PolyDense

Value Members

1. final def !=(arg0: Any): Boolean

   

   Definition Classes

   AnyRef → Any

2. final def ##(): Int

   

   Definition Classes

   AnyRef → Any

3. def *(rhs: Polynomial[C])(implicit ring: Semiring[C], eq: Eq[C]): Polynomial[C]

   

   Definition Classes

   PolyDense → Polynomial

4. def **(k: Int)(implicit ring: Rig[C], eq: Eq[C]): Polynomial[C]

   

   Definition Classes

   Polynomial

5. def *:(k: C)(implicit ring: Semiring[C], eq: Eq[C]): Polynomial[C]

   

   Definition Classes

   PolyDense → Polynomial

6. def +(rhs: Polynomial[C])(implicit ring: Semiring[C], eq: Eq[C]): Polynomial[C]

   

   Definition Classes

   PolyDense → Polynomial

7. def -(rhs: Polynomial[C])(implicit ring: Rng[C], eq: Eq[C]): Polynomial[C]

   

   Definition Classes

   Polynomial

8. def :*(k: C)(implicit ring: Semiring[C], eq: Eq[C]): Polynomial[C]

   

   Definition Classes

   Polynomial

9. def :/(k: C)(implicit field: Field[C], eq: Eq[C]): Polynomial[C]

   

   Definition Classes

   Polynomial

10. final def ==(arg0: Any): Boolean

    

    Definition Classes

    AnyRef → Any

11. def apply(x: C)(implicit ring: Semiring[C]): C

    

    Evaluate the polynomial at x.

    Evaluate the polynomial at x.

    Definition Classes

    PolyDense → Polynomial

12. final def asInstanceOf[T0]: T0

    

    Definition Classes

    Any

13. def clone(): AnyRef

    

    Attributes

    protected[java.lang]

    Definition Classes

    AnyRef

    Annotations

    @throws( ... )

14. val coeffs: Array[C]

    

15. def coeffsArray(implicit ring: Semiring[C]): Array[C]

    

    Returns the coefficients in little-endian order.

    Returns the coefficients in little-endian order. So, the i-th element is coeffsArray(i) * (x ** i).

    Definition Classes

    PolyDense → Polynomial

16. def compose(y: Polynomial[C])(implicit ring: Rig[C], eq: Eq[C]): Polynomial[C]

    

    Compose this polynomial with another.

    Compose this polynomial with another.

    Definition Classes

    Polynomial

17. implicit val ct: ClassTag[C]

    

    Definition Classes

    PolyDense → Polynomial

18. def data(implicit ring: Semiring[C], eq: Eq[C]): Map[Int, C]

    

    Returns a map from exponent to coefficient of this polynomial.

    Returns a map from exponent to coefficient of this polynomial.

    Definition Classes

    Polynomial

19. def degree: Int

    

    Returns the degree of this polynomial.

    Returns the degree of this polynomial.

    Definition Classes

    PolyDense → Polynomial

20. def derivative(implicit ring: Ring[C], eq: Eq[C]): Polynomial[C]

    

    Definition Classes

    PolyDense → Polynomial

21. final def eq(arg0: AnyRef): Boolean

    

    Definition Classes

    AnyRef

22. def equals(that: Any): Boolean

    

    Definition Classes

    Polynomial → AnyRef → Any

23. def evalWith[A](x: A)(f: (C) ⇒ A)(implicit arg0: Semiring[A], arg1: Eq[A], arg2: ClassTag[A], ring: Semiring[C], eq: Eq[C]): A

    

    Definition Classes

    Polynomial

24. def finalize(): Unit

    

    Attributes

    protected[java.lang]

    Definition Classes

    AnyRef

    Annotations

    @throws( classOf[java.lang.Throwable] )

25. def flip(implicit ring: Rng[C], eq: Eq[C]): Polynomial[C]

    

    This will flip/mirror the polynomial about the y-axis.

    This will flip/mirror the polynomial about the y-axis. It is equivalent to poly.compose(-Polynomial.x), but will likely be faster to calculate.

    Definition Classes

    Polynomial

26. def foreach[U](f: (Int, C) ⇒ U): Unit

    

    Traverses each term in this polynomial, in order of degree, lowest to highest (eg.

    Traverses each term in this polynomial, in order of degree, lowest to highest (eg. constant term would be first) and calls f with the degree of term and its coefficient. This may skip zero terms, or it may not.

    Definition Classes

    PolyDense → Polynomial

27. def foreachNonZero[U](f: (Int, C) ⇒ U)(implicit ring: Semiring[C], eq: Eq[C]): Unit

    

    Traverses each non-zero term in this polynomial, in order of degree, lowest to highest (eg.

    Traverses each non-zero term in this polynomial, in order of degree, lowest to highest (eg. constant term would be first) and calls f with the degree of term and its coefficient.

    Definition Classes

    PolyDense → Polynomial

28. final def getClass(): Class[_]

    

    Definition Classes

    AnyRef → Any

29. def hashCode(): Int

    

    Definition Classes

    Polynomial → AnyRef → Any

30. def integral(implicit field: Field[C], eq: Eq[C]): Polynomial[C]

    

    Definition Classes

    PolyDense → Polynomial

31. def isConstant: Boolean

    

    Returns true iff this polynomial is constant.

    Returns true iff this polynomial is constant.

    Definition Classes

    Polynomial

32. final def isInstanceOf[T0]: Boolean

    

    Definition Classes

    Any

33. def isZero: Boolean

    

    Returns true if this polynomial is ring.zero.

    Returns true if this polynomial is ring.zero.

    Definition Classes

    PolyDense → Polynomial

34. def map[D](f: (C) ⇒ D)(implicit arg0: Semiring[D], arg1: Eq[D], arg2: ClassTag[D], ring: Semiring[C], eq: Eq[C]): Polynomial[D]

    

    Definition Classes

    Polynomial

35. def mapTerms[D](f: (Term[C]) ⇒ Term[D])(implicit arg0: Semiring[D], arg1: Eq[D], arg2: ClassTag[D], ring: Semiring[C], eq: Eq[C]): Polynomial[D]

    

    Definition Classes

    Polynomial

36. def maxOrderTermCoeff(implicit ring: Semiring[C]): C

    

    Returns the coefficient of max term of this polynomial.

    Returns the coefficient of max term of this polynomial.

    Definition Classes

    PolyDense → Polynomial

37. def maxTerm(implicit ring: Semiring[C]): Term[C]

    

    Returns the term of the highest degree in this polynomial.

    Returns the term of the highest degree in this polynomial.

    Definition Classes

    Polynomial

38. def minTerm(implicit ring: Semiring[C], eq: Eq[C]): Term[C]

    

    Returns the non-zero term of the minimum degree in this polynomial, unless it is zero.

    Returns the non-zero term of the minimum degree in this polynomial, unless it is zero. If this polynomial is zero, then this returns a zero term.

    Definition Classes

    Polynomial

39. def monic(implicit f: Field[C], eq: Eq[C]): Polynomial[C]

    

    Returns this polynomial as a monic polynomial, where the leading coefficient (ie.

    Returns this polynomial as a monic polynomial, where the leading coefficient (ie. maxOrderTermCoeff) is 1.

    Definition Classes

    Polynomial

40. final def ne(arg0: AnyRef): Boolean

    

    Definition Classes

    AnyRef

41. final def notify(): Unit

    

    Definition Classes

    AnyRef

42. final def notifyAll(): Unit

    

    Definition Classes

    AnyRef

43. def nth(n: Int)(implicit ring: Semiring[C]): C

    

    Returns the coefficient of the n-th degree term.

    Returns the coefficient of the n-th degree term.

    Definition Classes

    PolyDense → Polynomial

44. def pow(k: Int)(implicit ring: Rig[C], eq: Eq[C]): Polynomial[C]

    

    Definition Classes

    Polynomial

45. def reciprocal(implicit ring: Semiring[C], eq: Eq[C]): Polynomial[C]

    

    Returns the reciprocal of this polynomial.

    Returns the reciprocal of this polynomial. Essentially, if this polynomial is p with degree n, then returns a polynomial q(x) = x^n*p(1/x).

    Definition Classes

    Polynomial

    See also

    http://en.wikipedia.org/wiki/Reciprocal_polynomial

46. def reductum(implicit e: Eq[C], ring: Semiring[C], ct: ClassTag[C]): Polynomial[C]

    

    Returns a polynomial with the max term removed.

    Returns a polynomial with the max term removed.

    Definition Classes

    PolyDense → Polynomial

47. def removeZeroRoots(implicit ring: Semiring[C], eq: Eq[C]): Polynomial[C]

    

    Removes all zero roots from this polynomial.

    Removes all zero roots from this polynomial.

    Definition Classes

    Polynomial

48. def roots(implicit finder: RootFinder[C]): Roots[C]

    

    Returns the real roots of this polynomial.

    Returns the real roots of this polynomial.

    Depending on C, the finder argument may need to be passed "explicitly" via an implicit conversion. This is because some types (eg BigDecimal, Rational, etc) require an error bound, and so provide implicit conversions to RootFinders from the error type. For instance, BigDecimal requires either a scale or MathContext. So, we'd call this method with poly.roots(MathContext.DECIMAL128), which would return a Roots[BigDecimal whose roots are approximated to the precision specified in DECIMAL128 and rounded appropriately.

    On the other hand, a type like Double doesn't require an error bound and so can be called without specifying the RootFinder.

    finder

    a root finder to extract roots with

    returns

    the real roots of this polynomial

    Definition Classes

    Polynomial

49. def shift(h: C)(implicit ring: Ring[C], eq: Eq[C]): Polynomial[C]

    

    Shift this polynomial along the x-axis by h, so that this(x + h) == this.shift(h).apply(x).

    Shift this polynomial along the x-axis by h, so that this(x + h) == this.shift(h).apply(x). This is equivalent to calling this.compose(Polynomial.x + h), but is likely to compute the shifted polynomial much faster.

    Definition Classes

    Polynomial

50. def signVariations(implicit ring: Semiring[C], eq: Eq[C], signed: Signed[C]): Int

    

    Returns the number of sign variations in the coefficients of this polynomial.

    Returns the number of sign variations in the coefficients of this polynomial. Given 2 consecutive terms (ignoring 0 terms), a sign variation is indicated when the terms have differing signs.

    Definition Classes

    Polynomial

51. final def synchronized[T0](arg0: ⇒ T0): T0

    

    Definition Classes

    AnyRef

52. def terms(implicit ring: Semiring[C], eq: Eq[C]): List[Term[C]]

    

    Returns a list of non-zero terms.

    Returns a list of non-zero terms.

    Definition Classes

    Polynomial

53. def termsIterator: Iterator[Term[C]]

    

    Return an iterator of non-zero terms.

    Return an iterator of non-zero terms.

    This method is used to implement equals and hashCode.

    NOTE: This method uses a (_ == 0) test to prune zero values. This makes sense in a context where Semiring[C] and Eq[C] are unavailable, but not other places.

    Definition Classes

    PolyDense → Polynomial

54. def toDense(implicit ring: Semiring[C], eq: Eq[C]): PolyDense[C]

    

    Returns a polynmial that has a dense representation.

    Returns a polynmial that has a dense representation.

    Definition Classes

    PolyDense → Polynomial

55. def toSparse(implicit ring: Semiring[C], eq: Eq[C]): PolySparse[C]

    

    Returns a polynomial that has a sparse representation.

    Returns a polynomial that has a sparse representation.

    Definition Classes

    PolyDense → Polynomial

56. def toString(): String

    

    Definition Classes

    Polynomial → AnyRef → Any

57. def unary_-()(implicit ring: Rng[C]): Polynomial[C]

    

    Definition Classes

    PolyDense → Polynomial

58. final def wait(): Unit

    

    Definition Classes

    AnyRef

    Annotations

    @throws( ... )

59. final def wait(arg0: Long, arg1: Int): Unit

    

    Definition Classes

    AnyRef

    Annotations

    @throws( ... )

60. final def wait(arg0: Long): Unit

    

    Definition Classes

    AnyRef

    Annotations

    @throws( ... )