Questions tagged [matrices]

For questions about construction and modification of matrices, objects represented by 2-dimensional arrays that are used to define linear operators within linear algebra.

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Minimal subset of rows that generate smaller polyhedron

Given a matrix $[A|B]$ I want to find a minimal matrix $[A'|B'] \subseteq [A|B]$ (i.e. the rows in $[A'|B']$ are also in $[A|B]$) such that $A'x < B' \Rightarrow Ax < B$. Geometrically, I want ...
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23 views

Minimum amount of rectangles to create a 2-dimensional matrix

From this codegolf question. Consider an $r$ by $c$ matrix of nonnegative integers, called $M$. You also have a zero matrix of the same dimensions, called $N$. A "move" consists of replacing a ...
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46 views

How to cover given entries in a matrix with minimum number of rows and columns?

We have a matrix of 0 and 1. We want to cover all the 1's. We can cover a raw or a column with a plate. We want to use the minimum number of plates. example 0 0 1 0 0 1 0 1 0 0 1 0 0 0 1 0 ...
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59 views

In-place matrix transposition using rotations

Some time ago I invented an algorithm for in-place matrix transposition using rotations. A matrix of size N×M is represented as a one-dimensional array of size N*M, which is also the future storage ...
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1answer
73 views

Generate random matrix and its inverse

I want to randomly generate a pair of invertible matrices $A,B$ that are inverses of each other. In other words, I want to sample uniformly at random from the set of pairs $A,B$ of matrices such that ...
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4answers
155 views

Is order of matrix multiplication affecting numerical accuracy of the result?

I have to multiply three matrices of floats: A (100x8000), B (8000x27) and C (27x1). Is ...
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31 views

Minimize number of math operation of a specific matrix vector multiplication?

Let's say we have a Matrix M and a column vector v like below multiply equals Assume we can only perform multiplication, addition and substraction operation. With normal approach we need 3 ...
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23 views

Finding fixed size submatrix with highest sum

I have a matrix, which has N rows and M columns. I need to find n rows and m columns, which has the highest sum. Matrix consists of positive numbers. Not optimal solutions are ok. For example N=M=4; n=...
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4answers
267 views

Algorithms for 2-colouring a 2 x N matrix

Our task is to color a given $2 \times N$ matrix with two colours red (R) and blue (B) such that no two adjacent cells are blue. For red, there are no restrictions. An example of all possible ...
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1answer
65 views

Finding the shortest path for synchronized pawns in a maze

I have been trying to wrap my head around this problem, and I just can't get it. We have an $a \times b$ matrix where every cell corresponds to either an empty space, denoted with a dot, or a wall, ...
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45 views

The maximum number of uniquely intersected elements from the all possible intersection scenarios among the sets in a two-column matrix

Let us define a $n \times 2$ matrix M consisting of integer sets, such that the first column consists of the so-called intersecting sets, and the second column ...
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1answer
63 views

Hitting probability of random walk within given number of steps

Given m,n dimensions of a 2D matrix; (i,j) initial co-ordinates; (x,y) final co-ordinates. What is the probability of being at (x,y) after at most k steps if we start from (i,j) initially? We can ...
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89 views

Overlaying Two Matrices So That Sum Of Squared Differences Is Minimized

I have a question about my solution to a problem from Hackerrank. The problem is, given $R,C,H,W$ with $1\le R,C\le 100$, $1\le H\le R$, $1\le W\le C$, an $R\times C$-matrix $L$ and an $H\times W$-...
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Check if a matrix over finite fields is superregular

Is there any practical, efficient algorithm to check if a matrix over $\mathbf{F}_{p^n}$ is superregular? It need not be theoretically polynomial, just roughly be implementable for $n=32$ and for ...
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1answer
96 views

Image convolution - image darkens

I'm using kernel convolution in python to blur an image, but in addition to blurring it also turns the image darker. Could someone explain why it happens? ...
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2answers
173 views

Find an optimal ordering

I came across this problem and am struggling to find a way to approach it. Any thoughts would be greatly appreciated! Suppose we are given a matrix $\{-1, 0, 1\}^{n\ \times\ k} $, for example, ...
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1answer
193 views

Find an element in sorted 2D-array (matrix)

Given an $N\times N$ array, where elements are decreasing in every row and every column. What is the fastest way to find the $(i,j)$ of a given element if it exists in the array, or return no if it ...
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2answers
72 views

Determinant computation is equivalent to matrix powering

It has been claimed in this paper (page 2 last paragraph) that Matrix powering is equivalent to determinant computation. https://www.cse.iitk.ac.in/users/manindra/algebra/depth-four.pdf Does anybody ...
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43 views

Minimum number queries on matrix

As part of a solution to an earlier question, I am interested in the following problem. I have a 2-D matrix $M$. I want to preprocess it in linear time so that I can answer queries of the following ...
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1answer
76 views

Finding optimal multiplication order and optimal binary tree

I have to determine the Optimal Multiplication Order for above matrices using Dynamic Programming approach and also present that sequence (i.e. optimal order) in Binary Tree. Consider the following ...
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1answer
42 views

Algorithm to find if there are N 1's in a matrix where no two 1's are in same row or column

I am trying to find an algorithm to determine whether a $N\times N$ matrix of ones and zeroes could have a sublist of ones, such that in that sublist we have only one $1$ from each row or column.
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57 views

Finding disjoint paths between any number of cell pair marked in nXn matrix

What should be algorithm to find all the disjoint paths between any number of pairs of cells given in matrix? We will say two paths will not intersect if there there is no cell common between any two ...
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1answer
68 views

Matrix Representation for logical gates?

I have been trying to find if there are other matrix type representations logical circuits, in the example below, $$\begin{bmatrix} 1 & 0\\ 1 & 1\\ \end{bmatrix} \equiv \, \, \Rightarrow$$ ...
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8 views

Clarification on descending direction in optimization of function

Could someone clarify for me why given $f:\mathbb{R}^n \rightarrow\mathbb{R}$ to optimize an iterative function according to : $p^k=-M\nabla f(x^k)$ for $p^k$ to be descending direction the matrix M ...
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27 views

Equivalent Algorithm with Sharman Morrison inversion

I am trying to invert a matrix using Woodbury identity. The inversion using Cholesky decomposition has the following pseudo-code: For $t=1,2,...$ $(1)\;\; \text{Read}\;x_t\in\mathbb{R}^n$ ...
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1answer
49 views

Getting N top scores from a matrix

I start with a matrix, lets say 4x4. So I want the N top scores, with the sum of one element of each row. For example: ...
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0answers
40 views

Matrix with zero spectral radius

I need an algorithm which generates a random matrix with spectral radius equal zero. The only solution I have so far is to generate two vectors $v,w$, normal onto each other ($v\perp w$), and then ...
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0answers
33 views

Counting on a matrix

I have an $n \times m$ matrix, and fill it with numbers of $1 \dots k$. If a matrix can be turned into another matrix by exchanging its lines and exchanging its columns, the two matrices are ...
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1answer
54 views

Coin flipping problem on an $n \times m$ grid

There are $n \times m$ coins lying on an $n \times m$ grid. Each coin is either facing up or down initially. We can do the following operation repeatedly: Flipping a row of coins; Flipping a colomn ...
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1answer
283 views

Minimize Manhattan distance travel algorithm

I am trying to find the name of an algorithm for a game I am making. I am pretty sure it exists, but I have no idea what name it has. Say I have a matrix like: $$ \begin{array}{|r|r|r|} \hline \...
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1answer
70 views

Could a Van Emde Boas tree be used for storing matrices?

I'm aware that typical techniques to store matrices in sparse form are compressed formats or maps where the key is the pair of indices and value the value of the entry in a matrix. I was wondering if ...
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1answer
237 views

Merge sort mxn matrix

The question is as follows: I am new to this, and I do not understand how to apply divide and conquer to a matrix, the algorithm that I have come up with is as follows (I am not sure if I am correct) ...
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56 views

Sparse Matrix inversion without actual inversion

I want to know what are the efficient way to invert a Sparse Matrix? Are there any algorithm,linear algebra or expansions that make this task easier with out actually inverting the matrix? Thank you ...
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1answer
33 views

Rows and columns in quantum-gate matrices read the same - why?

I have noticed that for all the matrices representing quantum gates, if we read rows left-to-right and top to bottom, the read the same as columns top to bottom left to right. Example: \begin{...
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2k views

Algorithm (Addition of two matrices)

A file F holds the non-zero elements of two large n×n matrices, A and B. The matrix entries are stored as triplets (i,j,value), where value is the (i,j)th element of a matrix. The file first stores ...
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1answer
49 views

Compute unknown matrices that minimize a sum

This problem is about working with smart-phone accelerometers. To calibrate accelerometer, I need to find three unknown matrices T, K and B that minimize this sum: $$\sum_{i=0}^N(|g|^2 - |TK(a_i + B)|...
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1answer
60 views

Matrix multiplication in recurrent neural networks

I was looking at a tutorial for recurrent neural networks in Python, and I have a question in regards to multiplying matrices of different sizes. Specifically, why does S[t] have 100 elements in it? ...
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1answer
19 views

Simple Representation of Matrices with the Given Equivalence Relationship

I'm currently working on an algorithm that requires me to come up with unique matrices. Two matrices are considered equivalent if one's rows and columns can be swapped to make it match the other. For ...
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2answers
458 views

Strassen Algorithm for Unusal Matrices

The Strassen algorithm is developed for multiplying the matrices faster. It enables us to reduce O(n^3) time complexity to O(n^2.81). However, this algorithm is applied for the matrices which are ...
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1answer
13 views

Strassen's algorithm on unit vectors?

I am trying to do a dot product of two vectors of each 128 dimension. I am just looping each member and calculating the sum. ...
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1answer
1k views

Find all local minima in a big 2d array

Assume we have a big 2d array. All its elements are either zeros or natural numbers. A local minimum is an element that is less than all its 8 neighbors. Is there an effective algorithm to find all ...
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1answer
63 views

Find the nearest sum to a given number of two elements in sorted matrix

Given a sorted $n\times n$ matrix $A$ of real values. That is $a_{ki}<a_{kj}$ and $a_{it}<a_{jt}$, when $i<j$. Propose and algorithm, finding two elements of this matrix with the sum nearest ...
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1answer
535 views

The line-covering step in the Hungarian algorithm

I am trying to understand the Hungarian algorithm for the assignment problem. I found this presentation which gives an excellent explanation about the algorithm. However, there is one step I do not ...
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1answer
72 views

Find the maximizing row-column matches in a matrix

I have a set of R x C matrices similar to the following (can be much longer): C1 C2 C3 C4 C5 C6 R1 0.32 0.81 NA NA NA NA R2 0.90 -0.44 0.95 ...
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57 views

Advantages (from a mathematical perspective) of representing data as symmetric matrices

From Wikipedia, a symmetric matrix is a square matrix that is equal to its transpose. An example of this (I think) is an adjacency matrix with undirected edges, which is a square matrix representing ...
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1answer
163 views

Sort binary matrix by swapping columns to make subrectangle of ones with maximum size

We have given binary matrix (matrix containing only 1 and 0) of size $n\cdot m$. We want to order the matrix such that the biggest rectangle containing only ones is with maximum size. For example if ...
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1answer
306 views

How does matrix chain multiplication problem has an optimal substructure?

We solve Matrix chain multiplication problem considering the optimal solution to subproblems but what I cant get through my mind is how this problem has an optimal substructure? For eg. consider if ...
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1answer
71 views

Efficiently compute parallel matrix-vector product for block vectors with FFTs?

Assume I have $P$ processors, each having a different vector $v_p$ of size $N$, $p=1, ..., P$. I learned in this question/answer that for computing the matrix-vector product $$w = (E\otimes I_N)v$$ ...
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1answer
48 views

Efficiently compute parallel matrix-vector product for block vectors?

I have $P$ processors, each having a different vector $v_p$ of size $N$, $p=1, ..., P$. I now want to compute the matrix-vector product $$w = (E\otimes I_N)v$$ in parallel, where $\otimes$ is the ...
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1answer
67 views

Finding maximum clique in a distance matrix created by certain pattern

I have a distance matrix which is created through a predefined pattern (or formula) and I want to find elements with minimum distance "d" from each other, in order to do that I search for the maximum ...