Add to ORKGThe low-temperature driven or thermally activated motion of several condensed matter systems is often modeled by the dynamics of interfaces (co-dimension-1 elastic manifolds) subject to a random potential. Two characteristic quantitative features of the energy landscape of such a many-degree-of-freedom system are the ground-state energy and the magnitude of the energy barriers between given configurations. While the numerical determination of the former can be accomplished in time polynomial in the system size, it is shown here that the problem of determining the latter quantity is NP-complete. Exact computation of barriers is therefore (almost certainly) much more difficult than determining the exact ground states of interfaces
Combinatorial optimization algorithms which compute exact ground state configurations in disordered ...
We discuss the universal dynamics of elastic interfaces in quenched random media. We focus on the re...
The energy landscape for the random-field Ising model (RFIM) is complex, yet algorithms such as the ...
The low-temperature driven or thermally activated motion of several condensed matter systems is ofte...
A class of combinatorial optimization algorithms are applied in the study of disordered condensed ma...
The problem of determining the ground state of a $d$-dimensional interface embedded in a $(d+1)$-dim...
We discuss the zero-temperature susceptibility of elastic manifolds with quenched randomness. It div...
We discuss the feasibility of a hierarchical protocol whereby the description and prediction of ads...
International audienceWe study the interface energy σ as a function of disorder in two-dimensional I...
The random field Ising model (RFIM) is investigated from the complexity point of view. We prove that...
46 pages, 7 figuresInternational audienceWe study the scaling properties of a one-dimensional interf...
This thesis deals with some aspects of the physics of disordered systems. It consists of four papers...
We analyze the energy barriers that allow escapes from a given local minimum in a complex high-dimen...
We have studied numerically the dynamics of a driven elastic interface in a random medium, focusing ...
The dynamics of driven interfaces in the random-field Ising model (RFIM) is investigated by the use ...
Combinatorial optimization algorithms which compute exact ground state configurations in disordered ...
We discuss the universal dynamics of elastic interfaces in quenched random media. We focus on the re...
The energy landscape for the random-field Ising model (RFIM) is complex, yet algorithms such as the ...
The low-temperature driven or thermally activated motion of several condensed matter systems is ofte...
A class of combinatorial optimization algorithms are applied in the study of disordered condensed ma...
The problem of determining the ground state of a $d$-dimensional interface embedded in a $(d+1)$-dim...
We discuss the zero-temperature susceptibility of elastic manifolds with quenched randomness. It div...
We discuss the feasibility of a hierarchical protocol whereby the description and prediction of ads...
International audienceWe study the interface energy σ as a function of disorder in two-dimensional I...
The random field Ising model (RFIM) is investigated from the complexity point of view. We prove that...
46 pages, 7 figuresInternational audienceWe study the scaling properties of a one-dimensional interf...
This thesis deals with some aspects of the physics of disordered systems. It consists of four papers...
We analyze the energy barriers that allow escapes from a given local minimum in a complex high-dimen...
We have studied numerically the dynamics of a driven elastic interface in a random medium, focusing ...
The dynamics of driven interfaces in the random-field Ising model (RFIM) is investigated by the use ...
Combinatorial optimization algorithms which compute exact ground state configurations in disordered ...
We discuss the universal dynamics of elastic interfaces in quenched random media. We focus on the re...
The energy landscape for the random-field Ising model (RFIM) is complex, yet algorithms such as the ...