All questions concerning numbers which support extremely high precision: Libraries in programming languages (GMP, MPFR), support of arbitrary precision in computer algebra systems (CAS, Mathematica, Maple, Mathlab) and how to correctly use and calculate numbers with very high precision and accuracy.

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0
votes
1answer
146 views

Keeping accuracy when taking decimal to power of integer

My code is as follows (I have simplified it for ease of reading, sorry for the lack of functions): #include <stdio.h> #include <string.h> #include <math.h> #include ...
-3
votes
1answer
1k views

How to implement bignum addition/multiplication from scratch in C++ [duplicate]

I have started writing a bignum library, with a vector of shorts to represent the value, a print function, and negative number support. However, I cannot find a good way to implement long addition, ...
3
votes
1answer
227 views

Get GCC To Use Carry Logic For Arbitrary Precision Arithmetic Without Inline Assembly?

When working with arbitrary precision arithmetic (e.g. 512-bit integers), is there any way to get GCC to use ADC and similar instructions without using inline assembly? A first glance at GMP's ...
1
vote
2answers
571 views

How to calculate numbers to arbitrarily high precision?

I wrote a simple fortran program to compute Gauss's constant : program main implicit none integer :: i, nit double precision :: u0, v0, ut, vt nit=60 u0=1.d0 v0=sqrt(2.d0) print *,1.d0/u0,1.d0/v0 ...
2
votes
1answer
342 views

GCD algorithms for arbitrary-precision arithmetic

I am completely stuck with this question, so I am looking for any help. I think everybody knows about basic GCD computation algorithms like binary or euclidean GCD. It is not a problem to implement ...
0
votes
5answers
913 views

Optimization for functions that produce NaN for some initial values

I would like to find all local minimums of the following objective function func <- function(b){Mat=matrix(c(+0.5*1/((1/(exp(-b[1]-b[2]*-5)+1))*(1-(1/(exp(-b[1]-b[2]*-5)+1))))*exp(-b[1] - b[2] * ...
4
votes
1answer
955 views

Calculating the digits of pi

I've used the GMP library and C++ to code an implementation of the Gauss-Legendre algorithm to calculate the digits of pi. It has correct output, but the problem is I don't know at which point the ...
5
votes
3answers
460 views

BigDecimal precision explosion

I'm trying to do calculations in Scala (and/or Java) at a fixed precision larger than that of a double. I'm using BigDecimals with Scala's default MathContext, which has precision 34. Even though ...
7
votes
1answer
2k views

AVX VMOVDQA slower than two SSE MOVDQA?

While I was working on my fast ADD loop (Speed up x64 assembler ADD loop), I was testing memory access with SSE and AVX instructions. To add I have to read two inputs and produce one output. So I ...
11
votes
3answers
523 views

Speed up x64 assembler ADD loop

I'm working on arithmetic for multiplication of very long integers (some 100,000 decimal digits). As part of my library I to add two long numbers. Profiling shows that my code runs up to 25% of it's ...
24
votes
2answers
2k views

What is the fastest way to calculate e to 2 trillion digits?

I want to calculate e to 2 trillion (2,000,000,000,000) digits. This is about 1,8 TiB of pure e. I just implemented a taylor series expansion algorithm using GMP (code can be found here). ...
2
votes
1answer
731 views

fast arbitrary precision c++ library: is __float128 faster than MPFR?

I know there are a couple of thread on similar topics ( What's the best (for speed) arbitrary-precision library for C++? and The best cross platform (portable) arbitrary precision math library ) ...
11
votes
1answer
225 views

Compute the product a * b**2 * c**3 … efficiently

What is the most efficient way to compute the product a1 b2 c3 d4 e5 ... assuming that squaring costs about half as much as multiplication? The number of operands is less than 100. Is there a ...
7
votes
3answers
841 views

Is there an arbitrary precision floating point library for C/C++ which allows arbitrary precision exponents?

I'm looking for an arbitrary precision floating point library for C/C++ (plain C is preferred). I need arbitrary precision exponents. GMP and MPFR use fixed size exponents, so they are ineligible (I ...
3
votes
2answers
143 views

Strange precision issues in R when computing cumulative binomial probability

I've been running into some weird problems when using this code: positions<-c(58256) occurrencies<-c(30) frequency<-c(11/5531777) length<-c(4) prob<-c(0) for(i in 0:(occurrencies-1)) ...
1
vote
1answer
330 views

implementing a bignum library for rsa encryption

So of course I know there are simple solutions to this such as using the GMP library or numerous other arbitrary-precision libraries. This is for class work so I am not allowed to take any of these ...
2
votes
1answer
140 views

Parsing arbitrary precision integers with boost::spirit

I would like to create boost::spirit::qi::grammar for arbitrary integer. Storing integer to string just feels terrible wasting of memory especially when integer is represented in binary format. How ...
1
vote
3answers
102 views

Bit shifting on non contiguous internal number representation

I am writing a c++ arbitrary integer library as an homework. I represented numbers internally as a vector of unsigned int, in base 10^n, where n is as big as possible while fitting into a single ...
0
votes
2answers
390 views

Arbitrary precision bit manipulation (Objective C)

I need to do bit operations on representations of arbitrary precision numbers in Objective C. So far I have been using NSData objects to hold the numbers - is there a way to bit shift the content of ...
0
votes
1answer
123 views

Arbitrary precision in c++ using Windows? [duplicate]

Is there a library that can be implemented relatively easily in windows? I made a few functions a while ago which used arrays of numbers to get the desired outcome. I might work at them when I get the ...
3
votes
2answers
557 views

What is the precise meaning of arbitrary precision?

This might be a very simple question for some but I would like to know the meaning of arbitrary precision which appears in the first line in JavaDoc of BigInteger : Immutable arbitrary-precision ...
2
votes
4answers
316 views

How do I find the largest integer fully supported by hardware arithmetics?

I am implementing a BigInt class that must support arbitrary-precision operations on integers. Quote from "The Algorithm Design Manual" by S.Skiena: What base should I do [editor's note: ...
9
votes
4answers
712 views

Floats vs rationals in arbitrary precision fractional arithmetic (C/C++)

Since there are two ways of implementing an AP fractional number, one is to emulate the storage and behavior of the double data type, only with more bytes, and the other is to use an existing integer ...
1
vote
1answer
184 views

Arbitrary precision numbers and Javascript, Google Web Toolkit

This is not really a question as I do have a work around with the issue, but I thought I'd let everyone know because it may have quite a wide impact on the way people work with the Google Web Toolkit. ...
0
votes
1answer
707 views

numpy.allclose and multiprecision with mpmath

In my python code, I regularly verify some calculations using numpy.allclose. On the other hand, apart from these checks the implementation is able to deal with multiprecision (mpmath.mpc) numbers. If ...
4
votes
1answer
512 views

No solution in CPLEX with very small change in inputs

I'm using CPLEX in C++ to solve a hub location problem, a MIP, and I've recently found a very precise set of inputs that CPLEX thinks is infeasible (i.e. CPXMIP_INFEASIBLE) even though the problem is ...
3
votes
2answers
304 views

x86-64 Big Integer Representation?

How do high performance native big integer libraries on x86-64 represent a big integer in memory? (or does it vary? Is there a most common way?) Naively I was thinking about storing them as ...
2
votes
2answers
292 views

Avoiding expensive calculations in Python IRC bot

I'm using this calculator in a public IRC bot. Given that Python uses arbitrary precision by default, this would allow any user to execute something like calc 10000**10000**10000 or calc ...
1
vote
0answers
139 views

mpfr_free_cache in destructor - a good idea?

I need arbitrary precision in a C++ program, so I am using the well-known, lightweight C++-wrapper MPFRC++ over the multi-precision floating point C-library MPFR. I have been having memory issues. ...
0
votes
1answer
494 views

Which library should I use on OSX for arbitrary precision arithmetic?

I tried already GMP, MPFR. But I can't accomplish a simple division like below. BTW I have LLVM compiler in Xcode. I try to compile, run it to IOS Simulator. mpf_t a; mpf_init2 (a, 256); ...
5
votes
2answers
155 views

manually printing a N-byte integer

What is a scalable algorithm to print an N-binary-digit integer manually whose value does not fit in long long. I know printf and friends, along with <iostream> (which most likely piggy-backs on ...
1
vote
1answer
125 views

GMP rounding modes

Is there any way to change the rounding mode when doing operations with GMP? Or do I have to use MPFR for that? Thanks in advance!
2
votes
4answers
957 views

big integer addition without carry flag

In assembly languages, there is usually an instruction that adds two operands and a carry. If you want to implement big integer additions, you simply add the lowest integers without a carry and the ...
0
votes
3answers
2k views

MatLab - variable precision arithmetic

I have a brief question regarding the vpa command one may use to evaluate symbolic expressions in MatLab. My textbook says the following: "You need to be careful when you use functions such as sqrt ...
2
votes
2answers
739 views

Multiple Precision for Visual Studio 2010

Can anyone suggest a multiple precision library that comes with pre-built windows binaries. I need to use it use with an existing Visual Studio 2010 project (or where I can get pre-built binaries for ...
7
votes
2answers
1k views

JVM Arbitrary Precision Libraries

I'm working on a project ( in Scala ), where I have a need to manipulate some very large numbers; far too big to be represented by the integral types. Java provides the BigInteger and BigDecimal ...
2
votes
2answers
291 views

Translation from Complex-FFT to Finite-Field-FFT

Good afternoon! I am trying to develop an NTT algorithm based on the naive recursive FFT implementation I already have. Consider the following code (coefficients' length, let it be m, is an exact ...
2
votes
1answer
507 views

Multiplication using FFT in integer rings

I need to multiply long integer numbers with an arbitrary BASE of the digits using FFT in integer rings. Operands are always of length n = 2^k for some k, and the convolution vector has 2n components, ...
0
votes
1answer
702 views

Square root in Ruby with more precision than BigDecimal.sqrt?

I thought that the purpose of Ruby's BigDecimal class is that it is infinitely arbitrarily precise at the cost of speed. Wrong: > BigDecimal(4).sqrt(4) => #<BigDecimal:906602c,'0.1999999999 ...
0
votes
2answers
612 views

Algorithm for solving decimal exponents without fractions

Could someone explain the steps involved in solving something like 2^2.2 if fractions couldn't be used, such as in an infinite precision calculation?
0
votes
1answer
2k views

double-double precision floating point as sum of two doubles

Following papers and source code for double-double arithmetic for some time, I still can't find out how exactly a dd_real ( defined as struct dd_real { double x[2];...}) number is split into two ...
3
votes
2answers
428 views

How do pocket calculators simplify fractions and keep imprecise numbers as fractions?

Could someone explain how calculators (such as casio pocket ones) manage equations such as '500/12' and are able to return '125/3' as the result, alternately can someone name some algorithms which do ...
2
votes
3answers
1k views

Is there support for arbitrary precision arithmetic in C#

Does c# support arbitrary precision arithmetic, I think they are also called bignums? If it doesn't which libraries would you recommend that does support it?
3
votes
3answers
162 views

what options are there for representing numbers with more than 2^81 digits?

I came across an interesting math problem that would require me to do some artithmetic with numbers that have more than 281 digits. I know that its impossible to represent a number this large with a ...
3
votes
1answer
954 views

How should the MySQL Decimal datatype be used in php?

Hopefully just a quick question. I have a DECIMAL column in my database. The value is a very small decimal fraction - summing this value for all rows would equal 1. Now I'd like to use this value in ...
14
votes
1answer
2k views

Can long integer routines benefit from SSE?

I'm still working on routines for arbitrary long integers in C++. So far, I have implemented addition/subtraction and multiplication for 64-bit Intel CPUs. Everything works fine, but I wondered if I ...
2
votes
1answer
418 views

Arbitrary long integers in Delphi - NX library?

just looking for some implementation of arbitrary large integer numbers with some basic arithmetic (add, mul, div at least) for Delphi. All solutions I did already found are either painfully ...
0
votes
1answer
627 views

Printing formatted arbitrary precision decimals in python

Python's arbitrary precision decimals are lovely, but I can't seem to find a way to print them in a nicely formatted way. For example, if I compute the following expression: >>> pow(2,70) -2 ...
8
votes
6answers
381 views

Python computing error

I’m using the API mpmath to compute the following sum Let us consider the serie u0, u1, u2 defined by: u0 = 3/2 = 1,5 u1 = 5/3 = 1,6666666… un+1 = 2003 - 6002/un + 4000/un un-1 The serie ...
2
votes
5answers
157 views

Can Java floating point hazards be avoided with rounding?

It is known that java floating point primitive values are not to be used when arbitrary precision is required. Goetz explained the problem in his excellent article. Imagine we need to achieve ...