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Similar to Swift で数学のススメ 〜 プログラミングと数学は同時に学べ
Similar to Swift で数学のススメ 〜 プログラミングと数学は同時に学べ (20)
More from Taketo Sano (20)
Swift で数学のススメ 〜 プログラミングと数学は同時に学べ
- 17. protocol AdditiveGroup { //
static var zero: Self { get } //
static func + (a: Self, b: Self) -> Self //
prefix static func - (x: Self) -> Self //
}
extension AdditiveGroup {
static func -(a: Self, b: Self) -> Self {
return (a + (-b)) //
}
}
- 18. protocol AdditiveGroup { //
…
}
protocol Ring: AdditiveGroup { //
static var identity: Self { get } // 1
static func * (a: Self, b: Self) -> Self //
var inverse: Self? { get } // (optional)
}
- 19. protocol AdditiveGroup { //
…
}
protocol Ring: AdditiveGroup { //
…
}
protocol Field: Ring {} //
extension Field {
static func / (a: Self, b: Self) -> Self { //
return a * b.inverse! // 0
}
}
- 20. extension Int: Ring { // Int
static var zero: Int {
return 0
}
static var identity: Int {
return 1
}
}
// Int
- 21. struct Rational: Field { //
private let p, q: Int
init(_ p: Int, _ q: Int) {
(self.p, self.q) = (p, q)
}
static var zero: Int {
return Rational(0, 1)
}
static var identity: Int {
return Rational(1, 1)
}
var inverse: Rational? { //
return (p != 0) ? Rational(q, p) : nil
}
…
- 22. struct Rational: Field {
…
static func + (a: Rational, b: Rational) -> Rational {
return Rational(a.p * b.q + a.q * b.p, a.q * b.q)
}
static prefix func - (a: Rational) -> Rational {
return Rational(-a.p, a.q)
}
static func * (a: Rational, b: Rational) -> Rational {
return Rational(a.p * b.p, a.q * b.q)
}
}
- 27. protocol EuclideanRing: Ring { //
static func eucDiv(_ a: Self, _ b: Self)
-> (q: Self, r: Self) //
}
extension EuclideanRing {
static func % (_ a: Self, b: Self) -> Self { //
return Self.eucDiv(a, b).r
}
}
- 28. extension Int: EuclideanRing { // Int EuclideanRing
static func eucDiv(_ a: Int, _ b: Int)
-> (q: Int, r: Int) { //
let q = a / b
return (q: q, r: a - q * b)
}
}
- 29. struct Polynomial<K: Field>: EuclideanRing {
public let coeffs: [K]
public init(_ coeffs: K...) {
self.coeffs = coeffs
}
public static func + (f: Polynomial<K>, g: Polynomial<K>) -> Polynomial<K> {
return Polynomial<K>(degree: max(f.degree, g.degree)) {
f.coeff($0) + g.coeff($0)
}
}
public static prefix func - (f: Polynomial<K>) -> Polynomial<K> {
return f.map { -$0 }
}
public static func * (f: Polynomial<K>, g: Polynomial<K>) -> Polynomial<K> {
…
}
…
- 30. struct Polynomial<K: Field>: EuclideanRing {
…
static func eucDiv<K: Field>(_ f: Polynomial<K>, _ g: Polynomial<K>)
-> (q: Polynomial<K>, r: Polynomial<K>) {
return (0 ... max(0, f.degree - g.degree))
.reversed()
.reduce( (0, f) ) {
(result: (Polynomial<K>, Polynomial<K>), degree: Int) in
let (q, r) = result
let m = eucDivMonomial(r, g)
return (q + m.q, m.r)
}
}
}
- 31. public func gcd<R: EuclideanRing>(_ a: R, _ b: R) -> R {
switch b {
case 0:
return a
default:
return gcd(b, a % b)
}
}
- 34. let a = sqrt(2.0) // 1.41421356…
a * a == 2.0 // false