TY  - JOUR
N1  - © 2007 IOP Publishing Ltd
ID  - epprod4150
UR  - http://dx.doi.org/10.1088/1751-8113/40/33/011
IS  - 33
A1  - King, RC
A1  - Welsh, TA
A1  - Jarvis, PD
Y1  - 2007/08/17/
N2  - The local invariants of a mixed two-qubit system are discussed. These invariants are polynomials in the elements of the corresponding density matrix. They are counted by means of group-theoretic branching rules which relate this problem to one arising in spin?isospin nuclear shell models. The corresponding Molien series and a refinement in the form of a four-parameter generating function are determined. A graphical approach is then used to construct explicitly a fundamental set of 21 invariants. Relations between them are found in the form of syzygies. By using these, the structure of the ring of local invariants is determined, and complete sets of primary and secondary invariants are identified: there are 10 of the former and 15 of the latter.
PB  - IOP Publishing Ltd
JF  - Journal of Physics A: Mathematical and Theoretical
VL  - 40
SN  - 1751-8113
TI  - The mixed two-qubit system and the structure of its ring of local invariants
SP  - 10083
AV  - restricted
EP  - 10108
ER  -