Add to ORKGWe study the computational power of unitary Clifford circuits with solely magic state inputs (CM circuits), supplemented by classical efficient computation. We show that CM circuits are hard to classically simulate up to multiplicative error (assuming polynomial hierarchy non-collapse), and also up to additive error under plausible average-case hardness conjectures. Unlike other such known classes, a broad variety of possible conjectures apply. Along the way, we give an extension of the Gottesman-Knill theorem that applies to universal computation, showing that for Clifford circuits with joint stabilizer and non-stabilizer inputs, the stabilizer part can be eliminated in favour of classical simulation, leaving a Clifford circuit on only the...
With this thesis project, we improve the classical simulation of quantum computers using stabilizers...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Electrical Engineering and Comp...
We define and construct efficient depth universal and almost size universal quantum circuits. Such c...
Clifford gates are a winsome class of quantum operations combining mathematical elegance with physic...
Universal quantum computation can be achieved with a gate set that includes a generating set of Clif...
Clifford gates are a winsome class of quantum operations combining mathematical elegance with physic...
Clifford gates are a winsome class of quantum operations combining mathematical el-egance with physi...
In this thesis, we explore the mathematical properties of the Clifford group, a special subgroup of ...
The stabiliser formalism is a widely used and successful subtheory of quantum mechanics consisting o...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mathematics, 2019Cataloged from...
We consider a model of quantum computation in which the set of elementary operations is limited to C...
The Gottesman-Knill theorem states that a Clifford circuit acting on stabilizer states can be simula...
In this work, we develop resource-theoretic approaches to study the non-stabilizer resources in faul...
Abstract We study two-qubit circuits over the Clifford+CS gate set, which consists of the Clifford g...
We give a new algorithm for computing the robustness of magic-a measure of the utility of quantum st...
With this thesis project, we improve the classical simulation of quantum computers using stabilizers...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Electrical Engineering and Comp...
We define and construct efficient depth universal and almost size universal quantum circuits. Such c...
Clifford gates are a winsome class of quantum operations combining mathematical elegance with physic...
Universal quantum computation can be achieved with a gate set that includes a generating set of Clif...
Clifford gates are a winsome class of quantum operations combining mathematical elegance with physic...
Clifford gates are a winsome class of quantum operations combining mathematical el-egance with physi...
In this thesis, we explore the mathematical properties of the Clifford group, a special subgroup of ...
The stabiliser formalism is a widely used and successful subtheory of quantum mechanics consisting o...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mathematics, 2019Cataloged from...
We consider a model of quantum computation in which the set of elementary operations is limited to C...
The Gottesman-Knill theorem states that a Clifford circuit acting on stabilizer states can be simula...
In this work, we develop resource-theoretic approaches to study the non-stabilizer resources in faul...
Abstract We study two-qubit circuits over the Clifford+CS gate set, which consists of the Clifford g...
We give a new algorithm for computing the robustness of magic-a measure of the utility of quantum st...
With this thesis project, we improve the classical simulation of quantum computers using stabilizers...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Electrical Engineering and Comp...
We define and construct efficient depth universal and almost size universal quantum circuits. Such c...