Given a sequence $S=(s_1,\dots,s_m) \in [0, 1]^m$, a block $B$ of $S$ is a
subsequence $B=(s_i,s_{i+1},\dots,s_j)$. The size $b$ of a block $B$ is the sum
of its elements. It is proved in [1] that for each positive integer $n$, there
is a partition of $S$ into $n$ blocks $B_1, \dots , B_n$ with $|b_i - b_j| \le
1$ for every $i, j$. In this paper, we consider a generalization of the problem
in higher dimensions

Bárány, I.

Csóka, E.

Károlyi, Gy.

Tóth, G.

English

arXiv

Given a sequence , a block B of S is a subsequence . The size b of a block B is the sum of its elements. It is proved in [1] that for each positive integer n, there is a partition of S into n blocks B (1), B (n) with for every i, j. In this paper, we consider a generalization of the problem in higher dimensions

Block partitions: an extended view

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