chaospy.ExponentialWeibull¶

class chaospy.ExponentialWeibull(alpha=1, kappa=1, scale=1, shift=0)[source]¶

Exponential Weibull distribution.

Args:

alpha (float, Distribution):: First shape parameter
kappa (float, Distribution):: Second shape parameter
scale (float, Distribution):: Scaling parameter
shift (float, Distribution):: Location parameter

Examples:

>>> distribution = chaospy.ExponentialWeibull(alpha=2, kappa=3)
>>> distribution
ExponentialWeibull(2, 3)
>>> uloc = numpy.linspace(0, 1, 6)
>>> uloc
array([0. , 0.2, 0.4, 0.6, 0.8, 1. ])
>>> xloc = distribution.inv(uloc)
>>> xloc.round(3)
array([0.   , 0.84 , 1.   , 1.142, 1.31 , 3.275])
>>> numpy.allclose(distribution.fwd(xloc), uloc)
True
>>> distribution.pdf(xloc).round(3)
array([0.   , 1.047, 1.396, 1.367, 0.972, 0.   ])
>>> distribution.sample(4).round(3)
array([1.182, 0.745, 1.544, 1.058])

__init__(alpha=1, kappa=1, scale=1, shift=0)[source]¶

Distribution initializer.

In addition to assigning some object variables, also checks for some consistency issues.

Args:

parameters (Optional[Distribution[str, Union[ndarray, Distribution]]]):: Collection of model parameters.
dependencies (Optional[Sequence[Set[int]]]):: Dependency identifiers. One collection for each dimension.
rotation (Optional[Sequence[int]]):: The order of which to resolve dependencies.
exclusion (Optional[Sequence[int]]):: Distributions that has been “taken out of play” and therefore can not be reused other places in the dependency hierarchy.
repr_args (Optional[Sequence[str]]):: Positional arguments to place in the object string representation. The repr output will then be: <class name>(<arg1>, <arg2>, …).

Raises:

StochasticallyDependentError:: For dependency structures that can not later be rectified. This include under-defined distributions, and inclusion of distributions that should be exclusion.

Methods

`pdf`(x_data[, decompose, allow_approx, step_size])	Probability density function.
`cdf`(x_data)	Cumulative distribution function.
`fwd`(x_data)	Forward Rosenblatt transformation.
`inv`(q_data[, max_iterations, tollerance])	Inverse Rosenblatt transformation.
`sample`([size, rule, antithetic, ...])	Create pseudo-random generated samples.
`mom`(K[, allow_approx])	Raw statistical moments.
`ttr`(kloc)	Three terms relation's coefficient generator.

Attributes

`interpret_as_integer`	Flag indicating that return value from the methods sample, and inv should be interpreted as integers instead of floating point.
`lower`	Lower bound for the distribution.
`stochastic_dependent`	True if distribution contains stochastically dependent components.
`upper`	Upper bound for the distribution.