# Questions tagged [packing]

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### $\rho OPT + k$ approximation for bin packing (Unpublished result of David P. Williamson)

I am currently stuck on Exercise 5.12 in this book, which is apparently an unpublished result of David P. Williamson according to the book notes. The problem asks to use randomized rounding and first ...
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### Bin packing where each item must occur in $k$ bins

I am looking for information on a generalization of bin-packing in which each item should appear in exactly $k$ different bins, for some positive integer $k$. The standard bin packing problem ...
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### Using bin-packing algorithms to approximate maximum-makespan

Bin-packing (BP) and maximum-makespan (MM) are dual problems. In both problems, the input can be defined as a set $S$ of positive integers, and the output is a partition of $S$. In BP, there is a ...
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### Bin Packing And Preemptive Multi-Core Scheduling

I am trying to solve a preemptive multi-core scheduling problem, where the input is the tasks. The number of cores M can be decided after seeing the input tasks. I ...
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### The "electricity packing" problem

In a distant village, there are $n$ electricity consumers. Consumer $i$ has a power demand of $d_i$ watts. The total electricity supply is $s$ watts. If $s\geq \sum_{i=1}^n d_i$, then all consumers ...
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### Is $\{0,1\}$-Vector bin packing NP-Hard when vectors have constant dimension?

The paper https://cs.brown.edu/people/seny/pubs/vbponline.pdf discusses $\{0,1\}$-Vector Bin packing in the online setting and give lower bounds. However, they do not mention anything about the ...
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### Packing $n$ objects into $m$ bins whose size is variable

Assume we have $n$ fixed size objects with sizes $O_1$ to $O_n$. Also, assume we have $m$ bins with size $a \times B_1$ to $a \times B_m$ in which $a$ is a real number and $a\ge1$. We want to put ...
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### Maximize number of bins and minimize cost of elements chosen from a set

I am considering the following problem: there is a set of elements $S$ where each element is assigned to a bin $B$. The bins are disjoint and their union is $S$. There is also a cost function ...
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### What is the current "state-of-the-art" solver for quadratic knapsack problems?

New to this forum, so please let me know if my question format is incorrect. For linear KP with $n$ items and $c$ capacity, dynamic programming can find exact solutions in $\mathcal{O}(nc)$. I have ...
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### 3D Bin Packing with one bin with infinite/unknown size

Hi I'm looking for a variation of the Orthogonal 3D-BinPacking algorithm with only one bin of unknown size. I have a set $S$ of $n$ cuboids items $i_j$ with $j=1...n$. The dimensions of the items are ...
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### Hardness of an extended maximum set packing problem

(Edited) The maximum set packing problem when the sets are all of equal size, say $k$, is known to be NP-hard for $k \ge 3$. The requirement in this problem is that the sets in the solution will be ...
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### Variation of bin packing

My problem is related to the standard bin packing problem, but in my case each item has a value, and the objective is to minimise the number of bins used to pack all the items PLUS the sum of the ...
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### Distribution of variable sized images/boxes(only aspect ratio given) on a 2D area

I'm trying to find a solution for the following problem. You have a set of pictures or let us assume they are just boxes with a given aspect ratio. And you have a two-dimensional area with width and ...
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### Does this bin packing problem have a name?

My problem is related to the standard bin packing problem (where you have bins of capacity $1$, items of capacity $(0,1]$, and want to pack the items into as few bins as possible), but there are a ...
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### Hardness of Approximation results for Special Set Packing Problem Wanted

Is there any inapproximability result for the following NP-hard problem, which is a special case of the weighted Set Packing Problem? The general Set Packing Problem would be: Given A Collection of ...
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### What is the complexity of rectangle packing when rotations are allowed?

In the rectangle packing problem, one is given a set of rectangles $\{r_1,\dots,r_n\}$ and bounding rectangle $R$. The task is to find a placement of $r_1,\ldots,r_n$ inside $R$ such that none of ...
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### Partitioning based on distribution

Having a set of numbers $S={s_i}$, I want to assign them to bins, $b_i$, such that the sum of items on bins follow a specific distribution. For two bins and uniform distribution, this problem is ...
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### bin packing with overlapping objects

I have $N$ bins with capacity $M$ and $k$ objects with size $s_i$. The goal is to pack these objects in the bins. Until now it is similar to the bin-packing problem. But the twist is that each object ...
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### On algorithms that minimizes maximal load of bins

There are $n$ bins and $m$ balls, $b_i$ where $0<i\le m$. Balls are with different weights $w_i$ and have dependency between them. ball $b_1$ depends on $b_2$, $b_2$ depends on $b_3$, and so on. It ...
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### Bin Packing with uniform size constraints

Consider the following version of the Bin Packing problem: We are given $k$ unit-size bins and $n$ items with sizes $\epsilon < a_i \le 1$ for $1 \le i \le n$. Is it possible to pack items in bins? ...
Let $V$ be a set of $D$-dimensional rectangular shapes. For $d \in \{1,...,D\}$ and $v \in V$, $w_d(v) \in \mathbb{Q}^{+}$ describes the length of $v$ in the dimension $d$. The same notation is used ...