A293940 Poincaré series for invariant polynomial functions on the space of binary forms of degree 15.

1, 0, 3, 1, 36, 80, 418, 1111, 3581, 8899, 22786, 51286, 114049, 234754, 472443, 902625, 1683916, 3024451, 5313062, 9063638, 15158162, 24760532, 39743317, 62563090, 96977396, 147874275, 222433862, 329908935, 483445738, 699822112, 1002221943, 1419949064, 1992553143

Offset

0,3

Comments

Many of these Poincaré series has every other term zero, in which case these zeros have been omitted.

Links

Table of n, a(n) for n=0..32.

Andries Brouwer, Poincaré Series (See n=915)

Example

The Poincaré series is (1 + 2t^4 + 32t^8 + 76t^10 + 378t^12 + 995t^14 + 3048t^16 + 7294t^18 + 17681t^20 + 37736t^22 + 78903t^24 + 152321t^26 + 285968t^28 + 507762t^30 + 876759t^32 + 1451423t^34 + 2341739t^36 + 3653241t^38 + 5568497t^40 + 8254649t^42 + 11983447t^44 + 16987847t^46 + 23631274t^48 + 32196429t^50 + 43116834t^52 + 56681420t^54 + 73342055t^56 + 93320393t^58 + 117007543t^60 + 144461993t^62 + 175919353t^64 + 211175615t^66 + 250222591t^68 + 292516508t^70 + 337751801t^72 + 385016863t^74 + 433713649t^76 + 482605505t^78 + 530877973t^80 + 577086324t^82 + 620343376t^84 + 659172312t^86 + 692798202t^88 + 719914717t^90 + 740045690t^92 + 752239053t^94 + 756462172t^96 + 752239053t^98 + 740045690t^100 + 719914717t^102 + 692798202t^104 + 659172312t^106 + 620343376t^108 + 577086324t^110 + 530877973t^112 + 482605505t^114 + 433713649t^116 + 385016863t^118 + 337751801t^120 + 292516508t^122 + 250222591t^124 + 211175615t^126 + 175919353t^128 + 144461993t^130 + 117007543t^132 + 93320393t^134 + 73342055t^136 + 56681420t^138 + 43116834t^140 + 32196429t^142 + 23631274t^144 + 16987847t^146 + 11983447t^148 + 8254649t^150 + 5568497t^152 + 3653241t^154 + 2341739t^156 + 1451423t^158 + 876759t^160 + 507762t^162 + 285968t^164 + 152321t^166 + 78903t^168 + 37736t^170 + 17681t^172 + 7294t^174 + 3048t^176 + 995t^178 + 378t^180 + 76t^182 + 32t^184 + 2t^188 + t^192) / (1 - t^4)(1 - t^6)(1 - t^8)(1 - t^10)(1 - t^12)(1 - t^14)(1 - t^16) (1 - t^18)(1 - t^20)(1 - t^22)(1 - t^24)(1 - t^26)(1 - t^28)

Maple

nmax := 120 :
(1 + 2*t^4 + 32*t^8 + 76*t^10 + 378*t^12 + 995*t^14 + 3048*t^16 + 7294*t^18 + 17681*t^20 + 37736*t^22 + 78903*t^24 + 152321*t^26 + 285968*t^28 + 507762*t^30 + 876759*t^32 + 1451423*t^34 + 2341739*t^36 + 3653241*t^38 + 5568497*t^40 + 8254649*t^42 + 11983447*t^44 + 16987847*t^46 + 23631274*t^48 + 32196429*t^50 + 43116834*t^52 + 56681420*t^54 + 73342055*t^56 + 93320393*t^58 + 117007543*t^60 + 144461993*t^62 + 175919353*t^64 + 211175615*t^66 + 250222591*t^68 + 292516508*t^70 + 337751801*t^72 + 385016863*t^74 + 433713649*t^76 + 482605505*t^78 + 530877973*t^80 + 577086324*t^82 + 620343376*t^84 + 659172312*t^86 + 692798202*t^88 + 719914717*t^90 + 740045690*t^92 + 752239053*t^94 + 756462172*t^96 + 752239053*t^98 + 740045690*t^100 + 719914717*t^102 + 692798202*t^104 + 659172312*t^106 + 620343376*t^108 + 577086324*t^110 + 530877973*t^112 + 482605505*t^114 + 433713649*t^116 + 385016863*t^118 + 337751801*t^120 + 292516508*t^122 + 250222591*t^124 + 211175615*t^126 + 175919353*t^128 + 144461993*t^130 + 117007543*t^132 + 93320393*t^134 + 73342055*t^136 + 56681420*t^138 + 43116834*t^140 + 32196429*t^142 + 23631274*t^144 + 16987847*t^146 + 11983447*t^148 + 8254649*t^150 + 5568497*t^152 + 3653241*t^154 + 2341739*t^156 + 1451423*t^158 + 876759*t^160 + 507762*t^162 + 285968*t^164 + 152321*t^166 + 78903*t^168 + 37736*t^170 + 17681*t^172 + 7294*t^174 + 3048*t^176 + 995*t^178 + 378*t^180 + 76*t^182 + 32*t^184 + 2*t^188 + t^192) / (1 - t^4)/(1 - t^6)/(1 - t^8)/(1 - t^10)/(1 - t^12)/(1 - t^14)/(1 - t^16) /(1 - t^18)/(1 - t^20)/(1 - t^22)/(1 - t^24)/(1 - t^26)/(1 - t^28) ;
taylor(%, t=0, nmax) ;
gfun[seriestolist](%) ;
seq( %[1+2*i], i=0..nmax/2-1) ; # R. J. Mathar, Oct 26 2017

Crossrefs

For these Poincaré series for d = 6, 7, 8, 9, 10, 11, 12, 13, 14, 15, 16, 20, 24 see A097852, A293933, A097851, A293934, A293935, A293936, A293937, A293938, A293939, A293940, A293941, A293942, A293943 respectively.

Sequence in context: A271288 A271276 A270090 * A103242 A271296 A270132

Adjacent sequences: A293937 A293938 A293939 * A293941 A293942 A293943

Keyword

nonn

Author

N. J. A. Sloane, Oct 20 2017

Status

approved