[seqfan] Re: Primes and prime remainders
Bob Selcoe
rselcoe at entouchonline.net
Mon Oct 6 00:26:11 CEST 2014
Hi Vladimir, Eric, et. al,
> But is there,
> for prime k>=5, such a prime q such that q-2*k is a prime (r)?
>... So, till now it is an unsolved problem.
Vladimir, what are you looking to solve? How does this pertain to Eric's
sequence?
The number of ways q can be written as q-2*k = r (k,q,r are prime) is
A103274. Are you looking for an equation for A103274?? How does this
pertain to Eric's sequence?
Cheers,
Bob
--------------------------------------------------
From: "Vladimir Shevelev" <shevelev at bgu.ac.il>
Sent: Sunday, October 05, 2014 1:47 PM
To: "Sequence Fanatics Discussion list" <seqfan at list.seqfan.eu>
Subject: [seqfan] Re: Primes and prime remainders
> If a(n) is lesser of twin primes, then a(n+1)=a(n)+2;
> otherwise, it is intuitively clear that a(n+1) is
> the smallest prime of the form 2*a(n)+prime.
> Indeed,it is known that between 2*k and 3*k, k>=2,
> there is a prime (q )( El Bachraoui (2006)). But is there,
> for prime k>=5, such a prime q such that q-2*k is a prime (r)?
> In this case we have q=r+2*k, where q,k,r are primes.
> It is similar to a special case of the Lemoine's-Levy's
> conjecture for odd prime (here q is prime)
> [cf. A046927], but with additional condition r<k.
> So, till now it is an unsolved problem.
>
> Regards,
> Vladimir
>
> ________________________________________
> From: SeqFan [seqfan-bounces at list.seqfan.eu] on behalf of Eric Angelini
> [Eric.Angelini at kntv.be]
> Sent: 05 October 2014 12:03
> To: Sequence Discussion list
> Subject: [seqfan] Primes and prime remainders
>
> Hello SeqFans,
> Primes p(n) such that the remainder
> of p(n)/p(n-1) is prime.
> The seq P starts with p(1)=3 and is always
> extended with the smallest possible
> prime.
>
> P=3,5,7,17,19,41,43,89,...
>
> Example:
> 5/3--> remainder 2
> 7/5--> remainder 2
> 17/7--> remainder 3
> 19/17--> remainder 2
> 41/19--> remainder 3
> 43/41--> remainder 2
> 89/43--> remainder 3
> etc.
> Hope I didn't mistake somewhere.
> Best.
> É.
>
>
> Catapulté de mon aPhone
>
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