From orthosymplectic structure to super topological matter

Abstract

Topological supermatter is given by ordinary topological matter constrained by supersymmetry or graded supergroups such as OSP(2N|2N). Using results on super oscillators and lattice QFTd, we construct a super tight binding model on hypercubic super lattice with supercharge Q=ΣkFk.qk.Bk. We first show that the algebraic triplet ( ,G,J) of super oscillators can be derived from the OSp(2N|2N) supergroup containing the symplectic Sp(2N) and the orthogonal SO(2N) as even subgroups. Then, we apply the obtained result on super oscillating matter to super bands and investigate its topological obstructions protected by TPC symmetries. We also give a classification of the Bose/Fermi coupling matrix qk in terms of subgroups of OSp(2N|2N)\ and show that there are 2PN (partition of N) classes qk given by unitary subgroups of U( 2) × U( N) . Other features are also given.