Add to ORKGWe consider a notion of relative homology (and cohomology) for surfaces with two types of boundaries. Using this tool, we study a generalization of Kitaev's code based on surfaces with mixed boundaries. This construction includes both Bravyi and Kitaev's and Freedman and Meyer's extension of Kitaev's toric code. We argue that our generalization offers a denser storage of quantum information. In a planar architecture, we obtain a three-fold overhead reduction over the standard architecture consisting of a punctured square lattice
This dissertation is concerned with quantum computation using many-body quantum systems encoded in t...
We show how a hyperbolic surface code could be used for overhead-efficient quantum storage. We give ...
We review constructions of quantum surface codes and give an alternative, algebraic, construction of...
We consider a notion of relative homology (and cohomology) for surfaces with two types of boundaries...
We prove several theorems characterizing the existence of homological error correction codes both cl...
Computer architectures which exploit quantum mechanical effects can solve computing tasks that are o...
An economy of scale is found when storing many qubits in one highly entangled block of a topological...
We construct surface codes corresponding to genus greater than one in the context of quantum error c...
We construct surface codes corresponding to genus greater than one in the context of quantum error c...
We construct a double-toric surface code by exploiting the planar tessellation using a rhombus-shape...
This thesis is a collection of ideas with the general goal of building, at least in the abstract, a ...
We analyze surface codes, the topological quantum error-correcting codes introduced by Kitaev. In th...
This thesis is a collection of ideas with the general goal of building, at least in the abstract, a ...
We construct toric codes on various high-dimensional manifolds. Assuming a conjecture in geometry w...
In this paper we construct a class of topological quantum error-correcting codes on compact surfaces...
This dissertation is concerned with quantum computation using many-body quantum systems encoded in t...
We show how a hyperbolic surface code could be used for overhead-efficient quantum storage. We give ...
We review constructions of quantum surface codes and give an alternative, algebraic, construction of...
We consider a notion of relative homology (and cohomology) for surfaces with two types of boundaries...
We prove several theorems characterizing the existence of homological error correction codes both cl...
Computer architectures which exploit quantum mechanical effects can solve computing tasks that are o...
An economy of scale is found when storing many qubits in one highly entangled block of a topological...
We construct surface codes corresponding to genus greater than one in the context of quantum error c...
We construct surface codes corresponding to genus greater than one in the context of quantum error c...
We construct a double-toric surface code by exploiting the planar tessellation using a rhombus-shape...
This thesis is a collection of ideas with the general goal of building, at least in the abstract, a ...
We analyze surface codes, the topological quantum error-correcting codes introduced by Kitaev. In th...
This thesis is a collection of ideas with the general goal of building, at least in the abstract, a ...
We construct toric codes on various high-dimensional manifolds. Assuming a conjecture in geometry w...
In this paper we construct a class of topological quantum error-correcting codes on compact surfaces...
This dissertation is concerned with quantum computation using many-body quantum systems encoded in t...
We show how a hyperbolic surface code could be used for overhead-efficient quantum storage. We give ...
We review constructions of quantum surface codes and give an alternative, algebraic, construction of...