cp's OEIS Frontend

This is a front-end for the Online Encyclopedia of Integer Sequences, made by Christian Perfect. The idea is to provide OEIS entries in non-ancient HTML, and then to think about how they're presented visually. The source code is on GitHub.

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A077762 Number of ways of pairing the squares of the numbers 1 to n with the squares of the numbers n+1 to 2n such that each pair sums to a prime. Because an odd square must always be added to an even square to obtain a prime, this sequence is the product of A077763 and A077764.

Original entry on oeis.org

1, 1, 0, 1, 2, 0, 1, 1, 4, 8, 0, 8, 42, 28, 140, 616, 836, 180, 1416, 2542, 10960, 96048, 242204, 367587, 923949, 1145430, 2622420, 19081728, 245846500, 2934255428, 6725485476, 7722272142, 26106311490, 114470819132, 331909473776, 330258090272, 4585951400436, 37021666628450
Offset: 1

Views

Author

T. D. Noe, Nov 15 2002

Keywords

Comments

Apparently, for n>11, there seems always to be a pairing possible. Note that all primes have the 4k+1 form. By the 4k+1 theorem, such a prime has a unique representation as the sum of two squares.

Examples

			a(5) = 2 because there are two ways: (1,4,9,16,25) + (36,49,100,81,64) = (37,53,109,97,89) and (1,4,9,16,25) + (100,49,64,81,36) = (101,53,73,97,61).

Links

Crossrefs

Cf. A000348, A070897, A077763, A077764.

Programs

  • Mathematica
    lst1*lst2 (* which are defined in A077763 and A077764 *)

Formula

a(n) = permanent(m), where the n X n matrix m is defined by m(i,j) = 1 or 0, depending on whether i^2 + (j+n)^2 is prime or composite, respectively. - T. D. Noe, Feb 10 2007

Extensions

More terms from Bert Dobbelaere, Sep 08 2019

A077764 Number of ways of pairing the even squares of the numbers 1 to n with the odd squares of the numbers n+1 to 2n such that each pair sums to a prime. a(1) is defined to be 1.

Original entry on oeis.org

1, 1, 1, 1, 1, 1, 1, 1, 2, 4, 4, 8, 6, 14, 14, 44, 22, 30, 12, 41, 137, 667, 401, 517, 149, 286, 306, 1312, 1940, 23546, 23886, 23886, 68285, 728501, 241424, 555302, 630441, 4175810, 7996830, 87591010, 101316606, 148078428, 92744140, 298180464, 241949668, 1090944470
Offset: 1

Views

Author

T. D. Noe, Nov 15 2002

Keywords

Comments

It appears that a pairing is always possible. The Mathematica program uses backtracking to find all solutions. The Print statement can be uncommented to print all solutions. The product of this sequence and A077763 gives A077762.

Examples

			a(5)=1 because only one pairing is possible: 4+49=53, 16+81=97.

Links

Crossrefs

Cf. A077762, A077763.

Programs

  • Mathematica
    try[lev_] := Module[{j}, If[lev>n, (*Print[soln]; *) cnt++, For[j=1, j<=Length[s[[lev]]], j++, If[ !MemberQ[soln, s[[lev]][[j]]], soln[[lev]]=s[[lev]][[j]]; try[lev+2]; soln[[lev]]=0]]]]; maxN=28; For[lst2={1}; n=2, n<=maxN, n++, s=Table[{}, {n}]; For[i=2, i<=n, i=i+2, For[j=n+1, j<=2n, j++, If[PrimeQ[i^2+j^2], AppendTo[s[[i]], j]]]]; soln=Table[0, {n}]; cnt=0; try[2]; AppendTo[lst2, cnt]]; lst2

Extensions

a(29)-a(46) from Bert Dobbelaere, Sep 08 2019
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