def test_check_exception_is_raised(self): """ Test that the expected results are returned for the bounds_pairing. """ cube_name = "nonsense" cube_units = Unit("degreesC") msg = "The bounds_pairing_key" with self.assertRaisesRegex(KeyError, msg): get_bounds_of_distribution(cube_name, cube_units)
def test_check_data(self): """ Test that the expected results are returned for the bounds_pairing. """ cube_name = "air_temperature" cube_units = Unit("degreesC") bounds_pairing = (-40, 50) result = (get_bounds_of_distribution(cube_name, cube_units)) self.assertArrayAlmostEqual(result, bounds_pairing)
def process(self, forecast_at_percentiles, no_of_percentiles=None, sampling="quantile"): """ 1. Concatenates cubes with a percentile coordinate. 2. Creates a list of percentiles. 3. Accesses the lower and upper bound pair of the forecast values, in order to specify lower and upper bounds for the percentiles. 4. Interpolate the percentile coordinate into an alternative set of percentiles using linear interpolation. Args: forecast_at_percentiles (Iris CubeList or Iris Cube): Cube or CubeList expected to contain a percentile coordinate. no_of_percentiles (Integer or None): Number of percentiles If None, the number of percentiles within the input forecast_at_percentiles cube is used as the number of percentiles. sampling (String): Type of sampling of the distribution to produce a set of percentiles e.g. quantile or random. Accepted options for sampling are: * Quantile: A regular set of equally-spaced percentiles aimed at dividing a Cumulative Distribution Function into blocks of equal probability. * Random: A random set of ordered percentiles. Returns: forecast_at_percentiles (iris.cube.Cube): Cube with forecast values at the desired set of percentiles. The percentile coordinate is always the zeroth dimension. """ forecast_at_percentiles = concatenate_cubes(forecast_at_percentiles) percentile_coord = ( find_percentile_coordinate(forecast_at_percentiles).name()) if no_of_percentiles is None: no_of_percentiles = ( len(forecast_at_percentiles.coord( percentile_coord).points)) percentiles = choose_set_of_percentiles( no_of_percentiles, sampling=sampling) cube_units = forecast_at_percentiles.units bounds_pairing = ( get_bounds_of_distribution( forecast_at_percentiles.name(), cube_units)) forecast_at_percentiles = self._interpolate_percentiles( forecast_at_percentiles, percentiles, bounds_pairing, percentile_coord) return forecast_at_percentiles
def process(self, forecast_probabilities, no_of_percentiles=None, sampling="quantile"): """ 1. Concatenates cubes with a threshold coordinate. 2. Creates a list of percentiles. 3. Accesses the lower and upper bound pair to find the ends of the cumulative distribution function. 4. Convert the threshold coordinate into values at a set of percentiles using linear interpolation, see Figure 1 from Flowerdew, 2014. Parameters ---------- forecast_probabilities : Iris CubeList or Iris Cube Cube or CubeList expected to contain a threshold coordinate. no_of_percentiles : Integer or None Number of percentiles If None, the number of thresholds within the input forecast_probabilities cube is used as the number of percentiles. sampling : String Type of sampling of the distribution to produce a set of percentiles e.g. quantile or random. Accepted options for sampling are: Quantile: A regular set of equally-spaced percentiles aimed at dividing a Cumulative Distribution Function into blocks of equal probability. Random: A random set of ordered percentiles. Returns ------- forecast_at_percentiles : Iris cube Cube with forecast values at the desired set of percentiles. The threshold coordinate is always the zeroth dimension. """ forecast_probabilities = concatenate_cubes(forecast_probabilities) threshold_coord = forecast_probabilities.coord("threshold") phenom_name = (forecast_probabilities.name().replace( "probability_of_", "")) if no_of_percentiles is None: no_of_percentiles = (len( forecast_probabilities.coord(threshold_coord.name()).points)) percentiles = choose_set_of_percentiles(no_of_percentiles, sampling=sampling) cube_units = (forecast_probabilities.coord( threshold_coord.name()).units) bounds_pairing = (get_bounds_of_distribution(phenom_name, cube_units)) forecast_at_percentiles = self._probabilities_to_percentiles( forecast_probabilities, percentiles, bounds_pairing) return forecast_at_percentiles
def test_check_unit_conversion(self): """ Test that the expected results are returned for the bounds_pairing, if the units of the bounds_pairings need to be converted to match the units of the forecast. """ cube_name = "air_temperature" cube_units = Unit("fahrenheit") bounds_pairing = (-40, 122) # In fahrenheit result = (get_bounds_of_distribution(cube_name, cube_units)) self.assertArrayAlmostEqual(result, bounds_pairing)
def process(self, forecast_probabilities, no_of_percentiles=None, percentiles=None, sampling="quantile"): """ 1. Concatenates cubes with a threshold coordinate. 2. Creates a list of percentiles. 3. Accesses the lower and upper bound pair to find the ends of the cumulative distribution function. 4. Convert the threshold coordinate into values at a set of percentiles using linear interpolation, see Figure 1 from Flowerdew, 2014. Args: forecast_probabilities (Iris CubeList or Iris Cube): Cube or CubeList expected to contain a threshold coordinate. no_of_percentiles (Integer or None): Number of percentiles. If None and percentiles is not set, the number of thresholds within the input forecast_probabilities cube is used as the number of percentiles. This argument is mutually exclusive with percentiles. percentiles (list of floats): The desired percentile values in the interval [0, 100]. This argument is mutually exclusive with no_of_percentiles. sampling (String): Type of sampling of the distribution to produce a set of percentiles e.g. quantile or random. Accepted options for sampling are: * Quantile: A regular set of equally-spaced percentiles aimed at dividing a Cumulative Distribution Function into blocks of equal probability. * Random: A random set of ordered percentiles. Returns: forecast_at_percentiles (Iris cube): Cube with forecast values at the desired set of percentiles. The threshold coordinate is always the zeroth dimension. """ if no_of_percentiles is not None and percentiles is not None: raise ValueError( "Cannot specify both no_of_percentiles and percentiles to " "GeneratePercentilesFromProbabilities") forecast_probabilities = concatenate_cubes( forecast_probabilities, coords_to_slice_over="threshold", coordinates_for_association=[]) threshold_coord = forecast_probabilities.coord("threshold") phenom_name = (forecast_probabilities.name().replace( "probability_of_", "")) if no_of_percentiles is None: no_of_percentiles = (len( forecast_probabilities.coord(threshold_coord.name()).points)) if percentiles is None: percentiles = choose_set_of_percentiles(no_of_percentiles, sampling=sampling) elif not isinstance(percentiles, (tuple, list)): percentiles = [percentiles] percentiles = np.array(percentiles, dtype=np.float32) cube_units = (forecast_probabilities.coord( threshold_coord.name()).units) bounds_pairing = (get_bounds_of_distribution(phenom_name, cube_units)) # If a cube still has multiple realizations, slice over these to reduce # the memory requirements into manageable chunks. try: slices_over_realization = forecast_probabilities.slices_over( "realization") except CoordinateNotFoundError: slices_over_realization = [forecast_probabilities] cubelist = iris.cube.CubeList([]) for cube_realization in slices_over_realization: cubelist.append( self._probabilities_to_percentiles(cube_realization, percentiles, bounds_pairing)) forecast_at_percentiles = cubelist.merge_cube() return forecast_at_percentiles
def test_basic(self): """Test that the result is a numpy array.""" cube_name = "air_temperature" cube_units = Unit("degreesC") result = get_bounds_of_distribution(cube_name, cube_units) self.assertIsInstance(result, np.ndarray)