[seqfan] Re: Frobenius Numbers

[Charles Greathouse]

Very nice!  Certainly I support adding them.

Charles Greathouse
Analyst/Programmer
Case Western Reserve University

On Thu, Jul 26, 2012 at 5:18 AM, Max Alekseyev <maxale at gmail.com> wrote:
> A formula for Frobenius number of an arithmetic sequence (in this case
> formed by consecutive integers) is known:
> http://en.wikipedia.org/wiki/Frobenius_number#Arithmetic_sequences
>
> Regards,
> Max
>
> On Wed, Jul 25, 2012 at 10:48 PM, Charles Greathouse
> <charles.greathouse at case.edu> wrote:
>> I'm not opposed. Is there anything interesting to say about them? Is
>> there a formula or an asymptotic?
>>
>> Charles Greathouse
>> Analyst/Programmer
>> Case Western Reserve University
>>
>> On Wed, Jul 25, 2012 at 2:28 PM, Harvey P. Dale <hpd1 at nyu.edu> wrote:
>>>             A069756 gives the Frobenius numbers for any two consecutive
>>> square numbers, and A069755 gives the Frobenius numbers for any three
>>> consecutive triangular numbers.  Obviously, other possible sequences are
>>> possible, e.g., (1) Frobenius numbers for any three consecutive square
>>> numbers, (2) Frobenius numbers for any four consecutive triangular
>>> numbers, etc.  Are any of these of sufficient interest to include in the
>>> OEIS?
>>>
>>>             Best,
>>>
>>>             Harvey
>>>
>>>
>>> _______________________________________________
>>>
>>> Seqfan Mailing list - http://list.seqfan.eu/
>>
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