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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
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
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
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