Smallest prime of the form a^2^m + b^2^m, m>=14 - Page 11

JeppeSN · 2018-04-06, 17:26

Quote:

Originally Posted by axn

Code:

(3^2+1^2)/2
(3^4+1^4)/2
(5^8+3^8)/2
(3^16+1^16)/2
(3^32+1^32)/2
(3^64+1^64)/2
(179^128+177^128)/2
(169^256+167^256)/2
(935^512+933^512)/2
(663^1024+661^1024)/2

Submitted as A302387 (not approved yet). /JeppeSN

JeppeSN · 2018-12-15, 23:24

Quote:

Originally Posted by Batalov

Aw well, m=16 was too easy. Even a pair for the good measure:
124^65536+57^65536
143^65536+106^65536

I just discovered these are duplicates at the PRP Top site. If you search for x^(2^16)+y^(2^16), the same two numbers were found by Valeryi Kuryshev in Feb 2011.

/JeppeSN

Batalov · 2018-12-16, 00:17

Yes, there are many more; I've seen duplicates in other classes before. (Because there are similarly different ways to write values, e.g. using Phi(), or gcd() ... for primitive parts or Aurifeuillean parts. PRP owners should better have an in-take evaluator and checker.

The bracketed form is hard to search for. You can use "x^?+y^?" and then filter, but that's not the first form that comes to mind.

JeppeSN · 2018-12-16, 00:35

OK. And still no trace of A291944(17), the smallest PRP of form xGF(17, a, b) = a^131072 + b^131072. /JeppeSN

Batalov · 2018-12-16, 01:57

How far did anybody search?

JeppeSN · 2022-08-02, 15:30

Kellen Shenton found the PRP 1196^131072 + 595^131072, to appear on PRP Top.

As soon as it is verified that 1196 is minimal for this exponent, OEIS will be updated.

/JeppeSN

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2018-12-16, 00:17	#113
Batalov "Serge" Mar 2008 Phi(4,2^7658614+1)/2 10011010101101₂ Posts	Yes, there are many more; I've seen duplicates in other classes before. (Because there are similarly different ways to write values, e.g. using Phi(), or gcd() ... for primitive parts or Aurifeuillean parts. PRP owners should better have an in-take evaluator and checker. The bracketed form is hard to search for. You can use "x^?+y^?" and then filter, but that's not the first form that comes to mind.

2018-12-16, 00:35	#114
JeppeSN "Jeppe" Jan 2016 Denmark 2×89 Posts	OK. And still no trace of A291944(17), the smallest PRP of form xGF(17, a, b) = a^131072 + b^131072. /JeppeSN

2018-12-16, 01:57	#115
Batalov "Serge" Mar 2008 Phi(4,2^7658614+1)/2 10011010101101₂ Posts	How far did anybody search?

2022-08-02, 15:30	#116
JeppeSN "Jeppe" Jan 2016 Denmark 178₁₀ Posts	Kellen Shenton found the PRP 1196^131072 + 595^131072, to appear on PRP Top. As soon as it is verified that 1196 is minimal for this exponent, OEIS will be updated. /JeppeSN