version 1.9.1.0 (59.7 KB) by
Ben Petschel

create and manipulate fractions (K+N/D) using exact arithmetic

The fractions toolbox allows users to create and manipulate fractions and fraction arrays of the form K+N/D, e.g.

fr(1,3) % returns 1 / 3

fr(pi) % returns 3 + 4703 / 33215

All the standard arithmetic and comparison operations are valid:

fr(1,3)+fr(1,2) % returns 5 / 6

fr(1,3)>0.3 % returns 1

Linear equations:

A = fr(ones(2),[2,3;5,7]);

B = fr(ones(2,1),[11;13]);

A\B % returns [-3+49/143; 4+37/143]

lsq(fr([1;1]),[0;1]) % returns 1/2

The treatment of singular and non-square systems is different from that of the built-in "\" so please read the documentation, e.g. for reasons of personal preference "\" does not do least-squares by default - use lsq instead.

Partial fractions and arbitrary-base digits can be computed:

[d,r]=digits(fr(1,7),4,3) % 4 digits of base-3 expansion of 1/7 plus remainder

% returns d=[0,1,0,2] and r= 4/567

Continued fractions expansions of fractions and square roots:

[cf,rep] = cfracsqrt(fr(13,5)) % continued fraction of sqrt(13/5)

[r1,r2] = bestrat(cf,rep,1000) % best rational approximations with denominator limit 1000

A powerful feature of the toolbox is that the numerator and denominator can theoretically be any data types that accept the standard arithmetic and comparison operations as well as gcd and mod. For example, if you have John D'Errico's Variable Precision Integer Toolbox (20 July 2009 release or later; see link below):

prod(fr(1,vpi(2:7)).^10)

ans =

1 / 10575608481180064985917685760000000000

If there exists a suitably defined polynomial object, this toolbox could be used to perform partial fraction and series expansions of rational functions.

See the demo and help files for a full list of features.

The functions have been tested with doubles and vpi integers, but message me if you encounter any problems, and let me know how it goes with other data types.

Ben Petschel (2021). Fractions Toolbox (https://www.mathworks.com/matlabcentral/fileexchange/24878-fractions-toolbox), MATLAB Central File Exchange. Retrieved .

Created with
R2009b

Compatible with any release

**Inspired by:**
Variable Precision Integer Arithmetic

**Inspired:**
The Computation of Pi by Archimedes

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John BGHi

would it be possible to have this toolbox packed as an app so it works regardless of the MATLAB path chosen?

John

jgb2012@sky.com

nikhil pachauriHOW I CAN ADD THIS TOOLBOX IN MY MATLAB

JaredBen, very useful tool. I wanted to alert you to what looks to be a small bug:

In @fr/rat, I think line 54 should read:

varargout{1}=N+K.*D;

rather than

varargout{1}=N+K*D;

I am happy so far and will provide more feedback one I have more time to play with it.

Ben PetschelRichard/Nathan, thanks for the suggestions - I've submitted a new update for fr.m and freduce.m. I got around the performance issue in fr.m by using a persistent variable to ensure that the calls to superiorto are done only once.

Richard CrozierOne more thing, even with my change, I still find that about 60% of the time in fr.m is spent on the line

if exist('vpi', 'class')

at least according to the profiler. So if anyone does not have this toolbox, I'd advise just commenting this whole test out.

Richard CrozierSorry for the multiple posts, and a better suggestion, just:

if exist('vpi', 'class')

superiorto('vpi')

end

Richard CrozierI suggest modifying fr.m to check for the existence of the vpi class before calling superiorto like follows:

if exist('vpi', 'class')

try

superiorto('vpi')

catch

% in case VPI toolbox has never been used

end

end

the reason is that if you call fr.m many times and don't have the vpi toolbox, the call to superiorto('vpi') is incredibly slow, and in fact takes up most of the execution time.

Richard CrozierI suggest modifying fr.m to check for the existence of the vpi class before calling superiorto like follows:

if exist('vpi', 'class')

try

superiorto('vpi')

catch

% in case VPI toolbox has never been used

end

end

the reason is that if you call fr.m many times and don't have the vpi toolbox, the call to superiorto('vpi') is incredibly slow, and in fact takes up most of the execution time.

Nathan ThernExcellent work. I was just writing a wrapper class around java.math.BigInteger and tried creating an fr object using it. I found that your freduce function uses / (mrdivide) in three places where you really want ./ (rdivide).

Ben PetschelOk, to do that you'd need to define a total ordering on the polynomials by partitioning R[x] into P, -P and {0}, so p(x)>0 if p(x) is in P. See Lang's Algebra chapter 11 (real fields) for examples and details on the theory - e.g. the monomial orderings used for Groebner basis calculation are valid. This way you have sign(p)=1 if p is in P, etc, and similarly abs(p)=sign(p)*p.

Also I forgot to mention that MOD is required, but once this is defined then it's easy to write a GCD function. To define MOD you just need to define the representative elements of the cosets R[x]/p(x), such that MOD(q,p)>=0.

If you're willing to put in the effort implementing this, I'd be keen to see the results, but otherwise you're probably better off with a professional package such as Mathematica (which has an affordable home-use version) or the Symbolic Toolbox.

Christophe LauwerysGreat stuff, but I wonder how your two statements quoted below can be unified.

In other words: how can you define for instance SIGN and ABS for objects that represent polynomials? Not to mention GCD for multivariate polynomials ... Not an expert but do you need Groebner bases for this?

Thanks

Christophe

A)

% Non-standard objects must include 0, 1, -1 and require the following

% operations to be defined in order to create a fraction object:

% gcd

% rem

% sign

% abs

% +, - , .*, ./

% ==, <, <=, >, >=, ~=

%

% The following additional operation definitions are recommended:

% *, .^

% sort

% floor

% factor

% gcd (3-output form)

% rat (if floor(x) or mod(x,1) is not always equal to x)

B) If there exists a suitably defined polynomial object, this toolbox could be used to perform partial fractions.

Bill McKeemanI used this toolbox in the computation of pi (see FX 29504).

Erdal BizkevelciMatt FigGreat work!

Derek O'ConnorThis is a very useful toolbox, especially when used with

John D'Errico's Variable Precision Integer Toolbox.

Here are two tests I ran :

function z = RumpFrac(x,y)

% Testing John D'Errico's Variable Precision Integer Toolbox

% and Ben Petschel's Fractions Toolbox using

% Rump's polynomial. Derek O'Connor Aug 01 2009

x = fr(vpi(x));

y = fr(vpi(y));

R1 = (33375/100)*y^6+ x^2*(11*x^2*y^2-y^6- 121*y^4- 2)

R2 = (55/10)*y^8

R3 = x/(2*y)

z1 = R1+R2

z = z1 + R3;

%

% R1 =

% -7917111340668961361101134701524942850

% R2 =

% 7917111340668961361101134701524942848

% R3 =

% 1 + 11425 / 66192

% z1 =

% -2

% z =

% -1 + 11425 / 66192 = -54767/66192 --- Correct.

% z = -1.180591620717411e+021 without first two statements

and

function z = JuddFrac(x,y)

% Testing John D'Errico's Variable Precision Integer Toolbox

% and Ben Petschel's Fractions Toolbox using

% Judd's polynomial. Derek O'Connor Aug 01 2009

x = fr(vpi(x));

y = fr(vpi(y));

J1 = 1682*x*y^4

J2 = 3*x^3

J3 = 29*x*y^2

J4 = - 2*x^5

z1 = J1+J2

z2 = z1+J3

z3 = z2+J4

z4 = z3+832

z = z4/107751

% z = JuddFrac(192119201,35675640);

% J1 =

% 523460426438903533308340192814390277120000

% J2 =

% 21273236588999014470832803

% J3 =

% 7091078862999671298158400

% J4 =

% -523460426438903561672655644813075853992002

% z1 =

% 523460426438903554581576781813404747952803

% z2 =

% 523460426438903561672655644813076046111203

% z3 =

% 192119201

% z4 =

% 192120033

% z =

% 1783 --- Correct.

% z = 7.721506064908910e-003 without first two statements

Khaled HamedVery useful toolbox, especially with the added precision of the vpi toolbox.

I think the demo_fr.m file needs an "echo on" at the beginning to see the header of each of the demo problems, rather than answers only (followed by echo off at the end).

Ben PetschelHi Khaled, thanks for pointing that out (I forgot to run "rehash path" when testing without the vpi toolbox). I've submitted an update which should become available soon. Let me know if you have any further problems.

Khaled HamedIt seems to require vpi to be in the Matlab path, or a previous instance of a vpi.

>> fr(1,7)

??? Error using ==> superiorto

Unknown class 'vpi' listed in 'SUPERIORTO'.

Error in ==> fr.fr at 201

superiorto('vpi','double','single','int8','uint8','int16', ...

John D'ErricoNifty