"""Lowess - wrapper for cythonized extension

Author : Chris Jordan-Squire
Author : Carl Vogel
Author : Josef Perktold

"""

import numpy as np
from ._smoothers_lowess import lowess as _lowess

def lowess(endog, exog, frac=2.0/3.0, it=3, delta=0.0, xvals=None, is_sorted=False,
           missing='drop', return_sorted=True):
    '''LOWESS (Locally Weighted Scatterplot Smoothing)

    A lowess function that outs smoothed estimates of endog
    at the given exog values from points (exog, endog)

    Parameters
    ----------
    endog : 1-D numpy array
        The y-values of the observed points
    exog : 1-D numpy array
        The x-values of the observed points
    frac : float
        Between 0 and 1. The fraction of the data used
        when estimating each y-value.
    it : int
        The number of residual-based reweightings
        to perform.
    delta : float
        Distance within which to use linear-interpolation
        instead of weighted regression.
    xvals: 1-D numpy array
        Values of the exogenous variable at which to evaluate the regression.
        If supplied, cannot use delta.
    is_sorted : bool
        If False (default), then the data will be sorted by exog before
        calculating lowess. If True, then it is assumed that the data is
        already sorted by exog. If xvals is specified, then it too must be
        sorted if is_sorted is True.
    missing : str
        Available options are 'none', 'drop', and 'raise'. If 'none', no nan
        checking is done. If 'drop', any observations with nans are dropped.
        If 'raise', an error is raised. Default is 'drop'.
    return_sorted : bool
        If True (default), then the returned array is sorted by exog and has
        missing (nan or infinite) observations removed.
        If False, then the returned array is in the same length and the same
        sequence of observations as the input array.

    Returns
    -------
    out : {ndarray, float}
        The returned array is two-dimensional if return_sorted is True, and
        one dimensional if return_sorted is False.
        If return_sorted is True, then a numpy array with two columns. The
        first column contains the sorted x (exog) values and the second column
        the associated estimated y (endog) values.
        If return_sorted is False, then only the fitted values are returned,
        and the observations will be in the same order as the input arrays.
        If xvals is provided, then return_sorted is ignored and the returned
        array is always one dimensional, containing the y values fitted at
        the x values provided by xvals.

    Notes
    -----
    This lowess function implements the algorithm given in the
    reference below using local linear estimates.

    Suppose the input data has N points. The algorithm works by
    estimating the `smooth` y_i by taking the frac*N closest points
    to (x_i,y_i) based on their x values and estimating y_i
    using a weighted linear regression. The weight for (x_j,y_j)
    is tricube function applied to abs(x_i-x_j).

    If it > 1, then further weighted local linear regressions
    are performed, where the weights are the same as above
    times the _lowess_bisquare function of the residuals. Each iteration
    takes approximately the same amount of time as the original fit,
    so these iterations are expensive. They are most useful when
    the noise has extremely heavy tails, such as Cauchy noise.
    Noise with less heavy-tails, such as t-distributions with df>2,
    are less problematic. The weights downgrade the influence of
    points with large residuals. In the extreme case, points whose
    residuals are larger than 6 times the median absolute residual
    are given weight 0.

    `delta` can be used to save computations. For each `x_i`, regressions
    are skipped for points closer than `delta`. The next regression is
    fit for the farthest point within delta of `x_i` and all points in
    between are estimated by linearly interpolating between the two
    regression fits.

    Judicious choice of delta can cut computation time considerably
    for large data (N > 5000). A good choice is ``delta = 0.01 * range(exog)``.

    If `xvals` is provided, the regression is then computed at those points
    and the fit values are returned. Otherwise, the regression is run
    at points of `exog`.

    Some experimentation is likely required to find a good
    choice of `frac` and `iter` for a particular dataset.

    References
    ----------
    Cleveland, W.S. (1979) "Robust Locally Weighted Regression
    and Smoothing Scatterplots". Journal of the American Statistical
    Association 74 (368): 829-836.

    Examples
    --------
    The below allows a comparison between how different the fits from
    lowess for different values of frac can be.

    >>> import numpy as np
    >>> import statsmodels.api as sm
    >>> lowess = sm.nonparametric.lowess
    >>> x = np.random.uniform(low = -2*np.pi, high = 2*np.pi, size=500)
    >>> y = np.sin(x) + np.random.normal(size=len(x))
    >>> z = lowess(y, x)
    >>> w = lowess(y, x, frac=1./3)

    This gives a similar comparison for when it is 0 vs not.

    >>> import numpy as np
    >>> import scipy.stats as stats
    >>> import statsmodels.api as sm
    >>> lowess = sm.nonparametric.lowess
    >>> x = np.random.uniform(low = -2*np.pi, high = 2*np.pi, size=500)
    >>> y = np.sin(x) + stats.cauchy.rvs(size=len(x))
    >>> z = lowess(y, x, frac= 1./3, it=0)
    >>> w = lowess(y, x, frac=1./3)

    '''

    endog = np.asarray(endog, float)
    exog = np.asarray(exog, float)

    # Whether xvals argument was provided
    given_xvals = (xvals is not None)

    # Inputs should be vectors (1-D arrays) of the
    # same length.
    if exog.ndim != 1:
        raise ValueError('exog must be a vector')
    if endog.ndim != 1:
        raise ValueError('endog must be a vector')
    if endog.shape[0] != exog.shape[0] :
        raise ValueError('exog and endog must have same length')

    if xvals is not None:
        xvals = np.ascontiguousarray(xvals)
        if xvals.ndim != 1:
            raise ValueError('exog_predict must be a vector')

    if missing in ['drop', 'raise']:
        mask_valid = (np.isfinite(exog) & np.isfinite(endog))
        all_valid = np.all(mask_valid)
        if all_valid:
            y = endog
            x = exog
        else:
            if missing == 'drop':
                x = exog[mask_valid]
                y = endog[mask_valid]
            else:
                raise ValueError('nan or inf found in data')
    elif missing == 'none':
        y = endog
        x = exog
        all_valid = True   # we assume it's true if missing='none'
    else:
        raise ValueError("missing can only be 'none', 'drop' or 'raise'")

    if not is_sorted:
        # Sort both inputs according to the ascending order of x values
        sort_index = np.argsort(x)
        x = np.array(x[sort_index])
        y = np.array(y[sort_index])

    if not given_xvals:
        # If given no explicit x values, we use the x-values in the exog array
        xvals = exog
        xvalues = x

        xvals_all_valid = all_valid
        if missing == 'drop':
            xvals_mask_valid = mask_valid
    else:
        if delta != 0.0:
            raise ValueError("Cannot have non-zero 'delta' and 'xvals' values")
            # TODO: allow this again
        mask_valid = np.isfinite(xvals)
        if missing == "raise":
            raise ValueError("NaN values in xvals with missing='raise'")
        elif missing == 'drop':
            xvals_mask_valid = mask_valid

        xvalues = xvals
        xvals_all_valid = True if missing == "none" else np.all(mask_valid)
        # With explicit xvals, we ignore 'return_sorted' and always
        # use the order provided
        return_sorted = False

        if missing in ['drop', 'raise']:
            xvals_mask_valid = np.isfinite(xvals)
            xvals_all_valid = np.all(xvals_mask_valid)
            if xvals_all_valid:
                xvalues = xvals
            else:
                if missing == 'drop':
                    xvalues = xvals[xvals_mask_valid]
                else:
                    raise ValueError("nan or inf found in xvals")

        if not is_sorted:
            sort_index = np.argsort(xvalues)
            xvalues = np.array(xvalues[sort_index])
        else:
            xvals_all_valid = True
    y = np.ascontiguousarray(y)
    x = np.ascontiguousarray(x)
    if not given_xvals:
        # Run LOWESS on the data points
        res, _ = _lowess(y, x, x, np.ones_like(x),
                        frac=frac, it=it, delta=delta, given_xvals=False)
    else:
        # First run LOWESS on the data points to get the weights of the data points
        # using it-1 iterations, last iter done next
        if it > 0:
            _, weights = _lowess(y, x, x, np.ones_like(x),
                                frac=frac, it=it-1, delta=delta, given_xvals=False)
        else:
            weights = np.ones_like(x)
        xvalues = np.ascontiguousarray(xvalues, dtype=float)
        # Then run once more using those supplied weights at the points provided by xvals
        # No extra iterations are performed here since weights are fixed
        res, _ = _lowess(y, x, xvalues, weights,
                        frac=frac, it=0, delta=delta, given_xvals=True)

    _, yfitted = res.T

    if return_sorted:
        return res
    else:

        # rebuild yfitted with original indices
        # a bit messy: y might have been selected twice
        if not is_sorted:
            yfitted_ = np.empty_like(xvalues)
            yfitted_.fill(np.nan)
            yfitted_[sort_index] = yfitted
            yfitted = yfitted_
        else:
            yfitted = yfitted

        if not xvals_all_valid:
            yfitted_ = np.empty_like(xvals)
            yfitted_.fill(np.nan)
            yfitted_[xvals_mask_valid] = yfitted
            yfitted = yfitted_

        # we do not need to return exog anymore
        return yfitted