Expansion of series related to Liouville's Last Theorem: g.f. sum_{t>0} (-1)^(t+1) *x^(t*(t+1)/2) / ( (1-x^t)^6 *product_{i=1..t} (1-x^i) ).

A059823

Expansion of series related to Liouville's Last Theorem: g.f. sum_{t>0} (-1)^(t+1) *x^(t*(t+1)/2) / ( (1-x^t)^6 *product_{i=1..t} (1-x^i) ).

Terms

    a(0) =0a(1) =1a(2) =7a(3) =27a(4) =83a(5) =202a(6) =455a(7) =889a(8) =1682a(9) =2892a(10) =4894a(11) =7694a(12) =12090a(13) =17822a(14) =26411a(15) =37206a(16) =52730a(17) =71447a(18) =97984a(19) =128714a(20) =171421a(21) =220064a(22) =285963a(23) =359204a(24) =458506a(25) =565347a(26) =708665a(27) =862163a(28) =1064302a(29) =1276474

External references