#!/usr/bin/env python3 """ Utilities for analytic description of parameter-dependent model attributes. This module provides classes and helper functions useful for least-squares regression and general handling of model functions. """ from itertools import chain, combinations import logging import numpy as np import os import re from scipy import optimize from .utils import is_numeric logger = logging.getLogger(__name__) def powerset(iterable): """ Return powerset of `iterable` elements. Example: `powerset([1, 2])` -> `[(), (1), (2), (1, 2)]` """ s = list(iterable) return chain.from_iterable(combinations(s, r) for r in range(len(s) + 1)) def gplearn_to_function(function_str: str): """ Convert gplearn-style function string to Python function. Takes a function string like "mul(add(X0, X1), X2)" and returns a Python function implementing the specified behaviour, e.g. "lambda x, y, z: (x + y) * z". Supported functions: add -- x + y sub -- x - y mul -- x * y div -- x / y if |y| > 0.001, otherwise 1 sqrt -- sqrt(|x|) log -- log(|x|) if |x| > 0.001, otherwise 0 inv -- 1 / x if |x| > 0.001, otherwise 0 """ eval_globals = { "add": lambda x, y: x + y, "sub": lambda x, y: x - y, "mul": lambda x, y: x * y, "div": lambda x, y: np.divide(x, y) if np.abs(y) > 0.001 else 1.0, "sqrt": lambda x: np.sqrt(np.abs(x)), "log": lambda x: np.log(np.abs(x)) if np.abs(x) > 0.001 else 0.0, "inv": lambda x: 1.0 / x if np.abs(x) > 0.001 else 0.0, } last_arg_index = 0 for i in range(0, 100): if function_str.find("X{:d}".format(i)) >= 0: last_arg_index = i arg_list = [] for i in range(0, last_arg_index + 1): arg_list.append("X{:d}".format(i)) eval_str = "lambda {}, *whatever: {}".format(",".join(arg_list), function_str) logger.debug(eval_str) return eval(eval_str, eval_globals) class ParamFunction: """ A one-dimensional model function, ready for least squares optimization and similar. Supports validity checks (e.g. if it is undefined for x <= 0) and an error measure. """ def __init__(self, param_function, validation_function, num_vars, repr_str=None): """ Create function object suitable for regression analysis. This documentation assumes that 1-dimensional functions (-> single float as model input) are used. However, n-dimensional functions (-> list of float as model input) are also supported. :param param_function: regression function (reg_param, model_param) -> float. reg_param is a list of regression variable values, model_param is the model input value (float). Example: `lambda rp, mp: rp[0] + rp[1] * mp` :param validation_function: function used to check whether param_function is defined for a given model_param. Signature: model_param -> bool Example: `lambda mp: mp > 0` :param num_vars: How many regression variables are used by this function, i.e., the length of param_function's reg_param argument. """ self._param_function = param_function self._validation_function = validation_function self._num_variables = num_vars self.repr_str = repr_str def __repr__(self) -> str: if self.repr_str: return f"ParamFunction<{self.repr_str}>" return f"ParamFunction<{self._param_function}, {self.validation_function}, {self._num_variables}>" def is_valid(self, arg: float) -> bool: """ Check whether the regression function is defined for the given argument. :param arg: argument (e.g. model parameter) to check for :returns: True iff the function is defined for `arg` """ return self._validation_function(arg) def eval(self, param: list, arg: float) -> float: """ Evaluate regression function. :param param: regression variable values (list of float) :param arg: model input (float) :returns: regression function output (float) """ return self._param_function(param, arg) def error_function(self, P: list, X: float, y: float) -> float: """ Calculate model error. :param P: regression variables as returned by optimization (list of float) :param X: model input (float) :param y: expected model output / ground truth for model input (float) :returns: Deviation between model output and ground truth (float) """ return self._param_function(P, X) - y class NormalizationFunction: """ Wrapper for parameter normalization functions used in YAML PTA/DFA models. """ def __init__(self, function_str: str): """ Create a new normalization function from `function_str`. :param function_str: Function string. Must use the single argument `param` and return a float. """ self._function_str = function_str self._function = eval("lambda param: " + function_str) def eval(self, param_value: float) -> float: """ Evaluate the normalization function and return its output. :param param_value: Parameter value """ return self._function(param_value) class ModelFunction: """ Encapsulates the behaviour of a single model attribute, e.g. TX power or write duration. The behaviour may be constant or depend on a number of factors. Modelfunction is a virtual base class, individuel decendents describe actual behaviour. Common attributes: :param value: median data value :type value: float :param value_error: static model value error :type value_error: dict, optional :param function_error: model error :type value_error: dict, optional """ def __init__(self, value): # a model always has a static (median/mean) value. For StaticFunction, it's the only data point. # For more complex models, it's usede both as fallback in case the model cannot predict the current # parameter combination, and for use cases requiring static models self.value = value # A ModelFunction may track its own accuracy, both of the static value and of the eval() method. # However, it does not specify how the accuracy was calculated (e.g. which data was used and whether cross-validation was performed) self.value_error = None self.function_error = None def is_predictable(self, param_list): raise NotImplementedError def eval(self, param_list): raise NotImplementedError def eval_mae(self, param_list): """Return model Mean Absolute Error (MAE) for `param_list`.""" if self.is_predictable(param_list): return self.function_error["mae"] return self.value_error["mae"] def webconf_function_map(self): return list() def to_json(self, **kwargs): """Convert model to JSON.""" ret = { "value": self.value, "valueError": self.value_error, "functionError": self.function_error, } return ret @classmethod def from_json(cls, data): """ Create ModelFunction instance from JSON. Delegates to StaticFunction, SplitFunction, etc. as appropriate. """ if data["type"] == "static": mf = StaticFunction.from_json(data) elif data["type"] == "split": mf = SplitFunction.from_json(data) elif data["type"] == "analytic": mf = AnalyticFunction.from_json(data) else: raise ValueError("Unknown ModelFunction type: " + data["type"]) if "valueError" in data: mf.value_error = data["valueError"] if "functionError" in data: mf.function_error = data["functionError"] return mf @classmethod def from_json_maybe(cls, json_wrapped: dict, attribute: str): # Legacy Code for PTA / tests. Do not use. if type(json_wrapped) is dict and attribute in json_wrapped: # benchmark data obtained before 2021-03-04 uses {"attr": {"static": 0}} # benchmark data obtained after 2021-03-04 uses {"attr": {"type": "static", "value": 0}} or {"attr": None} # from_json expects the latter. if json_wrapped[attribute] is None: return None if ( "static" in json_wrapped[attribute] and "type" not in json_wrapped[attribute] ): json_wrapped[attribute]["type"] = "static" json_wrapped[attribute]["value"] = json_wrapped[attribute]["static"] json_wrapped[attribute].pop("static") return cls.from_json(json_wrapped[attribute]) return StaticFunction(0) class StaticFunction(ModelFunction): def is_predictable(self, param_list=None): """ Return whether the model function can be evaluated on the given parameter values. For a StaticFunction, this is always the case (i.e., this function always returns true). """ return True def eval(self, param_list=None): """ Evaluate model function with specified param/arg values. Far a Staticfunction, this is just the static value """ return self.value def to_json(self, **kwargs): ret = super().to_json(**kwargs) ret.update({"type": "static", "value": self.value}) return ret @classmethod def from_json(cls, data): assert data["type"] == "static" return cls(data["value"]) def __repr__(self): return f"StaticFunction({self.value})" class SplitFunction(ModelFunction): def __init__(self, value, param_index, child): super().__init__(value) self.param_index = param_index self.child = child def is_predictable(self, param_list): """ Return whether the model function can be evaluated on the given parameter values. The first value corresponds to the lexically first model parameter, etc. All parameters must be set, not just the ones this function depends on. Returns False iff a parameter the function depends on is not numeric (e.g. None). """ param_value = param_list[self.param_index] if param_value not in self.child: return False return self.child[param_value].is_predictable(param_list) def eval(self, param_list): param_value = param_list[self.param_index] return self.child[param_value].eval(param_list) def webconf_function_map(self): ret = list() for child in self.child.values(): ret.extend(child.webconf_function_map()) return ret def to_json(self, **kwargs): ret = super().to_json(**kwargs) with_param_name = kwargs.get("with_param_name", False) param_names = kwargs.get("param_names", list()) update = { "type": "split", "paramIndex": self.param_index, "child": dict([[k, v.to_json(**kwargs)] for k, v in self.child.items()]), } if with_param_name and param_names: update["paramName"] = param_names[self.param_index] ret.update(update) return ret def get_number_of_nodes(self): ret = 1 for v in self.child.values(): if type(v) is SplitFunction: ret += v.get_number_of_nodes() else: ret += 1 return ret def get_max_depth(self): ret = [0] for v in self.child.values(): if type(v) is SplitFunction: ret.append(v.get_max_depth()) return 1 + max(ret) @classmethod def from_json(cls, data): assert data["type"] == "split" self = cls(data["value"], data["paramIndex"], dict()) for k, v in data["child"].items(): self.child[k] = ModelFunction.from_json(v) return self def __repr__(self): return f"SplitFunction<{self.value}, param_index={self.param_index}>" class SubstateFunction(ModelFunction): def __init__(self, value, sequence_by_count, count_model, sub_model): super().__init__(value) self.sequence_by_count = sequence_by_count self.count_model = count_model self.sub_model = sub_model # only used by analyze-archive model quality evaluation. Not serialized. self.static_duration = None def is_predictable(self, param_list): substate_count = round(self.count_model.eval(param_list)) return substate_count in self.sequence_by_count def eval(self, param_list, duration=None): substate_count = round(self.count_model.eval(param_list)) cumulative_energy = 0 total_duration = 0 substate_model, _ = self.sub_model.get_fitted() substate_sequence = self.sequence_by_count[substate_count] for i, sub_name in enumerate(substate_sequence): sub_duration = substate_model(sub_name, "duration", param=param_list) sub_power = substate_model(sub_name, "power", param=param_list) if i == substate_count - 1: if duration is not None: sub_duration = duration - total_duration elif self.static_duration is not None: sub_duration = self.static_duration - total_duration cumulative_energy += sub_power * sub_duration total_duration += sub_duration return cumulative_energy / total_duration def to_json(self, **kwargs): ret = super().to_json(**kwargs) ret.update( { "type": "substate", "sequence": self.sequence_by_count, "countModel": self.count_model.to_json(**kwargs), "subModel": self.sub_model.to_json(**kwargs), } ) return ret @classmethod def from_json(cls, data): assert data["type"] == "substate" raise NotImplementedError def __repr__(self): return "SubstateFunction" class SKLearnRegressionFunction(ModelFunction): def __init__(self, value, regressor, categorial_to_index, ignore_index): super().__init__(value) self.regressor = regressor self.categorial_to_index = categorial_to_index self.ignore_index = ignore_index def is_predictable(self, param_list=None): """ Return whether the model function can be evaluated on the given parameter values. For a StaticFunction, this is always the case (i.e., this function always returns true). """ return True def eval(self, param_list=None): """ Evaluate model function with specified param/arg values. Far a Staticfunction, this is just the static value """ if param_list is None: return self.value actual_param_list = list() for i, param in enumerate(param_list): if not self.ignore_index[i]: if i in self.categorial_to_index: try: actual_param_list.append(self.categorial_to_index[i][param]) except KeyError: # param was not part of training data. substitute an unused scalar. # Note that all param values which were not part of training data map to the same scalar this way. # This should be harmless. actual_param_list.append( max(self.categorial_to_index[i].values()) + 1 ) else: actual_param_list.append(param) predictions = self.regressor.predict(np.array([actual_param_list])) if predictions.shape == (1,): return predictions[0] return predictions class CARTFunction(SKLearnRegressionFunction): def get_number_of_nodes(self): return self.regressor.tree_.node_count def get_max_depth(self): return self.regressor.get_depth() class LMTFunction(SKLearnRegressionFunction): def get_number_of_nodes(self): return self.regressor.node_count def get_max_depth(self): return self.regressor.max_depth class XGBoostFunction(SKLearnRegressionFunction): def get_number_of_nodes(self): import json self.regressor.get_booster().dump_model( "/tmp/xgb.json", dump_format="json", with_stats=True ) with open("/tmp/xgb.json", "r") as f: data = json.load(f) return sum(map(self._get_number_of_nodes, data)) def _get_number_of_nodes(self, data): ret = 1 for child in data.get("children", list()): ret += self._get_number_of_nodes(child) return ret def get_max_depth(self): import json self.regressor.get_booster().dump_model( "/tmp/xgb.json", dump_format="json", with_stats=True ) with open("/tmp/xgb.json", "r") as f: data = json.load(f) return max(map(self._get_max_depth, data)) def _get_max_depth(self, data): ret = [0] for child in data.get("children", list()): ret.append(self._get_max_depth(child)) return 1 + max(ret) class AnalyticFunction(ModelFunction): """ A multi-dimensional model function, generated from a string, which can be optimized using regression. The function describes a single model attribute (e.g. TX duration or send(...) energy) and how it is influenced by model parameters such as configured bit rate or packet length. """ def __init__( self, value, function_str, parameters, num_args=0, regression_args=None, fit_by_param=None, ): """ Create a new AnalyticFunction object from a function string. :param function_str: the function. Refer to regression variables using regression_arg(123), to parameters using parameter(name), and to function arguments (if any) using function_arg(123). Example: "regression_arg(0) + regression_arg(1) * parameter(txbytes)" :param parameters: list containing the names of all model parameters, including those not used in function_str, sorted lexically. Sorting is mandatory, as parameter indexes (and not names) are used internally. :param num_args: number of local function arguments, if any. Set to 0 if the model attribute does not belong to a function or if function arguments are not included in the model. :param regression_args: Initial regression variable values, both for function usage and least squares optimization. If unset, defaults to [1, 1, 1, ...] """ super().__init__(value) self._parameter_names = parameters self._num_args = num_args self.model_function = function_str rawfunction = function_str self._dependson = [False] * (len(parameters) + num_args) self.fit_success = False self.fit_by_param = fit_by_param if type(function_str) == str: num_vars_re = re.compile(r"regression_arg\(([0-9]+)\)") num_vars = max(map(int, num_vars_re.findall(function_str))) + 1 for i in range(len(parameters)): if rawfunction.find("parameter({})".format(parameters[i])) >= 0: self._dependson[i] = True rawfunction = rawfunction.replace( "parameter({})".format(parameters[i]), "model_param[{:d}]".format(i), ) for i in range(0, num_args): if rawfunction.find("function_arg({:d})".format(i)) >= 0: self._dependson[len(parameters) + i] = True rawfunction = rawfunction.replace( "function_arg({:d})".format(i), "model_param[{:d}]".format(len(parameters) + i), ) for i in range(num_vars): rawfunction = rawfunction.replace( "regression_arg({:d})".format(i), "reg_param[{:d}]".format(i) ) self._function_str = rawfunction self._function = eval("lambda reg_param, model_param: " + rawfunction) else: self._function_str = "raise ValueError" self._function = function_str if regression_args: self.model_args = regression_args.copy() self._fit_success = True elif type(function_str) == str: self.model_args = list(np.ones((num_vars))) else: self.model_args = [] def get_fit_data(self, by_param): """ Return training data suitable for scipy.optimize.least_squares. :param by_param: measurement data, partitioned by parameter/arg values. by_param[*] must be a list or 1-D NumPy array containing the ground truth. The parameter values (dict keys) must be numeric for all parameters this function depends on -- otherwise, the corresponding data will be left out. Parameter values must be ordered according to the order of parameter names used in the ParamFunction constructor. Argument values (if any) always come after parameters, in the order of their index in the function signature. :return: (X, Y, num_valid, num_total): X -- 2-D NumPy array of parameter combinations (model input). First dimension is the parameter/argument index, the second dimension contains its values. Example: X[0] contains the first parameter's values. Y -- 1-D NumPy array of training data (desired model output). num_valid -- amount of distinct parameter values suitable for optimization num_total -- total amount of distinct parameter values """ dimension = len(self._parameter_names) + self._num_args X = [[] for i in range(dimension)] Y = [] num_valid = 0 num_total = 0 for key, val in by_param.items(): if len(key) == dimension: valid = True num_total += 1 for i in range(dimension): if self._dependson[i] and not is_numeric(key[i]): valid = False if valid: num_valid += 1 Y.extend(val) for i in range(dimension): if self._dependson[i]: X[i].extend([float(key[i])] * len(val)) else: X[i].extend([np.nan] * len(val)) else: logger.warning( "Invalid parameter key length while gathering fit data. is {}, want {}.".format( len(key), dimension ) ) X = np.array(X) Y = np.array(Y) return X, Y, num_valid, num_total def fit(self, by_param): """ Fit the function on measurements via least squares regression. :param by_param: measurement data, partitioned by parameter/arg values The ground truth is read from by_param[*], which must be a list or 1-D NumPy array. Parameter values must be ordered according to the parameter names in the constructor. If argument values are present, they must come after parameter values in the order of their appearance in the function signature. """ X, Y, num_valid, num_total = self.get_fit_data(by_param) if num_valid > 2: error_function = lambda P, X, y: self._function(P, X) - y try: res = optimize.least_squares( error_function, self.model_args, args=(X, Y), xtol=2e-15 ) except ValueError as err: logger.warning(f"Fit failed: {err} (function: {self.model_function})") return if res.status > 0: self.model_args = res.x self.fit_success = True else: logger.warning( f"Fit failed: {res.message} (function: {self.model_function})" ) else: logger.warning("Insufficient amount of valid parameter keys, cannot fit") def is_predictable(self, param_list): """ Return whether the model function can be evaluated on the given parameter values. The first value corresponds to the lexically first model parameter, etc. All parameters must be set, not just the ones this function depends on. Returns False iff a parameter the function depends on is not numeric (e.g. None). """ for i, param in enumerate(param_list): if self._dependson[i] and not is_numeric(param): return False return True def eval(self, param_list): """ Evaluate model function with specified param/arg values. :param param_list: parameter values (list of float). First item corresponds to lexically first parameter, etc. :param arg_list: argument values (list of float), if arguments are used. """ return self._function(self.model_args, param_list) def webconf_function_map(self): js_buf = self.model_function for i in range(len(self.model_args)): js_buf = js_buf.replace(f"regression_arg({i})", str(self.model_args[i])) for parameter_name in self._parameter_names: js_buf = js_buf.replace( f"parameter({parameter_name})", f"""param["{parameter_name}"]""" ) for arg_num in range(self._num_args): js_buf = js_buf.replace(f"function_arg({arg_num})", f"args[{arg_num}]") js_buf = "(param, args) => " + js_buf.replace("np.", "Math.") return [(f'"{self.model_function}"', js_buf)] def to_json(self, **kwargs): ret = super().to_json(**kwargs) ret.update( { "type": "analytic", "functionStr": self.model_function, "argCount": self._num_args, "parameterNames": self._parameter_names, "regressionModel": list(self.model_args), } ) return ret @classmethod def from_json(cls, data): assert data["type"] == "analytic" return cls( data["value"], data["functionStr"], data["parameterNames"], data["argCount"], data["regressionModel"], ) def __repr__(self): return f"AnalyticFunction<{self.value}, {self.model_function}>" class analytic: """ Utilities for analytic description of parameter-dependent model attributes and regression analysis. provided functions: functions -- retrieve pre-defined set of regression function candidates function_powerset -- combine several per-parameter functions into a single AnalyticFunction """ _num0_8 = np.vectorize(lambda x: 8 - bin(int(x)).count("1")) _num0_16 = np.vectorize(lambda x: 16 - bin(int(x)).count("1")) _num1 = np.vectorize(lambda x: bin(int(x)).count("1")) _safe_log = np.vectorize(lambda x: np.log(np.abs(x)) if np.abs(x) > 0.001 else 1.0) _safe_inv = np.vectorize(lambda x: 1 / x if np.abs(x) > 0.001 else 1.0) _safe_sqrt = np.vectorize(lambda x: np.sqrt(np.abs(x))) _function_map = { "linear": lambda x: x, "logarithmic": np.log, "logarithmic1": lambda x: np.log(x + 1), "exponential": np.exp, "square": lambda x: x ** 2, "inverse": lambda x: 1 / x, "sqrt": lambda x: np.sqrt(np.abs(x)), "num0_8": _num0_8, "num0_16": _num0_16, "num1": _num1, "safe_log": lambda x: np.log(np.abs(x)) if np.abs(x) > 0.001 else 1.0, "safe_inv": lambda x: 1 / x if np.abs(x) > 0.001 else 1.0, "safe_sqrt": lambda x: np.sqrt(np.abs(x)), } @staticmethod def functions(safe_functions_enabled=False): """ Retrieve pre-defined set of regression function candidates. :param safe_functions_enabled: Include "safe" variants of functions with limited argument range, e.g. a safe inverse which returns 1 when dividing by 0. Returns a dict of functions which are typical for energy/timing behaviour of embedded hardware, e.g. linear, exponential or inverse dependency on a configuration setting/runtime variable. Each function is a ParamFunction object. In most cases, two regression variables are expected. """ functions = { "linear": ParamFunction( lambda reg_param, model_param: reg_param[0] + reg_param[1] * model_param, lambda model_param: True, 2, repr_str="β₀ + β₁ * x", ), "logarithmic": ParamFunction( lambda reg_param, model_param: reg_param[0] + reg_param[1] * np.log(model_param), lambda model_param: model_param > 0, 2, repr_str="β₀ + β₁ * np.log(x)", ), "logarithmic1": ParamFunction( lambda reg_param, model_param: reg_param[0] + reg_param[1] * np.log(model_param + 1), lambda model_param: model_param > -1, 2, repr_str="β₀ + β₁ * np.log(x+1)", ), "exponential": ParamFunction( lambda reg_param, model_param: reg_param[0] + reg_param[1] * np.exp(model_param), lambda model_param: model_param <= 64, 2, repr_str="β₀ + β₁ * np.exp(x)", ), #'polynomial' : lambda reg_param, model_param: reg_param[0] + reg_param[1] * model_param + reg_param[2] * model_param ** 2, "square": ParamFunction( lambda reg_param, model_param: reg_param[0] + reg_param[1] * model_param ** 2, lambda model_param: True, 2, repr_str="β₀ + β₁ * x²", ), "inverse": ParamFunction( lambda reg_param, model_param: reg_param[0] + reg_param[1] / model_param, lambda model_param: model_param != 0, 2, repr_str="β₀ + β₁ * 1/x", ), "sqrt": ParamFunction( lambda reg_param, model_param: reg_param[0] + reg_param[1] * np.sqrt(model_param), lambda model_param: model_param >= 0, 2, repr_str="β₀ + β₁ * np.sqrt(x)", ), # "num0_8": ParamFunction( # lambda reg_param, model_param: reg_param[0] # + reg_param[1] * analytic._num0_8(model_param), # lambda model_param: True, # 2, # ), # "num0_16": ParamFunction( # lambda reg_param, model_param: reg_param[0] # + reg_param[1] * analytic._num0_16(model_param), # lambda model_param: True, # 2, # ), # "num1": ParamFunction( # lambda reg_param, model_param: reg_param[0] # + reg_param[1] * analytic._num1(model_param), # lambda model_param: True, # 2, # ), } if safe_functions_enabled or bool( int(os.getenv("DFATOOL_REGRESSION_SAFE_FUNCTIONS", "0")) ): functions.pop("logarithmic1") functions.pop("logarithmic") functions["safe_log"] = ParamFunction( lambda reg_param, model_param: reg_param[0] + reg_param[1] * analytic._safe_log(model_param), lambda model_param: True, 2, repr_str="β₀ + β₁ * safe_log(x)", ) functions.pop("inverse") functions["safe_inv"] = ParamFunction( lambda reg_param, model_param: reg_param[0] + reg_param[1] * analytic._safe_inv(model_param), lambda model_param: True, 2, repr_str="β₀ + β₁ * safe(1/x)", ) functions.pop("sqrt") functions["safe_sqrt"] = ParamFunction( lambda reg_param, model_param: reg_param[0] + reg_param[1] * analytic._safe_sqrt(model_param), lambda model_param: True, 2, repr_str="β₀ + β₁ * safe_sqrt(x)", ) if bool(int(os.getenv("DFATOOL_FIT_LINEAR_ONLY", "0"))): functions = {"linear": functions["linear"]} return functions @staticmethod def _fmap(reference_type, reference_name, function_type): """Map arg/parameter name and best-fit function name to function text suitable for AnalyticFunction.""" ref_str = "{}({})".format(reference_type, reference_name) if function_type == "linear": return ref_str if function_type == "logarithmic": return "np.log({})".format(ref_str) if function_type == "logarithmic1": return "np.log({} + 1)".format(ref_str) if function_type == "exponential": return "np.exp({})".format(ref_str) if function_type == "exponential": return "np.exp({})".format(ref_str) if function_type == "square": return "({})**2".format(ref_str) if function_type == "inverse": return "1/({})".format(ref_str) if function_type == "sqrt": return "np.sqrt({})".format(ref_str) return "analytic._{}({})".format(function_type, ref_str) @staticmethod def function_powerset(fit_results, parameter_names, num_args=0): """ Combine per-parameter regression results into a single multi-dimensional function. :param fit_results: results dict. One element per parameter, each containing a dict of the form {'best' : name of function with best fit}. Must not include parameters which do not influence the model attribute. Example: {'txpower' : {'best': 'exponential'}} :param parameter_names: Parameter names, including those left out in fit_results because they do not influence the model attribute. Must be sorted lexically. Example: ['bitrate', 'txpower'] :param num_args: number of local function arguments, if any. Set to 0 if the model attribute does not belong to a function or if function arguments are not included in the model. Returns an AnalyticFunction instantce corresponding to the combined function. """ buf = "0" arg_idx = 0 for combination in powerset(fit_results.items()): buf += " + regression_arg({:d})".format(arg_idx) arg_idx += 1 for function_item in combination: if is_numeric(function_item[0]): buf += " * {}".format( analytic._fmap( "function_arg", function_item[0], function_item[1]["best"] ) ) else: buf += " * {}".format( analytic._fmap( "parameter", function_item[0], function_item[1]["best"] ) ) return AnalyticFunction( None, buf, parameter_names, num_args, fit_by_param=fit_results )