Blinovsky Vladimir - Profile on Academia.edu (original) (raw)

Karol Zyczkowski related author profile picture

Ivan Kostov related author profile picture

Evgeni Voronko related author profile picture

James Montaldi related author profile picture

Fatemeh Panjeh Ali Beik related author profile picture

Chaudry Khalique related author profile picture

Michael Lashkevich related author profile picture

Valeria Gili related author profile picture

Michael Lashkevich related author profile picture

Natalia I Rodchenkova related author profile picture

Uploads

Papers by Blinovsky Vladimir

Research paper thumbnail of New Bounds for Multiple Packings of Eu-clidean Sphere

Let R n, S n− 1 (x, r)⊂ R n, x∈ R n be the n− dimensional Euclidean space and sphere of radius r ... more Let R n, S n− 1 (x, r)⊂ R n, x∈ R n be the n− dimensional Euclidean space and sphere of radius r with the center in x. Denote S n− 1∆= S n− 1 (0, 1). Let B n (x, r)⊂ R n be the (closed) ball of radius r with the center in x. We say that (finite) set K n⊂ S n− 1 (0, r) is packing by the balls of radius t of multiplicity L iff for the arbitrary set of

Research paper thumbnail of New Bounds for Multiple Packings of Eu-clidean Sphere

Let R n, S n− 1 (x, r)⊂ R n, x∈ R n be the n− dimensional Euclidean space and sphere of radius r ... more Let R n, S n− 1 (x, r)⊂ R n, x∈ R n be the n− dimensional Euclidean space and sphere of radius r with the center in x. Denote S n− 1∆= S n− 1 (0, 1). Let B n (x, r)⊂ R n be the (closed) ball of radius r with the center in x. We say that (finite) set K n⊂ S n− 1 (0, r) is packing by the balls of radius t of multiplicity L iff for the arbitrary set of

Research paper thumbnail of New Bounds for Multiple Packings of Eu-clidean Sphere

Let R n, S n− 1 (x, r)⊂ R n, x∈ R n be the n− dimensional Euclidean space and sphere of radius r ... more Let R n, S n− 1 (x, r)⊂ R n, x∈ R n be the n− dimensional Euclidean space and sphere of radius r with the center in x. Denote S n− 1∆= S n− 1 (0, 1). Let B n (x, r)⊂ R n be the (closed) ball of radius r with the center in x. We say that (finite) set K n⊂ S n− 1 (0, r) is packing by the balls of radius t of multiplicity L iff for the arbitrary set of

Research paper thumbnail of New Bounds for Multiple Packings of Eu-clidean Sphere

Let R n, S n− 1 (x, r)⊂ R n, x∈ R n be the n− dimensional Euclidean space and sphere of radius r ... more Let R n, S n− 1 (x, r)⊂ R n, x∈ R n be the n− dimensional Euclidean space and sphere of radius r with the center in x. Denote S n− 1∆= S n− 1 (0, 1). Let B n (x, r)⊂ R n be the (closed) ball of radius r with the center in x. We say that (finite) set K n⊂ S n− 1 (0, r) is packing by the balls of radius t of multiplicity L iff for the arbitrary set of

Log In