AbstractThough complexity theory already extensively studies path-cardinality-based restrictions on the power of nondeterminism, this paper is motivated by a more recent goal: To gain insight into how much of a restriction, it is of nondeterminism to limit machines to have just one contiguous (with respect to some simple order) interval of accepting paths. In particular, we study the robustness—the invariance under definition changes—of the cluster class CL#P. This class contains each #P function that is computed by a balanced Turing machine whose accepting paths always form a cluster with respect to some length-respecting total order with efficient adjacency checks. The definition of CL#P is heavily influenced by the defining paper’s focus...
Hertrampf's locally definable acceptance types show that many complexity classes can be defined...
Classical clustering problems search for a partition of objects into a fixed number of clusters. In ...
Hertrampf's locally denable acceptance types show that many complexity classes can be dened in ...
We study the robustness---the invariance under definition changes---of the cluster class CL#P [HHKW0...
AbstractThough complexity theory already extensively studies path-cardinality-based restrictions on ...
We provide machine-independent characterizations of some complexity classes, over an arbitrary struc...
Kleinberg introduced three natural clustering properties, or axioms, and showed they cannot be simul...
The formal study of algorithms arises with the definition of the Turing machine in a context which i...
Unambiguous computation according to UP has become a classical notion in computational complexity th...
Part I. We make progress in understanding the complexity of the graph reachability problem in the co...
The theory of distributed computing aims at understanding which tasks can be solved efficiently in l...
The extent to which a set of related graph-theoretic properties can be used to accont for the superl...
In SODA 2001, Raghavan and Spinrad introduced robust algorithms as a way to solve hard combinatorial...
This dissertation presents several results in fine-grained complexity. Fine-grained complexity aims ...
International audienceThis paper originates from the observation that many classical NP graph proble...
Hertrampf's locally definable acceptance types show that many complexity classes can be defined...
Classical clustering problems search for a partition of objects into a fixed number of clusters. In ...
Hertrampf's locally denable acceptance types show that many complexity classes can be dened in ...
We study the robustness---the invariance under definition changes---of the cluster class CL#P [HHKW0...
AbstractThough complexity theory already extensively studies path-cardinality-based restrictions on ...
We provide machine-independent characterizations of some complexity classes, over an arbitrary struc...
Kleinberg introduced three natural clustering properties, or axioms, and showed they cannot be simul...
The formal study of algorithms arises with the definition of the Turing machine in a context which i...
Unambiguous computation according to UP has become a classical notion in computational complexity th...
Part I. We make progress in understanding the complexity of the graph reachability problem in the co...
The theory of distributed computing aims at understanding which tasks can be solved efficiently in l...
The extent to which a set of related graph-theoretic properties can be used to accont for the superl...
In SODA 2001, Raghavan and Spinrad introduced robust algorithms as a way to solve hard combinatorial...
This dissertation presents several results in fine-grained complexity. Fine-grained complexity aims ...
International audienceThis paper originates from the observation that many classical NP graph proble...
Hertrampf's locally definable acceptance types show that many complexity classes can be defined...
Classical clustering problems search for a partition of objects into a fixed number of clusters. In ...
Hertrampf's locally denable acceptance types show that many complexity classes can be dened in ...