם ערך מסוים.
עבור CP + IS + FUN = TRUE, המגבלות הן:
- המשוואה:
CP + IS + FUN = TRUE. - כל אחת מעשר האותיות חייבת להיות ספרה שונה.
C,I,Fו-Tלא יכולים להיות אפס (כי לא כותבים אפסים בתחילת המספר ).
אפשר לפתור בעיות קריפטוגרפיות בעזרת פותר ה-CP-SAT החדש, יעיל יותר, או פותר ה-CP המקורי. אנחנו נציג לך דוגמאות לשימוש בשני הפתרונות, החל מ-CP-SAT.
פתרון CP-SAT
נציג את המשתנים, את המגבלות, את הפעלת הפותר ולבסוף את כל התוכניות.
ייבוא הספריות
הקוד הבא מייבא את הספרייה הנדרשת.
Python
from ortools.sat.python import cp_model
C++
#include <stdlib.h> #include <cstdint> #include "ortools/base/logging.h" #include "ortools/sat/cp_model.h" #include "ortools/sat/cp_model.pb.h" #include "ortools/sat/cp_model_solver.h" #include "ortools/sat/model.h" #include "ortools/sat/sat_parameters.pb.h" #include "ortools/util/sorted_interval_list.h"
Java
import com.google.ortools.Loader; import com.google.ortools.sat.CpModel; import com.google.ortools.sat.CpSolver; import com.google.ortools.sat.CpSolverSolutionCallback; import com.google.ortools.sat.IntVar; import com.google.ortools.sat.LinearExpr;
C#
using System; using Google.OrTools.Sat;
להצהיר על המודל
הקוד הבא מציין את המודל לבעיה.
Python
model = cp_model.CpModel()
C++
CpModelBuilder cp_model;
Java
CpModel model = new CpModel();
C#
CpModel model = new CpModel(); int kBase = 10; IntVar c = model.NewIntVar(1, kBase - 1, "C"); IntVar p = model.NewIntVar(0, kBase - 1, "P"); IntVar i = model.NewIntVar(1, kBase - 1, "I"); IntVar s = model.NewIntVar(0, kBase - 1, "S"); IntVar f = model.NewIntVar(1, kBase - 1, "F"); IntVar u = model.NewIntVar(0, kBase - 1, "U"); IntVar n = model.NewIntVar(0, kBase - 1, "N"); IntVar t = model.NewIntVar(1, kBase - 1, "T"); IntVar r = model.NewIntVar(0, kBase - 1, "R"); IntVar e = model.NewIntVar(0, kBase - 1, "E"); // We need to group variables in a list to use the constraint AllDifferent. IntVar[] letters = new IntVar[] { c, p, i, s, f, u, n, t, r, e }; // Define constraints. model.AddAllDifferent(letters); // CP + IS + FUN = TRUE model.Add(c * kBase + p + i * kBase + s + f * kBase * kBase + u * kBase + n == t * kBase * kBase * kBase + r * kBase * kBase + u * kBase + e); // Creates a solver and solves the model. CpSolver solver = new CpSolver(); VarArraySolutionPrinter cb = new VarArraySolutionPrinter(letters); // Search for all solutions. solver.StringParameters = "enumerate_all_solutions:true"; // And solve. solver.Solve(model, cb); Console.WriteLine("Statistics"); Console.WriteLine($" conflicts : {solver.NumConflicts()}"); Console.WriteLine($" branches : {solver.NumBranches()}"); Console.WriteLine($" wall time : {solver.WallTime()} s"); Console.WriteLine($" number of solutions found: {cb.SolutionCount()}"); } }
הגדרת המשתנים
כאשר משתמשים בפותר CP-SAT, יש שיטות מסייעות מסוימות שיכולות לעזור
להגדיר.
נשתמש באחד מהם, NewIntVar, כדי להצהיר על הספרות (שלמים) שלנו.
אנחנו מבחינים בין האותיות שיכולות להיות אפס לבין האותיות
לא יכול (C, I, F ו-T).
Python
base = 10 c = model.new_int_var(1, base - 1, "C") p = model.new_int_var(0, base - 1, "P") i = model.new_int_var(1, base - 1, "I") s = model.new_int_var(0, base - 1, "S") f = model.new_int_var(1, base - 1, "F") u = model.new_int_var(0, base - 1, "U") n = model.new_int_var(0, base - 1, "N") t = model.new_int_var(1, base - 1, "T") r = model.new_int_var(0, base - 1, "R") e = model.new_int_var(0, base - 1, "E") # We need to group variables in a list to use the constraint AllDifferent. letters = [c, p, i, s, f, u, n, t, r, e] # Verify that we have enough digits. assert base >= len(letters)
C++
const int64_t kBase = 10; // Define decision variables. Domain digit(0, kBase - 1); Domain non_zero_digit(1, kBase - 1); IntVar c = cp_model.NewIntVar(non_zero_digit).WithName("C"); IntVar p = cp_model.NewIntVar(digit).WithName("P"); IntVar i = cp_model.NewIntVar(non_zero_digit).WithName("I"); IntVar s = cp_model.NewIntVar(digit).WithName("S"); IntVar f = cp_model.NewIntVar(non_zero_digit).WithName("F"); IntVar u = cp_model.NewIntVar(digit).WithName("U"); IntVar n = cp_model.NewIntVar(digit).WithName("N"); IntVar t = cp_model.NewIntVar(non_zero_digit).WithName("T"); IntVar r = cp_model.NewIntVar(digit).WithName("R"); IntVar e = cp_model.NewIntVar(digit).WithName("E");
Java
int base = 10; IntVar c = model.newIntVar(1, base - 1, "C"); IntVar p = model.newIntVar(0, base - 1, "P"); IntVar i = model.newIntVar(1, base - 1, "I"); IntVar s = model.newIntVar(0, base - 1, "S"); IntVar f = model.newIntVar(1, base - 1, "F"); IntVar u = model.newIntVar(0, base - 1, "U"); IntVar n = model.newIntVar(0, base - 1, "N"); IntVar t = model.newIntVar(1, base - 1, "T"); IntVar r = model.newIntVar(0, base - 1, "R"); IntVar e = model.newIntVar(0, base - 1, "E"); // We need to group variables in a list to use the constraint AllDifferent. IntVar[] letters = new IntVar[] {c, p, i, s, f, u, n, t, r, e};
C#
int kBase = 10; IntVar c = model.NewIntVar(1, kBase - 1, "C"); IntVar p = model.NewIntVar(0, kBase - 1, "P"); IntVar i = model.NewIntVar(1, kBase - 1, "I"); IntVar s = model.NewIntVar(0, kBase - 1, "S"); IntVar f = model.NewIntVar(1, kBase - 1, "F"); IntVar u = model.NewIntVar(0, kBase - 1, "U"); IntVar n = model.NewIntVar(0, kBase - 1, "N"); IntVar t = model.NewIntVar(1, kBase - 1, "T"); IntVar r = model.NewIntVar(0, kBase - 1, "R"); IntVar e = model.NewIntVar(0, kBase - 1, "E"); // We need to group variables in a list to use the constraint AllDifferent. IntVar[] letters = new IntVar[] { c, p, i, s, f, u, n, t, r, e };
הגדרת המגבלות
השלב הבא – מגבלות. קודם כל, אנחנו מוודאים שלכל האותיות יש ערכים שונים,
באמצעות AddAllDifferent עם שיטת ה-helper. לאחר מכן נשתמש בכלי העזר AddEquality
ליצירת אילוצים שאוכפים את השוויון CP + IS + FUN = TRUE.
Python
model.add_all_different(letters) # CP + IS + FUN = TRUE model.add( c * base + p + i * base + s + f * base * base + u * base + n == t * base * base * base + r * base * base + u * base + e )
C++
// Define constraints. cp_model.AddAllDifferent({c, p, i, s, f, u, n, t, r, e}); // CP + IS + FUN = TRUE cp_model.AddEquality( c * kBase + p + i * kBase + s + f * kBase * kBase + u * kBase + n, kBase * kBase * kBase * t + kBase * kBase * r + kBase * u + e);
Java
model.addAllDifferent(letters);
// CP + IS + FUN = TRUE
model.addEquality(LinearExpr.weightedSum(new IntVar[] {c, p, i, s, f, u, n, t, r, u, e},
new long[] {base, 1, base, 1, base * base, base, 1, -base * base * base,
-base * base, -base, -1}),
0);C#
// Define constraints. model.AddAllDifferent(letters); // CP + IS + FUN = TRUE model.Add(c * kBase + p + i * kBase + s + f * kBase * kBase + u * kBase + n == t * kBase * kBase * kBase + r * kBase * kBase + u * kBase + e);
מדפסת פתרונות
הקוד של מדפסת הפתרונות, שמציגה כל פתרון כפותר היא תוצג בהמשך.
Python
class VarArraySolutionPrinter(cp_model.CpSolverSolutionCallback): """Print intermediate solutions.""" def __init__(self, variables: list[cp_model.IntVar]): cp_model.CpSolverSolutionCallback.__init__(self) self.__variables = variables self.__solution_count = 0 def on_solution_callback(self) -> None: self.__solution_count += 1 for v in self.__variables: print(f"{v}={self.value(v)}", end=" ") print() @property def solution_count(self) -> int: return self.__solution_count
C++
Model model; int num_solutions = 0; model.Add(NewFeasibleSolutionObserver([&](const CpSolverResponse& response) { LOG(INFO) << "Solution " << num_solutions; LOG(INFO) << "C=" << SolutionIntegerValue(response, c) << " " << "P=" << SolutionIntegerValue(response, p) << " " << "I=" << SolutionIntegerValue(response, i) << " " << "S=" << SolutionIntegerValue(response, s) << " " << "F=" << SolutionIntegerValue(response, f) << " " << "U=" << SolutionIntegerValue(response, u) << " " << "N=" << SolutionIntegerValue(response, n) << " " << "T=" << SolutionIntegerValue(response, t) << " " << "R=" << SolutionIntegerValue(response, r) << " " << "E=" << SolutionIntegerValue(response, e); num_solutions++; }));
Java
static class VarArraySolutionPrinter extends CpSolverSolutionCallback { public VarArraySolutionPrinter(IntVar[] variables) { variableArray = variables; } @Override public void onSolutionCallback() { for (IntVar v : variableArray) { System.out.printf(" %s = %d", v.getName(), value(v)); } System.out.println(); solutionCount++; } public int getSolutionCount() { return solutionCount; } private int solutionCount; private final IntVar[] variableArray; }
C#
public class VarArraySolutionPrinter : CpSolverSolutionCallback { public VarArraySolutionPrinter(IntVar[] variables) { variables_ = variables; } public override void OnSolutionCallback() { { foreach (IntVar v in variables_) { Console.Write(String.Format(" {0}={1}", v.ToString(), Value(v))); } Console.WriteLine(); solution_count_++; } } public int SolutionCount() { return solution_count_; } private int solution_count_; private IntVar[] variables_; }
הפעלת הפותר
בסוף אנחנו פותרים את הבעיה ונציג את הפתרון. כל הקסם נמצא
operations_research::sat::SolveCpModel()
.
Python
solver = cp_model.CpSolver() solution_printer = VarArraySolutionPrinter(letters) # Enumerate all solutions. solver.parameters.enumerate_all_solutions = True # Solve. status = solver.solve(model, solution_printer)
C++
// Tell the solver to enumerate all solutions. SatParameters parameters; parameters.set_enumerate_all_solutions(true); model.Add(NewSatParameters(parameters)); const CpSolverResponse response = SolveCpModel(cp_model.Build(), &model); LOG(INFO) << "Number of solutions found: " << num_solutions;
Java
CpSolver solver = new CpSolver(); VarArraySolutionPrinter cb = new VarArraySolutionPrinter(letters); // Tell the solver to enumerate all solutions. solver.getParameters().setEnumerateAllSolutions(true); // And solve. solver.solve(model, cb);
C#
// Creates a solver and solves the model. CpSolver solver = new CpSolver(); VarArraySolutionPrinter cb = new VarArraySolutionPrinter(letters); // Search for all solutions. solver.StringParameters = "enumerate_all_solutions:true"; // And solve. solver.Solve(model, cb);
כשמריצים את התוכנה, היא מפצלת את הפלט הבא, שבו כל שורה היא פתרון:
C=2 P=3 I=7 S=4 F=9 U=6 N=8 T=1 R=0 E=5 C=2 P=4 I=7 S=3 F=9 U=6 N=8 T=1 R=0 E=5 C=2 P=5 I=7 S=3 F=9 U=4 N=8 T=1 R=0 E=6 C=2 P=8 I=7 S=3 F=9 U=4 N=5 T=1 R=0 E=6 C=2 P=8 I=7 S=3 F=9 U=6 N=4 T=1 R=0 E=5 C=3 P=7 I=6 S=2 F=9 U=8 N=5 T=1 R=0 E=4 C=6 P=7 I=3 S=2 F=9 U=8 N=5 T=1 R=0 E=4 C=6 P=5 I=3 S=2 F=9 U=8 N=7 T=1 R=0 E=4 C=3 P=5 I=6 S=2 F=9 U=8 N=7 T=1 R=0 E=4 C=3 P=8 I=6 S=4 F=9 U=2 N=5 T=1 R=0 E=7 C=3 P=7 I=6 S=5 F=9 U=8 N=2 T=1 R=0 E=4 C=3 P=8 I=6 S=5 F=9 U=2 N=4 T=1 R=0 E=7 C=3 P=5 I=6 S=4 F=9 U=2 N=8 T=1 R=0 E=7 C=3 P=4 I=6 S=5 F=9 U=2 N=8 T=1 R=0 E=7 C=3 P=2 I=6 S=5 F=9 U=8 N=7 T=1 R=0 E=4 C=3 P=4 I=6 S=8 F=9 U=2 N=5 T=1 R=0 E=7 C=3 P=2 I=6 S=7 F=9 U=8 N=5 T=1 R=0 E=4 C=3 P=5 I=6 S=8 F=9 U=2 N=4 T=1 R=0 E=7 C=3 P=5 I=6 S=7 F=9 U=8 N=2 T=1 R=0 E=4 C=2 P=5 I=7 S=6 F=9 U=8 N=3 T=1 R=0 E=4 C=2 P=5 I=7 S=8 F=9 U=4 N=3 T=1 R=0 E=6 C=2 P=6 I=7 S=5 F=9 U=8 N=3 T=1 R=0 E=4 C=2 P=4 I=7 S=8 F=9 U=6 N=3 T=1 R=0 E=5 C=2 P=3 I=7 S=8 F=9 U=6 N=4 T=1 R=0 E=5 C=2 P=8 I=7 S=5 F=9 U=4 N=3 T=1 R=0 E=6 C=2 P=8 I=7 S=4 F=9 U=6 N=3 T=1 R=0 E=5 C=2 P=6 I=7 S=3 F=9 U=8 N=5 T=1 R=0 E=4 C=2 P=5 I=7 S=3 F=9 U=8 N=6 T=1 R=0 E=4 C=2 P=3 I=7 S=5 F=9 U=4 N=8 T=1 R=0 E=6 C=2 P=3 I=7 S=5 F=9 U=8 N=6 T=1 R=0 E=4 C=2 P=3 I=7 S=6 F=9 U=8 N=5 T=1 R=0 E=4 C=2 P=3 I=7 S=8 F=9 U=4 N=5 T=1 R=0 E=6 C=4 P=3 I=5 S=8 F=9 U=2 N=6 T=1 R=0 E=7 C=5 P=3 I=4 S=8 F=9 U=2 N=6 T=1 R=0 E=7 C=6 P=2 I=3 S=7 F=9 U=8 N=5 T=1 R=0 E=4 C=7 P=3 I=2 S=6 F=9 U=8 N=5 T=1 R=0 E=4 C=7 P=3 I=2 S=8 F=9 U=4 N=5 T=1 R=0 E=6 C=6 P=4 I=3 S=8 F=9 U=2 N=5 T=1 R=0 E=7 C=5 P=3 I=4 S=6 F=9 U=2 N=8 T=1 R=0 E=7 C=4 P=3 I=5 S=6 F=9 U=2 N=8 T=1 R=0 E=7 C=5 P=6 I=4 S=3 F=9 U=2 N=8 T=1 R=0 E=7 C=7 P=4 I=2 S=3 F=9 U=6 N=8 T=1 R=0 E=5 C=7 P=3 I=2 S=4 F=9 U=6 N=8 T=1 R=0 E=5 C=6 P=2 I=3 S=5 F=9 U=8 N=7 T=1 R=0 E=4 C=7 P=3 I=2 S=5 F=9 U=4 N=8 T=1 R=0 E=6 C=6 P=4 I=3 S=5 F=9 U=2 N=8 T=1 R=0 E=7 C=6 P=5 I=3 S=4 F=9 U=2 N=8 T=1 R=0 E=7 C=7 P=5 I=2 S=3 F=9 U=4 N=8 T=1 R=0 E=6 C=4 P=6 I=5 S=3 F=9 U=2 N=8 T=1 R=0 E=7 C=6 P=5 I=3 S=8 F=9 U=2 N=4 T=1 R=0 E=7 C=6 P=5 I=3 S=7 F=9 U=8 N=2 T=1 R=0 E=4 C=7 P=5 I=2 S=8 F=9 U=4 N=3 T=1 R=0 E=6 C=7 P=5 I=2 S=6 F=9 U=8 N=3 T=1 R=0 E=4 C=5 P=8 I=4 S=6 F=9 U=2 N=3 T=1 R=0 E=7 C=4 P=8 I=5 S=6 F=9 U=2 N=3 T=1 R=0 E=7 C=4 P=8 I=5 S=3 F=9 U=2 N=6 T=1 R=0 E=7 C=5 P=8 I=4 S=3 F=9 U=2 N=6 T=1 R=0 E=7 C=7 P=8 I=2 S=3 F=9 U=4 N=5 T=1 R=0 E=6 C=7 P=8 I=2 S=3 F=9 U=6 N=4 T=1 R=0 E=5 C=7 P=8 I=2 S=4 F=9 U=6 N=3 T=1 R=0 E=5 C=7 P=8 I=2 S=5 F=9 U=4 N=3 T=1 R=0 E=6 C=6 P=8 I=3 S=5 F=9 U=2 N=4 T=1 R=0 E=7 C=6 P=8 I=3 S=4 F=9 U=2 N=5 T=1 R=0 E=7 C=6 P=7 I=3 S=5 F=9 U=8 N=2 T=1 R=0 E=4 C=7 P=6 I=2 S=5 F=9 U=8 N=3 T=1 R=0 E=4 C=7 P=3 I=2 S=5 F=9 U=8 N=6 T=1 R=0 E=4 C=7 P=4 I=2 S=8 F=9 U=6 N=3 T=1 R=0 E=5 C=7 P=3 I=2 S=8 F=9 U=6 N=4 T=1 R=0 E=5 C=5 P=6 I=4 S=8 F=9 U=2 N=3 T=1 R=0 E=7 C=4 P=6 I=5 S=8 F=9 U=2 N=3 T=1 R=0 E=7 C=7 P=6 I=2 S=3 F=9 U=8 N=5 T=1 R=0 E=4 C=7 P=5 I=2 S=3 F=9 U=8 N=6 T=1 R=0 E=4 Statistics - status : OPTIMAL - conflicts : 110 - branches : 435 - wall time : 0.014934 ms - solutions found : 72
השלמת תוכניות
אלה התוכניות המלאות.
Python
"""Cryptarithmetic puzzle. First attempt to solve equation CP + IS + FUN = TRUE where each letter represents a unique digit. This problem has 72 different solutions in base 10. """ from ortools.sat.python import cp_model class VarArraySolutionPrinter(cp_model.CpSolverSolutionCallback): """Print intermediate solutions.""" def __init__(self, variables: list[cp_model.IntVar]): cp_model.CpSolverSolutionCallback.__init__(self) self.__variables = variables self.__solution_count = 0 def on_solution_callback(self) -> None: self.__solution_count += 1 for v in self.__variables: print(f"{v}={self.value(v)}", end=" ") print() @property def solution_count(self) -> int: return self.__solution_count def main() -> None: """solve the CP+IS+FUN==TRUE cryptarithm.""" # Constraint programming engine model = cp_model.CpModel() base = 10 c = model.new_int_var(1, base - 1, "C") p = model.new_int_var(0, base - 1, "P") i = model.new_int_var(1, base - 1, "I") s = model.new_int_var(0, base - 1, "S") f = model.new_int_var(1, base - 1, "F") u = model.new_int_var(0, base - 1, "U") n = model.new_int_var(0, base - 1, "N") t = model.new_int_var(1, base - 1, "T") r = model.new_int_var(0, base - 1, "R") e = model.new_int_var(0, base - 1, "E") # We need to group variables in a list to use the constraint AllDifferent. letters = [c, p, i, s, f, u, n, t, r, e] # Verify that we have enough digits. assert base >= len(letters) # Define constraints. model.add_all_different(letters) # CP + IS + FUN = TRUE model.add( c * base + p + i * base + s + f * base * base + u * base + n == t * base * base * base + r * base * base + u * base + e ) # Creates a solver and solves the model. solver = cp_model.CpSolver() solution_printer = VarArraySolutionPrinter(letters) # Enumerate all solutions. solver.parameters.enumerate_all_solutions = True # Solve. status = solver.solve(model, solution_printer) # Statistics. print("\nStatistics") print(f" status : {solver.status_name(status)}") print(f" conflicts: {solver.num_conflicts}") print(f" branches : {solver.num_branches}") print(f" wall time: {solver.wall_time} s") print(f" sol found: {solution_printer.solution_count}") if __name__ == "__main__": main()
C++
// Cryptarithmetic puzzle // // First attempt to solve equation CP + IS + FUN = TRUE // where each letter represents a unique digit. // // This problem has 72 different solutions in base 10. #include <stdlib.h> #include <cstdint> #include "ortools/base/logging.h" #include "ortools/sat/cp_model.h" #include "ortools/sat/cp_model.pb.h" #include "ortools/sat/cp_model_solver.h" #include "ortools/sat/model.h" #include "ortools/sat/sat_parameters.pb.h" #include "ortools/util/sorted_interval_list.h" namespace operations_research { namespace sat { void CPIsFunSat() { // Instantiate the solver. CpModelBuilder cp_model; const int64_t kBase = 10; // Define decision variables. Domain digit(0, kBase - 1); Domain non_zero_digit(1, kBase - 1); IntVar c = cp_model.NewIntVar(non_zero_digit).WithName("C"); IntVar p = cp_model.NewIntVar(digit).WithName("P"); IntVar i = cp_model.NewIntVar(non_zero_digit).WithName("I"); IntVar s = cp_model.NewIntVar(digit).WithName("S"); IntVar f = cp_model.NewIntVar(non_zero_digit).WithName("F"); IntVar u = cp_model.NewIntVar(digit).WithName("U"); IntVar n = cp_model.NewIntVar(digit).WithName("N"); IntVar t = cp_model.NewIntVar(non_zero_digit).WithName("T"); IntVar r = cp_model.NewIntVar(digit).WithName("R"); IntVar e = cp_model.NewIntVar(digit).WithName("E"); // Define constraints. cp_model.AddAllDifferent({c, p, i, s, f, u, n, t, r, e}); // CP + IS + FUN = TRUE cp_model.AddEquality( c * kBase + p + i * kBase + s + f * kBase * kBase + u * kBase + n, kBase * kBase * kBase * t + kBase * kBase * r + kBase * u + e); Model model; int num_solutions = 0; model.Add(NewFeasibleSolutionObserver([&](const CpSolverResponse& response) { LOG(INFO) << "Solution " << num_solutions; LOG(INFO) << "C=" << SolutionIntegerValue(response, c) << " " << "P=" << SolutionIntegerValue(response, p) << " " << "I=" << SolutionIntegerValue(response, i) << " " << "S=" << SolutionIntegerValue(response, s) << " " << "F=" << SolutionIntegerValue(response, f) << " " << "U=" << SolutionIntegerValue(response, u) << " " << "N=" << SolutionIntegerValue(response, n) << " " << "T=" << SolutionIntegerValue(response, t) << " " << "R=" << SolutionIntegerValue(response, r) << " " << "E=" << SolutionIntegerValue(response, e); num_solutions++; })); // Tell the solver to enumerate all solutions. SatParameters parameters; parameters.set_enumerate_all_solutions(true); model.Add(NewSatParameters(parameters)); const CpSolverResponse response = SolveCpModel(cp_model.Build(), &model); LOG(INFO) << "Number of solutions found: " << num_solutions; // Statistics. LOG(INFO) << "Statistics"; LOG(INFO) << CpSolverResponseStats(response); } } // namespace sat } // namespace operations_research int main(int argc, char** argv) { operations_research::sat::CPIsFunSat(); return EXIT_SUCCESS; }
Java
package com.google.ortools.sat.samples; import com.google.ortools.Loader; import com.google.ortools.sat.CpModel; import com.google.ortools.sat.CpSolver; import com.google.ortools.sat.CpSolverSolutionCallback; import com.google.ortools.sat.IntVar; import com.google.ortools.sat.LinearExpr; /** Cryptarithmetic puzzle. */ public final class CpIsFunSat { static class VarArraySolutionPrinter extends CpSolverSolutionCallback { public VarArraySolutionPrinter(IntVar[] variables) { variableArray = variables; } @Override public void onSolutionCallback() { for (IntVar v : variableArray) { System.out.printf(" %s = %d", v.getName(), value(v)); } System.out.println(); solutionCount++; } public int getSolutionCount() { return solutionCount; } private int solutionCount; private final IntVar[] variableArray; } public static void main(String[] args) throws Exception { Loader.loadNativeLibraries(); // Create the model. CpModel model = new CpModel(); int base = 10; IntVar c = model.newIntVar(1, base - 1, "C"); IntVar p = model.newIntVar(0, base - 1, "P"); IntVar i = model.newIntVar(1, base - 1, "I"); IntVar s = model.newIntVar(0, base - 1, "S"); IntVar f = model.newIntVar(1, base - 1, "F"); IntVar u = model.newIntVar(0, base - 1, "U"); IntVar n = model.newIntVar(0, base - 1, "N"); IntVar t = model.newIntVar(1, base - 1, "T"); IntVar r = model.newIntVar(0, base - 1, "R"); IntVar e = model.newIntVar(0, base - 1, "E"); // We need to group variables in a list to use the constraint AllDifferent. IntVar[] letters = new IntVar[] {c, p, i, s, f, u, n, t, r, e}; // Define constraints. model.addAllDifferent(letters); // CP + IS + FUN = TRUE model.addEquality(LinearExpr.weightedSum(new IntVar[] {c, p, i, s, f, u, n, t, r, u, e}, new long[] {base, 1, base, 1, base * base, base, 1, -base * base * base, -base * base, -base, -1}), 0); // Create a solver and solve the model. CpSolver solver = new CpSolver(); VarArraySolutionPrinter cb = new VarArraySolutionPrinter(letters); // Tell the solver to enumerate all solutions. solver.getParameters().setEnumerateAllSolutions(true); // And solve. solver.solve(model, cb); // Statistics. System.out.println("Statistics"); System.out.println(" - conflicts : " + solver.numConflicts()); System.out.println(" - branches : " + solver.numBranches()); System.out.println(" - wall time : " + solver.wallTime() + " s"); System.out.println(" - solutions : " + cb.getSolutionCount()); } private CpIsFunSat() {} }
C#
// Cryptarithmetic puzzle // // First attempt to solve equation CP + IS + FUN = TRUE // where each letter represents a unique digit. // // This problem has 72 different solutions in base 10. using System; using Google.OrTools.Sat; public class CpIsFunSat { public class VarArraySolutionPrinter : CpSolverSolutionCallback { public VarArraySolutionPrinter(IntVar[] variables) { variables_ = variables; } public override void OnSolutionCallback() { { foreach (IntVar v in variables_) { Console.Write(String.Format(" {0}={1}", v.ToString(), Value(v))); } Console.WriteLine(); solution_count_++; } } public int SolutionCount() { return solution_count_; } private int solution_count_; private IntVar[] variables_; } // Solve the CP+IS+FUN==TRUE cryptarithm. static void Main() { // Constraint programming engine CpModel model = new CpModel(); int kBase = 10; IntVar c = model.NewIntVar(1, kBase - 1, "C"); IntVar p = model.NewIntVar(0, kBase - 1, "P"); IntVar i = model.NewIntVar(1, kBase - 1, "I"); IntVar s = model.NewIntVar(0, kBase - 1, "S"); IntVar f = model.NewIntVar(1, kBase - 1, "F"); IntVar u = model.NewIntVar(0, kBase - 1, "U"); IntVar n = model.NewIntVar(0, kBase - 1, "N"); IntVar t = model.NewIntVar(1, kBase - 1, "T"); IntVar r = model.NewIntVar(0, kBase - 1, "R"); IntVar e = model.NewIntVar(0, kBase - 1, "E"); // We need to group variables in a list to use the constraint AllDifferent. IntVar[] letters = new IntVar[] { c, p, i, s, f, u, n, t, r, e }; // Define constraints. model.AddAllDifferent(letters); // CP + IS + FUN = TRUE model.Add(c * kBase + p + i * kBase + s + f * kBase * kBase + u * kBase + n == t * kBase * kBase * kBase + r * kBase * kBase + u * kBase + e); // Creates a solver and solves the model. CpSolver solver = new CpSolver(); VarArraySolutionPrinter cb = new VarArraySolutionPrinter(letters); // Search for all solutions. solver.StringParameters = "enumerate_all_solutions:true"; // And solve. solver.Solve(model, cb); Console.WriteLine("Statistics"); Console.WriteLine($" conflicts : {solver.NumConflicts()}"); Console.WriteLine($" branches : {solver.NumBranches()}"); Console.WriteLine($" wall time : {solver.WallTime()} s"); Console.WriteLine($" number of solutions found: {cb.SolutionCount()}"); } }
פתרון CP מקורי
במקרה הזה נתייחס לבסיס כמשתנה, כדי שתוכלו לפתור את המשוואה
לבסיסים גבוהים יותר. (לא יכולים להיות פתרונות בסיסיים נמוכים יותר
CP + IS + FUN = TRUE, מאחר שעשר האותיות צריכות להיות שונות).
ייבוא הספריות
הקוד הבא מייבא את הספרייה הנדרשת.
Python
from ortools.constraint_solver import pywrapcp
C++
#include <cstdint> #include <vector> #include "absl/flags/flag.h" #include "absl/log/flags.h" #include "ortools/base/init_google.h" #include "ortools/base/logging.h" #include "ortools/constraint_solver/constraint_solver.h"
Java
C#
using System; using Google.OrTools.ConstraintSolver;
יצירת הפתרון
השלב הראשון הוא יצירת Solver.
Python
solver = pywrapcp.Solver("CP is fun!")
C++
Solver solver("CP is fun!");
Java
Solver solver = new Solver("CP is fun!");
C#
Solver solver = new Solver("CP is fun!");
הגדרת המשתנים
השלב הראשון הוא ליצור IntVar לכל אות. אנחנו מבחינים בין
האותיות שיכולות להיות אפס והאותיות שלא יכולות להיות (C, I, F,
ו-T).
בשלב הבא אנחנו יוצרים מערך שמכיל ערך IntVar חדש לכל אות. זה רק
מכיוון שכשאנחנו מגדירים את האילוצים, נשתמש
AllDifferent, לכן אנחנו צריכים מערך שבו כל רכיב צריך להיות שונה.
לבסוף, אנחנו מוודאים שהבסיס שלנו גדול לפחות כמו מספר האותיות; אחרת, אין פתרון.
Python
base = 10 # Decision variables. digits = list(range(0, base)) digits_without_zero = list(range(1, base)) c = solver.IntVar(digits_without_zero, "C") p = solver.IntVar(digits, "P") i = solver.IntVar(digits_without_zero, "I") s = solver.IntVar(digits, "S") f = solver.IntVar(digits_without_zero, "F") u = solver.IntVar(digits, "U") n = solver.IntVar(digits, "N") t = solver.IntVar(digits_without_zero, "T") r = solver.IntVar(digits, "R") e = solver.IntVar(digits, "E") # We need to group variables in a list to use the constraint AllDifferent. letters = [c, p, i, s, f, u, n, t, r, e] # Verify that we have enough digits. assert base >= len(letters)
C++
const int64_t kBase = 10; // Define decision variables. IntVar* const c = solver.MakeIntVar(1, kBase - 1, "C"); IntVar* const p = solver.MakeIntVar(0, kBase - 1, "P"); IntVar* const i = solver.MakeIntVar(1, kBase - 1, "I"); IntVar* const s = solver.MakeIntVar(0, kBase - 1, "S"); IntVar* const f = solver.MakeIntVar(1, kBase - 1, "F"); IntVar* const u = solver.MakeIntVar(0, kBase - 1, "U"); IntVar* const n = solver.MakeIntVar(0, kBase - 1, "N"); IntVar* const t = solver.MakeIntVar(1, kBase - 1, "T"); IntVar* const r = solver.MakeIntVar(0, kBase - 1, "R"); IntVar* const e = solver.MakeIntVar(0, kBase - 1, "E"); // We need to group variables in a vector to be able to use // the global constraint AllDifferent std::vector<IntVar*> letters{c, p, i, s, f, u, n, t, r, e}; // Check if we have enough digits CHECK_GE(kBase, letters.size());
Java
final int base = 10; // Decision variables. final IntVar c = solver.makeIntVar(1, base - 1, "C"); final IntVar p = solver.makeIntVar(0, base - 1, "P"); final IntVar i = solver.makeIntVar(1, base - 1, "I"); final IntVar s = solver.makeIntVar(0, base - 1, "S"); final IntVar f = solver.makeIntVar(1, base - 1, "F"); final IntVar u = solver.makeIntVar(0, base - 1, "U"); final IntVar n = solver.makeIntVar(0, base - 1, "N"); final IntVar t = solver.makeIntVar(1, base - 1, "T"); final IntVar r = solver.makeIntVar(0, base - 1, "R"); final IntVar e = solver.makeIntVar(0, base - 1, "E"); // Group variables in a vector so that we can use AllDifferent. final IntVar[] letters = new IntVar[] {c, p, i, s, f, u, n, t, r, e}; // Verify that we have enough digits. if (base < letters.length) { throw new Exception("base < letters.Length"); }
C#
const int kBase = 10; // Decision variables. IntVar c = solver.MakeIntVar(1, kBase - 1, "C"); IntVar p = solver.MakeIntVar(0, kBase - 1, "P"); IntVar i = solver.MakeIntVar(1, kBase - 1, "I"); IntVar s = solver.MakeIntVar(0, kBase - 1, "S"); IntVar f = solver.MakeIntVar(1, kBase - 1, "F"); IntVar u = solver.MakeIntVar(0, kBase - 1, "U"); IntVar n = solver.MakeIntVar(0, kBase - 1, "N"); IntVar t = solver.MakeIntVar(1, kBase - 1, "T"); IntVar r = solver.MakeIntVar(0, kBase - 1, "R"); IntVar e = solver.MakeIntVar(0, kBase - 1, "E"); // Group variables in a vector so that we can use AllDifferent. IntVar[] letters = new IntVar[] { c, p, i, s, f, u, n, t, r, e }; // Verify that we have enough digits. if (kBase < letters.Length) { throw new Exception("kBase < letters.Length"); }
הגדרת המגבלות
עכשיו אחרי שהגדרנו את המשתנים שלנו, השלב הבא הוא להגדיר אילוצים.
קודם כול, מוסיפים את האילוץ AllDifferent ומאלצים כל אות
ספרה שונה.
בשלב הבא מוסיפים את האילוץ CP + IS + FUN = TRUE. התוכנות לדוגמה עושות זאת
בדרכים שונות.
Python
solver.Add(solver.AllDifferent(letters)) # CP + IS + FUN = TRUE solver.Add( p + s + n + base * (c + i + u) + base * base * f == e + base * u + base * base * r + base * base * base * t )
C++
// Define constraints. solver.AddConstraint(solver.MakeAllDifferent(letters)); // CP + IS + FUN = TRUE IntVar* const term1 = MakeBaseLine2(&solver, c, p, kBase); IntVar* const term2 = MakeBaseLine2(&solver, i, s, kBase); IntVar* const term3 = MakeBaseLine3(&solver, f, u, n, kBase); IntVar* const sum_terms = solver.MakeSum(solver.MakeSum(term1, term2), term3)->Var(); IntVar* const sum = MakeBaseLine4(&solver, t, r, u, e, kBase); solver.AddConstraint(solver.MakeEquality(sum_terms, sum));
Java
solver.addConstraint(solver.makeAllDifferent(letters)); // CP + IS + FUN = TRUE final IntVar sum1 = solver .makeSum(new IntVar[] {p, s, n, solver.makeProd(solver.makeSum(new IntVar[] {c, i, u}).var(), base).var(), solver.makeProd(f, base * base).var()}) .var(); final IntVar sum2 = solver .makeSum(new IntVar[] {e, solver.makeProd(u, base).var(), solver.makeProd(r, base * base).var(), solver.makeProd(t, base * base * base).var()}) .var(); solver.addConstraint(solver.makeEquality(sum1, sum2));
C#
solver.Add(letters.AllDifferent()); // CP + IS + FUN = TRUE solver.Add(p + s + n + kBase * (c + i + u) + kBase * kBase * f == e + kBase * u + kBase * kBase * r + kBase * kBase * kBase * t);
הפעלת הפותר
עכשיו, אחרי שיש לנו את המשתנים והאילוצים, אנחנו מוכנים לפתור.
הקוד של מדפסת הפתרונות, שמציגה כל פתרון כפותר היא תוצג בהמשך.
מאחר שיש יותר מפתרון אחד לבעיה שלנו, אנחנו חוזרים על הפעולה
פתרונות עם לולאה של while solver.NextSolution(). אם רק רצינו
נוכל למצוא פתרון אחד, נשתמש במונח הזה:\
if (solver.NextSolution()) {
// Print solution.
} else {
// Print that no solution could be found.
}Python
solution_count = 0 db = solver.Phase(letters, solver.INT_VAR_DEFAULT, solver.INT_VALUE_DEFAULT) solver.NewSearch(db) while solver.NextSolution(): print(letters) # Is CP + IS + FUN = TRUE? assert ( base * c.Value() + p.Value() + base * i.Value() + s.Value() + base * base * f.Value() + base * u.Value() + n.Value() == base * base * base * t.Value() + base * base * r.Value() + base * u.Value() + e.Value() ) solution_count += 1 solver.EndSearch() print(f"Number of solutions found: {solution_count}")
C++
int num_solutions = 0; // Create decision builder to search for solutions. DecisionBuilder* const db = solver.MakePhase( letters, Solver::CHOOSE_FIRST_UNBOUND, Solver::ASSIGN_MIN_VALUE); solver.NewSearch(db); while (solver.NextSolution()) { LOG(INFO) << "C=" << c->Value() << " " << "P=" << p->Value() << " " << "I=" << i->Value() << " " << "S=" << s->Value() << " " << "F=" << f->Value() << " " << "U=" << u->Value() << " " << "N=" << n->Value() << " " << "T=" << t->Value() << " " << "R=" << r->Value() << " " << "E=" << e->Value(); // Is CP + IS + FUN = TRUE? CHECK_EQ(p->Value() + s->Value() + n->Value() + kBase * (c->Value() + i->Value() + u->Value()) + kBase * kBase * f->Value(), e->Value() + kBase * u->Value() + kBase * kBase * r->Value() + kBase * kBase * kBase * t->Value()); num_solutions++; } solver.EndSearch(); LOG(INFO) << "Number of solutions found: " << num_solutions;
Java
int countSolution = 0; // Create the decision builder to search for solutions. final DecisionBuilder db = solver.makePhase(letters, Solver.CHOOSE_FIRST_UNBOUND, Solver.ASSIGN_MIN_VALUE); solver.newSearch(db); while (solver.nextSolution()) { System.out.println("C=" + c.value() + " P=" + p.value()); System.out.println(" I=" + i.value() + " S=" + s.value()); System.out.println(" F=" + f.value() + " U=" + u.value()); System.out.println(" N=" + n.value() + " T=" + t.value()); System.out.println(" R=" + r.value() + " E=" + e.value()); // Is CP + IS + FUN = TRUE? if (p.value() + s.value() + n.value() + base * (c.value() + i.value() + u.value()) + base * base * f.value() != e.value() + base * u.value() + base * base * r.value() + base * base * base * t.value()) { throw new Exception("CP + IS + FUN != TRUE"); } countSolution++; } solver.endSearch(); System.out.println("Number of solutions found: " + countSolution);
C#
int SolutionCount = 0; // Create the decision builder to search for solutions. DecisionBuilder db = solver.MakePhase(letters, Solver.CHOOSE_FIRST_UNBOUND, Solver.ASSIGN_MIN_VALUE); solver.NewSearch(db); while (solver.NextSolution()) { Console.Write("C=" + c.Value() + " P=" + p.Value()); Console.Write(" I=" + i.Value() + " S=" + s.Value()); Console.Write(" F=" + f.Value() + " U=" + u.Value()); Console.Write(" N=" + n.Value() + " T=" + t.Value()); Console.Write(" R=" + r.Value() + " E=" + e.Value()); Console.WriteLine(); // Is CP + IS + FUN = TRUE? if (p.Value() + s.Value() + n.Value() + kBase * (c.Value() + i.Value() + u.Value()) + kBase * kBase * f.Value() != e.Value() + kBase * u.Value() + kBase * kBase * r.Value() + kBase * kBase * kBase * t.Value()) { throw new Exception("CP + IS + FUN != TRUE"); } SolutionCount++; } solver.EndSearch(); Console.WriteLine($"Number of solutions found: {SolutionCount}");
השלמת תוכניות
אלה התוכניות המלאות.
Python
"""Cryptarithmetic puzzle. First attempt to solve equation CP + IS + FUN = TRUE where each letter represents a unique digit. This problem has 72 different solutions in base 10. """ from ortools.constraint_solver import pywrapcp def main(): # Constraint programming engine solver = pywrapcp.Solver("CP is fun!") base = 10 # Decision variables. digits = list(range(0, base)) digits_without_zero = list(range(1, base)) c = solver.IntVar(digits_without_zero, "C") p = solver.IntVar(digits, "P") i = solver.IntVar(digits_without_zero, "I") s = solver.IntVar(digits, "S") f = solver.IntVar(digits_without_zero, "F") u = solver.IntVar(digits, "U") n = solver.IntVar(digits, "N") t = solver.IntVar(digits_without_zero, "T") r = solver.IntVar(digits, "R") e = solver.IntVar(digits, "E") # We need to group variables in a list to use the constraint AllDifferent. letters = [c, p, i, s, f, u, n, t, r, e] # Verify that we have enough digits. assert base >= len(letters) # Define constraints. solver.Add(solver.AllDifferent(letters)) # CP + IS + FUN = TRUE solver.Add( p + s + n + base * (c + i + u) + base * base * f == e + base * u + base * base * r + base * base * base * t ) solution_count = 0 db = solver.Phase(letters, solver.INT_VAR_DEFAULT, solver.INT_VALUE_DEFAULT) solver.NewSearch(db) while solver.NextSolution(): print(letters) # Is CP + IS + FUN = TRUE? assert ( base * c.Value() + p.Value() + base * i.Value() + s.Value() + base * base * f.Value() + base * u.Value() + n.Value() == base * base * base * t.Value() + base * base * r.Value() + base * u.Value() + e.Value() ) solution_count += 1 solver.EndSearch() print(f"Number of solutions found: {solution_count}") if __name__ == "__main__": main()
C++
// Cryptarithmetic puzzle // // First attempt to solve equation CP + IS + FUN = TRUE // where each letter represents a unique digit. // // This problem has 72 different solutions in base 10. #include <cstdint> #include <vector> #include "absl/flags/flag.h" #include "absl/log/flags.h" #include "ortools/base/init_google.h" #include "ortools/base/logging.h" #include "ortools/constraint_solver/constraint_solver.h" namespace operations_research { // Helper functions. IntVar* MakeBaseLine2(Solver* s, IntVar* const v1, IntVar* const v2, const int64_t base) { return s->MakeSum(s->MakeProd(v1, base), v2)->Var(); } IntVar* MakeBaseLine3(Solver* s, IntVar* const v1, IntVar* const v2, IntVar* const v3, const int64_t base) { std::vector<IntVar*> tmp_vars; std::vector<int64_t> coefficients; tmp_vars.push_back(v1); coefficients.push_back(base * base); tmp_vars.push_back(v2); coefficients.push_back(base); tmp_vars.push_back(v3); coefficients.push_back(1); return s->MakeScalProd(tmp_vars, coefficients)->Var(); } IntVar* MakeBaseLine4(Solver* s, IntVar* const v1, IntVar* const v2, IntVar* const v3, IntVar* const v4, const int64_t base) { std::vector<IntVar*> tmp_vars; std::vector<int64_t> coefficients; tmp_vars.push_back(v1); coefficients.push_back(base * base * base); tmp_vars.push_back(v2); coefficients.push_back(base * base); tmp_vars.push_back(v3); coefficients.push_back(base); tmp_vars.push_back(v4); coefficients.push_back(1); return s->MakeScalProd(tmp_vars, coefficients)->Var(); } void CPIsFunCp() { // Instantiate the solver. Solver solver("CP is fun!"); const int64_t kBase = 10; // Define decision variables. IntVar* const c = solver.MakeIntVar(1, kBase - 1, "C"); IntVar* const p = solver.MakeIntVar(0, kBase - 1, "P"); IntVar* const i = solver.MakeIntVar(1, kBase - 1, "I"); IntVar* const s = solver.MakeIntVar(0, kBase - 1, "S"); IntVar* const f = solver.MakeIntVar(1, kBase - 1, "F"); IntVar* const u = solver.MakeIntVar(0, kBase - 1, "U"); IntVar* const n = solver.MakeIntVar(0, kBase - 1, "N"); IntVar* const t = solver.MakeIntVar(1, kBase - 1, "T"); IntVar* const r = solver.MakeIntVar(0, kBase - 1, "R"); IntVar* const e = solver.MakeIntVar(0, kBase - 1, "E"); // We need to group variables in a vector to be able to use // the global constraint AllDifferent std::vector<IntVar*> letters{c, p, i, s, f, u, n, t, r, e}; // Check if we have enough digits CHECK_GE(kBase, letters.size()); // Define constraints. solver.AddConstraint(solver.MakeAllDifferent(letters)); // CP + IS + FUN = TRUE IntVar* const term1 = MakeBaseLine2(&solver, c, p, kBase); IntVar* const term2 = MakeBaseLine2(&solver, i, s, kBase); IntVar* const term3 = MakeBaseLine3(&solver, f, u, n, kBase); IntVar* const sum_terms = solver.MakeSum(solver.MakeSum(term1, term2), term3)->Var(); IntVar* const sum = MakeBaseLine4(&solver, t, r, u, e, kBase); solver.AddConstraint(solver.MakeEquality(sum_terms, sum)); int num_solutions = 0; // Create decision builder to search for solutions. DecisionBuilder* const db = solver.MakePhase( letters, Solver::CHOOSE_FIRST_UNBOUND, Solver::ASSIGN_MIN_VALUE); solver.NewSearch(db); while (solver.NextSolution()) { LOG(INFO) << "C=" << c->Value() << " " << "P=" << p->Value() << " " << "I=" << i->Value() << " " << "S=" << s->Value() << " " << "F=" << f->Value() << " " << "U=" << u->Value() << " " << "N=" << n->Value() << " " << "T=" << t->Value() << " " << "R=" << r->Value() << " " << "E=" << e->Value(); // Is CP + IS + FUN = TRUE? CHECK_EQ(p->Value() + s->Value() + n->Value() + kBase * (c->Value() + i->Value() + u->Value()) + kBase * kBase * f->Value(), e->Value() + kBase * u->Value() + kBase * kBase * r->Value() + kBase * kBase * kBase * t->Value()); num_solutions++; } solver.EndSearch(); LOG(INFO) << "Number of solutions found: " << num_solutions; } } // namespace operations_research int main(int argc, char** argv) { InitGoogle(argv[0], &argc, &argv, true); absl::SetFlag(&FLAGS_stderrthreshold, 0); operations_research::CPIsFunCp(); return EXIT_SUCCESS; }
Java
// Cryptarithmetic puzzle // // First attempt to solve equation CP + IS + FUN = TRUE // where each letter represents a unique digit. // // This problem has 72 different solutions in base 10. package com.google.ortools.constraintsolver.samples; import com.google.ortools.Loader; import com.google.ortools.constraintsolver.DecisionBuilder; import com.google.ortools.constraintsolver.IntVar; import com.google.ortools.constraintsolver.Solver; /** Cryptarithmetic puzzle. */ public final class CpIsFunCp { public static void main(String[] args) throws Exception { Loader.loadNativeLibraries(); // Instantiate the solver. Solver solver = new Solver("CP is fun!"); final int base = 10; // Decision variables. final IntVar c = solver.makeIntVar(1, base - 1, "C"); final IntVar p = solver.makeIntVar(0, base - 1, "P"); final IntVar i = solver.makeIntVar(1, base - 1, "I"); final IntVar s = solver.makeIntVar(0, base - 1, "S"); final IntVar f = solver.makeIntVar(1, base - 1, "F"); final IntVar u = solver.makeIntVar(0, base - 1, "U"); final IntVar n = solver.makeIntVar(0, base - 1, "N"); final IntVar t = solver.makeIntVar(1, base - 1, "T"); final IntVar r = solver.makeIntVar(0, base - 1, "R"); final IntVar e = solver.makeIntVar(0, base - 1, "E"); // Group variables in a vector so that we can use AllDifferent. final IntVar[] letters = new IntVar[] {c, p, i, s, f, u, n, t, r, e}; // Verify that we have enough digits. if (base < letters.length) { throw new Exception("base < letters.Length"); } // Define constraints. solver.addConstraint(solver.makeAllDifferent(letters)); // CP + IS + FUN = TRUE final IntVar sum1 = solver .makeSum(new IntVar[] {p, s, n, solver.makeProd(solver.makeSum(new IntVar[] {c, i, u}).var(), base).var(), solver.makeProd(f, base * base).var()}) .var(); final IntVar sum2 = solver .makeSum(new IntVar[] {e, solver.makeProd(u, base).var(), solver.makeProd(r, base * base).var(), solver.makeProd(t, base * base * base).var()}) .var(); solver.addConstraint(solver.makeEquality(sum1, sum2)); int countSolution = 0; // Create the decision builder to search for solutions. final DecisionBuilder db = solver.makePhase(letters, Solver.CHOOSE_FIRST_UNBOUND, Solver.ASSIGN_MIN_VALUE); solver.newSearch(db); while (solver.nextSolution()) { System.out.println("C=" + c.value() + " P=" + p.value()); System.out.println(" I=" + i.value() + " S=" + s.value()); System.out.println(" F=" + f.value() + " U=" + u.value()); System.out.println(" N=" + n.value() + " T=" + t.value()); System.out.println(" R=" + r.value() + " E=" + e.value()); // Is CP + IS + FUN = TRUE? if (p.value() + s.value() + n.value() + base * (c.value() + i.value() + u.value()) + base * base * f.value() != e.value() + base * u.value() + base * base * r.value() + base * base * base * t.value()) { throw new Exception("CP + IS + FUN != TRUE"); } countSolution++; } solver.endSearch(); System.out.println("Number of solutions found: " + countSolution); } private CpIsFunCp() {} }
C#
// Cryptarithmetic puzzle // // First attempt to solve equation CP + IS + FUN = TRUE // where each letter represents a unique digit. // // This problem has 72 different solutions in base 10. using System; using Google.OrTools.ConstraintSolver; public class CpIsFunCp { public static void Main(String[] args) { // Instantiate the solver. Solver solver = new Solver("CP is fun!"); const int kBase = 10; // Decision variables. IntVar c = solver.MakeIntVar(1, kBase - 1, "C"); IntVar p = solver.MakeIntVar(0, kBase - 1, "P"); IntVar i = solver.MakeIntVar(1, kBase - 1, "I"); IntVar s = solver.MakeIntVar(0, kBase - 1, "S"); IntVar f = solver.MakeIntVar(1, kBase - 1, "F"); IntVar u = solver.MakeIntVar(0, kBase - 1, "U"); IntVar n = solver.MakeIntVar(0, kBase - 1, "N"); IntVar t = solver.MakeIntVar(1, kBase - 1, "T"); IntVar r = solver.MakeIntVar(0, kBase - 1, "R"); IntVar e = solver.MakeIntVar(0, kBase - 1, "E"); // Group variables in a vector so that we can use AllDifferent. IntVar[] letters = new IntVar[] { c, p, i, s, f, u, n, t, r, e }; // Verify that we have enough digits. if (kBase < letters.Length) { throw new Exception("kBase < letters.Length"); } // Define constraints. solver.Add(letters.AllDifferent()); // CP + IS + FUN = TRUE solver.Add(p + s + n + kBase * (c + i + u) + kBase * kBase * f == e + kBase * u + kBase * kBase * r + kBase * kBase * kBase * t); int SolutionCount = 0; // Create the decision builder to search for solutions. DecisionBuilder db = solver.MakePhase(letters, Solver.CHOOSE_FIRST_UNBOUND, Solver.ASSIGN_MIN_VALUE); solver.NewSearch(db); while (solver.NextSolution()) { Console.Write("C=" + c.Value() + " P=" + p.Value()); Console.Write(" I=" + i.Value() + " S=" + s.Value()); Console.Write(" F=" + f.Value() + " U=" + u.Value()); Console.Write(" N=" + n.Value() + " T=" + t.Value()); Console.Write(" R=" + r.Value() + " E=" + e.Value()); Console.WriteLine(); // Is CP + IS + FUN = TRUE? if (p.Value() + s.Value() + n.Value() + kBase * (c.Value() + i.Value() + u.Value()) + kBase * kBase * f.Value() != e.Value() + kBase * u.Value() + kBase * kBase * r.Value() + kBase * kBase * kBase * t.Value()) { throw new Exception("CP + IS + FUN != TRUE"); } SolutionCount++; } solver.EndSearch(); Console.WriteLine($"Number of solutions found: {SolutionCount}"); } }