def test_beta_binomial():
# verify parameters
raises(ValueError, lambda: BetaBinomial('b', .2, 1, 2))
raises(ValueError, lambda: BetaBinomial('b', 2, -1, 2))
raises(ValueError, lambda: BetaBinomial('b', 2, 1, -2))
assert BetaBinomial('b', 2, 1, 1)
# test numeric values
nvals = range(1, 5)
alphavals = [Rational(1, 4), S.Half, Rational(3, 4), 1, 10]
betavals = [Rational(1, 4), S.Half, Rational(3, 4), 1, 10]
for n in nvals:
for a in alphavals:
for b in betavals:
X = BetaBinomial('X', n, a, b)
assert E(X) == moment(X, 1)
assert variance(X) == cmoment(X, 2)
# test symbolic
n, a, b = symbols('a b n')
assert BetaBinomial('x', n, a, b)
n = 2 # Because we're using for loops, can't do symbolic n
a, b = symbols('a b', positive=True)
X = BetaBinomial('X', n, a, b)
t = Symbol('t')
assert E(X).expand() == moment(X, 1).expand()
assert variance(X).expand() == cmoment(X, 2).expand()
assert skewness(X) == smoment(X, 3)
assert characteristic_function(X)(t) == exp(2*I*t)*beta(a + 2, b)/beta(a, b) +\
2*exp(I*t)*beta(a + 1, b + 1)/beta(a, b) + beta(a, b + 2)/beta(a, b)
assert moment_generating_function(X)(t) == exp(2*t)*beta(a + 2, b)/beta(a, b) +\
2*exp(t)*beta(a + 1, b + 1)/beta(a, b) + beta(a, b + 2)/beta(a, b)
def test_multiple_normal():
X, Y = Normal('x', 0, 1), Normal('y', 0, 1)
p = Symbol("p", positive=True)
assert E(X + Y) == 0
assert variance(X + Y) == 2
assert variance(X + X) == 4
assert covariance(X, Y) == 0
assert covariance(2 * X + Y, -X) == -2 * variance(X)
assert skewness(X) == 0
assert skewness(X + Y) == 0
assert kurtosis(X) == 3
assert kurtosis(X + Y) == 3
assert correlation(X, Y) == 0
assert correlation(X, X + Y) == correlation(X, X - Y)
assert moment(X, 2) == 1
assert cmoment(X, 3) == 0
assert moment(X + Y, 4) == 12
assert cmoment(X, 2) == variance(X)
assert smoment(X * X, 2) == 1
assert smoment(X + Y, 3) == skewness(X + Y)
assert smoment(X + Y, 4) == kurtosis(X + Y)
assert E(X, Eq(X + Y, 0)) == 0
assert variance(X, Eq(X + Y, 0)) == S.Half
assert quantile(X)(p) == sqrt(2) * erfinv(2 * p - S.One)
def test_dice():
# TODO: Make iid method!
X, Y, Z = Die('X', 6), Die('Y', 6), Die('Z', 6)
a, b, t, p = symbols('a b t p')
assert E(X) == 3 + S.Half
assert variance(X) == S(35) / 12
assert E(X + Y) == 7
assert E(X + X) == 7
assert E(a * X + b) == a * E(X) + b
assert variance(X + Y) == variance(X) + variance(Y) == cmoment(X + Y, 2)
assert variance(X + X) == 4 * variance(X) == cmoment(X + X, 2)
assert cmoment(X, 0) == 1
assert cmoment(4 * X, 3) == 64 * cmoment(X, 3)
assert covariance(X, Y) == S.Zero
assert covariance(X, X + Y) == variance(X)
assert density(Eq(cos(X * S.Pi), 1))[True] == S.Half
assert correlation(X, Y) == 0
assert correlation(X, Y) == correlation(Y, X)
assert smoment(X + Y, 3) == skewness(X + Y)
assert smoment(X, 0) == 1
assert P(X > 3) == S.Half
assert P(2 * X > 6) == S.Half
assert P(X > Y) == S(5) / 12
assert P(Eq(X, Y)) == P(Eq(X, 1))
assert E(X, X > 3) == 5 == moment(X, 1, 0, X > 3)
assert E(X, Y > 3) == E(X) == moment(X, 1, 0, Y > 3)
assert E(X + Y, Eq(X, Y)) == E(2 * X)
assert moment(X, 0) == 1
assert moment(5 * X, 2) == 25 * moment(X, 2)
assert quantile(X)(p) == Piecewise((nan, (p > S.One) | (p < S(0))),\
(S.One, p <= S(1)/6), (S(2), p <= S(1)/3), (S(3), p <= S.Half),\
(S(4), p <= S(2)/3), (S(5), p <= S(5)/6), (S(6), p <= S.One))
assert P(X > 3, X > 3) == S.One
assert P(X > Y, Eq(Y, 6)) == S.Zero
assert P(Eq(X + Y, 12)) == S.One / 36
assert P(Eq(X + Y, 12), Eq(X, 6)) == S.One / 6
assert density(X + Y) == density(Y + Z) != density(X + X)
d = density(2 * X + Y**Z)
assert d[S(22)] == S.One / 108 and d[S(4100)] == S.One / 216 and S(
3130) not in d
assert pspace(X).domain.as_boolean() == Or(
*[Eq(X.symbol, i) for i in [1, 2, 3, 4, 5, 6]])
assert where(X > 3).set == FiniteSet(4, 5, 6)
assert characteristic_function(X)(t) == exp(6 * I * t) / 6 + exp(
5 * I * t) / 6 + exp(4 * I * t) / 6 + exp(3 * I * t) / 6 + exp(
2 * I * t) / 6 + exp(I * t) / 6
assert moment_generating_function(X)(
t) == exp(6 * t) / 6 + exp(5 * t) / 6 + exp(4 * t) / 6 + exp(
3 * t) / 6 + exp(2 * t) / 6 + exp(t) / 6
def test_dice():
# TODO: Make iid method!
X, Y, Z = Die('X', 6), Die('Y', 6), Die('Z', 6)
a, b, t, p = symbols('a b t p')
assert E(X) == 3 + S.Half
assert variance(X) == S(35)/12
assert E(X + Y) == 7
assert E(X + X) == 7
assert E(a*X + b) == a*E(X) + b
assert variance(X + Y) == variance(X) + variance(Y) == cmoment(X + Y, 2)
assert variance(X + X) == 4 * variance(X) == cmoment(X + X, 2)
assert cmoment(X, 0) == 1
assert cmoment(4*X, 3) == 64*cmoment(X, 3)
assert covariance(X, Y) == S.Zero
assert covariance(X, X + Y) == variance(X)
assert density(Eq(cos(X*S.Pi), 1))[True] == S.Half
assert correlation(X, Y) == 0
assert correlation(X, Y) == correlation(Y, X)
assert smoment(X + Y, 3) == skewness(X + Y)
assert smoment(X, 0) == 1
assert P(X > 3) == S.Half
assert P(2*X > 6) == S.Half
assert P(X > Y) == S(5)/12
assert P(Eq(X, Y)) == P(Eq(X, 1))
assert E(X, X > 3) == 5 == moment(X, 1, 0, X > 3)
assert E(X, Y > 3) == E(X) == moment(X, 1, 0, Y > 3)
assert E(X + Y, Eq(X, Y)) == E(2*X)
assert moment(X, 0) == 1
assert moment(5*X, 2) == 25*moment(X, 2)
assert quantile(X)(p) == Piecewise((nan, (p > S.One) | (p < S(0))),\
(S.One, p <= S(1)/6), (S(2), p <= S(1)/3), (S(3), p <= S.Half),\
(S(4), p <= S(2)/3), (S(5), p <= S(5)/6), (S(6), p <= S.One))
assert P(X > 3, X > 3) == S.One
assert P(X > Y, Eq(Y, 6)) == S.Zero
assert P(Eq(X + Y, 12)) == S.One/36
assert P(Eq(X + Y, 12), Eq(X, 6)) == S.One/6
assert density(X + Y) == density(Y + Z) != density(X + X)
d = density(2*X + Y**Z)
assert d[S(22)] == S.One/108 and d[S(4100)] == S.One/216 and S(3130) not in d
assert pspace(X).domain.as_boolean() == Or(
*[Eq(X.symbol, i) for i in [1, 2, 3, 4, 5, 6]])
assert where(X > 3).set == FiniteSet(4, 5, 6)
assert characteristic_function(X)(t) == exp(6*I*t)/6 + exp(5*I*t)/6 + exp(4*I*t)/6 + exp(3*I*t)/6 + exp(2*I*t)/6 + exp(I*t)/6
assert moment_generating_function(X)(t) == exp(6*t)/6 + exp(5*t)/6 + exp(4*t)/6 + exp(3*t)/6 + exp(2*t)/6 + exp(t)/6
def test_ideal_soliton():
raises(ValueError, lambda: IdealSoliton('sol', -12))
raises(ValueError, lambda: IdealSoliton('sol', 13.2))
raises(ValueError, lambda: IdealSoliton('sol', 0))
f = Function('f')
raises(ValueError, lambda: density(IdealSoliton('sol', 10)).pmf(f))
k = Symbol('k', integer=True, positive=True)
x = Symbol('x', integer=True, positive=True)
t = Symbol('t')
sol = IdealSoliton('sol', k)
assert density(sol).low == S.One
assert density(sol).high == k
assert density(sol).dict == Density(density(sol))
assert density(sol).pmf(x) == Piecewise(
(1 / k, Eq(x, 1)), (1 / (x * (x - 1)), k >= x), (0, True))
k_vals = [5, 20, 50, 100, 1000]
for i in k_vals:
assert E(sol.subs(k, i)) == harmonic(i) == moment(sol.subs(k, i), 1)
assert variance(sol.subs(
k, i)) == (i - 1) + harmonic(i) - harmonic(i)**2 == cmoment(
sol.subs(k, i), 2)
assert skewness(sol.subs(k, i)) == smoment(sol.subs(k, i), 3)
assert kurtosis(sol.subs(k, i)) == smoment(sol.subs(k, i), 4)
assert exp(I * t) / 10 + Sum(exp(I * t * x) / (x * x - x), (x, 2, k)).subs(
k, 10).doit() == characteristic_function(sol.subs(k, 10))(t)
assert exp(t) / 10 + Sum(exp(t * x) / (x * x - x), (x, 2, k)).subs(
k, 10).doit() == moment_generating_function(sol.subs(k, 10))(t)
def test_binomial_symbolic():
n = 2
p = symbols('p', positive=True)
X = Binomial('X', n, p)
t = Symbol('t')
assert simplify(E(X)) == n * p == simplify(moment(X, 1))
assert simplify(variance(X)) == n * p * (1 - p) == simplify(cmoment(X, 2))
assert cancel((skewness(X) - (1 - 2 * p) / sqrt(n * p * (1 - p)))) == 0
assert cancel((kurtosis(X)) - (3 + (1 - 6 * p * (1 - p)) / (n * p *
(1 - p)))) == 0
assert characteristic_function(X)(t) == p**2 * exp(
2 * I * t) + 2 * p * (-p + 1) * exp(I * t) + (-p + 1)**2
assert moment_generating_function(X)(
t) == p**2 * exp(2 * t) + 2 * p * (-p + 1) * exp(t) + (-p + 1)**2
# Test ability to change success/failure winnings
H, T = symbols('H T')
Y = Binomial('Y', n, p, succ=H, fail=T)
assert simplify(E(Y) - (n * (H * p + T * (1 - p)))) == 0
# test symbolic dimensions
n = symbols('n')
B = Binomial('B', n, p)
raises(NotImplementedError, lambda: P(B > 2))
assert density(B).dict == Density(BinomialDistribution(n, p, 1, 0))
assert set(density(B).dict.subs(n, 4).doit().keys()) == \
set([S(0), S(1), S(2), S(3), S(4)])
assert set(density(B).dict.subs(n, 4).doit().values()) == \
set([(1 - p)**4, 4*p*(1 - p)**3, 6*p**2*(1 - p)**2, 4*p**3*(1 - p), p**4])
k = Dummy('k', integer=True)
assert E(B > 2).dummy_eq(
Sum(
Piecewise((k * p**k * (1 - p)**(-k + n) * binomial(n, k), (k >= 0)
& (k <= n) & (k > 2)), (0, True)), (k, 0, n)))
def test_exponential():
rate = Symbol('lambda', positive=True)
X = Exponential('x', rate)
p = Symbol("p", positive=True, real=True, finite=True)
assert E(X) == 1 / rate
assert variance(X) == 1 / rate**2
assert skewness(X) == 2
assert skewness(X) == smoment(X, 3)
assert kurtosis(X) == 9
assert kurtosis(X) == smoment(X, 4)
assert smoment(2 * X, 4) == smoment(X, 4)
assert moment(X, 3) == 3 * 2 * 1 / rate**3
assert P(X > 0) is S.One
assert P(X > 1) == exp(-rate)
assert P(X > 10) == exp(-10 * rate)
assert quantile(X)(p) == -log(1 - p) / rate
assert where(X <= 1).set == Interval(0, 1)
#Test issue 9970
z = Dummy('z')
assert P(X > z) == exp(-z * rate)
assert P(X < z) == 0
#Test issue 10076 (Distribution with interval(0,oo))
x = Symbol('x')
_z = Dummy('_z')
b = SingleContinuousPSpace(x, ExponentialDistribution(2))
expected1 = Integral(2 * exp(-2 * _z), (_z, 3, oo))
assert b.probability(x > 3, evaluate=False).dummy_eq(expected1) is True
expected2 = Integral(2 * exp(-2 * _z), (_z, 0, 4))
assert b.probability(x < 4, evaluate=False).dummy_eq(expected2) is True
def test_dice():
# TODO: Make iid method!
X, Y, Z = Die('X', 6), Die('Y', 6), Die('Z', 6)
a, b = symbols('a b')
assert E(X) == 3 + S.Half
assert variance(X) == S(35) / 12
assert E(X + Y) == 7
assert E(X + X) == 7
assert E(a * X + b) == a * E(X) + b
assert variance(X + Y) == variance(X) + variance(Y) == cmoment(X + Y, 2)
assert variance(X + X) == 4 * variance(X) == cmoment(X + X, 2)
assert cmoment(X, 0) == 1
assert cmoment(4 * X, 3) == 64 * cmoment(X, 3)
assert covariance(X, Y) == S.Zero
assert covariance(X, X + Y) == variance(X)
assert density(Eq(cos(X * S.Pi), 1))[True] == S.Half
assert correlation(X, Y) == 0
assert correlation(X, Y) == correlation(Y, X)
assert smoment(X + Y, 3) == skewness(X + Y)
assert smoment(X, 0) == 1
assert P(X > 3) == S.Half
assert P(2 * X > 6) == S.Half
assert P(X > Y) == S(5) / 12
assert P(Eq(X, Y)) == P(Eq(X, 1))
assert E(X, X > 3) == 5 == moment(X, 1, 0, X > 3)
assert E(X, Y > 3) == E(X) == moment(X, 1, 0, Y > 3)
assert E(X + Y, Eq(X, Y)) == E(2 * X)
assert moment(X, 0) == 1
assert moment(5 * X, 2) == 25 * moment(X, 2)
assert P(X > 3, X > 3) == S.One
assert P(X > Y, Eq(Y, 6)) == S.Zero
assert P(Eq(X + Y, 12)) == S.One / 36
assert P(Eq(X + Y, 12), Eq(X, 6)) == S.One / 6
assert density(X + Y) == density(Y + Z) != density(X + X)
d = density(2 * X + Y**Z)
assert d[S(22)] == S.One / 108 and d[S(4100)] == S.One / 216 and S(
3130) not in d
assert pspace(X).domain.as_boolean() == Or(
*[Eq(X.symbol, i) for i in [1, 2, 3, 4, 5, 6]])
assert where(X > 3).set == FiniteSet(4, 5, 6)
def test_dice():
# TODO: Make iid method!
X, Y, Z = Die('X', 6), Die('Y', 6), Die('Z', 6)
a, b = symbols('a b')
assert E(X) == 3 + S.Half
assert variance(X) == S(35)/12
assert E(X + Y) == 7
assert E(X + X) == 7
assert E(a*X + b) == a*E(X) + b
assert variance(X + Y) == variance(X) + variance(Y) == cmoment(X + Y, 2)
assert variance(X + X) == 4 * variance(X) == cmoment(X + X, 2)
assert cmoment(X, 0) == 1
assert cmoment(4*X, 3) == 64*cmoment(X, 3)
assert covariance(X, Y) == S.Zero
assert covariance(X, X + Y) == variance(X)
assert density(Eq(cos(X*S.Pi), 1))[True] == S.Half
assert correlation(X, Y) == 0
assert correlation(X, Y) == correlation(Y, X)
assert smoment(X + Y, 3) == skewness(X + Y)
assert smoment(X, 0) == 1
assert P(X > 3) == S.Half
assert P(2*X > 6) == S.Half
assert P(X > Y) == S(5)/12
assert P(Eq(X, Y)) == P(Eq(X, 1))
assert E(X, X > 3) == 5 == moment(X, 1, 0, X > 3)
assert E(X, Y > 3) == E(X) == moment(X, 1, 0, Y > 3)
assert E(X + Y, Eq(X, Y)) == E(2*X)
assert moment(X, 0) == 1
assert moment(5*X, 2) == 25*moment(X, 2)
assert P(X > 3, X > 3) == S.One
assert P(X > Y, Eq(Y, 6)) == S.Zero
assert P(Eq(X + Y, 12)) == S.One/36
assert P(Eq(X + Y, 12), Eq(X, 6)) == S.One/6
assert density(X + Y) == density(Y + Z) != density(X + X)
d = density(2*X + Y**Z)
assert d[S(22)] == S.One/108 and d[S(4100)] == S.One/216 and S(3130) not in d
assert pspace(X).domain.as_boolean() == Or(
*[Eq(X.symbol, i) for i in [1, 2, 3, 4, 5, 6]])
assert where(X > 3).set == FiniteSet(4, 5, 6)
def test_robust_soliton():
raises(ValueError, lambda: RobustSoliton('robSol', -12, 0.1, 0.02))
raises(ValueError, lambda: RobustSoliton('robSol', 13, 1.89, 0.1))
raises(ValueError, lambda: RobustSoliton('robSol', 15, 0.6, -2.31))
f = Function('f')
raises(ValueError,
lambda: density(RobustSoliton('robSol', 15, 0.6, 0.1)).pmf(f))
k = Symbol('k', integer=True, positive=True)
delta = Symbol('delta', positive=True)
c = Symbol('c', positive=True)
robSol = RobustSoliton('robSol', k, delta, c)
assert density(robSol).low == 1
assert density(robSol).high == k
k_vals = [10, 20, 50]
delta_vals = [0.2, 0.4, 0.6]
c_vals = [0.01, 0.03, 0.05]
for x in k_vals:
for y in delta_vals:
for z in c_vals:
assert E(robSol.subs({
k: x,
delta: y,
c: z
})) == moment(robSol.subs({
k: x,
delta: y,
c: z
}), 1)
assert variance(robSol.subs({
k: x,
delta: y,
c: z
})) == cmoment(robSol.subs({
k: x,
delta: y,
c: z
}), 2)
assert skewness(robSol.subs({
k: x,
delta: y,
c: z
})) == smoment(robSol.subs({
k: x,
delta: y,
c: z
}), 3)
assert kurtosis(robSol.subs({
k: x,
delta: y,
c: z
})) == smoment(robSol.subs({
k: x,
delta: y,
c: z
}), 4)
def test_multiple_normal():
X, Y = Normal('x', 0, 1), Normal('y', 0, 1)
assert E(X + Y) == 0
assert variance(X + Y) == 2
assert variance(X + X) == 4
assert covariance(X, Y) == 0
assert covariance(2*X + Y, -X) == -2*variance(X)
assert skewness(X) == 0
assert skewness(X + Y) == 0
assert correlation(X, Y) == 0
assert correlation(X, X + Y) == correlation(X, X - Y)
assert moment(X, 2) == 1
assert cmoment(X, 3) == 0
assert moment(X + Y, 4) == 12
assert cmoment(X, 2) == variance(X)
assert smoment(X*X, 2) == 1
assert smoment(X + Y, 3) == skewness(X + Y)
assert E(X, Eq(X + Y, 0)) == 0
assert variance(X, Eq(X + Y, 0)) == S.Half
def test_multiple_normal():
X, Y = Normal('x', 0, 1), Normal('y', 0, 1)
assert E(X + Y) == 0
assert variance(X + Y) == 2
assert variance(X + X) == 4
assert covariance(X, Y) == 0
assert covariance(2*X + Y, -X) == -2*variance(X)
assert skewness(X) == 0
assert skewness(X + Y) == 0
assert correlation(X, Y) == 0
assert correlation(X, X + Y) == correlation(X, X - Y)
assert moment(X, 2) == 1
assert cmoment(X, 3) == 0
assert moment(X + Y, 4) == 12
assert cmoment(X, 2) == variance(X)
assert smoment(X*X, 2) == 1
assert smoment(X + Y, 3) == skewness(X + Y)
assert E(X, Eq(X + Y, 0)) == 0
assert variance(X, Eq(X + Y, 0)) == S.Half
def test_binomial_symbolic():
n = 10 # Because we're using for loops, can't do symbolic n
p = symbols('p', positive=True)
X = Binomial('X', n, p)
assert simplify(E(X)) == n*p == simplify(moment(X, 1))
assert simplify(variance(X)) == n*p*(1 - p) == simplify(cmoment(X, 2))
assert cancel((skewness(X) - (1-2*p)/sqrt(n*p*(1-p)))) == 0
# Test ability to change success/failure winnings
H, T = symbols('H T')
Y = Binomial('Y', n, p, succ=H, fail=T)
assert simplify(E(Y) - (n*(H*p + T*(1 - p)))) == 0
def test_binomial_symbolic():
n = 10 # Because we're using for loops, can't do symbolic n
p = symbols('p', positive=True)
X = Binomial('X', n, p)
assert simplify(E(X)) == n * p == simplify(moment(X, 1))
assert simplify(variance(X)) == n * p * (1 - p) == simplify(cmoment(X, 2))
assert cancel((skewness(X) - (1 - 2 * p) / sqrt(n * p * (1 - p)))) == 0
# Test ability to change success/failure winnings
H, T = symbols('H T')
Y = Binomial('Y', n, p, succ=H, fail=T)
assert simplify(E(Y) - (n * (H * p + T * (1 - p)))) == 0
def test_binomial_symbolic():
n = 10 # Because we're using for loops, can't do symbolic n
p = symbols("p", positive=True)
X = Binomial("X", n, p)
assert simplify(E(X)) == n * p == simplify(moment(X, 1))
assert simplify(variance(X)) == n * p * (1 - p) == simplify(cmoment(X, 2))
assert factor(simplify(skewness(X))) == factor((1 - 2 * p) / sqrt(n * p * (1 - p)))
# Test ability to change success/failure winnings
H, T = symbols("H T")
Y = Binomial("Y", n, p, succ=H, fail=T)
assert simplify(E(Y)) == simplify(n * (H * p + T * (1 - p)))
def test_multiple_normal():
X, Y = Normal('x', 0, 1), Normal('y', 0, 1)
p = Symbol("p", positive=True)
assert E(X + Y) == 0
assert variance(X + Y) == 2
assert variance(X + X) == 4
assert covariance(X, Y) == 0
assert covariance(2*X + Y, -X) == -2*variance(X)
assert skewness(X) == 0
assert skewness(X + Y) == 0
assert correlation(X, Y) == 0
assert correlation(X, X + Y) == correlation(X, X - Y)
assert moment(X, 2) == 1
assert cmoment(X, 3) == 0
assert moment(X + Y, 4) == 12
assert cmoment(X, 2) == variance(X)
assert smoment(X*X, 2) == 1
assert smoment(X + Y, 3) == skewness(X + Y)
assert E(X, Eq(X + Y, 0)) == 0
assert variance(X, Eq(X + Y, 0)) == S.Half
assert quantile(X)(p) == sqrt(2)*erfinv(2*p - S.One)
def test_exponential():
rate = Symbol('lambda', positive=True, real=True, finite=True)
X = Exponential('x', rate)
assert E(X) == 1/rate
assert variance(X) == 1/rate**2
assert skewness(X) == 2
assert skewness(X) == smoment(X, 3)
assert smoment(2*X, 4) == smoment(X, 4)
assert moment(X, 3) == 3*2*1/rate**3
assert P(X > 0) == S(1)
assert P(X > 1) == exp(-rate)
assert P(X > 10) == exp(-10*rate)
assert where(X <= 1).set == Interval(0, 1)
def test_exponential():
rate = Symbol('lambda', positive=True, real=True, finite=True)
X = Exponential('x', rate)
assert E(X) == 1/rate
assert variance(X) == 1/rate**2
assert skewness(X) == 2
assert skewness(X) == smoment(X, 3)
assert smoment(2*X, 4) == smoment(X, 4)
assert moment(X, 3) == 3*2*1/rate**3
assert P(X > 0) == S(1)
assert P(X > 1) == exp(-rate)
assert P(X > 10) == exp(-10*rate)
assert where(X <= 1).set == Interval(0, 1)
def test_binomial_symbolic():
n = 2 # Because we're using for loops, can't do symbolic n
p = symbols('p', positive=True)
X = Binomial('X', n, p)
t = Symbol('t')
assert simplify(E(X)) == n * p == simplify(moment(X, 1))
assert simplify(variance(X)) == n * p * (1 - p) == simplify(cmoment(X, 2))
assert cancel((skewness(X) - (1 - 2 * p) / sqrt(n * p * (1 - p)))) == 0
assert characteristic_function(X)(t) == p**2 * exp(
2 * I * t) + 2 * p * (-p + 1) * exp(I * t) + (-p + 1)**2
# Test ability to change success/failure winnings
H, T = symbols('H T')
Y = Binomial('Y', n, p, succ=H, fail=T)
assert simplify(E(Y) - (n * (H * p + T * (1 - p)))) == 0
def test_binomial_symbolic():
n = 2 # Because we're using for loops, can't do symbolic n
p = symbols('p', positive=True)
X = Binomial('X', n, p)
t = Symbol('t')
assert simplify(E(X)) == n*p == simplify(moment(X, 1))
assert simplify(variance(X)) == n*p*(1 - p) == simplify(cmoment(X, 2))
assert cancel((skewness(X) - (1 - 2*p)/sqrt(n*p*(1 - p)))) == 0
assert characteristic_function(X)(t) == p ** 2 * exp(2 * I * t) + 2 * p * (-p + 1) * exp(I * t) + (-p + 1) ** 2
assert moment_generating_function(X)(t) == p ** 2 * exp(2 * t) + 2 * p * (-p + 1) * exp(t) + (-p + 1) ** 2
# Test ability to change success/failure winnings
H, T = symbols('H T')
Y = Binomial('Y', n, p, succ=H, fail=T)
assert simplify(E(Y) - (n*(H*p + T*(1 - p)))) == 0
def test_gamma():
k = Symbol("k", positive=True)
theta = Symbol("theta", positive=True)
X = Gamma("x", k, theta)
assert density(X)(x) == x ** (k - 1) * theta ** (-k) * exp(-x / theta) / gamma(k)
assert cdf(X, meijerg=True)(z) == Piecewise(
(-k * lowergamma(k, 0) / gamma(k + 1) + k * lowergamma(k, z / theta) / gamma(k + 1), z >= 0), (0, True)
)
# assert simplify(variance(X)) == k*theta**2 # handled numerically below
assert E(X) == moment(X, 1)
k, theta = symbols("k theta", real=True, finite=True, positive=True)
X = Gamma("x", k, theta)
assert simplify(E(X)) == k * theta
# can't get things to simplify on this one so we use subs
assert variance(X).subs(k, 5) == (k * theta ** 2).subs(k, 5)
def test_gamma():
k = Symbol("k", positive=True)
theta = Symbol("theta", positive=True)
X = Gamma('x', k, theta)
assert density(X)(x) == x**(k - 1)*theta**(-k)*exp(-x/theta)/gamma(k)
assert cdf(X, meijerg=True)(z) == Piecewise(
(-k*lowergamma(k, 0)/gamma(k + 1) +
k*lowergamma(k, z/theta)/gamma(k + 1), z >= 0),
(0, True))
# assert simplify(variance(X)) == k*theta**2 # handled numerically below
assert E(X) == moment(X, 1)
k, theta = symbols('k theta', real=True, finite=True, positive=True)
X = Gamma('x', k, theta)
assert simplify(E(X)) == k*theta
# can't get things to simplify on this one so we use subs
assert variance(X).subs(k, 5) == (k*theta**2).subs(k, 5)
def test_gamma():
k = Symbol("k", positive=True)
theta = Symbol("theta", positive=True)
X = Gamma('x', k, theta)
assert density(X)(x) == x**(k - 1)*theta**(-k)*exp(-x/theta)/gamma(k)
assert cdf(X, meijerg=True)(z) == Piecewise(
(-k*lowergamma(k, 0)/gamma(k + 1) +
k*lowergamma(k, z/theta)/gamma(k + 1), z >= 0),
(0, True))
# assert simplify(variance(X)) == k*theta**2 # handled numerically below
assert E(X) == moment(X, 1)
k, theta = symbols('k theta', real=True, finite=True, positive=True)
X = Gamma('x', k, theta)
assert E(X) == k*theta
assert variance(X) == k*theta**2
assert simplify(skewness(X)) == 2/sqrt(k)
def test_gamma():
k = Symbol("k", positive=True)
theta = Symbol("theta", positive=True)
X = Gamma('x', k, theta)
assert density(X)(x) == x**(k - 1) * theta**(-k) * exp(
-x / theta) / gamma(k)
assert cdf(X, meijerg=True)(z) == Piecewise(
(-k * lowergamma(k, 0) / gamma(k + 1) +
k * lowergamma(k, z / theta) / gamma(k + 1), z >= 0), (0, True))
# assert simplify(variance(X)) == k*theta**2 # handled numerically below
assert E(X) == moment(X, 1)
k, theta = symbols('k theta', real=True, finite=True, positive=True)
X = Gamma('x', k, theta)
assert E(X) == k * theta
assert variance(X) == k * theta**2
assert simplify(skewness(X)) == 2 / sqrt(k)
def test_exponential():
rate = Symbol('lambda', positive=True)
X = Exponential('x', rate)
p = Symbol("p", positive=True, real=True, finite=True)
assert E(X) == 1 / rate
assert variance(X) == 1 / rate**2
assert skewness(X) == 2
assert skewness(X) == smoment(X, 3)
assert kurtosis(X) == 9
assert kurtosis(X) == smoment(X, 4)
assert smoment(2 * X, 4) == smoment(X, 4)
assert moment(X, 3) == 3 * 2 * 1 / rate**3
assert P(X > 0) is S.One
assert P(X > 1) == exp(-rate)
assert P(X > 10) == exp(-10 * rate)
assert quantile(X)(p) == -log(1 - p) / rate
assert where(X <= 1).set == Interval(0, 1)
def test_gamma():
k = Symbol("k", positive=True)
theta = Symbol("theta", positive=True)
X = Gamma('x', k, theta)
# Tests characteristic function
assert characteristic_function(X)(x) == ((-I * theta * x + 1)**(-k))
assert density(X)(x) == x**(k - 1) * theta**(-k) * exp(
-x / theta) / gamma(k)
assert cdf(X, meijerg=True)(z) == Piecewise(
(-k * lowergamma(k, 0) / gamma(k + 1) +
k * lowergamma(k, z / theta) / gamma(k + 1), z >= 0), (0, True))
# assert simplify(variance(X)) == k*theta**2 # handled numerically below
assert E(X) == moment(X, 1)
k, theta = symbols('k theta', positive=True)
X = Gamma('x', k, theta)
assert E(X) == k * theta
assert variance(X) == k * theta**2
assert skewness(X).expand() == 2 / sqrt(k)
assert kurtosis(X).expand() == 3 + 6 / k
def test_moment_constant():
assert moment(3, 0) == 1
assert moment(3, 1) == 3
assert moment(3, 2) == 9
x = Symbol('x')
assert moment(x, 2) == x**2
def test_dice():
# TODO: Make iid method!
X, Y, Z = Die('X', 6), Die('Y', 6), Die('Z', 6)
a, b, t, p = symbols('a b t p')
assert E(X) == 3 + S.Half
assert variance(X) == S(35) / 12
assert E(X + Y) == 7
assert E(X + X) == 7
assert E(a * X + b) == a * E(X) + b
assert variance(X + Y) == variance(X) + variance(Y) == cmoment(X + Y, 2)
assert variance(X + X) == 4 * variance(X) == cmoment(X + X, 2)
assert cmoment(X, 0) == 1
assert cmoment(4 * X, 3) == 64 * cmoment(X, 3)
assert covariance(X, Y) == S.Zero
assert covariance(X, X + Y) == variance(X)
assert density(Eq(cos(X * S.Pi), 1))[True] == S.Half
assert correlation(X, Y) == 0
assert correlation(X, Y) == correlation(Y, X)
assert smoment(X + Y, 3) == skewness(X + Y)
assert smoment(X + Y, 4) == kurtosis(X + Y)
assert smoment(X, 0) == 1
assert P(X > 3) == S.Half
assert P(2 * X > 6) == S.Half
assert P(X > Y) == S(5) / 12
assert P(Eq(X, Y)) == P(Eq(X, 1))
assert E(X, X > 3) == 5 == moment(X, 1, 0, X > 3)
assert E(X, Y > 3) == E(X) == moment(X, 1, 0, Y > 3)
assert E(X + Y, Eq(X, Y)) == E(2 * X)
assert moment(X, 0) == 1
assert moment(5 * X, 2) == 25 * moment(X, 2)
assert quantile(X)(p) == Piecewise((nan, (p > S.One) | (p < S(0))),\
(S.One, p <= S(1)/6), (S(2), p <= S(1)/3), (S(3), p <= S.Half),\
(S(4), p <= S(2)/3), (S(5), p <= S(5)/6), (S(6), p <= S.One))
assert P(X > 3, X > 3) == S.One
assert P(X > Y, Eq(Y, 6)) == S.Zero
assert P(Eq(X + Y, 12)) == S.One / 36
assert P(Eq(X + Y, 12), Eq(X, 6)) == S.One / 6
assert density(X + Y) == density(Y + Z) != density(X + X)
d = density(2 * X + Y**Z)
assert d[S(22)] == S.One / 108 and d[S(4100)] == S.One / 216 and S(
3130) not in d
assert pspace(X).domain.as_boolean() == Or(
*[Eq(X.symbol, i) for i in [1, 2, 3, 4, 5, 6]])
assert where(X > 3).set == FiniteSet(4, 5, 6)
assert characteristic_function(X)(t) == exp(6 * I * t) / 6 + exp(
5 * I * t) / 6 + exp(4 * I * t) / 6 + exp(3 * I * t) / 6 + exp(
2 * I * t) / 6 + exp(I * t) / 6
assert moment_generating_function(X)(
t) == exp(6 * t) / 6 + exp(5 * t) / 6 + exp(4 * t) / 6 + exp(
3 * t) / 6 + exp(2 * t) / 6 + exp(t) / 6
# Bayes test for die
BayesTest(X > 3, X + Y < 5)
BayesTest(Eq(X - Y, Z), Z > Y)
BayesTest(X > 3, X > 2)
# arg test for die
raises(ValueError, lambda: Die('X', -1)) # issue 8105: negative sides.
raises(ValueError, lambda: Die('X', 0))
raises(ValueError, lambda: Die('X', 1.5)) # issue 8103: non integer sides.
# symbolic test for die
n, k = symbols('n, k', positive=True)
D = Die('D', n)
dens = density(D).dict
assert dens == Density(DieDistribution(n))
assert set(dens.subs(n, 4).doit().keys()) == set([1, 2, 3, 4])
assert set(dens.subs(n, 4).doit().values()) == set([S(1) / 4])
k = Dummy('k', integer=True)
assert E(D).dummy_eq(Sum(Piecewise((k / n, k <= n), (0, True)), (k, 1, n)))
assert variance(D).subs(n, 6).doit() == S(35) / 12
ki = Dummy('ki')
cumuf = cdf(D)(k)
assert cumuf.dummy_eq(
Sum(Piecewise((1 / n, (ki >= 1) & (ki <= n)), (0, True)), (ki, 1, k)))
assert cumuf.subs({n: 6, k: 2}).doit() == S(1) / 3
t = Dummy('t')
cf = characteristic_function(D)(t)
assert cf.dummy_eq(
Sum(Piecewise((exp(ki * I * t) / n, (ki >= 1) & (ki <= n)), (0, True)),
(ki, 1, n)))
assert cf.subs(
n,
3).doit() == exp(3 * I * t) / 3 + exp(2 * I * t) / 3 + exp(I * t) / 3
mgf = moment_generating_function(D)(t)
assert mgf.dummy_eq(
Sum(Piecewise((exp(ki * t) / n, (ki >= 1) & (ki <= n)), (0, True)),
(ki, 1, n)))
assert mgf.subs(n,
3).doit() == exp(3 * t) / 3 + exp(2 * t) / 3 + exp(t) / 3
