UPD
Протестировал выборку на сходство с детерминированной и случайной последовательностями, имеющими примерно такое же соотношение нулей (972) и единиц (1081).
Сравнение велось по следующим тестам.
Тест на подпоследовательности и их корреляцию с последующим элементом (до 7 элементов).
Количество и степень детерминированности подпоследовательностей совпали со случайной выборкой, в то время как синусная выборка проявила большое количество полностью детерминированных подпоследовательностей.
Тест на максимумы автокорреляционной функции (АКФ).
Тест АКФ совпал со случайной выборкой (отсутствие существенных корреляций), в то время как в синусной выборке присутствуют практически полные корреляции.
Тест на авторегрессию данных по Левинсону - Дарбину, подробные объяснения здесь
Темпы падения СКО при увеличении порядка авторегрессии совпали с таковыми для случайной выборки, в то время как синусная выборка обнаружила наличие авторегрессий, резко снижающих СКО остатка.
Вывод: Выборка реальных данных проявила полное сходство со случайной последовательностью и явное отличие от детерминированной (синусной).
Программа:
set_time_limit(300);
$str_real = "11001010110011011111011100100100011001101111010001001110011101000000001010111010010000100110010001100111011101011000111111111110100010011110111001001001011111000001101011011010101000111001001010100000110111111011100111010001011000001111001101000101000100101010110101100110010110110011011110101111011011010011000101101101100010000010001110011001100100000101001110110011101110101110111011011001111001100011111001101101001100100101100001111100111101101001011110111100111100100111110110100100000010110010011001100010110010110010111010111101101101111000101011010101111000000010101010101110110111000010000110001000111001001110100001011110011101111001100101100111001001010101111110011110110011000011110110000111010011111010000010111010110010010011110111011001110001011010011101101110001001101000101111001100110011100011110101000100100011110011000000000100011110111000000100010111000000110011110001100100111010111100101110010001110100010001000001101001101100111101111101101100011100110011011001000111101100111011110011111001110111011011110010110101110110101111110000101101001100101000111010111000001010010011001010101000111001011010100100111011100010110101001110111111111110001111101111111011001110111011001010010001000010011111110111010001111011101001001101110001010101000001001011100011101100011111111110101010110111000100100110000101101101101001010001010001111001111000000101000111000001101000101010001111100110010111001101001000111000111011101111001011101101011111000110111011010001100111000111001100011001001100011000001001111001100101101000010111000111101010111001101011100101011000001111100111100111100101110010001011000101010101011111110010111110111111000100000101011000111011010111100101001111011101011101111101110111011011100110110111001011110010100110111110001010000010101110001000101010001000100100110001011100111100100000011100000011011101111101101011000011111100110101011011110000011110101000100110110100100010110101011000100011100001011001001011100000000001110010011001000101100000111001010101100000010000011110100101111111010100101011000100111100";
function samples($flow, $k){
$trans = [];
for($i=1; $i<65536; $i++){
$str = sprintf("%016b", $i);
$trans[$str] = $i;
}
$len = strlen($flow);
$cnt_num = (1 << $k);
for ($num = 0; $num < $cnt_num; $num++){ // для каждого сэмпла
$st = substr(sprintf("%016b",$num), -$k, $k);
$sum = 0;
$sum1 =0;
for($i = $k; $i < $len; $i++){
$n = substr($flow,$i-$k,$k);
$n = str_pad($n, 16, "0", STR_PAD_LEFT);
$n = $trans[$n];
if($n == $num){
$sum++;
$sum1 += $flow[$i];
}
}
if($sum) $result[$st] = sprintf("%5.3f = $sum1/$sum", $sum1/$sum);
}
return $result;
}
function test_samples($arr, $n){
print "<br>АНАЛИЗ ПОДПОСЛЕДОВАТЕЛЬНОСТЕЙ<br>";
for($k=1; $k <= $n; $k++){
$sam = samples($arr, $k);
arsort($sam);
print "<br>$k-битовые предвестники и антагонисты единичного бита:";
$order = 0;
$prn = 0;
foreach($sam as $key=>$item){
if($order == $k){
$prn = 0;
}
if(($order < $k) || ($order >= ((1<<$k)-$k))){
if(($prn++ % 5) == 0) print"<br>";
$kk = substr(sprintf("%016d",$key),-$k, $k);
print "\"$kk\" => $item ";
}
$order++;
}
}
}
function center(&$arr){
$len = count($arr);
$aver = array_sum($arr) / $len;
foreach($arr as &$item){
$item -= $aver;
}
}
function scalar_prod($a, $b, $shift = 0, &$c = null){
$scal = 0;
if(is_null($c)) $cc = []; else $cc = &$c;
foreach($a as $key => $item){
$cc[] = $item * $b[$key+$shift];
$scal += end($cc);
}
return $scal;
}
function print_array($arr, $str, $n = 11){
print $str."[";
foreach($arr as $key => $item){
if(!(($key+1) % $n)) print "<br>";
printf ("\"%03d\" => %.3f, ", $key, $item);
}
print "]";
}
function print_s($a, $b, $str){
print("<br><br>$str");
printf("<br> %.3f f0 + %.3f f1 = %.3f", $a[0][0], $a[0][1], $b[0]);
printf("<br> %.3f f0 + %.3f f1 = %.3f", $a[1][0], $a[1][1], $b[1]);
$det = $a[0][0]*$a[1][1] - $a[1][0]*$a[0][1];
$det0 = $b[0]*$a[1][1] - $b[1]*$a[0][1];
$det1 = $a[0][0]*$b[1] - $a[1][0]*$b[0];
printf("<br>Решение: f = [%f, %f]", (float)$det0 / $det, (float)$det1/$det);
}
function acf($ar_flow, $k, $center = -1, $len = null){
if(is_null($len)){
$len = count($flow);
}
$slice = array_slice($ar_flow, $k, $len-$k);
for($lag = 0; $lag <= $k; $lag++){
$result[$lag] = scalar_prod($slice, $ar_flow, $k-$lag);
}
if($center != -1){
$denom = 1.0/$result[0];
foreach($result as &$res){
$res *= $denom;
}
}
return $result;
}
function compare_s($test){
$m = count($test);
$acf2 = acf($test, 0, -1, $m-2);
$acf1 = acf($test, 1, -1, $m-1);
$acf = acf($test, 2);
$a_exact = [ [$acf1[0],$acf1[1]], [$acf1[1],$acf2[0]] ];
$a = [ [$acf[0],$acf[1]], [$acf[1],$acf[0]] ];
$b = [-$acf[1], -$acf[2]];
print_s($a_exact, $b, "Контроль симметрии матрицы<br><br>Точная система (порядок 2):");
print_s($a, $b, "Тёплицева система (порядок 2):");
}
function durbin($acf, $n){
$ff = [];
$f = [-$acf[1]/$acf[0]];
$ff[] = $f;
for($r = 1; $r < $n; $r++){
$acr = array_reverse(array_slice($acf, 0, $r+1));
$fr = array_reverse($f);
$fr[] = 1;
$f[] = 0;
$beta = - ($acf[$r+1] + scalar_prod($f, $acr))/scalar_prod($fr, $acr);
$f = array_map(function($a,$b) use($beta){
return $a+$beta*$b;
},$f,$fr);
$ff[] = $f;
}
return $ff;
}
function test_durbin($arr, $a, $n, $center=0){
printf("АВТОРЕГРЕССИЯ ПО ДАРБИНУ");
compare_s($arr);
$len = count($arr);
if($center){
center($arr);
}
$eps_arr = 0;
foreach($arr as $item){
$eps_arr += $item*$item;
}
printf("<br><br>Порядок АР = %d, длина выборки = $len, СКО выборки = %f):", $n, sqrt($eps_arr/($len-1)));
$s = [];
$ff = durbin($a,$n);
foreach($ff as $key => $f){
$c = array_reverse($f);
$eps = 0;
$brr = [];
for($j=$n; $j<$len; $j++){
$brr[$j] = $arr[$j]+scalar_prod($c, $arr, $j-$n);
$eps += pow($brr[$j],2);
}
$k = count($f)-1;
$s[$key+1] = sqrt($eps/($len-$n));
}
return $s;
}
function analytics($str_data){
print $str_data;
$len_data = strlen($str_data);
printf("<br>Длина последовательности = %d <br>", $len_data);
$array_data = [];
for($i=0; $i<$len_data; $i++){
$array_data[$i] = (int)$str_data[$i];
}
test_samples($str_data, 7);
$n = 100;
$a = acf($array_data, $n, 1);
$acf1 = $a;
arsort($acf1);
print("<br><br>МАКСИМУМЫ АКФ (из $n):");
var_dump(array_slice($acf1, 0, 10, TRUE));
$sko = test_durbin($array_data, $a, $n);
print_array($sko, "<br>CKO: <br>");
}
print("*** РЕАЛЬНЫЕ ДАННЫЕ ***<br><br>");
analytics($str_real);
$m=2054;
$str_sin = "";
for($j=0; $j<$m; $j++) $str_sin .= (sin($j) > -0.08) ? "1" : "0";
print("<br><br>*** СИНУСНАЯ ПОСЛЕДОВАТЕЛЬНОСТЬ ***<br><br>");
analytics($str_sin);
$str_mt_rand = "";
for($i=0; $i<$m; $i++){
$str_mt_rand .= (mt_rand() > 100e7) ? 1 : 0;
}
print("<br><br>*** ДАТЧИК mt_rand() ***<br><br>");
analytics($str_mt_rand);
Результаты:
*** РЕАЛЬНЫЕ ДАННЫЕ ***
11001010110011011111011100100100011001101111010001001110011101000000001010111010010000100110010001100111011101011000111111111110100010011110111001001001011111000001101011011010101000111001001010100000110111111011100111010001011000001111001101000101000100101010110101100110010110110011011110101111011011010011000101101101100010000010001110011001100100000101001110110011101110101110111011011001111001100011111001101101001100100101100001111100111101101001011110111100111100100111110110100100000010110010011001100010110010110010111010111101101101111000101011010101111000000010101010101110110111000010000110001000111001001110100001011110011101111001100101100111001001010101111110011110110011000011110110000111010011111010000010111010110010010011110111011001110001011010011101101110001001101000101111001100110011100011110101000100100011110011000000000100011110111000000100010111000000110011110001100100111010111100101110010001110100010001000001101001101100111101111101101100011100110011011001000111101100111011110011111001110111011011110010110101110110101111110000101101001100101000111010111000001010010011001010101000111001011010100100111011100010110101001110111111111110001111101111111011001110111011001010010001000010011111110111010001111011101001001101110001010101000001001011100011101100011111111110101010110111000100100110000101101101101001010001010001111001111000000101000111000001101000101010001111100110010111001101001000111000111011101111001011101101011111000110111011010001100111000111001100011001001100011000001001111001100101101000010111000111101010111001101011100101011000001111100111100111100101110010001011000101010101011111110010111110111111000100000101011000111011010111100101001111011101011101111101110111011011100110110111001011110010100110111110001010000010101110001000101010001000100100110001011100111100100000011100000011011101111101101011000011111100110101011011110000011110101000100110110100100010110101011000100011100001011001001011100000000001110010011001000101100000111001010101100000010000011110100101111111010100101011000100111100
Длина последовательности = 2054
АНАЛИЗ ПОДПОСЛЕДОВАТЕЛЬНОСТЕЙ
1-битовые предвестники и антагонисты единичного бита:
"0" => 0.531 = 516/972
"1" => 0.522 = 564/1081
2-битовые предвестники и антагонисты единичного бита:
"00" => 0.558 = 254/455 "01" => 0.541 = 279/516
"10" => 0.507 = 262/517 "11" => 0.504 = 284/564
3-битовые предвестники и антагонисты единичного бита:
"101" => 0.576 = 151/262 "100" => 0.563 = 143/254 "011" => 0.552 = 154/279
"001" => 0.504 = 128/254 "110" => 0.482 = 135/280 "111" => 0.458 = 130/284
4-битовые предвестники и антагонисты единичного бита:
"1000" => 0.631 = 70/111 "1100" => 0.611 = 88/144 "1101" => 0.600 = 81/135 "0011" => 0.586 = 75/128
"0111" => 0.468 = 72/154 "0001" => 0.459 = 51/111 "0000" => 0.456 = 41/90 "1111" => 0.446 = 58/130
5-битовые предвестники и антагонисты единичного бита:
"00011" => 0.725 = 37/51 "01000" => 0.691 = 38/55 "11101" => 0.667 = 50/75 "11100" => 0.615 = 48/78 "01010" => 0.614 = 35/57
"00001" => 0.439 = 18/41 "10111" => 0.430 = 34/79 "00110" => 0.396 = 21/53 "01111" => 0.389 = 28/72 "10000" => 0.317 = 13/41
6-битовые предвестники и антагонисты единичного бита:
"100011" => 0.788 = 26/33 "101000" => 0.741 = 20/27 "111100" => 0.711 = 27/38 "111101" => 0.697 = 23/33 "001100" => 0.656 = 21/32
"011101" => 0.643 = 27/42
"100001" => 0.385 = 5/13 "100110" => 0.385 = 15/39 "010100" => 0.364 = 8/22 "110000" => 0.333 = 8/24 "001111" => 0.316 = 12/38
"010000" => 0.294 = 5/17
7-битовые предвестники и антагонисты единичного бита:
"0100011" => 0.833 = 15/18 "1000011" => 0.800 = 4/5 "0111100" => 0.792 = 19/24 "0101000" => 0.786 = 11/14 "0100000" => 0.750 = 9/12
"0001100" => 0.750 = 6/8 "1001110" => 0.737 = 14/19
"1010000" => 0.286 = 2/7 "1011110" => 0.278 = 5/18 "1010100" => 0.273 = 3/11 "1110000" => 0.231 = 3/13 "1001111" => 0.211 = 4/19
"0100001" => 0.200 = 1/5 "1000110" => 0.143 = 1/7
МАКСИМУМЫ АКФ (из 100):
array (size=10)
0 => float 1
6 => float 0.560606060606
15 => float 0.560606060606
34 => float 0.555555555556
58 => float 0.554545454545
18 => float 0.553535353535
4 => float 0.550505050505
73 => float 0.547474747475
16 => float 0.547474747475
85 => float 0.546464646465
АВТОРЕГРЕССИЯ ПО ДАРБИНУ
Контроль симметрии матрицы
Точная система (порядок 2):
1080.000 f0 + 564.000 f1 = -563.000
564.000 f0 + 1081.000 f1 = -546.000
Решение: f = [-0.353973, -0.320406]
Тёплицева система (порядок 2):
1079.000 f0 + 563.000 f1 = -563.000
563.000 f0 + 1079.000 f1 = -546.000
Решение: f = [-0.354171, -0.321225]
Порядок АР = 100, длина выборки = 2054, СКО выборки = 0.725635):
CKO:
["001" => 0.619, "002" => 0.579, "003" => 0.562, "004" => 0.548, "005" => 0.541, "006" => 0.538, "007" => 0.533, "008" => 0.531, "009" => 0.527,
"010" => 0.528, "011" => 0.523, "012" => 0.525, "013" => 0.522, "014" => 0.521, "015" => 0.524, "016" => 0.518, "017" => 0.522, "018" => 0.521, "019" => 0.518, "020" => 0.522,
"021" => 0.518, "022" => 0.517, "023" => 0.519, "024" => 0.517, "025" => 0.516, "026" => 0.518, "027" => 0.515, "028" => 0.515, "029" => 0.519, "030" => 0.516, "031" => 0.514,
"032" => 0.518, "033" => 0.513, "034" => 0.519, "035" => 0.516, "036" => 0.517, "037" => 0.515, "038" => 0.519, "039" => 0.514, "040" => 0.519, "041" => 0.516, "042" => 0.516,
"043" => 0.518, "044" => 0.516, "045" => 0.518, "046" => 0.515, "047" => 0.516, "048" => 0.516, "049" => 0.514, "050" => 0.518, "051" => 0.516, "052" => 0.516, "053" => 0.518,
"054" => 0.515, "055" => 0.515, "056" => 0.516, "057" => 0.514, "058" => 0.513, "059" => 0.515, "060" => 0.516, "061" => 0.517, "062" => 0.522, "063" => 0.513, "064" => 0.519,
"065" => 0.515, "066" => 0.517, "067" => 0.515, "068" => 0.512, "069" => 0.517, "070" => 0.515, "071" => 0.523, "072" => 0.514, "073" => 0.518, "074" => 0.517, "075" => 0.518,
"076" => 0.513, "077" => 0.519, "078" => 0.516, "079" => 0.514, "080" => 0.519, "081" => 0.516, "082" => 0.516, "083" => 0.519, "084" => 0.517, "085" => 0.517, "086" => 0.515,
"087" => 0.520, "088" => 0.516, "089" => 0.515, "090" => 0.514, "091" => 0.513, "092" => 0.517, "093" => 0.521, "094" => 0.515, "095" => 0.517, "096" => 0.520, "097" => 0.513,
"098" => 0.516, "099" => 0.521, "100" => 0.489, ]
*** СИНУСНАЯ ПОСЛЕДОВАТЕЛЬНОСТЬ ***
11110001110001110001111000111000111000111000111100011100011100011110001110001110001110001111000111000111000111100011100011100011100011110001110001110001111001111000111000111000111100011100011100011110011110001110001110001111000111000111000111000111100011100011100011110001110001110001110001111000111000111000111100011100011100011100011110001110001110001111000111000111000111000111100011100011100011110001110001110001110001111000111000111000111100011100011100011100011110001110001110001111000111000111000111000111100011100011100011110011110001110001110001111000111000111000111000111100011100011100011110001110001110001110001111000111000111000111100011100011100011100011110001110001110001111000111000111000111000111100011100011100011110001110001110001110001111000111000111000111100011100011100011100011110001110001110001111000111000111000111000111100011100011100011110011110001110001110001111000111000111000111100111100011100011100011110001110001110001110001111000111000111000111100011100011100011100011110001110001110001111000111000111000111000111100011100011100011110001110001110001110001111000111000111000111100011100011100011100011110001110001110001111000111000111000111000111100011100011100011110001110001110001110001111000111000111000111100111100011100011100011110001110001110001110001111000111000111000111100011100011100011100011110001110001110001111000111000111000111000111100011100011100011110001110001110001110001111000111000111000111100011100011100011100011110001110001110001111000111000111000111000111100011100011100011110001110001110001110001111000111000111000111100111100011100011100011110001110001110001111001111000111000111000111100011100011100011100011110001110001110001111000111000111000111000111100011100011100011110001110001110001110001111000111000111000111100011100011100011100011110001110001110001111000111000111000111000111100011100011100011110001110001110001110001111000111000111000111100011100011100011100011110001110001110001111001111000111000111000111100011100011100011100011110001110001110001111000111000111000111000111100011100
Длина последовательности = 2054
АНАЛИЗ ПОДПОСЛЕДОВАТЕЛЬНОСТЕЙ
1-битовые предвестники и антагонисты единичного бита:
"1" => 0.698 = 756/1083
"0" => 0.336 = 326/970
2-битовые предвестники и антагонисты единичного бита:
"01" => 1.000 = 326/326 "11" => 0.567 = 429/756
"00" => 0.507 = 326/643 "10" => 0.000 = 0/327
3-битовые предвестники и антагонисты единичного бита:
"001" => 1.000 = 326/326 "011" => 1.000 = 326/326 "000" => 1.000 = 317/317
"110" => 0.000 = 0/327
4-битовые предвестники и антагонисты единичного бита:
"1001" => 1.000 = 9/9 "0011" => 1.000 = 326/326 "0001" => 1.000 = 317/317 "1000" => 1.000 = 317/317
5-битовые предвестники и антагонисты единичного бита:
"10011" => 1.000 = 9/9 "11001" => 1.000 = 9/9 "00011" => 1.000 = 317/317 "11000" => 1.000 = 317/317 "10001" => 1.000 = 317/317
6-битовые предвестники и антагонисты единичного бита:
"110011" => 1.000 = 9/9 "100111" => 1.000 = 9/9 "111001" => 1.000 = 9/9 "110001" => 1.000 = 317/317 "111000" => 1.000 = 317/317
"100011" => 1.000 = 317/317
7-битовые предвестники и антагонисты единичного бита:
"1111000" => 1.000 = 93/93 "1100111" => 1.000 = 9/9 "1110011" => 1.000 = 9/9 "1111001" => 1.000 = 9/9 "1110001" => 1.000 = 317/317
"1100011" => 1.000 = 317/317 "0111000" => 1.000 = 224/224
МАКСИМУМЫ АКФ (из 100):
array (size=10)
0 => float 1
44 => float 0.994882292733
88 => float 0.989764585466
69 => float 0.96417604913
25 => float 0.959058341863
19 => float 0.954964176049
63 => float 0.949846468782
94 => float 0.924257932446
50 => float 0.919140225179
6 => float 0.914022517912
АВТОРЕГРЕССИЯ ПО ДАРБИНУ
Контроль симметрии матрицы
Точная система (порядок 2):
1082.000 f0 + 756.000 f1 = -755.000
756.000 f0 + 1083.000 f1 = -429.000
Решение: f = [-0.821865, 0.177590]
Тёплицева система (порядок 2):
1081.000 f0 + 755.000 f1 = -755.000
755.000 f0 + 1081.000 f1 = -429.000
Решение: f = [-0.822440, 0.177560]
Порядок АР = 100, длина выборки = 2054, СКО выборки = 0.726306):
CKO:
["001" => 0.406, "002" => 0.695, "003" => 0.890, "004" => 0.749, "005" => 0.469, "006" => 0.325, "007" => 0.593, "008" => 0.820, "009" => 0.924,
"010" => 0.782, "011" => 0.541, "012" => 0.216, "013" => 0.514, "014" => 0.763, "015" => 0.945, "016" => 0.837, "017" => 0.619, "018" => 0.247, "019" => 0.435, "020" => 0.713,
"021" => 0.909, "022" => 0.896, "023" => 0.695, "024" => 0.407, "025" => 0.327, "026" => 0.652, "027" => 0.862, "028" => 0.945, "029" => 0.763, "030" => 0.514, "031" => 0.157,
"032" => 0.579, "033" => 0.808, "034" => 0.964, "035" => 0.820, "036" => 0.595, "037" => 0.194, "038" => 0.495, "039" => 0.751, "040" => 0.941, "041" => 0.876, "042" => 0.670,
"043" => 0.362, "044" => 0.412, "045" => 0.699, "046" => 0.898, "047" => 0.931, "048" => 0.740, "049" => 0.480, "050" => 0.281, "051" => 0.630, "052" => 0.846, "053" => 0.970,
"054" => 0.800, "055" => 0.567, "056" => 0.101, "057" => 0.555, "058" => 0.791, "059" => 0.969, "060" => 0.854, "061" => 0.642, "062" => 0.306, "063" => 0.469, "064" => 0.734,
"065" => 0.926, "066" => 0.905, "067" => 0.708, "068" => 0.429, "069" => 0.363, "070" => 0.672, "071" => 0.879, "072" => 0.961, "073" => 0.779, "074" => 0.535, "075" => 0.235,
"076" => 0.663, "077" => 1.921, "078" => 1.053, "079" => 18.272, "080" => 0.637, "081" => 0.273, "082" => 0.543, "083" => 0.777, "084" => 0.956, "085" => 0.883, "086" => 0.676,
"087" => 0.369, "088" => 0.420, "089" => 0.704, "090" => 0.903, "091" => 0.930, "092" => 0.739, "093" => 0.476, "094" => 0.295, "095" => 0.635, "096" => 0.849, "097" => 0.970,
"098" => 0.796, "099" => 0.563, "100" => 0.080, ]
*** ДАТЧИК mt_rand() ***
11001100110110101100010010001011100011010100100101110010011100000111100110011011110010101111001011000101000101111101011010000001111111011010111001100110011101011010011101100110110110100111000011000000101010110110101010000011111011011101100000110100000110100111100100010110011010010001110111100001011000110101111011100111001100111110111111110000011000000011001000010010100111001011110111111110101101110000011011001111000011101011110111010100110111110001110110011100011111100000110110111110110110111011001101100101000101110111111000111001010000011010011110101110111110011101001010001110111110011011011111010100111111100101100011111010011111000110110001010101110001011010011001111110111001000110011001010010110110011011101001010011100101000110110010101011111111100110110011110101110100001100011100100101001001111001100110111100101010010101010001101011001100110001111100111101110110111010100110110101101000000011010101100010011100010000111111101110100011110101110110101010100101001101101001011110101111001111000000000111111010101000001001100010011101010110111011100010001000010001010111111010101110010011010010000001101011011111010000101010001101101010010111010111110001000001100011101110000110000011100111101001010110000101101110001110001100010111011110100100110100010011101101011010010101010010001100000110011110110010011011001100001001111111000001010110110000001100111111000100001111011011011110100111110100000010111011010011110000000101101110111111110011000011000101111100010111110101000001010010101101110111110011010011100100101010110101111010001011100010110101110011101100011000111100000111110111001111010110110110001010011000010101000100100100000011110001001111001000111100011001001000111110011011001101011001011110111110110111010011001110100101111000010101101110001110011111101110100011010001111011111101110101000111001011101010100011010000011111011010100101000111010101001101111111111011111110111111100111000011011110101011000010111101001011001010101100001000101100011010011110101001011010101011100100001001111010101110011101111100111110101101010000
Длина последовательности = 2054
АНАЛИЗ ПОДПОСЛЕДОВАТЕЛЬНОСТЕЙ
1-битовые предвестники и антагонисты единичного бита:
"0" => 0.552 = 521/943
"1" => 0.530 = 588/1110
2-битовые предвестники и антагонисты единичного бита:
"10" => 0.559 = 292/522 "00" => 0.544 = 229/421
"01" => 0.541 = 282/521 "11" => 0.519 = 305/588
3-битовые предвестники и антагонисты единичного бита:
"001" => 0.585 = 134/229 "010" => 0.565 = 135/239 "110" => 0.555 = 157/283
"111" => 0.521 = 159/305 "011" => 0.518 = 146/282 "101" => 0.507 = 148/292
4-битовые предвестники и антагонисты единичного бита:
"0010" => 0.600 = 57/95 "1001" => 0.587 = 74/126 "0001" => 0.583 = 60/103 "0110" => 0.574 = 78/136
"0000" => 0.517 = 45/87 "0011" => 0.515 = 69/134 "1111" => 0.503 = 80/159 "0101" => 0.489 = 66/135
5-битовые предвестники и антагонисты единичного бита:
"11001" => 0.642 = 43/67 "00001" => 0.622 = 28/45 "00000" => 0.619 = 26/42 "00010" => 0.605 = 26/43 "10010" => 0.596 = 31/52
"00101" => 0.491 = 28/57 "10101" => 0.487 = 38/78 "00011" => 0.483 = 29/60 "11111" => 0.475 = 38/80 "10000" => 0.422 = 19/45
6-битовые предвестники и антагонисты единичного бита:
"000001" => 0.769 = 20/26 "011001" => 0.733 = 22/30 "000010" => 0.647 = 11/17 "010011" => 0.645 = 20/31 "010010" => 0.643 = 18/28
"110100" => 0.636 = 21/33
"011111" => 0.452 = 19/42 "101011" => 0.447 = 17/38 "100001" => 0.421 = 8/19 "000011" => 0.393 = 11/28 "100101" => 0.387 = 12/31
"010000" => 0.368 = 7/19
7-битовые предвестники и антагонисты единичного бита:
"0000010" => 0.833 = 5/6 "0000111" => 0.818 = 9/11 "1000001" => 0.812 = 13/16 "0011001" => 0.800 = 12/15 "1101111" => 0.739 = 17/23
"1001101" => 0.737 = 14/19 "1000101" => 0.733 = 11/15
"0011010" => 0.375 = 6/16 "1000011" => 0.375 = 3/8 "0001100" => 0.357 = 5/14 "0001101" => 0.353 = 6/17 "0101100" => 0.308 = 4/13
"0011011" => 0.300 = 6/20 "1010000" => 0.182 = 2/11
МАКСИМУМЫ АКФ (из 100):
array (size=10)
0 => float 1
20 => float 0.565606361829
7 => float 0.562624254473
29 => float 0.561630218688
13 => float 0.559642147117
97 => float 0.559642147117
43 => float 0.557654075547
39 => float 0.557654075547
62 => float 0.557654075547
90 => float 0.557654075547
АВТОРЕГРЕССИЯ ПО ДАРБИНУ
Контроль симметрии матрицы
Точная система (порядок 2):
1109.000 f0 + 588.000 f1 = -587.000
588.000 f0 + 1110.000 f1 = -597.000
Решение: f = [-0.339492, -0.357999]
Тёплицева система (порядок 2):
1108.000 f0 + 587.000 f1 = -587.000
587.000 f0 + 1108.000 f1 = -597.000
Решение: f = [-0.339666, -0.358859]
Порядок АР = 100, длина выборки = 2054, СКО выборки = 0.735304):
CKO:
["001" => 0.617, "002" => 0.576, "003" => 0.556, "004" => 0.540, "005" => 0.531, "006" => 0.525, "007" => 0.522, "008" => 0.521, "009" => 0.521,
"010" => 0.517, "011" => 0.515, "012" => 0.513, "013" => 0.513, "014" => 0.514, "015" => 0.514, "016" => 0.511, "017" => 0.512, "018" => 0.511, "019" => 0.511, "020" => 0.511,
"021" => 0.513, "022" => 0.510, "023" => 0.508, "024" => 0.507, "025" => 0.507, "026" => 0.508, "027" => 0.510, "028" => 0.508, "029" => 0.508, "030" => 0.506, "031" => 0.508,
"032" => 0.509, "033" => 0.511, "034" => 0.510, "035" => 0.510, "036" => 0.510, "037" => 0.508, "038" => 0.507, "039" => 0.507, "040" => 0.509, "041" => 0.509, "042" => 0.506,
"043" => 0.509, "044" => 0.505, "045" => 0.508, "046" => 0.509, "047" => 0.508, "048" => 0.510, "049" => 0.510, "050" => 0.509, "051" => 0.508, "052" => 0.509, "053" => 0.505,
"054" => 0.507, "055" => 0.513, "056" => 0.512, "057" => 0.508, "058" => 0.508, "059" => 0.507, "060" => 0.507, "061" => 0.508, "062" => 0.509, "063" => 0.505, "064" => 0.508,
"065" => 0.505, "066" => 0.505, "067" => 0.509, "068" => 0.511, "069" => 0.511, "070" => 0.510, "071" => 0.511, "072" => 0.507, "073" => 0.511, "074" => 0.512, "075" => 0.514,
"076" => 0.511, "077" => 0.510, "078" => 0.510, "079" => 0.509, "080" => 0.510, "081" => 0.506, "082" => 0.513, "083" => 0.513, "084" => 0.511, "085" => 0.512, "086" => 0.512,
"087" => 0.511, "088" => 0.512, "089" => 0.516, "090" => 0.516, "091" => 0.512, "092" => 0.516, "093" => 0.512, "094" => 0.514, "095" => 0.515, "096" => 0.515, "097" => 0.515,
"098" => 0.515, "099" => 0.513, "100" => 0.490, ]