Add to ORKGLet F be a family of n+1 convex sets in R^d, each n of which have a point in common, such that F is starshaped. If either all members of F are closed or all members of F are open, then the intersection of F is nonempty. This result which strengthens a theorem by V.Klee follows from a topological theorem of C.D.Horvath and M.Lassonde. We present a simple geometric proof in the spirit of Klee''s proof. This immediately provides an alternative proof of a Helly type theorem due to M.Breen. An abstract vector space variant of the above result is given, too
Eduard Helly (18$4- 1943) discovered his famous theorem concerning the intersection of certain famil...
This paper will investigate the dimension of the kernel of a compact starshaped set, and the followi...
AbstractIn the present paper, the concept of n-ary and finitary connectedness is introduced, where 1...
AbstractThe Helly convex-set theorem is extended onto topological spaces. From our results it follow...
Dedicated to V. L. Klee Jr. in honor of his sixty-fifty birthday Abstract. Let S be a non-convex con...
Abstract. Let k be a fixed integer, k ≥ 1, and let K be a family of simply connected sets in the pla...
AbstractThe Helly convex-set theorem is extended onto topological spaces. From our results it follow...
Let S be a set system of convex sets in R^d . Helly’s theorem states that if all sets in S have empt...
A sunflower is a collection of sets $\{U_1,\ldots, U_n\}$ such that the pairwise intersection $U_i\c...
Abstract. Motivated by typical questions from computational geometry (visibility and art gallery pro...
Let S be a set system of convex sets in Rd. Helly’s theorem states that if all sets in S have empty ...
closed set S C R 2 will be 'almost starshaped'?; that is, when will therexist a convex sub...
We show that the union closed sets conjecture holds for tree convex sets. The union closed sets conj...
AbstractIn one of his early papers Claude Berge proved a Helly-type theorem, which replaces the usua...
AbstractIf S is a closed connected nonconvex locally compact and bounded subset of a real normed lin...
Eduard Helly (18$4- 1943) discovered his famous theorem concerning the intersection of certain famil...
This paper will investigate the dimension of the kernel of a compact starshaped set, and the followi...
AbstractIn the present paper, the concept of n-ary and finitary connectedness is introduced, where 1...
AbstractThe Helly convex-set theorem is extended onto topological spaces. From our results it follow...
Dedicated to V. L. Klee Jr. in honor of his sixty-fifty birthday Abstract. Let S be a non-convex con...
Abstract. Let k be a fixed integer, k ≥ 1, and let K be a family of simply connected sets in the pla...
AbstractThe Helly convex-set theorem is extended onto topological spaces. From our results it follow...
Let S be a set system of convex sets in R^d . Helly’s theorem states that if all sets in S have empt...
A sunflower is a collection of sets $\{U_1,\ldots, U_n\}$ such that the pairwise intersection $U_i\c...
Abstract. Motivated by typical questions from computational geometry (visibility and art gallery pro...
Let S be a set system of convex sets in Rd. Helly’s theorem states that if all sets in S have empty ...
closed set S C R 2 will be 'almost starshaped'?; that is, when will therexist a convex sub...
We show that the union closed sets conjecture holds for tree convex sets. The union closed sets conj...
AbstractIn one of his early papers Claude Berge proved a Helly-type theorem, which replaces the usua...
AbstractIf S is a closed connected nonconvex locally compact and bounded subset of a real normed lin...
Eduard Helly (18$4- 1943) discovered his famous theorem concerning the intersection of certain famil...
This paper will investigate the dimension of the kernel of a compact starshaped set, and the followi...
AbstractIn the present paper, the concept of n-ary and finitary connectedness is introduced, where 1...