We consider an approach to deciding isomorphism of rigid n-vertex graphs (and related isomorphism problems) by solving a nonabelian hidden shift problem on a quantum computer using the standard method. Such an approach is arguably more natural than viewing the problem as a hidden subgroup problem. We prove that the hidden shift approach to rigid graph isomorphism is hard in two senses. First, we prove that Ω(n) copies of the hidden shift states are necessary to solve the problem (whereas O(n log n) copies are sufficient). Second, we prove that if one is restricted to single-register measurements, an exponential number of hidden shift states are required. © Rinton Press
We introduce a nonlocal game that captures and extends the notion of graph isomorphism. This game ca...
Three graph invariants are introduced which may be measured from a quantum graph state and form exam...
We introduce the (G,H)-isomorphism game, a new two-player non-local game that classical players can ...
We consider an approach to deciding isomorphism of rigid n-vertex graphs (and related isomorphism pr...
We consider an approach to deciding isomorphism of rigid n-vertex graphs (and related isomorphism pr...
The hidden subgroup problem is the foundation of many quantum algorithms. An e#cient solution is kno...
Thesis (Ph.D.)--University of Washington, 2015In this thesis, we study quantum computation and algor...
The isomorphism problem involves judging whether two graphs are topologically the same and producing...
Consider the following generalized hidden shift problem: given a function f on {0,...,M-1} x Z_N sat...
The study of the quantum query complexity for some graph problems is an interesting area in quantum ...
It is known that any quantum algorithm for Graph Isomorphism that works within the framework of the ...
The Hidden Subgroup Problem is the foundation of many quantum algorithms. An efficient solution is k...
Almost all of the most successful quantum algorithms discovered to date exploit the ability of the F...
We present a quantum algorithm for solving graph isomorphism problems that is based on an adiabatic ...
We present a quantum algorithm for solving graph isomorphism problems that is based on an adiabatic ...
We introduce a nonlocal game that captures and extends the notion of graph isomorphism. This game ca...
Three graph invariants are introduced which may be measured from a quantum graph state and form exam...
We introduce the (G,H)-isomorphism game, a new two-player non-local game that classical players can ...
We consider an approach to deciding isomorphism of rigid n-vertex graphs (and related isomorphism pr...
We consider an approach to deciding isomorphism of rigid n-vertex graphs (and related isomorphism pr...
The hidden subgroup problem is the foundation of many quantum algorithms. An e#cient solution is kno...
Thesis (Ph.D.)--University of Washington, 2015In this thesis, we study quantum computation and algor...
The isomorphism problem involves judging whether two graphs are topologically the same and producing...
Consider the following generalized hidden shift problem: given a function f on {0,...,M-1} x Z_N sat...
The study of the quantum query complexity for some graph problems is an interesting area in quantum ...
It is known that any quantum algorithm for Graph Isomorphism that works within the framework of the ...
The Hidden Subgroup Problem is the foundation of many quantum algorithms. An efficient solution is k...
Almost all of the most successful quantum algorithms discovered to date exploit the ability of the F...
We present a quantum algorithm for solving graph isomorphism problems that is based on an adiabatic ...
We present a quantum algorithm for solving graph isomorphism problems that is based on an adiabatic ...
We introduce a nonlocal game that captures and extends the notion of graph isomorphism. This game ca...
Three graph invariants are introduced which may be measured from a quantum graph state and form exam...
We introduce the (G,H)-isomorphism game, a new two-player non-local game that classical players can ...