Please cite this article in press as: A. Cañete et al., Trisections of a 3-rotationally symmetri
Classical problems in integral geometry and geometric probability involve the kinematic measure of c...
AbstractSharpening work of the first two authors, for every proportion λ∈(0,1) we provide exact quan...
Abstract. A theorem due to Favard states that among all plane sets of given area and perimeter, the ...
In this work we study the fencing problem consisting of finding a trisection of a 3-rotationally sym...
In this work we study the maximum relative diameter functional dM in the class of multi-rotationall...
In this work we study subdivisions of k-rotationally symmetric planar convex bodies that minimize t...
Is it true, that through every interior point of 3-dimensional convex body comes planar section with...
In this paper, we study the bisections of a centrally symmetric planar convex body which minimize th...
International audienceIt is shown that the cross-section body of a convex body K subset of R-3, that...
First, a state of motion of three finite bodies, m1, m2, m3 is idealized by an approximation to the ...
International audienceWe consider the problem of minimizing a functional (like the area, perimeter, ...
Explore the restricted three-body problem in three dimensions-a classic problem in celestial mechani...
It is proved that the simultaneous lattice packing and lattice covering constant of every three-dime...
This dissertation investigates a particular reduction of the three body problem, using a combination...
If K is a convex body in the Euclidean space En, we consider the six classic geometric functionals a...
Classical problems in integral geometry and geometric probability involve the kinematic measure of c...
AbstractSharpening work of the first two authors, for every proportion λ∈(0,1) we provide exact quan...
Abstract. A theorem due to Favard states that among all plane sets of given area and perimeter, the ...
In this work we study the fencing problem consisting of finding a trisection of a 3-rotationally sym...
In this work we study the maximum relative diameter functional dM in the class of multi-rotationall...
In this work we study subdivisions of k-rotationally symmetric planar convex bodies that minimize t...
Is it true, that through every interior point of 3-dimensional convex body comes planar section with...
In this paper, we study the bisections of a centrally symmetric planar convex body which minimize th...
International audienceIt is shown that the cross-section body of a convex body K subset of R-3, that...
First, a state of motion of three finite bodies, m1, m2, m3 is idealized by an approximation to the ...
International audienceWe consider the problem of minimizing a functional (like the area, perimeter, ...
Explore the restricted three-body problem in three dimensions-a classic problem in celestial mechani...
It is proved that the simultaneous lattice packing and lattice covering constant of every three-dime...
This dissertation investigates a particular reduction of the three body problem, using a combination...
If K is a convex body in the Euclidean space En, we consider the six classic geometric functionals a...
Classical problems in integral geometry and geometric probability involve the kinematic measure of c...
AbstractSharpening work of the first two authors, for every proportion λ∈(0,1) we provide exact quan...
Abstract. A theorem due to Favard states that among all plane sets of given area and perimeter, the ...