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2
votes
1answer
31 views

`Range` gives me something else in place of `0`, why?

I wanted to put some FrameTicks to a Plot with xticks = Range[-2, 2, 0.2] and got {-2., -1.8, -1.6, -1.4, -1.2, -1., -0.8, -0.6, -0.4, -0.2, 1.11022*10^-16, 0.2, 0.4, 0.6, 0.8, 1., 1.2, 1.4, 1.6, ...
3
votes
0answers
103 views

C/C++ code with GNU Scientific Library (GSL) gives different results to GNUPlot - possible floating point instabilities?

SShort: GNUPlot gives a much better fit to my data than my GSL code does. Why? Short: I am slightly confused at the moment, so my question might not be particularly well worded... I will edit this ...
5
votes
2answers
76 views

How do I implement a numerically stable weighted logaddexp?

What is the most numerically stable way of calculating: log[(wx * exp(x) + wy * exp_y)/(wx + wy)] where the weights wx, wy > 0? Without the weights, this function is logaddexp and could be ...
21
votes
1answer
183 views

Weird numpy.sum behavior when adding zeros

I understand how mathematically-equivalent arithmentic operations can result in different results due to numerical errors (e.g. summing floats in different orders). However, it surprises me that ...
0
votes
1answer
36 views

error bound in function approximation algorithm

Suppose we have the set of floating point number with "m" bit mantissa and "e" bits for exponent. Suppose more over we want to approximate a function "f". From the theory we know that usually a ...
0
votes
1answer
28 views

Implicit Euler method for integration of ODEs

For those of you familiar with the method, it is known that one must solve the equation: y(i+1) = y(i) + h*F( X(i+1), Y(i+1) ) However, F is usually not linear, and the resulting equation usually ...
3
votes
2answers
103 views

Numerical inconsistency in .NET

I’m building a CAD-like application in C#. I’m using SlimDX as the graphics engine, and for the number-crunching part, I build custom libraries which ultimately rely on the System.Math class, ...
0
votes
1answer
69 views

Solving a matrix equation with very small inputs

I'm programming in Matlab and in my program I need to solve a system Ax=b, where A is a m by m square matrix with very small entries. If m increases, the entries of A become smaller. A is a sparse ...
4
votes
3answers
666 views

Robust atan(y,x) on GLSL for converting XY coordinate to angle

In GLSL (specifically 3.00 that I'm using), there are two versions of atan(): atan(y_over_x) can only return angles between -PI/2, PI/2, while atan(y/x) can take all 4 quadrants into account so the ...
1
vote
0answers
60 views

C floating point arithmetic: multiple wrong answers [duplicate]

I'm running into a numerical issue in a large C programming project. (This is statistical research, not homework for a class). One step involves calculating sqrt(x^2 + y) - x, which I need to be ...
1
vote
0answers
62 views

Numerical Stability - does Multiply/Divide give a more precise value than Divide/Multiply?

Consider the following code: $result *= $oldFactor / $newFactor; //using shorthand *= operator which is actually this: $result = $oldFactor / $newFactor * $result; //division done first I can ...
2
votes
4answers
541 views

Converting float to UInt32 - which expression is more precise

I have a number float x which should be in <0,1> range but it undergo several numerical operations - the result may be slightly outside <0,1>. I need to convert this result to uint y using ...
7
votes
1answer
117 views

Power of number close to 1

I'm guessing there is some standard trick that I wasn't able to find: Anyway I want to compute a large power of a number very close to 1(think 1-p where p<1e-17) in a numerically stable fashion. ...
1
vote
4answers
1k views

Source code for trigonometric functions calculations

For program that needs to be deterministic and provide the same result on different platforms (compilers), the built-in trigonometric functions can't be used, since the algorithm to compute it is ...
6
votes
2answers
110 views

Numerically Stable Implementation

I need to compute a normalized exponential of a vector in Matlab. Simply writing res = exp(V)/sum(exp(V)) overflows in an element of V is greater than log(realmax) = 709.7827. (I am not sure ...
2
votes
1answer
144 views

numpy.random.multinomial bad outputs?

I have this function: import numpy as np def unhot(vec): """ takes a one-hot vector and returns the corresponding integer """ assert np.sum(vec) == 1 # this assertion shouldn't fail, but ...
2
votes
1answer
402 views

How can I avoid value errors when using numpy.random.multinomial?

When I use this random generator: numpy.random.multinomial, I keep getting: ValueError: sum(pvals[:-1]) > 1.0 I am always passing the output of this softmax function: def softmax(w, t = 1.0): ...
2
votes
5answers
630 views

Quaternions and numerical stability

I'm learning about unit quaternions and how to use them to represent and compose rotations. Wikipedia says they are more numerically stable than matrix representations, but doesn't give a reference. ...
1
vote
2answers
296 views

2nd order centered finite-difference approximation

This question may sound mathematical, but it's more of a programming question related to discretization, so I decided to ask it here. The problem is to find a 2nd order finite difference ...
5
votes
2answers
327 views

Interpreting error from computing Jordan form of 36-by-36 matrix

I've been trying to compute the jordan normal form of a 36-by-36 matrix composed of only three distinct entries, 1, 1/2, and 0. The matrix is a probability transition matrix so, given these entries, ...
3
votes
1answer
210 views

Testing for “double” equality in javascript

I have translated the experimental C# "float" version of Clipper library to javascript. In the newest sandbox version there is a function IsAlmostEqual which seems to be hard to translate. Double ...
1
vote
1answer
217 views

OLS in R - lm() giving a different answer to matrix calculation

I was playing around with doing a manual calculation for the OLS estimators using linear algebra in R and I got a different answer to R's inbuilt regression function lm(). Would anyone be able to tell ...
4
votes
2answers
830 views

Avoiding numerical overflow when calculating the value AND gradient of the Logistic loss function

I am currently trying to implement a machine learning algorithm that involves the logistic loss function in MATLAB. Unfortunately, I am having some trouble due to numerical overflow. In general, for ...
2
votes
2answers
94 views

Clojure: Inconsistent Rounding in Subtractions

I am working on a piece of code where numerical equality is an important factor in several logical conditional. Clojure is doing something I dont know enough about to explain. For example: ...
0
votes
1answer
370 views

How to fix this round-off error?

Apologies for the long code. This is as far as I could reduce it. #include <QtGui/QApplication> #include <QtGui/QWidget> #include <QtGui/QImage> #include <QtGui/QPainter> ...
2
votes
2answers
622 views

solve() crashes when aimed at singular matrices

I am trying to solve a system of linear equations in the least-squares-style. Using armadillo and its solve function I want to calculate the three coefficients of a parabolic fit. vec coeffs = ...
2
votes
1answer
121 views

Numerically stable algorithm for online updating vector sum

Given a vector v, I want to keep track of the sum of its elements in a variable sum_v. Each element i of the vector v is a dot product of a weight vector w_i with other vectors d_i. So, every time ...
0
votes
1answer
402 views

Numerical errors : absolute error and absolute relative error?

I would like to understand how absolute and relative errors work with an example. I will need later an algorithm so I'd appreciate your help. Suppose, we have x1*=4.54 x2*=3.00 and x3*=15.0 with ...
0
votes
1answer
155 views

Algorithms for Performing Large Integer Matrix Operations w/ Numerical Stability

I'm looking for a library that performs matrix operations on large sparse matrices w/o sacrificing numerical stability. Matrices will be 1000+ by 1000+ and values of the matrix will be between 0 and ...
9
votes
1answer
1k views

c++: strategies for stability of floating point arithmetic

Can anyone recommend any C++ libraries/routines/packages that contain strategies for maintaining the stability of various floating point operations? Example: suppose you would like to sum across a ...
0
votes
1answer
339 views

Numerically stable average of java.util.Dates

I've got a bunch of Dates and I want to find their average. How many Dates within 100 years of now can I sum before I run into overflow problems? Any gotchas? What's the best way to calculate the ...
1
vote
1answer
2k views

Stabilizing Infrared Distance Sensor Output Values

I'm reading infrared Sharp distance sensors: http://www.robofun.ro/senzori/infrarosu/senzor_sharp_%20GP2D120XJ00F With the reading I'm commanding a servo to direct the robot along a wall, a pretty ...
2
votes
2answers
17k views

Calculating an inverse matrix in Matlab

I'm running an optimization algorithm that requires calculation of the inverse of a matrix. The goal of the algorithm is to eliminate negative values from the matrix A and obtain the new matrix B. ...
0
votes
1answer
1k views

Getting y from x co-ord for cubic bezier curve, fast Newton-Raphson method

Given the points of a Bezier curve (P0, P1, P2, P3) in 2D, I would like to find the y co-ordinate for a given x co-ordinate. The problem is well defined because of the following restrictions: P0 = ...
3
votes
5answers
2k views

numerically stable inverse of a 2x2 matrix

In a numerical solver I am working on in C, I need to invert a 2x2 matrix and it then gets multiplied on the right side by another matrix: C = B . inv(A) I have been using the following definition ...
9
votes
4answers
3k views

How do I check and handle numbers very close to zero

I have some math (in C++) which seems to be generating some very small, near zero, numbers (I suspect the trig function calls are my real problem), but I'd like to detect these cases so that I can ...
1
vote
2answers
121 views

Numeric instability

I'm doing some Linear programming exercises for the course of Algorithms, and in doing this I'm solving manually many operations with fractions. In doing this I realized that a human being don't ...
8
votes
1answer
1k views

Java code optimization leads to numerical inaccuracies and errors

I'm trying to implement a version of the Fuzzy C-Means algorithm in Java and I'm trying to do some optimization by computing just once everything that can be computed just once. This is an iterative ...
4
votes
2answers
2k views

Good algorithm for calculating ln(1-x) for small (and occasionally large) x

I'm looking for an algorithm to calculate ln(1-x). x is often small (<0.01), but occasionally it might be larger. Algorithm needs to be accurate, and not too slow. I'd rather not use library for ...
15
votes
4answers
5k views

In Python small floats tending to zero

I have a Bayesian Classifier programmed in Python, the problem is that when I multiply the features probabilities I get VERY small float values like 2.5e-320 or something like that, and suddenly it ...
0
votes
2answers
199 views

Articles on analysis of mixed precision numerical algorithms?

Many numerical algorithms tend to run on 32/64bit floating points. However, what if you had access to lower precision (and less power hungry) co-processors? How can then be utilized in numerical ...
4
votes
3answers
1k views

positive semi-definite matrices and numerical stability?

i'm trying to do factor analysis for a co-occurrence matrix(C) , which is computed from the term-document matrix(TD) as follows: C=TD*TD' In theory C should be positive semi-definite , but it isn't ...
5
votes
2answers
346 views

Strategies for debugging numerical stability issues?

I'm trying to write an implementation of Wilson's spectral density factorization algorithm [1] for Python. The algorithm iteratively factorizes a [QxQ] matrix function into its square root (it's sort ...