Catálogo de publicaciones - libros

It is shown that for any orthogonal subdivision of size in a -dimensional Euclidean space, ∈ ℕ, ≥ 2, there is an axis-parallel line that stabs at least Ω(log) boxes. For any integer , 1≤ <, there is also an axis-aligned -flat that stabs at least Ω(log) boxes of the subdivision. These bounds cannot be improved.

It is shown that for any orthogonal subdivision of size in a -dimensional Euclidean space, ∈ ℕ, ≥ 2, there is an axis-parallel line that stabs at least Ω(log) boxes. For any integer , 1≤ <, there is also an axis-aligned -flat that stabs at least Ω(log) boxes of the subdivision. These bounds cannot be improved.

It is shown that for any orthogonal subdivision of size in a -dimensional Euclidean space, ∈ ℕ, ≥ 2, there is an axis-parallel line that stabs at least Ω(log) boxes. For any integer , 1≤ <, there is also an axis-aligned -flat that stabs at least Ω(log) boxes of the subdivision. These bounds cannot be improved.

It is shown that for any orthogonal subdivision of size in a -dimensional Euclidean space, ∈ ℕ, ≥ 2, there is an axis-parallel line that stabs at least Ω(log) boxes. For any integer , 1≤ <, there is also an axis-aligned -flat that stabs at least Ω(log) boxes of the subdivision. These bounds cannot be improved.

It is shown that for any orthogonal subdivision of size in a -dimensional Euclidean space, ∈ ℕ, ≥ 2, there is an axis-parallel line that stabs at least Ω(log) boxes. For any integer , 1≤ <, there is also an axis-aligned -flat that stabs at least Ω(log) boxes of the subdivision. These bounds cannot be improved.

It is shown that for any orthogonal subdivision of size in a -dimensional Euclidean space, ∈ ℕ, ≥ 2, there is an axis-parallel line that stabs at least Ω(log) boxes. For any integer , 1≤ <, there is also an axis-aligned -flat that stabs at least Ω(log) boxes of the subdivision. These bounds cannot be improved.

It is shown that for any orthogonal subdivision of size in a -dimensional Euclidean space, ∈ ℕ, ≥ 2, there is an axis-parallel line that stabs at least Ω(log) boxes. For any integer , 1≤ <, there is also an axis-aligned -flat that stabs at least Ω(log) boxes of the subdivision. These bounds cannot be improved.

It is shown that for any orthogonal subdivision of size in a -dimensional Euclidean space, ∈ ℕ, ≥ 2, there is an axis-parallel line that stabs at least Ω(log) boxes. For any integer , 1≤ <, there is also an axis-aligned -flat that stabs at least Ω(log) boxes of the subdivision. These bounds cannot be improved.

It is shown that for any orthogonal subdivision of size in a -dimensional Euclidean space, ∈ ℕ, ≥ 2, there is an axis-parallel line that stabs at least Ω(log) boxes. For any integer , 1≤ <, there is also an axis-aligned -flat that stabs at least Ω(log) boxes of the subdivision. These bounds cannot be improved.

It is shown that for any orthogonal subdivision of size in a -dimensional Euclidean space, ∈ ℕ, ≥ 2, there is an axis-parallel line that stabs at least Ω(log) boxes. For any integer , 1≤ <, there is also an axis-aligned -flat that stabs at least Ω(log) boxes of the subdivision. These bounds cannot be improved.