#!/usr/bin/python # Script to statistically compare two sets of log files with -ftime-report # output embedded within them. # Contributed by Lawrence Crowl # # Copyright (C) 2012 Free Software Foundation, Inc. # # This file is part of GCC. # # GCC is free software; you can redistribute it and/or modify # it under the terms of the GNU General Public License as published by # the Free Software Foundation; either version 3, or (at your option) # any later version. # # GCC is distributed in the hope that it will be useful, # but WITHOUT ANY WARRANTY; without even the implied warranty of # MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the # GNU General Public License for more details. # # You should have received a copy of the GNU General Public License # along with GCC; see the file COPYING. If not, write to # the Free Software Foundation, 51 Franklin Street, Fifth Floor, # Boston, MA 02110-1301, USA. """ Compare two sets of compile-time performance numbers. The intent of this script is to compare compile-time performance of two different versions of the compiler. Each version of the compiler must be run at least three times with the -ftime-report option. Each log file represents a data point, or trial. The set of trials for each compiler version constitutes a sample. The ouput of the script is a description of the statistically significant difference between the two version of the compiler. The parameters to the script are: Two file patterns that each match a set of log files. You will probably need to quote the patterns before passing them to the script. Each pattern corresponds to a version of the compiler. A regular expression that finds interesting lines in the log files. If you want to match the beginning of the line, you will need to add the ^ operator. The filtering uses Python regular expression syntax. The default is "TOTAL". All of the interesting lines in a single log file are summed to produce a single trial (data point). A desired statistical confidence within the range 60% to 99.9%. Due to the implementation, this confidence will be rounded down to one of 60%, 70%, 80%, 90%, 95%, 98%, 99%, 99.5%, 99.8%, and 99.9%. The default is 95. If the computed confidence is lower than desired, the script will estimate the number of trials needed to meet the desired confidence. This estimate is not very good, as the variance tends to change as you increase the number of trials. The most common use of the script is total compile-time comparison between logfiles stored in different directories. compare_two_ftime_report_sets "Log1/*perf" "Log2/*perf" One can also look at parsing time, but expecting a lower confidence. compare_two_ftime_report_sets "Log1/*perf" "Log2/*perf" "^phase parsing" 75 """ import os import sys import fnmatch import glob import re import math ####################################################################### Utility def divide(dividend, divisor): """ Return the quotient, avoiding division by zero. """ if divisor == 0: return sys.float_info.max else: return dividend / divisor ################################################################# File and Line # Should you repurpose this script, this code might help. # #def find_files(topdir, filepat): # """ Find a set of file names, under a given directory, # matching a Unix shell file pattern. # Returns an iterator over the file names. # """ # for path, dirlist, filelist in os.walk(topdir): # for name in fnmatch.filter(filelist, filepat): # yield os.path.join(path, name) def match_files(fileglob): """ Find a set of file names matching a Unix shell glob pattern. Returns an iterator over the file names. """ return glob.iglob(os.path.expanduser(fileglob)) def lines_in_file(filename): """ Return an iterator over lines in the named file. """ filedesc = open(filename, "r") for line in filedesc: yield line filedesc.close() def lines_containing_pattern(pattern, lines): """ Find lines by a Python regular-expression. Returns an iterator over lines containing the expression. """ parser = re.compile(pattern) for line in lines: if parser.search(line): yield line ############################################################# Number Formatting def strip_redundant_digits(numrep): if numrep.find(".") == -1: return numrep return numrep.rstrip("0").rstrip(".") def text_number(number): return strip_redundant_digits("%g" % number) def round_significant(digits, number): if number == 0: return 0 magnitude = abs(number) significance = math.floor(math.log10(magnitude)) least_position = int(significance - digits + 1) return round(number, -least_position) def text_significant(digits, number): return text_number(round_significant(digits, number)) def text_percent(number): return text_significant(3, number*100) + "%" ################################################################ T-Distribution # This section of code provides functions for using Student's t-distribution. # The functions are implemented using table lookup # to facilitate implementation of inverse functions. # The table is comprised of row 0 listing the alpha values, # column 0 listing the degree-of-freedom values, # and the other entries listing the corresponding t-distribution values. t_dist_table = [ [ 0, 0.200, 0.150, 0.100, 0.050, 0.025, 0.010, 0.005, .0025, 0.001, .0005], [ 1, 1.376, 1.963, 3.078, 6.314, 12.71, 31.82, 63.66, 127.3, 318.3, 636.6], [ 2, 1.061, 1.386, 1.886, 2.920, 4.303, 6.965, 9.925, 14.09, 22.33, 31.60], [ 3, 0.978, 1.250, 1.638, 2.353, 3.182, 4.541, 5.841, 7.453, 10.21, 12.92], [ 4, 0.941, 1.190, 1.533, 2.132, 2.776, 3.747, 4.604, 5.598, 7.173, 8.610], [ 5, 0.920, 1.156, 1.476, 2.015, 2.571, 3.365, 4.032, 4.773, 5.894, 6.869], [ 6, 0.906, 1.134, 1.440, 1.943, 2.447, 3.143, 3.707, 4.317, 5.208, 5.959], [ 7, 0.896, 1.119, 1.415, 1.895, 2.365, 2.998, 3.499, 4.029, 4.785, 5.408], [ 8, 0.889, 1.108, 1.397, 1.860, 2.306, 2.896, 3.355, 3.833, 4.501, 5.041], [ 9, 0.883, 1.100, 1.383, 1.833, 2.262, 2.821, 3.250, 3.690, 4.297, 4.781], [ 10, 0.879, 1.093, 1.372, 1.812, 2.228, 2.764, 3.169, 3.581, 4.144, 4.587], [ 11, 0.876, 1.088, 1.363, 1.796, 2.201, 2.718, 3.106, 3.497, 4.025, 4.437], [ 12, 0.873, 1.083, 1.356, 1.782, 2.179, 2.681, 3.055, 3.428, 3.930, 4.318], [ 13, 0.870, 1.079, 1.350, 1.771, 2.160, 2.650, 3.012, 3.372, 3.852, 4.221], [ 14, 0.868, 1.076, 1.345, 1.761, 2.145, 2.624, 2.977, 3.326, 3.787, 4.140], [ 15, 0.866, 1.074, 1.341, 1.753, 2.131, 2.602, 2.947, 3.286, 3.733, 4.073], [ 16, 0.865, 1.071, 1.337, 1.746, 2.120, 2.583, 2.921, 3.252, 3.686, 4.015], [ 17, 0.863, 1.069, 1.333, 1.740, 2.110, 2.567, 2.898, 3.222, 3.646, 3.965], [ 18, 0.862, 1.067, 1.330, 1.734, 2.101, 2.552, 2.878, 3.197, 3.610, 3.922], [ 19, 0.861, 1.066, 1.328, 1.729, 2.093, 2.539, 2.861, 3.174, 3.579, 3.883], [ 20, 0.860, 1.064, 1.325, 1.725, 2.086, 2.528, 2.845, 3.153, 3.552, 3.850], [ 21, 0.859, 1.063, 1.323, 1.721, 2.080, 2.518, 2.831, 3.135, 3.527, 3.819], [ 22, 0.858, 1.061, 1.321, 1.717, 2.074, 2.508, 2.819, 3.119, 3.505, 3.792], [ 23, 0.858, 1.060, 1.319, 1.714, 2.069, 2.500, 2.807, 3.104, 3.485, 3.768], [ 24, 0.857, 1.059, 1.318, 1.711, 2.064, 2.492, 2.797, 3.091, 3.467, 3.745], [ 25, 0.856, 1.058, 1.316, 1.708, 2.060, 2.485, 2.787, 3.078, 3.450, 3.725], [ 26, 0.856, 1.058, 1.315, 1.706, 2.056, 2.479, 2.779, 3.067, 3.435, 3.707], [ 27, 0.855, 1.057, 1.314, 1.703, 2.052, 2.473, 2.771, 3.057, 3.421, 3.689], [ 28, 0.855, 1.056, 1.313, 1.701, 2.048, 2.467, 2.763, 3.047, 3.408, 3.674], [ 29, 0.854, 1.055, 1.311, 1.699, 2.045, 2.462, 2.756, 3.038, 3.396, 3.660], [ 30, 0.854, 1.055, 1.310, 1.697, 2.042, 2.457, 2.750, 3.030, 3.385, 3.646], [ 31, 0.853, 1.054, 1.309, 1.696, 2.040, 2.453, 2.744, 3.022, 3.375, 3.633], [ 32, 0.853, 1.054, 1.309, 1.694, 2.037, 2.449, 2.738, 3.015, 3.365, 3.622], [ 33, 0.853, 1.053, 1.308, 1.692, 2.035, 2.445, 2.733, 3.008, 3.356, 3.611], [ 34, 0.852, 1.052, 1.307, 1.691, 2.032, 2.441, 2.728, 3.002, 3.348, 3.601], [ 35, 0.852, 1.052, 1.306, 1.690, 2.030, 2.438, 2.724, 2.996, 3.340, 3.591], [ 36, 0.852, 1.052, 1.306, 1.688, 2.028, 2.434, 2.719, 2.990, 3.333, 3.582], [ 37, 0.851, 1.051, 1.305, 1.687, 2.026, 2.431, 2.715, 2.985, 3.326, 3.574], [ 38, 0.851, 1.051, 1.304, 1.686, 2.024, 2.429, 2.712, 2.980, 3.319, 3.566], [ 39, 0.851, 1.050, 1.304, 1.685, 2.023, 2.426, 2.708, 2.976, 3.313, 3.558], [ 40, 0.851, 1.050, 1.303, 1.684, 2.021, 2.423, 2.704, 2.971, 3.307, 3.551], [ 50, 0.849, 1.047, 1.299, 1.676, 2.009, 2.403, 2.678, 2.937, 3.261, 3.496], [ 60, 0.848, 1.045, 1.296, 1.671, 2.000, 2.390, 2.660, 2.915, 3.232, 3.460], [ 80, 0.846, 1.043, 1.292, 1.664, 1.990, 2.374, 2.639, 2.887, 3.195, 3.416], [100, 0.845, 1.042, 1.290, 1.660, 1.984, 2.364, 2.626, 2.871, 3.174, 3.390], [150, 0.844, 1.040, 1.287, 1.655, 1.976, 2.351, 2.609, 2.849, 3.145, 3.357] ] # The functions use the following parameter name conventions: # alpha - the alpha parameter # degree - the degree-of-freedom parameter # value - the t-distribution value for some alpha and degree # deviations - a confidence interval radius, # expressed as a multiple of the standard deviation of the sample # ax - the alpha parameter index # dx - the degree-of-freedom parameter index # The interface to this section of code is the last three functions, # find_t_dist_value, find_t_dist_alpha, and find_t_dist_degree. def t_dist_alpha_at_index(ax): if ax == 0: return .25 # effectively no confidence else: return t_dist_table[0][ax] def t_dist_degree_at_index(dx): return t_dist_table[dx][0] def t_dist_value_at_index(ax, dx): return t_dist_table[dx][ax] def t_dist_index_of_degree(degree): limit = len(t_dist_table) - 1 dx = 0 while dx < limit and t_dist_degree_at_index(dx+1) <= degree: dx += 1 return dx def t_dist_index_of_alpha(alpha): limit = len(t_dist_table[0]) - 1 ax = 0 while ax < limit and t_dist_alpha_at_index(ax+1) >= alpha: ax += 1 return ax def t_dist_index_of_value(dx, value): limit = len(t_dist_table[dx]) - 1 ax = 0 while ax < limit and t_dist_value_at_index(ax+1, dx) < value: ax += 1 return ax def t_dist_value_within_deviations(dx, ax, deviations): degree = t_dist_degree_at_index(dx) count = degree + 1 root = math.sqrt(count) value = t_dist_value_at_index(ax, dx) nominal = value / root comparison = nominal <= deviations return comparison def t_dist_index_of_degree_for_deviations(ax, deviations): limit = len(t_dist_table) - 1 dx = 1 while dx < limit and not t_dist_value_within_deviations(dx, ax, deviations): dx += 1 return dx def find_t_dist_value(alpha, degree): """ Return the t-distribution value. The parameters are alpha and degree of freedom. """ dx = t_dist_index_of_degree(degree) ax = t_dist_index_of_alpha(alpha) return t_dist_value_at_index(ax, dx) def find_t_dist_alpha(value, degree): """ Return the alpha. The parameters are the t-distribution value for a given degree of freedom. """ dx = t_dist_index_of_degree(degree) ax = t_dist_index_of_value(dx, value) return t_dist_alpha_at_index(ax) def find_t_dist_degree(alpha, deviations): """ Return the degree-of-freedom. The parameters are the desired alpha and the number of standard deviations away from the mean that the degree should handle. """ ax = t_dist_index_of_alpha(alpha) dx = t_dist_index_of_degree_for_deviations(ax, deviations) return t_dist_degree_at_index(dx) ############################################################## Core Statistical # This section provides the core statistical classes and functions. class Accumulator: """ An accumulator for statistical information using arithmetic mean. """ def __init__(self): self.count = 0 self.mean = 0 self.sumsqdiff = 0 def insert(self, value): self.count += 1 diff = value - self.mean self.mean += diff / self.count self.sumsqdiff += (self.count - 1) * diff * diff / self.count def fill_accumulator_from_values(values): accumulator = Accumulator() for value in values: accumulator.insert(value) return accumulator def alpha_from_confidence(confidence): scrubbed = min(99.99, max(confidence, 60)) return (100.0 - scrubbed) / 200.0 def confidence_from_alpha(alpha): return 100 - 200 * alpha class Sample: """ A description of a sample using an arithmetic mean. """ def __init__(self, accumulator, alpha): if accumulator.count < 3: sys.exit("Samples must contain three trials.") self.count = accumulator.count self.mean = accumulator.mean variance = accumulator.sumsqdiff / (self.count - 1) self.deviation = math.sqrt(variance) self.error = self.deviation / math.sqrt(self.count) self.alpha = alpha self.radius = find_t_dist_value(alpha, self.count - 1) * self.error def alpha_for_radius(self, radius): return find_t_dist_alpha(divide(radius, self.error), self.count) def degree_for_radius(self, radius): return find_t_dist_degree(self.alpha, divide(radius, self.deviation)) def __str__(self): text = "trial count is " + text_number(self.count) text += ", mean is " + text_number(self.mean) text += " (" + text_number(confidence_from_alpha(self.alpha)) +"%" text += " confidence in " + text_number(self.mean - self.radius) text += " to " + text_number(self.mean + self.radius) + ")" text += ",\nstd.deviation is " + text_number(self.deviation) text += ", std.error is " + text_number(self.error) return text def sample_from_values(values, alpha): accumulator = fill_accumulator_from_values(values) return Sample(accumulator, alpha) class Comparison: """ A comparison of two samples using arithmetic means. """ def __init__(self, first, second, alpha): if first.mean > second.mean: self.upper = first self.lower = second self.larger = "first" else: self.upper = second self.lower = first self.larger = "second" self.a_wanted = alpha radius = self.upper.mean - self.lower.mean rising = self.lower.alpha_for_radius(radius) falling = self.upper.alpha_for_radius(radius) self.a_actual = max(rising, falling) rising = self.lower.degree_for_radius(radius) falling = self.upper.degree_for_radius(radius) self.count = max(rising, falling) + 1 def __str__(self): message = "The " + self.larger + " sample appears to be " change = divide(self.upper.mean, self.lower.mean) - 1 message += text_percent(change) + " larger,\n" confidence = confidence_from_alpha(self.a_actual) if confidence >= 60: message += "with " + text_number(confidence) + "% confidence" message += " of being larger." else: message += "but with no confidence of actually being larger." if self.a_actual > self.a_wanted: confidence = confidence_from_alpha(self.a_wanted) message += "\nTo reach " + text_number(confidence) + "% confidence," if self.count < 100: message += " you need roughly " + text_number(self.count) + " trials,\n" message += "assuming the standard deviation is stable, which is iffy." else: message += "\nyou need to reduce the larger deviation" message += " or increase the number of trials." return message ############################################################ Single Value Files # This section provides functions to compare two raw data files, # each containing a whole sample consisting of single number per line. # Should you repurpose this script, this code might help. # #def values_from_data_file(filename): # for line in lines_in_file(filename): # yield float(line) # Should you repurpose this script, this code might help. # #def sample_from_data_file(filename, alpha): # confidence = confidence_from_alpha(alpha) # text = "\nArithmetic sample for data file\n\"" + filename + "\"" # text += " with desired confidence " + text_number(confidence) + " is " # print text # values = values_from_data_file(filename) # sample = sample_from_values(values, alpha) # print sample # return sample # Should you repurpose this script, this code might help. # #def compare_two_data_files(filename1, filename2, confidence): # alpha = alpha_from_confidence(confidence) # sample1 = sample_from_data_file(filename1, alpha) # sample2 = sample_from_data_file(filename2, alpha) # print # print Comparison(sample1, sample2, alpha) # Should you repurpose this script, this code might help. # #def command_two_data_files(): # argc = len(sys.argv) # if argc < 2 or 4 < argc: # message = "usage: " + sys.argv[0] # message += " file-name file-name [confidence]" # print message # else: # filename1 = sys.argv[1] # filename2 = sys.argv[2] # if len(sys.argv) >= 4: # confidence = int(sys.argv[3]) # else: # confidence = 95 # compare_two_data_files(filename1, filename2, confidence) ############################################### -ftime-report TimeVar Log Files # This section provides functions to compare two sets of -ftime-report log # files. Each set is a sample, where each data point is derived from the # sum of values in a single log file. label = r"^ *([^:]*[^: ]) *:" number = r" *([0-9.]*) *" percent = r"\( *[0-9]*\%\)" numpct = number + percent total_format = label + number + number + number + number + " kB\n" total_parser = re.compile(total_format) tmvar_format = label + numpct + " usr" + numpct + " sys" tmvar_format += numpct + " wall" + number + " kB " + percent + " ggc\n" tmvar_parser = re.compile(tmvar_format) replace = r"\2\t\3\t\4\t\5\t\1" def split_time_report(lines, pattern): if pattern == "TOTAL": parser = total_parser else: parser = tmvar_parser for line in lines: modified = parser.sub(replace, line) if modified != line: yield re.split("\t", modified) def extract_cpu_time(tvtuples): for tuple in tvtuples: yield float(tuple[0]) + float(tuple[1]) def sum_values(values): sum = 0 for value in values: sum += value return sum def extract_time_for_timevar_log(filename, pattern): lines = lines_in_file(filename) tmvars = lines_containing_pattern(pattern, lines) tuples = split_time_report(tmvars, pattern) times = extract_cpu_time(tuples) return sum_values(times) def extract_times_for_timevar_logs(filelist, pattern): for filename in filelist: yield extract_time_for_timevar_log(filename, pattern) def sample_from_timevar_logs(fileglob, pattern, alpha): confidence = confidence_from_alpha(alpha) text = "\nArithmetic sample for timevar log files\n\"" + fileglob + "\"" text += "\nand selecting lines containing \"" + pattern + "\"" text += " with desired confidence " + text_number(confidence) + " is " print text filelist = match_files(fileglob) values = extract_times_for_timevar_logs(filelist, pattern) sample = sample_from_values(values, alpha) print sample return sample def compare_two_timevar_logs(fileglob1, fileglob2, pattern, confidence): alpha = alpha_from_confidence(confidence) sample1 = sample_from_timevar_logs(fileglob1, pattern, alpha) sample2 = sample_from_timevar_logs(fileglob2, pattern, alpha) print print Comparison(sample1, sample2, alpha) def command_two_timevar_logs(): argc = len(sys.argv) if argc < 3 or 5 < argc: message = "usage: " + sys.argv[0] message += " file-pattern file-pattern [line-pattern [confidence]]" print message else: filepat1 = sys.argv[1] filepat2 = sys.argv[2] if len(sys.argv) >= 5: confidence = int(sys.argv[4]) else: confidence = 95 if len(sys.argv) >= 4: linepat = sys.argv[3] else: linepat = "TOTAL" compare_two_timevar_logs(filepat1, filepat2, linepat, confidence) ########################################################################## Main # This section is the main code, implementing the command. command_two_timevar_logs()