AbstractThe problem of finding a piecewise straight-line path, with a constant number of line segments, in a two-dimensional domain is studied in the Turing machine-based computational model and in the discrete complexity theory. It is proved that, for polynomial-time recognizable domains associated with polynomial-time computable distance functions, the complexity of this problem is equivalent to a discrete problem which is complete for ∑2P, the second level of the polynomial-time hierarchy
We described a simple algorithm running in linear time for each xed constant k, that either establis...
AbstractA Directed Path Family is a family of subsets of some finite ground set whose members can be...
AbstractWe investigate the computational complexity of computing the convex hull of a two-dimensiona...
AbstractWe study the computational complexity of the distance function associated with a polynomial-...
The computational complexity of bounded sets of the two-dimensional plane is studied in the discrete...
AbstractWe investigate the computational complexity of finding the minimum-area circumscribed rectan...
In this paper we study the complexity of an Inverse Shortest Paths Problem (ISPP). We show that the ...
We revisit the minimum-link path problem: Given a polyhedral domain and two points in it, connect th...
AbstractComputational complexity of two-dimensional domains whose boundaries are polynomial-time com...
(a) Given x, y, it can be checked in polynomial time if (x, y) ∈ R. (b) There is a polynomial p suc...
AbstractThe rectilinear shortest path problem can be stated as follows: given a set of m non-interse...
International audienceGiven a Digital Straight Line (DSL) of known characteristics (a, b, µ), we add...
We propose an algorithm for the problem of computing shortest paths among curved obstacles in the pl...
AbstractComputational complexity of two-dimensional domains whose boundaries are polynomial-time com...
This dissertation presents several results in fine-grained complexity. Fine-grained complexity aims ...
We described a simple algorithm running in linear time for each xed constant k, that either establis...
AbstractA Directed Path Family is a family of subsets of some finite ground set whose members can be...
AbstractWe investigate the computational complexity of computing the convex hull of a two-dimensiona...
AbstractWe study the computational complexity of the distance function associated with a polynomial-...
The computational complexity of bounded sets of the two-dimensional plane is studied in the discrete...
AbstractWe investigate the computational complexity of finding the minimum-area circumscribed rectan...
In this paper we study the complexity of an Inverse Shortest Paths Problem (ISPP). We show that the ...
We revisit the minimum-link path problem: Given a polyhedral domain and two points in it, connect th...
AbstractComputational complexity of two-dimensional domains whose boundaries are polynomial-time com...
(a) Given x, y, it can be checked in polynomial time if (x, y) ∈ R. (b) There is a polynomial p suc...
AbstractThe rectilinear shortest path problem can be stated as follows: given a set of m non-interse...
International audienceGiven a Digital Straight Line (DSL) of known characteristics (a, b, µ), we add...
We propose an algorithm for the problem of computing shortest paths among curved obstacles in the pl...
AbstractComputational complexity of two-dimensional domains whose boundaries are polynomial-time com...
This dissertation presents several results in fine-grained complexity. Fine-grained complexity aims ...
We described a simple algorithm running in linear time for each xed constant k, that either establis...
AbstractA Directed Path Family is a family of subsets of some finite ground set whose members can be...
AbstractWe investigate the computational complexity of computing the convex hull of a two-dimensiona...