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Constructing a minimum-volume outer approximation polytope with fewer facets

I am tackling the following problem: Given a set of points $D \in \mathbb{R}^d$ and their convex hull, represented with $n$ facets, I want to construct a convex polytope $P$ with at most $m<n$ ...
Shperb's user avatar
  • 101
2 votes
1 answer
85 views

Example of worst case distributions for 4D convex hull

My understanding is that convex hull of n points in 4D could have O(n²) edges in the worst case. Source: https://sites.cs.ucsb.edu/~suri/cs235/ConvexHull.pdf This same source writes In 4D, there are ...
Alec Jacobson's user avatar
1 vote
0 answers
110 views

Upper bound on the diameter of a convex lattice n-gon with a given area

Given the area $A$ of ​​a strictly convex polygon with $n$ vertices with integer Cartesian coordinates, there are usually several non-equivalent polygons. The relationship between the area, the number ...
Hugo Pfoertner's user avatar
1 vote
0 answers
58 views

Are cells of 4-polytopes a convex polyhedron by definition?

I'm going by the Wikipedia definition for a 4-polytope. Do by definition, cells of 4-polytopes have to be a convex polyhedra? If not, then are there polyhedra with non-convex faces? If yes, is it the ...
Ron Michal's user avatar
2 votes
1 answer
113 views

Existence of fine approximate of a convex body in $\mathbb R^d$ with convex hull of $\mathcal O(d)$ points

Let $K$ be a convex body in $\mathbb R^d$ which contains the origin and let $\theta \in (0,1)$. Question. Is it always possible to find $n$ points $x_1,\dotsc,x_n \in \mathbb R^d$ such that $$ \theta ...
dohmatob's user avatar
  • 6,853
3 votes
0 answers
51 views

testing whether a polyhedral complex is convex

Definitions A (polyhedral) cone in $\Bbb R^n$ is the solution set of a finite number of inequalities of the form $a_1x_1+\cdots+a_nx_n\geq 0$. Note that I don't require strict convexity, i.e. a cone $...
Avi Steiner's user avatar
  • 3,079
1 vote
1 answer
1k views

Check if a point is in the interior of the convex hull of some other points in high dimensions, and lower-bounding the largest enclosed ball [closed]

Given $m$ points $P=\{p_0, p_1, ..., p_m\}$ in high dimensions (e.g. 100), it is known that computing (or even representing) their convex hull $\text{conv}(P)$ is generally intractable due to the ...
Dazheng's user avatar
  • 11
0 votes
0 answers
54 views

Attached convex "hulls"

Let $\mathcal{P}$ a finite set of points of a Euclidean $\mathbb{E}^n$ and take the union $\mathrm{U}(\mathcal{P})$ of all closed half-spaces defined by $n$ elements of $\mathcal{P}$ that contain only ...
Manfred Weis's user avatar
  • 13.2k
1 vote
0 answers
62 views

fast V representation update of polytope

Say that I have both the V and the H representation of a (possibly unbounded) polytope $P$. I want to append a some rows to the H representation, how can I quickly update the V representation to ...
user39430's user avatar
  • 155
1 vote
0 answers
43 views

Vertex enumeration for polytope with a sparse halfplane description?

Say I have a (bounded convex) polytope $P\subset\mathbb R^d$ with description $Ax\le b$, where $A$ is sparse in the sense that there are at most $k$ nonzero entries in each row or column, where $k$ is ...
tuna's user avatar
  • 523
1 vote
0 answers
52 views

How does one translate from convex hull to a set of facets (inequalities)? [duplicate]

Suppose I have defined a convex set as the convex hull of a set of points. (I know that all these points are "extremal points" of the convex set.) I know want to translate this description of the ...
guest's user avatar
  • 11
1 vote
1 answer
99 views

Estimating volume of a simple object

Volume computation is $\#P$ hard. Take the $[0,1]^n$ polytope. Slice it by an half space inequality with $poly(n)$ bit rational coefficients into two unequal halves. Volume of bigger section is $\...
Turbo's user avatar
  • 13.9k
6 votes
0 answers
237 views

Complexity of scissors congruence?

Where is the complexity of the problem 'Given two bounded compact convex integral polyhedra in $\mathbb R^n$ presented by $O(poly(n))$ integer valued halfspaces given by linear inequalities with ...
Turbo's user avatar
  • 13.9k
1 vote
0 answers
68 views

Projection of a polytope along 4 orthogonal axes

Consider the following problem: Given an $\mathcal{H}$-polytope $P$ in $\mathbb{R}^d$ and $4$ orthogonal vectors $v_1, ..., v_4 \in \mathbb{R}^d$, compute the projection of $P$ to the subspace ...
Alina's user avatar
  • 11
3 votes
1 answer
292 views

How to find the vertices of the set $\{v_i\in \mathbb{R}:a_1\ge v_1\ge v_2\ge \cdots\ge v_n\ge 0,\ q_2\le \sum_{i=1}^n p_iv_i\le q_1\}$

I am given a set of inequalities $v_1\ge v_2\ge \cdots\ge v_n\ge 0$, $q_2\le \sum_{i=1}^n p_iv_i\le q_1$, with $\{p_i\}_{i=1}^n,\ q_1,q_2$ positive reals, and only one bound for the coordinates: $v_1\...
Samrat Mukhopadhyay's user avatar
1 vote
0 answers
48 views

Efficient scissors congruence between efficiently describable convex polytopes and simplex?

Is there a convex polytope in $\mathbb R^n$ describable by only $O(poly(\log n))$ half-plane inequalities with positive volume (so at least $n+1$ vertices) such that the standard simplex has a ...
VS.'s user avatar
  • 1,826
1 vote
0 answers
65 views

Covering a simplex efficiently by efficiently describable polytopes?

Take a standard simplex or cube in $\mathbb R^n$. Is there a way to cover it with $O(poly(\log n))$ convex polytopes each describable by only $O(poly(\log n))$ half-plane inequalities? If not what ...
VS.'s user avatar
  • 1,826
1 vote
0 answers
64 views

Polytopes that can be efficiently described and efficiently covered by cubes or simplices?

Is there a bounded convex polytope $\mathcal P\subseteq\mathbb R^n$ with $m$ vertices, whose vertex vectors span $\mathbb R^n$ (so $m$ is $\Omega(n)$) and just $O(poly(\log n))$ half-plane ...
VS.'s user avatar
  • 1,826
4 votes
2 answers
734 views

Fast projection onto a subspace

Given an $n$-dimensional vector $\mathbf{c}\in [0,1]^n$, let $\Delta_{\mathbf{c}}$ be the set of points $\{\mathbf{x}\in [0,1]^n: \langle \mathbf{c},\mathbf{x} \rangle \le 1\}$, where $\langle \mathbf{...
Penelope Benenati's user avatar
2 votes
1 answer
349 views

Several convex polytopes in a simplex; fix an extreme point for each; how many can be supported by a function monotonic on all line segments?

Sorry the title may be unclear. I do not know how to give it a good title..... Let $\Delta$ be a probability simplex of $R^N$; i.e. set of all points $x$ such that $x\geq0$ and $\sum_{k=1}^Nx^k\leq1$....
Yi-Hsuan Lin's user avatar
5 votes
2 answers
294 views

Convex caps with prescribed edges

Let $P$ be a convex polygon in the plane $R^2=R^2\times \{0\}$, and $E$ be the edge graph of some subdivision of $P$ into convex polygons, which is $3$-connected. Does there exist a convex polyhedral ...
Mohammad Ghomi's user avatar
0 votes
1 answer
79 views

algorithms and tools available for a particular polytope computation

Let me define each half space i as: $${H_i}:{c_i}{\bf{x}} \le {b_i}$$ The intersection of all such ${H_i}$ gives a polyhedron (bounded or not). Suppose I am interested in if ${H_i}$ is active (...
user40780's user avatar
  • 867
2 votes
0 answers
49 views

Algorithm for Finding the Center of an Optimal Stereographic Projection

given a fnite set $\mathcal{P}$ of points on a $n$-sphere $\mathcal{S}$ and, define a function $f:(s,\mathcal{P})\mapsto\mathbb{R}_0^+$, that maps each point $s$ on $\mathcal{S}$ to the $n$-volume $...
Manfred Weis's user avatar
  • 13.2k
5 votes
2 answers
755 views

Intersecting a convex polytope with the unit sphere

I have a list of $m$ affine inequalities in $n$ variables of the following form $$a_1 x_1 + \cdots + a_n x_n \leq c_n$$ I would like to know whether there is any point on the unit sphere in $\...
user avatar
6 votes
1 answer
2k views

Approximation of convex hull in high dimension

What are efficient methods (polytime) to compute an approximation of the convex hull in high dimension (say, $30000$) for a given set of points? Edit: I am looking for an algorithm for getting the ...
test100's user avatar
  • 61
1 vote
0 answers
368 views

Convex hull of the intersection of nonconvex sets

I have a set $D$ in $\mathbb{R}^{d+1}$ which is the intersection of $d$ domains $D_i$ given by $f(x_{i}) \leq x_{i+1} \leq g(x_{i})$ for two functions $f$ and $g$. I want to find the convex hull of $...
mono's user avatar
  • 31
0 votes
0 answers
63 views

Distinguishing (possibly lower dimensional) $1$-skeleton of a regular graph inscribed in a sphere

Consider you have two (possibly same) convex $1$-skeleton of a regular graph $A$ and $B$ in $m$-dimensions inscribed in a sphere with possibly exponential number of vertices in $n$-dimension with ...
user avatar
1 vote
1 answer
391 views

Efficiently Generating the Convex Hulls of Two Polytopes and Counting Faces

Suppose you have two polytopes $P_1, P_2 \in \Bbb{R}^n$ given by $$ P_1 = \lbrace x: A_1 x \le b_1\rbrace$$ $$ P_2 = \lbrace x: A_2 x \le b_2\rbrace $$ I wish to find their convex hull, that is a ...
Sidharth Ghoshal's user avatar
0 votes
0 answers
52 views

Efficient sampling from a polytope with large number of contraints [duplicate]

As far as I know, the most popular way to sample from a polytope (in H-representation) \begin{equation} \mathcal{P} := \{z \in \mathbb{R}^n | (Az)_j \le b_j\; \forall j=1,2,\ldots,m\} \end{equation} ...
dohmatob's user avatar
  • 6,853
-1 votes
2 answers
640 views

Maximal-Orthogonal Convex Hull (or Maximal-Rectilinear Convex Hull) [closed]

Edit : Consider giving a reason for down vote. In my research, I have come across a this paper from the Computational Geometry field and I am not able to understand the concept of Maximal-...
Abhinav's user avatar
  • 119
2 votes
1 answer
248 views

Choosing the weights of a Voronoi diagram -- is this function always the gradient of another function?

This question is related to the earlier question Weighted area of a Voronoi cell . As in that question, let $X = \{ x_1,\dots,x_n\} $ denote a set of $n$ points in the unit square $S = [0,1]\times[0,...
Tom Solberg's user avatar
  • 4,049
5 votes
2 answers
153 views

Expressing a convex Polytope as a sublevel set of a function

Given an n-dimensional polytope $P$ in $\mathbb R^n$, Given as a convex hull of a finite set of points, $S$ I would like to construct an expliict formula for a function $f\colon \mathbb R^n \to \...
Yaniv Ganor's user avatar
  • 1,893
10 votes
1 answer
3k views

Computionally efficient vertex enumeration for (convex) polytopes

Let $P \subseteq \mathbb{R}^d$ be an $\mathcal{H}$-polytope. The vertex enumeration problem asks for the set of vertices $V$ of $P$. Theoretically, the vertex enumeration problem for $P$ can be ...
Christopher's user avatar
10 votes
1 answer
565 views

The intersection of two $l_1$ balls

Let $B_1$ and $B_2$ be two balls in $\mathbb{R}^n$ with respect to the $l_1$ norm that have different radii and different centers. Is there an upper bound for the number of vertices that $B_1\cap B_2$...
Jennifer Gao's user avatar
3 votes
0 answers
149 views

Dead Flies Problem [duplicate]

If a set of points in the plane contains one point in each convex region of area 1, then can it have finite density? what is the density of the points? In my understanding, it means the average ...
user avatar
3 votes
1 answer
141 views

Number of lattice polytopes contained in a given lattice polytope?

Given a (convex) lattice polytope, suppose we want to list or count all (convex) lattice polytopes (of the same dimension) contained in it. Are there efficient ways to do this?
wishcow's user avatar
  • 495
7 votes
2 answers
1k views

Is a given point in the interior of the convex hull of a given finite collection of points?

Suppose I have the convex hull $P$ of a finite collection of points in $\mathbb{R}^d,$ and I want to see whether a point $p$ is contained in $P.$ This is a standard (some would say the standard linear ...
Igor Rivin's user avatar
  • 96.4k
17 votes
2 answers
2k views

Efficiently determine if convex hull contains the unit ball

Given a set of $n$ points in $\mathbb{R}^d$, is there an algorithm to determine if the convex hull contains the unit ball centered at the origin in polynomial time (in both $n$ and $d$)? The convex ...
Simd's user avatar
  • 3,377
4 votes
1 answer
367 views

convex polyhedron in the unit cube

Let $P$ be a given finite set of points within the $n$-dimensional unit cube. A finite set $Q$ of points within the $n$-dimensional unit cube covers $P$ if $\operatorname{conv}(Q) \supseteq P$ where $\...
Stefan Kiefer's user avatar
1 vote
2 answers
431 views

Higher dimensional convex hull

Let $CH(S)$ be a convex hull of a finite set $S$ and denote the set of all the vertices of $CH(S)$ as $Vert(S)$. For a vertex $v \in Vert(S)$, it has an associated set $E(v)$ which is defined as $E(v)=...
user avatar
15 votes
2 answers
3k views

Given the vertices of a convex polytope, how can we construct its half-space representation?

Let us say I have the vertices of a polytope $V = \{v_1,\dots,v_k\} \subset \mathbb R^n$. Is it possible to write $V$ as intersection of half-spaces using the information from the vertices, i.e., can ...
user27396's user avatar
  • 173
1 vote
0 answers
185 views

Compute generalized pentagram map

Hi, (This is my first question on MathOverflow! :-) Imagine you have a set of points $S = \{p_1, \ldots, p_n\}$ in $\mathbb{R}^d$, of which $t$ are "bad". I want to compute a "safe convex hull", ...
hmendes's user avatar
  • 11
16 votes
2 answers
5k views

Weighted area of a Voronoi cell

Let $X = \{ x_1,\dots,x_n\} $ denote a set of $n$ points in the unit square $S = [0,1]\times[0,1]$, and let $w = \{w_1,\dots,w_n\}$ denote a set of weights corresponding to the $n$ points in $X$. ...
Joord Jacobsen's user avatar
11 votes
3 answers
6k views

Random Sampling a linearly constrained region in n-dimensions...

Hi, So here is my problem: Given a nonlinear, discontinous, cost function $f(x_1,x_2,..,x_N)$ along with linear constraints $x_n \ge 0, \forall n$ $x_n \le c_n$ and $\sum_{n=1}^N x_n = 1$ find an ...
user1's user avatar
  • 113
4 votes
1 answer
3k views

intersection of convex and non-convex polyhedra

I am trying to find the best appropriate way to intersect polyhedra which may be non-convex. The number of vertices that build the polyhedron is hence always small (up to 20 or so). The ...
tmaric's user avatar
  • 143