Add to ORKGAmong all bodies of constant width in the Euclidean plane, a Reuleaux triangle of width $\lambda$ has minimal area. But Reuleaux triangles are also minimal in another sense: if a convex body can be covered by a translate of any Reuleaux triangle, then it can be covered by a translate of any convex body of the same constant width. The first result is known as the Blaschke-Lebesgue theorem, and it is extended to an arbitrary normed plane in [19] and [5]. In the present paper we extend the second minimal property, known as Chakerian’s theorem, to all normed planes. Some corollaries from this generalization are also given
This paper presents the main concepts of curves of constant width. It provides definitions of variou...
In this paper we prove an extension of the Blaschke-Lebesgue theorem for a family of convex domains ...
In this paper we prove an extension of the Blaschke-Lebesgue theorem for a family of convex domains ...
Among all bodies of constant width in the Euclidean plane, a Reuleaux triangle of width $\lambda$ ha...
IT is well-known that of all plane convex sets of constant width d, the Reuleaux triangle, bounded b...
The mixed area of a Reuleaux polygon and its symmetric with respect to the origin is expressed in te...
AbstractThe Blaschke–Lebesgue theorem states that of all plane sets of given constant width the Reul...
The width of a closed convex subset of n-dimensional Euclidean space is the distance between two par...
The width of a closed convex subset of n-dimensional Euclidean space is the distance between two par...
The width of a closed convex subset of n-dimensional Euclidean space is the distance between two par...
Sets of constant width appear as a curiosity in the context of finite-dimensional Euclidean spaces. ...
Sets of constant width appear as a curiosity in the context of finite-dimensional Euclidean spaces. ...
In 2000 A. Bezdek asked which plane convex bodies have the property that whenever an annulus, consis...
AbstractUntil now there are almost no results on the precise geometric location of minimal enclosing...
This work refers to ball-intersections bodies as well as covering, packing, and kissing problems rel...
This paper presents the main concepts of curves of constant width. It provides definitions of variou...
In this paper we prove an extension of the Blaschke-Lebesgue theorem for a family of convex domains ...
In this paper we prove an extension of the Blaschke-Lebesgue theorem for a family of convex domains ...
Among all bodies of constant width in the Euclidean plane, a Reuleaux triangle of width $\lambda$ ha...
IT is well-known that of all plane convex sets of constant width d, the Reuleaux triangle, bounded b...
The mixed area of a Reuleaux polygon and its symmetric with respect to the origin is expressed in te...
AbstractThe Blaschke–Lebesgue theorem states that of all plane sets of given constant width the Reul...
The width of a closed convex subset of n-dimensional Euclidean space is the distance between two par...
The width of a closed convex subset of n-dimensional Euclidean space is the distance between two par...
The width of a closed convex subset of n-dimensional Euclidean space is the distance between two par...
Sets of constant width appear as a curiosity in the context of finite-dimensional Euclidean spaces. ...
Sets of constant width appear as a curiosity in the context of finite-dimensional Euclidean spaces. ...
In 2000 A. Bezdek asked which plane convex bodies have the property that whenever an annulus, consis...
AbstractUntil now there are almost no results on the precise geometric location of minimal enclosing...
This work refers to ball-intersections bodies as well as covering, packing, and kissing problems rel...
This paper presents the main concepts of curves of constant width. It provides definitions of variou...
In this paper we prove an extension of the Blaschke-Lebesgue theorem for a family of convex domains ...
In this paper we prove an extension of the Blaschke-Lebesgue theorem for a family of convex domains ...