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Implement complex number and ImaginaryUnit
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#pragma once | ||
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#include "fintamath/literals/Boolean.hpp" | ||
#include "fintamath/literals/constants/IConstant.hpp" | ||
#include "fintamath/numbers/Complex.hpp" | ||
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namespace fintamath { | ||
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class ImaginaryUnit : public IConstantCRTP<Boolean, ImaginaryUnit> { | ||
public: | ||
std::string toString() const override { | ||
return Complex(Integer(0), Integer(1)).toString(); | ||
} | ||
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static MathObjectTypeId getTypeIdStatic() { | ||
return MathObjectTypeId(MathObjectType::ImaginaryUnit); | ||
} | ||
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protected: | ||
std::unique_ptr<IMathObject> call() const override; | ||
}; | ||
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} |
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#pragma once | ||
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#include "fintamath/numbers/Integer.hpp" | ||
#include "fintamath/numbers/Rational.hpp" | ||
#include "fintamath/numbers/Real.hpp" | ||
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namespace fintamath { | ||
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class Complex : public INumberCRTP<Complex> { | ||
public: | ||
Complex() = default; | ||
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Complex(const Complex &rhs); | ||
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Complex(Complex &&rhs) noexcept = default; | ||
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Complex &operator=(const Complex &rhs); | ||
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Complex &operator=(Complex &&rhs) noexcept = default; | ||
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explicit Complex(const std::string &str); | ||
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explicit Complex(const INumber &inReal, const INumber &inImag); | ||
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Complex(const Integer &rhs); | ||
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Complex(const Rational &rhs); | ||
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Complex(const Real &rhs); | ||
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Complex(int64_t rhs); | ||
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std::string toString() const override; | ||
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std::unique_ptr<IMathObject> toMinimalObject() const override; | ||
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Complex precise(uint8_t precision) const; | ||
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const Integer &real() const; | ||
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const Integer &imag() const; | ||
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static MathObjectTypeId getTypeIdStatic() { | ||
return MathObjectTypeId(MathObjectType::Complex); | ||
} | ||
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protected: | ||
bool equals(const Complex &rhs) const override; | ||
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bool less(const Complex &rhs) const override; | ||
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bool more(const Complex &rhs) const override; | ||
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Complex &add(const Complex &rhs) override; | ||
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Complex &substract(const Complex &rhs) override; | ||
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Complex &multiply(const Complex &rhs) override; | ||
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Complex ÷(const Complex &rhs) override; | ||
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Complex &negate() override; | ||
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private: | ||
std::unique_ptr<INumber> re = std::make_unique<Integer>(0); | ||
std::unique_ptr<INumber> im = std::make_unique<Integer>(0); | ||
}; | ||
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} |
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#include "fintamath/literals/constants/ImaginaryUnit.hpp" | ||
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namespace fintamath { | ||
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std::unique_ptr<IMathObject> ImaginaryUnit::call() const { | ||
return std::make_unique<Complex>(Integer(0), Integer(1)); | ||
} | ||
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} |
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#include "fintamath/numbers/Complex.hpp" | ||
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#include <algorithm> | ||
#include <stdexcept> | ||
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#include "fintamath/exceptions/InvalidInputException.hpp" | ||
#include "fintamath/exceptions/UndefinedException.hpp" | ||
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namespace fintamath { | ||
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Complex::Complex(const Complex &rhs) : re(cast<INumber>(rhs.re->clone())), im(cast<INumber>(rhs.im->clone())) { | ||
} | ||
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Complex &Complex::operator=(const Complex &rhs) { | ||
if (this != &rhs) { | ||
re = cast<INumber>(rhs.re->clone()); | ||
im = cast<INumber>(rhs.im->clone()); | ||
} | ||
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return *this; | ||
} | ||
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Complex::Complex(const std::string &str) { | ||
re = INumber::parse(str); | ||
} | ||
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Complex::Complex(const INumber &inReal, const INumber &inImaginary) { | ||
if (is<Complex>(inReal) || is<Complex>(inImaginary)) { | ||
throw InvalidInputException("Nested complex numbers are not allowed"); | ||
} | ||
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re = cast<INumber>(inReal.clone()); | ||
im = cast<INumber>(inImaginary.clone()); | ||
} | ||
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Complex::Complex(const Integer &rhs) : re(cast<INumber>(rhs.toMinimalObject())) { | ||
} | ||
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Complex::Complex(const Rational &rhs) : re(cast<INumber>(rhs.toMinimalObject())) { | ||
} | ||
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Complex::Complex(const Real &rhs) : re(cast<INumber>(rhs.toMinimalObject())) { | ||
} | ||
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Complex::Complex(int64_t rhs) : re(std::make_unique<Integer>(rhs)) { | ||
} | ||
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std::string Complex::toString() const { | ||
std::string res; | ||
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if (*re != Integer(0)) { | ||
res += re->toString(); | ||
} | ||
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if (*im != Integer(0)) { | ||
if (!res.empty()) { | ||
res += " + "; | ||
} | ||
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res += im->toString() + "I"; | ||
} | ||
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if (res.empty()) { | ||
res = "0"; | ||
} | ||
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return res; | ||
} | ||
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std::unique_ptr<IMathObject> Complex::toMinimalObject() const { | ||
if (*im == Integer(0)) { | ||
return re->clone(); | ||
} | ||
return clone(); | ||
} | ||
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Complex Complex::precise(uint8_t precision) const { | ||
Complex res = *this; | ||
res.re = std::make_unique<Real>(convert<Real>(*re).precise(precision)); | ||
res.im = std::make_unique<Real>(convert<Real>(*im).precise(precision)); | ||
return res; | ||
} | ||
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bool Complex::equals(const Complex &rhs) const { | ||
return re == rhs.re && im == rhs.im; | ||
} | ||
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bool Complex::less(const Complex &rhs) const { | ||
// TODO!!! See symengine | ||
throw InvalidInputBinaryOperatorException("<", toString(), rhs.toString()); | ||
} | ||
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bool Complex::more(const Complex &rhs) const { | ||
// TODO!!! See symengine | ||
throw InvalidInputBinaryOperatorException(">", toString(), rhs.toString()); | ||
} | ||
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Complex &Complex::add(const Complex &rhs) { | ||
re = *re + *rhs.re; | ||
im = *im + *rhs.im; | ||
return *this; | ||
} | ||
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Complex &Complex::substract(const Complex &rhs) { | ||
re = *re - *rhs.re; | ||
im = *im - *rhs.im; | ||
return *this; | ||
} | ||
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// https://en.wikipedia.org/wiki/Complex_number#Multiplication_and_square | ||
Complex &Complex::multiply(const Complex &rhs) { | ||
auto lhsRe = cast<INumber>(re->clone()); | ||
auto lhsIm = cast<INumber>(im->clone()); | ||
re = *(*lhsRe * *rhs.re) + *(*lhsIm * *rhs.im); | ||
im = *(*lhsRe * *rhs.im) + *(*lhsIm * *rhs.re); | ||
return *this; | ||
} | ||
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// https://en.wikipedia.org/wiki/Complex_number#Reciprocal_and_division | ||
Complex &Complex::divide(const Complex &rhs) { | ||
auto lhsRe = cast<INumber>(re->clone()); | ||
auto lhsIm = cast<INumber>(im->clone()); | ||
auto divisor = *(*rhs.re * *rhs.re) + *(*rhs.im * *rhs.im); | ||
re = *(*(*lhsRe * *rhs.re) + *(*lhsIm * *rhs.im)) / *divisor; | ||
im = *(*(*lhsIm * *rhs.re) - *(*lhsRe * *rhs.im)) / *divisor; | ||
return *this; | ||
} | ||
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Complex &Complex::negate() { | ||
re = -(*re); | ||
im = -(*im); | ||
return *this; | ||
} | ||
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} |