Development of
Algorithmic Constructions
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01:22:11 | |
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| 17.Apr 2024 |
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Development of |
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1. Algorithm
liste_max:=100000;
sieving:=proc (stelle, p)
begin
while (stelle<=liste_max) do
erg:=liste[stelle];
while(erg mod p=0) do
// Divison of the stored f(x) by the prime
erg:=erg /p;
end_while;
liste[stelle]:=erg;
stelle:=stelle+p;
end_while;
end_proc;
// Calculation of the values of the polynom for x from 0 to liste_max
for x from 0 to liste_max do
p:=abs (a*x^2+b*x+c);
while (p mod 2=0) p:=p/2;
liste [x]:=p;
end_for;
for x from 0 to liste_max do
p:=liste[x];
if (p>1) then
// Printing the Primes
print (x, p);
// 1. Sieving
sieving (x+p, p);
t:=(-x-b/a) mod p;
if t=0 then t:=p; end_if;
// 2. Sieving
sieving (t, p);
end_if;
end_for;
If you are interested in some better algorithms have a look at quadr_Sieb_x^2+1.php.Lemma: If p | f(x) then also p | f(x+p) and p | f(-x-b/a) a) p | f(x) <=> ax^2 + bx + c = 0 mod p p | f(x+p) <=> a(x+p)^2 + b(x+p) + c = 0 mod p <=> ax^2 + 2axp + ap^2 + bx + bp + c = 0 mod p <=> ax^2 + bx + c = 0 mod p Thus if p | f(x) then p | f(x+p) b) if b = 0 mod a p | f(x) <=> ax^2 + bx + c = 0 mod p p | f(-x-b/a) <=> a(-x-b/a)^2 + b(-x-b/a) + c = 0 mod p <=> ax^2 + 2bx + b^2/a - bx - b^2/a + c = 0 mod p <=> ax^2 + bx + c = 0 mod p Thus if p | f(x) then p | f(-x-b/a)
The proof for this polynom is similar to the proof for the polynom f(x)=x^2-4x+1. a) First terms for the polynom f(x) = x^2-116x+307
f(0)=307
f(1)=3
f(2)=79
f(3)=1
f(4)=47
f(5)=31
f(6)=353
f(7)=19
f(8)=557
f(9)=41
f(10)=251
f(11)=53
f(12)=941
f(13)=43
f(14)=59
f(15)=151
f(16)=431
f(17)=1
f(18)=1
f(19)=1
f(20)=1613
f(21)=211
f(22)=587
f(23)=229
f(24)=1901
f(25)=1
f(26)=107
f(27)=131
f(28)=719
f(29)=277
f(30)=2273
f(31)=97
f(32)=2381
f(33)=1
f(34)=827
f(35)=1
f(36)=83
f(37)=109
f(38)=2657
f(39)=337
f(40)=911
f(41)=173
f(42)=2801
f(43)=1
f(44)=2861
f(45)=1
f(46)=971
f(47)=367
f(48)=2957
f(49)=1
f(50)=73
f(51)=1
f(52)=1
f(53)=379
f(54)=3041
f(55)=127
f(56)=71
f(57)=191
f(58)=1019
f(59)=1
f(60)=1
f(61)=1
f(62)=1
f(63)=1
f(64)=1
f(65)=1
f(66)=1
f(67)=1
f(68)=1
f(69)=1
f(70)=1
f(71)=1
f(72)=1
f(73)=1
f(74)=1
f(75)=1
f(76)=1
f(77)=1
f(78)=1
f(79)=1
f(80)=1
f(81)=1
f(82)=1
f(83)=1
f(84)=1
f(85)=1
f(86)=1
f(87)=1
f(88)=1
f(89)=1
f(90)=1
f(91)=1
f(92)=1
f(93)=1
f(94)=1
f(95)=1
f(96)=1
f(97)=1
f(98)=1
f(99)=1
b) Substitution of the polynom
The polynom f(x)=x^2-116x+307 could be written as f(y)= y^2-3057 with x=y+58
c) Backsubstitution Beside by backsubstitution you get an estimation for the huge of the primes with p | f(x) and p < f(x) f'(y)>(2y-1) with with y=x-58
f'(x)>2x-117 with x > 55
4. Infinity of the sequence 5. Sequence of the polynom with 1 6. Sequence of the polynom (only primes) 7. Distribution of the primes