This chapter contains commands to use for input and output and plotting. All output commands write to the same destination stream, called the "current output". This is initially the screen, but may be redirected by some commands. Similarly, most input commands read from the "current input" stream, which can also be redirected. The exception to this rule are the commands for reading script files, which simply read a specified file.
FullForm(expr)
print an expression in LISP-format
- param expr
expression to be printed in LISP-format
Evaluates "expr", and prints it in LISP-format on the current output. It is followed by a newline. The evaluated expression is also returned. This can be useful if you want to study the internal representation of a certain expression.
- Example
In> FullForm(a+b+c);
(+ (+ a b )c )
Out> a+b+c;
In> FullForm(2*I*b^2);
(* (Complex 0 2 )(^ b 2 ))
Out> Complex(0,2)*b^2;
The first example shows how the expression {a+b+c} is
internally represented. In the second example, {2*I} is
first evaluated to {Complex(0,2)} before the expression
is printed.
LispRead
, Listify
, Unlist
Echo(item)
high-level printing routine
- param item
the item to be printed
- param list
a list of items to be printed
If passed a single item, {Echo} will evaluate it and print it to the current output, followed by a newline. If {item} is a string, it is printed without quotation marks. If there is one argument, and it is a list, {Echo} will print all the entries in the list subsequently to the current output, followed by a newline. Any strings in the list are printed without quotation marks. All other entries are followed by a space. {Echo} can be called with a variable number of arguments, they will all be printed, followed by a newline. {Echo} always returns True
.
- Example
In> Echo(5+3);
8
Out> True;
In> Echo({"The square of two is ", 2*2});
The square of two is 4
Out> True;
In> Echo("The square of two is ", 2*2);
The square of two is 4
Out> True;
Note that one must use the second calling format if one wishes to
print a list:
In> Echo({a,b,c});
a b c
Out> True;
In> Echo({{a,b,c}});
{a,b,c}
Out> True;
PrettyForm
, Write
, WriteString
, RuleBaseListed
PrettyForm(expr)
print an expression nicely with ASCII art
- param expr
an expression
{PrettyForm} renders an expression in a nicer way, using ascii art. This is generally useful when the result of a calculation is more complex than a simple number.
- Example
In> Taylor(x,0,9)Sin(x)
Out> x-x^3/6+x^5/120-x^7/5040+x^9/362880;
In> PrettyForm(%)
3 5 7 9
x x x x
x - -- + --- - ---- + ------
6 120 5040 362880
Out> True;
EvalFormula
, PrettyPrinter'Set
EvalFormula(expr)
print an evaluation nicely with ASCII art
- param expr
an expression
Show an evaluation in a nice way, using {PrettyPrinter'Set} to show 'input = output'.
- Example
In> EvalFormula(Taylor(x,0,7)Sin(x))
3 5
x x
Taylor( x , 0 , 5 , Sin( x ) ) = x - -- + ---
6 120
PrettyForm
TeXForm(expr)
export expressions to
- param expr
an expression to be exported
{TeXForm} returns a string containing a
CForm(expr)
export expression to C++ code
- param expr
expression to be exported
{CForm} returns a string containing C++ code that attempts to implement the Yacas expression {expr}. Currently the exporter handles most expression types but not all.
IsCFormable(expr)
check possibility to export expression to C++ code
- param expr
expression to be exported (this argument is not evaluated)
- param funclist
list of "allowed" function atoms
{IsCFormable} returns True
if the Yacas expression {expr} can be exported into C++ code. This is a check whether the C++ exporter {CForm} can be safely used on the expression. A Yacas expression is considered exportable if it contains only functions that can be translated into C++ (e.g. {UnList} cannot be exported). All variables and constants are considered exportable. The verbose option prints names of functions that are not exportable. The second calling format of {IsCFormable} can be used to "allow" certain function names that will be available in the C++ code.
- Example
In> IsCFormable(Sin(a1)+2*Cos(b1))
Out> True;
In> V(IsCFormable(1+func123(b1)))
IsCFormable: Info: unexportable function(s):
func123
Out> False;
This returned :data:`False` because the function {func123} is not available in C++. We can
explicitly allow this function and then the expression will be considered
exportable:
In> IsCFormable(1+func123(b1), {func123})
Out> True;
CForm
, V
Write(expr, ...)
low-level printing routine
- param expr
expression to be printed
The expression "expr" is evaluated and written to the current output. Note that Write accept an arbitrary number of arguments, all of which are written to the current output (see second example). {Write} always returns True
.
- Example
In> Write(1);
1Out> True;
In> Write(1,2);
1 2Out> True;
Write does not write a newline, so the {Out>} prompt
immediately follows the output of {Write}.
Echo
, WriteString
WriteString(string)
low-level printing routine for strings
- param string
the string to be printed
The expression "string" is evaluated and written to the current output without quotation marks. The argument should be a string. WriteString always returns True.
- Example
In> Write("Hello, world!");
"Hello, world!"Out> True;
In> WriteString("Hello, world!");
Hello, world!Out> True;
This example clearly shows the difference between Write and
WriteString. Note that Write and WriteString do not write a newline,
so the {Out>} prompt immediately follows the output.
Echo
, Write
Space()
print one or more spaces
- param nr
the number of spaces to print
The command {Space()} prints one space on the current output. The second form prints {nr} spaces on the current output. The result is always True.
- Example
In> Space(5);
Out> True;
Echo
, Write
, NewLine
NewLine()
print one or more newline characters
- param nr
the number of newline characters to print
The command {NewLine()} prints one newline character on the current output. The second form prints "nr" newlines on the current output. The result is always True.
- Example
In> NewLine();
Out> True;
Echo
, Write
, Space
FromFile(name) body
connect current input to a file
- param name
string, the name of the file to read
- param body
expression to be evaluated
The current input is connected to the file "name". Then the expression "body" is evaluated. If some functions in "body" try to read from current input, they will now read from the file "name". Finally, the file is closed and the result of evaluating "body" is returned.
- Example
Suppose that the file {foo} contains
2 + 5;
Then we can have the following dialogue:
In> FromFile("foo") res := Read();
Out> 2+5;
In> FromFile("foo") res := ReadToken();
Out> 2;
ToFile
, FromString
, Read
, ReadToken
FromString(str) body;
connect current input to a string
- param str
a string containing the text to parse
- param body
expression to be evaluated
The commands in "body" are executed, but everything that is read from the current input is now read from the string "str". The result of "body" is returned.
- Example
In> FromString("2+5; this is never read") \
res := Read();
Out> 2+5;
In> FromString("2+5; this is never read") \
res := Eval(Read());
Out> 7;
ToString
, FromFile
, Read
, ReadToken
ToFile(name) body
connect current output to a file
- param name
string, the name of the file to write the result to
- param body
expression to be evaluated
The current output is connected to the file "name". Then the expression "body" is evaluated. Everything that the commands in "body" print to the current output, ends up in the file "name". Finally, the file is closed and the result of evaluating "body" is returned. If the file is opened again, the old contents will be overwritten. This is a limitation of {ToFile}: one cannot append to a file that has already been created.
- Example
Here is how one can create a file with C code to evaluate an expression:
In> ToFile("expr1.c") WriteString(
CForm(Sqrt(x-y)*Sin(x)) );
Out> True;
The file {expr1.c} was created in the current working directory and it
contains the line
sqrt(x-y)*sin(x)
As another example, take a look at the following command:
In> [ Echo("Result:"); \
PrettyForm(Taylor(x,0,9) Sin(x)); ];
Result:
3 5 7 9
x x x x
x - -- + --- - ---- + ------
6 120 5040 362880
Out> True;
Now suppose one wants to send the output of this command to a
file. This can be achieved as follows:
In> ToFile("out") [ Echo("Result:"); \
PrettyForm(Taylor(x,0,9) Sin(x)); ];
Out> True;
After this command the file {out} contains:
Result:
3 5 7 9
x x x x
x - -- + --- - ---- + ------
6 120 5040 362880
FromFile
, ToString
, Echo
, Write
, WriteString
, PrettyForm
, Taylor
ToString() body
connect current output to a string
- param body
expression to be evaluated
The commands in "body" are executed. Everything that is printed on the current output, by {Echo} for instance, is collected in a string and this string is returned.
- Example
In> str := ToString() [ WriteString( \
"The square of 8 is "); Write(8^2); ];
Out> "The square of 8 is 64";
FromFile
, ToString
, Echo
, Write
, WriteString
Read()
read an expression from current input
Read an expression from the current input, and return it unevaluated. When the end of an input file is encountered, the token atom {EndOfFile} is returned.
- Example
In> FromString("2+5;") Read();
Out> 2+5;
In> FromString("") Read();
Out> EndOfFile;
FromFile
, FromString
, LispRead
, ReadToken
, Write
ToStdout() body
select initial output stream for output
- param body
expression to be evaluated
When using {ToString} or {ToFile}, it might happen that something needs to be written to the standard default initial output (typically the screen). {ToStdout} can be used to select this stream.
ReadCmdLineString(prompt)
read an expression from command line and return in string
- param prompt
string representing the prompt shown on screen
This function allows for interactive input similar to the command line. When using this function, the history from the command line is also available. The result is returned in a string, so it still needs to be parsed. This function will typically be used in situations where one wants a custom read-eval-print loop.
- Example
The following defines a function that when invoked keeps asking
for an expression (the <i>read</i> step), and then takes
the derivative of it (the <i>eval</i> step) and then
uses PrettyForm to display the result (the <i>print</i> step).
In> ReEvPr() := \
In> While(True) [ \
In> PrettyForm(Deriv(x) \
In> FromString(ReadCmdLineString("Deriv> "):";")Read()); \
In> ];
Out> True;
Then one can invoke the command, from which the following interaction
might follow:
In> ReEvPr()
Deriv> Sin(a^2*x/b)
/ 2 \
| a * x | 2
Cos| ------ | * a * b
\ b /
----------------------
2
b
Deriv> Sin(x)
Cos( x )
Deriv>
Read
, LispRead
, LispReadListed
LispRead()
read expressions in LISP syntax
The function {LispRead} reads an expression in the LISP syntax from the current input, and returns it unevaluated. When the end of an input file is encountered, the special token atom {EndOfFile} is returned. The Yacas expression {a+b} is written in the LISP syntax as {(+ a b)}. The advantage of this syntax is that it is less ambiguous than the infix operator grammar that Yacas uses by default.
- Example
In> FromString("(+ a b)") LispRead();
Out> a+b;
In> FromString("(List (Sin x) (- (Cos x)))") \
LispRead();
Out> {Sin(x),-Cos(x)};
In> FromString("(+ a b)")LispRead()
Out> a+b;
FromFile
, FromString
, Read
, ReadToken
, FullForm
, LispReadListed
LispReadListed()
read expressions in LISP syntax
The function {LispReadListed} reads a LISP expression and returns it in a list, instead of the form usual to Yacas (expressions). The result can be thought of as applying {Listify} to {LispRead}. The function {LispReadListed} is more useful for reading arbitrary LISP expressions, because the first object in a list can be itself a list (this is never the case for Yacas expressions where the first object in a list is always a function atom).
- Example
In> FromString("(+ a b)")LispReadListed()
Out> {+,a,b};
FromFile
, FromString
, Read
, ReadToken
, FullForm
, LispRead
ReadToken()
read a token from current input
Read a token from the current input, and return it unevaluated. The returned object is a Yacas atom (not a string). When the end of an input file is encountered, the token atom {EndOfFile} is returned. A token is for computer languages what a word is for human languages: it is the smallest unit in which a command can be divided, so that the semantics (that is the meaning) of the command is in some sense a combination of the semantics of the tokens. Hence {a := foo} consists of three tokens, namely {a}, {:=}, and {foo}. The parsing of the string depends on the syntax of the language. The part of the kernel that does the parsing is the "tokenizer". Yacas can parse its own syntax (the default tokenizer) or it can be instructed to parse XML or C++ syntax using the directives {DefaultTokenizer} or {XmlTokenizer}. Setting a tokenizer is a global action that affects all {ReadToken} calls.
- Example
In> FromString("a := Sin(x)") While \
((tok := ReadToken()) != EndOfFile) \
Echo(tok);
a
:=
Sin
(
x
)
Out> True;
We can read some junk too:
In> FromString("-$3")ReadToken();
Out> -$;
The result is an atom with the string representation {-$}.
Yacas assumes that {-$} is an operator symbol yet to be defined.
The "{3}" will be in the next token.
(The results will be different if a non-default tokenizer is selected.)
FromFile
, FromString
, Read
, LispRead
, DefaultTokenizer
Load(name)
evaluate all expressions in a file
- param name
string, name of the file to load
The file "name" is opened. All expressions in the file are read and evaluated. {Load} always returns {true}.
Use
, DefLoad
, DefaultDirectory
, FindFile
Use(name)
load a file, but not twice
- param name
string, name of the file to load
If the file "name" has been loaded before, either by an earlier call to {Use} or via the {DefLoad} mechanism, nothing happens. Otherwise all expressions in the file are read and evaluated. {Use} always returns {true}. The purpose of this function is to make sure that the file will at least have been loaded, but is not loaded twice.
Load
, DefLoad
, DefaultDirectory
DefLoad(name)
load a {.def} file
- param name
string, name of the file (without {.def} suffix)
The suffix {.def} is appended to "name" and the file with this name is loaded. It should contain a list of functions, terminated by a closing brace } (the end-of-list delimiter). This tells the system to load the file "name" as soon as the user calls one of the functions named in the file (if not done so already). This allows for faster startup times, since not all of the rules databases need to be loaded, just the descriptions on which files to load for which functions.
Load
, Use
, DefaultDirectory
FindFile(name)
find a file in the current path
- param name
string, name of the file or directory to find
The result of this command is the full path to the file that would be opened when the command {Load(name)} would be invoked. This means that the input directories are subsequently searched for a file called "name". If such a file is not found, {FindFile} returns an empty string. {FindFile("")} returns the name of the default directory (the first one on the search path).
Load
, DefaultDirectory
PatchLoad(name)
execute commands between {<?} and {?>} in file
- param name
string, name of the file to "patch"
{PatchLoad} loads in a file and outputs the contents to the current output. The file can contain blocks delimited by {<?} and {?>} (meaning "Yacas Begin" and "Yacas End"). The piece of text between such delimiters is treated as a separate file with Yacas instructions, which is then loaded and executed. All output of write statements in that block will be written to the same current output. This is similar to the way PHP works. You can have a static text file with dynamic content generated by Yacas.
PatchString
, Load
Nl()
the newline character
This function returns a string with one element in it, namely a newline character. This may be useful for building strings to send to some output in the end. Note that the second letter in the name of this command is a lower case {L} (from "line").
- Example
In> WriteString("First line" : Nl() : "Second line" : Nl());
First line
Second line
Out> True;
NewLine
V(expression)
set verbose output mode
- param expression
expression to be evaluated in verbose mode
The function {V(expression)} will evaluate the expression in verbose mode. Various parts of Yacas can show extra information about the work done while doing a calculation when using {V}. In verbose mode, {InVerboseMode()} will return True
, otherwise it will return False
.
- Example
In> OldSolve({x+2==0},{x})
Out> {{-2}};
In> V(OldSolve({x+2==0},{x}))
Entering OldSolve
From x+2==0 it follows that x = -2
x+2==0 simplifies to True
Leaving OldSolve
Out> {{-2}};
In> InVerboseMode()
Out> False
In> V(InVerboseMode())
Out> True
Echo
, N
, OldSolve
, InVerboseMode
InVerboseMode()
check for verbose output mode
In verbose mode, {InVerboseMode()} will return True
, otherwise it will return False
.
- Example
In> InVerboseMode()
Out> False
In> V(InVerboseMode())
Out> True
Echo
, N
, OldSolve
, V
Plot2D(f(x))
adaptive two-dimensional plotting
- param f(x)
unevaluated expression containing one variables (function to be plotted)
- param list
list of functions to plot
- param a}, {b
numbers, plotting range in the
$x$ coordinate- param option
atom, option name
- param value
atom, number or string (value of option)
The routine {Plot2D} performs adaptive plotting of one or several functions of one variable in the specified range. The result is presented as a line given by the equation True
on using {V()}. The current algorithm uses Newton-Cotes quadratures and some heuristics for error estimation (see <yacasdoc://Algo/3/1/>). The initial grid of {points+1} points is refined between any grid points
- {yrange}: the range of ordinates to use for plotting, e.g. {yrange=0:20}. If no range is specified, the default is usually to leave the choice to the plotting backend.
- {points}: initial number of points (default 23) -- at least that many points will be plotted. The initial grid of this many points will be adaptively refined.
- {precision}: graphing precision (default $10^(-6)$). This is interpreted as the relative precision of computing the integral of
$f(x)-Min(f(x))$ using the grid points. For a smooth, non-oscillating function this value should be roughly 1/(number of screen pixels in the plot). - {depth}: max. refinement depth, logarithmic (default 5) -- means there will be at most
$2^depth$ extra points per initial grid point. - {output}: name of the plotting backend. Supported names: {data} (default). The {data} backend will return the data as a list of pairs such as {{{x1,y1}, {x2,y2}, ...}}.
- {filename}: specify name of the created data file. For example: {filename="data1.txt"}. The default is the name {"output.data"}. Note that if several functions are plotted, the data files will have a number appended to the given name, for example {data.txt1}, {data.txt2}.
Other options may be supported in the future.
The current implementation can deal with a singularity within the plotting range only if the function {f(x)} returns {Infinity}, {-Infinity} or {Undefined} at the singularity. If the function {f(x)} generates a numerical error and fails at a singularity, {Plot2D} will fail if one of the grid points falls on the singularity. (All grid points are generated by bisection so in principle the endpoints and the {points} parameter could be chosen to avoid numerical singularities.)
V
, NFunction
, Plot3DS
Plot3DS(f(x,y))
three-dimensional (surface) plotting
- param f(x,y)
unevaluated expression containing two variables (function to be plotted)
- param list
list of functions to plot
- param a}, {b}, {c}, {d
numbers, plotting ranges in the
$x$ and$y$ coordinates- param option
atom, option name
- param value
atom, number or string (value of option)
The routine {Plot3DS} performs adaptive plotting of a function of two variables in the specified ranges. The result is presented as a surface given by the equation True
on using {V()}. The current algorithm uses Newton-Cotes cubatures and some heuristics for error estimation (see <yacasdoc://Algo/3/1/>). The initial rectangular grid of {xpoints+1}*{ypoints+1} points is refined within any rectangle where the integral of
- {xrange}, {yrange}: optionally override coordinate ranges. Note that {xrange} is always the first variable and {yrange} the second variable, regardless of the actual variable names.
- {zrange}: the range of the
$z$ axis to use for plotting, e.g. {zrange=0:20}. If no range is specified, the default is usually to leave the choice to the plotting backend. Automatic choice based on actual values may give visually inadequate plots if the function has a singularity. - {points}, {xpoints}, {ypoints}: initial number of points (default 10 each) -- at least that many points will be plotted in each coordinate. The initial grid of this many points will be adaptively refined. If {points} is specified, it serves as a default for both {xpoints} and {ypoints}; this value may be overridden by {xpoints} and {ypoints} values.
- {precision}: graphing precision (default
$0.01$ ). This is interpreted as the relative precision of computing the integral of$f(x,y)-Min(f(x,y))$ using the grid points. For a smooth, non-oscillating function this value should be roughly 1/(number of screen pixels in the plot). - {depth}: max. refinement depth, logarithmic (default 3) -- means there will be at most
$2^depth$ extra points per initial grid point (in each coordinate). - {output}: name of the plotting backend. Supported names: {data} (default). The {data} backend will return the data as a list of triples such as {{{x1, y1, z1}, {x2, y2, z2}, ...}}.
Other options may be supported in the future.
The current implementation can deal with a singularity within the plotting range only if the function {f(x,y)} returns {Infinity}, {-Infinity} or {Undefined} at the singularity. If the function {f(x,y)} generates a numerical error and fails at a singularity, {Plot3DS} will fail only if one of the grid points falls on the singularity. (All grid points are generated by bisection so in principle the endpoints and the {xpoints}, {ypoints} parameters could be chosen to avoid numerical singularities.)
The {filename} option is optional if using graphical backends, but can be used to specify the location of the created data file.
- Example
In> Plot3DS(a*b^2)
Out> True;
In> V(Plot3DS(Sin(x)*Cos(y),x=0:20, y=0:20,depth=3))
CachedConstant: Info: constant Pi is being
recalculated at precision 10
CachedConstant: Info: constant Pi is being
recalculated at precision 11
Plot3DS: using 1699 points for function Sin(x)*Cos(y)
Plot3DS: max. used 8 subdivisions for Sin(x)*Cos(y)
Plot3DS'datafile: created file '/tmp/plot.tmp/data1'
Out> True;
V
, NFunction
, Plot2D
XmlExplodeTag(xmltext)
convert XML strings to tag objects
- param xmltext
string containing some XML tokens
{XmlExplodeTag} parses the first XML token in {xmltext} and returns a Yacas expression. The following subset of XML syntax is supported currently:
- {<TAG [options]>} -- an opening tag
- {</TAG [options]>} -- a closing tag
- {<TAG [options] />} -- an open/close tag
- plain (non-tag) text
The tag options take the form {paramname="value"}.
If given an XML tag, {XmlExplodeTag} returns a structure of the form {XmlTag(name,params,type)}. In the returned object, {name} is the (capitalized) tag name, {params} is an assoc list with the options (key fields capitalized), and type can be either "Open", "Close" or "OpenClose".
If given a plain text string, the same string is returned.
- Example
In> XmlExplodeTag("some plain text")
Out> "some plain text";
In> XmlExplodeTag("<a name=\"blah blah\"
align=\"left\">")
Out> XmlTag("A",{{"ALIGN","left"},
{"NAME","blah blah"}},"Open");
In> XmlExplodeTag("</p>")
Out> XmlTag("P",{},"Close");
In> XmlExplodeTag("<br/>")
Out> XmlTag("BR",{},"OpenClose");
XmlTokenizer
XmlTokenizer()
select the default syntax tokenizer for parsing the input
A "tokenizer" is an internal routine in the kernel that parses the input into Yacas expressions. This affects all input typed in by a user at the prompt and also the input redirected from files or strings using {FromFile} and {FromString} and read using {Read} or {ReadToken}. The Yacas environment currently supports some experimental tokenizers for various syntaxes. {DefaultTokenizer} switches to the tokenizer used for default Yacas syntax. {XmlTokenizer} switches to an XML syntax. Note that setting the tokenizer is a global side effect. One typically needs to switch back to the default tokenizer when finished reading the special syntax. Care needs to be taken when kernel errors are raised during a non-default tokenizer operation (as with any global change in the environment). Errors need to be caught with the {TrapError} function. The error handler code should re-instate the default tokenizer, or else the user will be unable to continue the session (everything a user types will be parsed using a non-default tokenizer). When reading XML syntax, the supported formats are the same as those of {XmlExplodeTag}. The parser does not validate anything in the XML input. After an XML token has been read in, it can be converted into an Yacas expression with {XmlExplodeTag}. Note that when reading XML, any plain text between tags is returned as one token. Any malformed XML will be treated as plain text.
- Example
In> [XmlTokenizer(); q:=ReadToken(); \
DefaultTokenizer();q;]
<a>
Out> <a>;
Note that:
- after switching to {XmlTokenizer} the {In>} prompt disappeared; the user typed {<a>} and the {Out>} prompt with the resulting expression appeared.
- The resulting expression is an atom with the string representation {<a>}; it is <i>not</i> a string.
OMRead
, TrapError
, XmlExplodeTag
, ReadToken
, FromFile
, FromString
DefaultTokenizer()
select the default syntax tokenizer for parsing the input
A "tokenizer" is an internal routine in the kernel that parses the input into Yacas expressions. This affects all input typed in by a user at the prompt and also the input redirected from files or strings using {FromFile} and {FromString} and read using {Read} or {ReadToken}. The Yacas environment currently supports some experimental tokenizers for various syntaxes. {DefaultTokenizer} switches to the tokenizer used for default Yacas syntax. {XmlTokenizer} switches to an XML syntax. Note that setting the tokenizer is a global side effect. One typically needs to switch back to the default tokenizer when finished reading the special syntax. Care needs to be taken when kernel errors are raised during a non-default tokenizer operation (as with any global change in the environment). Errors need to be caught with the {TrapError} function. The error handler code should re-instate the default tokenizer, or else the user will be unable to continue the session (everything a user types will be parsed using a non-default tokenizer). When reading XML syntax, the supported formats are the same as those of {XmlExplodeTag}. The parser does not validate anything in the XML input. After an XML token has been read in, it can be converted into an Yacas expression with {XmlExplodeTag}. Note that when reading XML, any plain text between tags is returned as one token. Any malformed XML will be treated as plain text.
OMRead
, TrapError
, XmlExplodeTag
, ReadToken
, FromFile
, FromString
OMForm(expression)
convert Yacas expression to OpenMath
- param expression
expression to convert
{OMForm} prints an OpenMath representation of the input parameter {expression} to standard output. If a Yacas symbol does not have a mapping defined by {OMDef}, it is translated to and from OpenMath as the OpenMath symbol in the CD "yacas" with the same name as it has in Yacas.
- Example
In> str:=ToString()OMForm(2+Sin(a*3))
Out> "<OMOBJ>
<OMA>
<OMS cd="arith1" name="plus"/>
<OMI>2</OMI>
<OMA>
<OMS cd="transc1" name="sin"/>
<OMA>
<OMS cd="arith1" name="times"/>
<OMV name="a"/>
<OMI>3</OMI>
</OMA>
</OMA>
</OMA>
</OMOBJ>
";
In> FromString(str)OMRead()
Out> 2+Sin(a*3);
In> OMForm(NotDefinedInOpenMath(2+3))
<OMOBJ>
<OMA>
<OMS cd="yacas" name="NotDefinedInOpenMath"/>
<OMA>
<OMS cd="arith1" name="plus"/>
<OMI>2</OMI>
<OMI>3</OMI>
</OMA>
</OMA>
</OMOBJ>
Out> True
XmlTokenizer
, XmlExplodeTag
, OMDef
OMRead()
read OpenMath expression and convert to Yacas
- param expression
expression to convert
{OMRead} reads an OpenMath expression from standard input and returns a normal Yacas expression that matches the input OpenMath expression. If a Yacas symbol does not have a mapping defined by {OMDef}, it is translated to and from OpenMath as the OpenMath symbol in the CD "yacas" with the same name as it has in Yacas.
- Example
In> str:=ToString()OMForm(2+Sin(a*3))
Out> "<OMOBJ>
<OMA>
<OMS cd="arith1" name="plus"/>
<OMI>2</OMI>
<OMA>
<OMS cd="transc1" name="sin"/>
<OMA>
<OMS cd="arith1" name="times"/>
<OMV name="a"/>
<OMI>3</OMI>
</OMA>
</OMA>
</OMA>
</OMOBJ>
";
In> FromString(str)OMRead()
Out> 2+Sin(a*3);
XmlTokenizer
, XmlExplodeTag
, OMDef
OMDef(yacasForm, cd, name)
define translations from Yacas to OpenMath and vice-versa.
- param yacasForm
string with the name of a Yacas symbol, or a Yacas expression
- param cd
OpenMath Content Dictionary for the symbol
- param name
OpenMath name for the symbol
- param yacasToOM
rule for translating an application of that symbol in Yacas into an OpenMath expression
- param omToYacas
rule for translating an OpenMath expression into an application of this symbol in Yacas
{OMDef} defines the translation rules for symbols between the Yacas representation and {OpenMath}. The first parameter, {yacasForm}, can be a string or an expression. The difference is that when giving an expression only the {omToYacas} translation is defined, and it uses the exact expression given. This is used for {OpenMath} symbols that must be translated into a whole subexpression in Yacas, such as {set1:emptyset} which gets translated to an empty list as follows: In> OMDef( {}, "set1","emptyset" ) Out> True In> FromString("<OMOBJ><OMS cd="set1" name="emptyset"/></OMOBJ> ")OMRead() Out> {} In> IsList(%) Out> True Otherwise, a symbol that is not inside an application (OMA) gets translated to the Yacas atom with the given name: In> OMDef( "EmptySet", "set1","emptyset" ) Warning: the mapping for set1:emptyset was already defined as {} , but is redefined now as EmptySet Out> True In> FromString("<OMOBJ><OMS cd="set1" name="emptyset"/></OMOBJ> ")OMRead() Out> EmptySet The definitions for the symbols in the Yacas library are in the *.rep
script subdirectories. In those modules for which the mappings are defined, there is a file called {om.ys} that contains the {OMDef} calls. Those files are loaded in {openmath.rep/om.ys}, so any new file must be added to the list there, at the end of the file. A rule is represented as a list of expressions. Since both OM and Yacas expressions are actually lists, the syntax is the same in both directions. There are two template forms that are expanded before the translation:
- {$}: this symbol stands for the translation of the symbol applied in the original expression.
- {_path}: a path into the original expression (list) to extract an element, written as an underscore applied to an integer or a list of integers. Those integers are indexes into expressions, and integers in a list are applied recursively starting at the original expression. For example, {_2} means the second parameter of the expression, while {_{3,2,1}} means the first parameter of the second parameter of the third parameter of the original expression.
They can appear anywhere in the rule as expressions or subexpressions.
Finally, several alternative rules can be specified by joining them with the {|} symbol, and each of them can be annotated with a post-predicate applied with the underscore {_} symbol, in the style of Yacas' simplification rules. Only the first alternative rule that matches is applied, so the more specific rules must be written first.
There are special symbols recognized by {OMForm} to output {OpenMath} constructs that have no specific parallel in Yacas, such as an OpenMath symbol having a {CD} and {name}: Yacas symbols have only a name. Those special symbols are:
- {OMS(cd, name)}: {<OMS cd="cd" name="name">}
- {OMA(f x y ...)}: {<OMA>f x y ...</OMA>}
- {OMBIND(binderSymbol, bvars, expression)}: {<OMBIND>binderSymbol bvars expression</OMBIND>}, where {bvars} must be produced by using {OMBVAR(...)}.
- {OMBVAR(x y ...)}: {<OMBVAR>x y ...</OMBVAR>}
- {OME(...)}: {<OME>...</OME>}
When translating from OpenMath to Yacas, we just store unknown symbols as {OMS("cd", "name")}. This way we don't have to bother defining bogus symbols for concepts that Yacas does not handle, and we can evaluate expressions that contain them.
- Example
In> OMDef( "Sqrt" , "arith1", "root", { $, _1, 2 }, $(_1)_(_2=2) | (_1^(1/_2)) );
Out> True
In> OMForm(Sqrt(3))
<OMOBJ>
<OMA>
<OMS cd="arith1" name="root"/>
<OMI>3</OMI>
<OMI>2</OMI>
</OMA>
</OMOBJ>
Out> True
In> FromString("<OMOBJ><OMA><OMS cd=\"arith1\" name=\"root\"/><OMI>16</OMI><OMI>2</OMI></OMA></OMOBJ> ")OMRead()
Out> Sqrt(16)
In> FromString("<OMOBJ><OMA><OMS cd=\"arith1\" name=\"root\"/><OMI>16</OMI><OMI>3</OMI></OMA></OMOBJ> ")OMRead()
Out> 16^(1/3)
In> OMDef("Limit", "limit1", "limit", \
{ $, _2, OMS("limit1", "under"), OMBIND(OMS("fns1", "lambda"), OMBVAR(_1), _4) }_(_3=Left) \
|{ $, _2, OMS("limit1", "above"), OMBIND(OMS("fns1", "lambda"), OMBVAR(_1), _4) }_(_3=Right) \
|{ $, _2, OMS("limit1", "both_sides"), OMBIND(OMS("fns1", "lambda"), OMBVAR(_1), _3) }, \
{ $, _{3,2,1}, _1, Left, _{3,3}}_(_2=OMS("limit1", "below")) \
|{$, _{3,2,1}, _1, Right, _{3,3}}_(_2=OMS("limit1", "above")) \
|{$, _{3,2,1}, _1, _{3,3}} \
);
In> OMForm(Limit(x,0) Sin(x)/x)
<OMOBJ>
<OMA>
<OMS cd="limit1" name="limit"/>
<OMI>0</OMI>
<OMS cd="limit1" name="both_sides"/>
<OMBIND>
<OMS cd="fns1" name="lambda"/>
<OMBVAR>
<OMV name="x"/>
</OMBVAR>
<OMA>
<OMS cd="arith1" name="divide"/>
<OMA>
<OMS cd="transc1" name="sin"/>
<OMV name="x"/>
</OMA>
<OMV name="x"/>
</OMA>
</OMBIND>
</OMA>
</OMOBJ>
Out> True
In> OMForm(Limit(x,0,Right) 1/x)
<OMOBJ>
<OMA>
<OMS cd="limit1" name="limit"/>
<OMI>0</OMI>
<OMS cd="limit1" name="above"/>
<OMBIND>
<OMS cd="fns1" name="lambda"/>
<OMBVAR>
<OMV name="x"/>
</OMBVAR>
<OMA>
<OMS cd="arith1" name="divide"/>
<OMI>1</OMI>
<OMV name="x"/>
</OMA>
</OMBIND>
</OMA>
</OMOBJ>
Out> True
In> FromString(ToString()OMForm(Limit(x,0,Right) 1/x))OMRead()
Out> Limit(x,0,Right)1/x
In> %
Out> Infinity
OMRead
, OMForm