%I A129548
%S A129548 1,1,8,9,36,43,120,147,329,406,784,966,1680,2058,3312,4026,6105,7359,
%T A129548 10648,12727,17732,21021,28392,33397,43953,51324,66080,76636,96832,
%U A129548 111588,138720,158916,194769,221901,268584,304437,364420,411103,487256
%N A129548 Measures of entanglement in 3-qbits.
%D A129548 David Meyer and Nolan Wallach, Invariants for multiple qubits: the case
of 3 qubits, Mathematics of quantum computing, Computational Mathematics
Series, 77-98, Chapman & Hall/CRC Press, 2002.
%D A129548 Nolan Wallach, The Hilbert series of measures of entanglement for 4 q-bits,
Acta Appl. Math. 86(2005),203-220.
%F A129548 G.f.: (1+x^4)*(1+x^4+x^8)/((1-x^2)*(1-x^4)^5*(1-x^6)).
%Y A129548 Cf. A000217, A129549.
%Y A129548 Sequence in context: A041136 A041915 A036764 this_sequence A075079 A041933
A041138
%Y A129548 Adjacent sequences: A129545 A129546 A129547 this_sequence A129549 A129550
A129551
%K A129548 nonn
%O A129548 0,3
%A A129548 Mike Zabrocki (zabrocki(AT)mathstat.yorku.ca), Apr 20 2007
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