Mixed graph states

TL;DR

This paper introduces mixed graph states, extending graph states to include directed and undirected edges, and provides methods to analyze their stabilizer matrices, group structures, and quantum properties.

Contribution

It generalizes graph states to mixed graphs, characterizes their stabilizer matrices, and develops algorithms for finding maximal commutative groups of associated Pauli matrices.

Findings

Mixed graph states are stabilized by matrices derived from mixed graphs.

The set of matrices in the stabilizer sum forms a maximum size commuting group.

The structure of maximal commutative groups is independent of edge directions.

Abstract

We have generalised the concept of graph states to what we have called mixed graph states, which we define in terms of mixed graphs, that is graphs with both directed and undirected edges, as the density matrix stabilized by the associated stabilizer matrix defined by the mixed graph. We can interpret this matrix as a quantum object by making it part of a larger fully commuting matrix, i.e. where we choose the environment appropriately, and this will imply that our quantum object is a mixed state. We prove that, in the same way as (pure) graph states, the density matrix of a parent of mixed graph state can be written as sum of a few Pauli matrices, well defined from the mixed graph. We have proven that the set of matrices that appear in this sum is fully pair-wise commuting, and form a multiplicative group up to global constants, which is always of maximum size. Furthermore, the cardinality of the set depends solely of the miminum possible number of extension columns/rows, and the number of nodes of the mixed graph. We prove a formula for this cardinality. Finally, in the case of purely undirected graphs, this corresponds to the usual pure graph state. Also, we have developed a way of finding maximal commutative group of such Pauli matrices as a linear subspace problem, for any given mixed graph. We also have proven how the structure of maximal commutative groups is independent of the direction of the arrows of the mixed graph, and also of the undirected edges; this allows the simplification of the problem of finding these groups in general to finding them for a much smaller set of graphs.