libSBML C++ API
5.20.2
|
Macros | |
#define | YYBISON 1 |
#define | YYBISON_VERSION "3.5.1" |
#define | YYPULL 1 |
#define | YYPURE 0 |
#define | YYPUSH 0 |
#define | YYSKELETON_NAME "yacc.c" |
Functions | |
L3ParserSettings_t * | SBML_getDefaultL3ParserSettings () |
Returns a copy of the default Level 3 ("L3") formula parser settings. More... | |
char * | SBML_getLastParseL3Error () |
Returns the last error reported by the "L3" mathematical formula parser. More... | |
ASTNode_t * | SBML_parseL3Formula (const char *formula) |
Parses a text string as a mathematical formula and returns an AST representation of it. More... | |
ASTNode_t * | SBML_parseL3FormulaWithModel (const char *formula, const Model_t *model) |
Parses a text string as a mathematical formula using a Model to resolve symbols, and returns an AST representation of the result. More... | |
ASTNode_t * | SBML_parseL3FormulaWithSettings (const char *formula, const L3ParserSettings_t *settings) |
Parses a text string as a mathematical formula using specific parser settings and returns an AST representation of the result. More... | |
#define YYBISON 1 |
#define YYBISON_VERSION "3.5.1" |
#define YYPULL 1 |
#define YYPURE 0 |
#define YYPUSH 0 |
#define YYSKELETON_NAME "yacc.c" |
L3ParserSettings_t* SBML_getDefaultL3ParserSettings | ( | ) |
Returns a copy of the default Level 3 ("L3") formula parser settings.
The data structure storing the settings allows callers to change the following parsing behaviors:
The following lists the main differences in the formula syntax supported by the Level 3 ("L3") versions of the formula parsers and formatters, compared to what is supported by the Level 1-oriented SBML_parseFormula() and SBML_formulaToString():
SId
in the SBML specifications). The whitespace between number and unit is optional.&&
(and), ||
(or), !
(not), and !=
(not equals) may be used.%
and will produce a <piecewise>
function in the corresponding MathML output by default, or can produce the MathML function rem
, depending on the L3ParserSettings object (see L3ParserSettings_setParseModuloL3v2() ).arc
as a prefix or simply a
; in other words, both arccsc
and acsc
are interpreted as the operator arccosecant as defined in MathML 2.0. (Many functions in the simpler SBML Level 1 oriented parser implemented by SBML_parseFormula() are defined this way as well, but not all.)(integer/integer)Spaces are not allowed in this construct; in other words, "
(3 / 4)
" (with whitespace between the numbers and the operator) will be parsed into the MathML <divide>
construct rather than a rational number. You can, however, assign units to a rational number as a whole; here is an example: "(3/4) ml
". (In the case of division rather than a rational number, units are not interpreted in this way.)The function log
with a single argument ("log(x)
") can be parsed as log10(x)
, ln(x)
, or treated as an error, as desired.
Unary minus signs can be collapsed or preserved; that is, sequential pairs of unary minuses (e.g., "- -3
") can be removed from the input entirely and single unary minuses can be incorporated into the number node, or all minuses can be preserved in the AST node structure.
Parsing of units embedded in the input string can be turned on and off.
The string avogadro
can be parsed as a MathML csymbol or as an identifier.
The string % can be parsed either as a piecewise function or as the 'rem' function: a % b
will either become
piecewise(a - b*ceil(a/b), xor((a < 0), (b < 0)), a - b*floor(a/b))
or
rem(a, b)
.
The latter is simpler, but the rem
MathML is only allowed as of SBML Level 3 Version 2.
A Model object may optionally be provided to the parser using the variant function call SBML_parseL3FormulaWithModel() or stored in a L3ParserSettings object passed to the variant function SBML_parseL3FormulaWithSettings(). When a Model object is provided, identifiers (values of type SId
) from that model are used in preference to pre-defined MathML definitions for both symbols and functions. More precisely:
In the case of symbols: the Model entities whose identifiers will shadow identical symbols in the mathematical formula are: Species, Compartment, Parameter, Reaction, and SpeciesReference. For instance, if the parser is given a Model containing a Species with the identifier "pi
", and the formula to be parsed is "3*pi
", the MathML produced will contain the construct <ci> pi </ci>
instead of the construct <pi/>
.
SId
values of user-defined functions present in the model will be used preferentially over pre-defined MathML functions. For example, if the passed-in Model contains a FunctionDefinition object with the identifier "sin
", that function will be used instead of the predefined MathML function <sin/>
. These configuration settings cannot be changed directly using the basic parser and formatter functions, but can be changed on a per-call basis by using the alternative functions SBML_parseL3FormulaWithSettings() and SBML_formulaToL3StringWithSettings().
Neither SBML nor the MathML standard define a "string-form" equivalent to MathML expressions. The approach taken by libSBML is to start with the formula syntax defined by SBML Level 1 (which in fact used a custom text-string representation of formulas, and not MathML), and expand it to include the functionality described above. This formula syntax is based mostly on C programming syntax, and may contain operators, function calls, symbols, and white space characters. The following table provides the precedence rules for the different entities that may appear in formula strings.
Token | Operation | Class | Preced. | Assoc. |
---|---|---|---|---|
name | symbol reference | operand | 8 | n/a |
( expression) | expression grouping | operand | 8 | n/a |
f( ...) | function call | prefix | 8 | left |
^ | power | binary | 7 | left |
-, ! | negation, Boolean 'not' | unary | 6 | right |
*, /, % | multip., div., modulo | binary | 5 | left |
+, - | addition and subtraction | binary | 4 | left |
==, <, >, <=, >=, != | Boolean comparisons | binary | 3 | left |
&&, || | Boolean 'and' and 'or' | binary | 2 | left |
, | argument delimiter | binary | 1 | left |
In the table above, operand implies the construct is an operand, prefix implies the operation is applied to the following arguments, unary implies there is one argument, and binary implies there are two arguments. The values in the Precedence column show how the order of different types of operation are determined. For example, the expression a + b * c
is evaluated as a + (b * c)
because the *
operator has higher precedence. The Associates column shows how the order of similar precedence operations is determined; for example, a && b || c
is evaluated as (a && b) || c
because the &&
and ||
operators are left-associative and have the same precedence.
The function call syntax consists of a function name, followed by optional white space, followed by an opening parenthesis token, followed by a sequence of zero or more arguments separated by commas (with each comma optionally preceded and/or followed by zero or more white space characters), followed by a closing parenthesis token. The function name must be chosen from one of the pre-defined functions in SBML or a user-defined function in the model. The following table lists the names of certain common mathematical functions; this table corresponds to Table 6 in the SBML Level 1 Version 2 specification with additions based on the functions added in SBML Level 2 and Level 3:
Name | Argument(s) | Formula or meaning | Argument Constraints | Result constraints |
---|---|---|---|---|
abs |
x | Absolute value of x. | ||
acos , arccos |
x | Arccosine of x in radians. | –1.0 ≤ x ≤ 1.0 | 0 ≤ acos(x) ≤ π |
acosh , arccosh |
x | Hyperbolic arccosine of x in radians. | ||
acot , arccot |
x | Arccotangent of x in radians. | ||
acoth , arccoth |
x | Hyperbolic arccotangent of x in radians. | ||
acsc , arccsc |
x | Arccosecant of x in radians. | ||
acsch , arccsch |
x | Hyperbolic arccosecant of x in radians. | ||
asec , arcsec |
x | Arcsecant of x in radians. | ||
asech , arcsech |
x | Hyperbolic arcsecant of x in radians. | ||
asin , arcsin |
x | Arcsine of x in radians. | –1.0 ≤ x ≤ 1.0 | 0 ≤ asin(x) ≤ π |
atan , arctan |
x | Arctangent of x in radians. | 0 ≤ atan(x) ≤ π | |
atanh , arctanh |
x | Hyperbolic arctangent of x in radians. | ||
ceil , ceiling |
x | Smallest number not less than x whose value is an exact integer. | ||
cos |
x | Cosine of x | ||
cosh |
x | Hyperbolic cosine of x. | ||
cot |
x | Cotangent of x. | ||
coth |
x | Hyperbolic cotangent of x. | ||
csc |
x | Cosecant of x. | ||
csch |
x | Hyperbolic cosecant of x. | ||
delay |
x, y | The value of x at y time units in the past. | ||
factorial |
n | The factorial of n. Factorials are defined by n! = n*(n–1)* ... * 1. | n must be an integer. | |
exp |
x | e x, where e is the base of the natural logarithm. | ||
floor |
x | The largest number not greater than x whose value is an exact integer. | ||
ln |
x | Natural logarithm of x. | x > 0 | |
log |
x | By default, the base 10 logarithm of x, but can be set to be the natural logarithm of x, or to be an illegal construct. | x > 0 | |
log |
x, y | The base x logarithm of y. | y > 0 | |
log10 |
x | Base 10 logarithm of x. | x > 0 | |
piecewise |
x1, y1, [x2, y2,] [...] [z] | A piecewise function: if (y1), x1. Otherwise, if (y2), x2, etc. Otherwise, z. | y1, y2, y3 [etc] must be Boolean | |
pow , power |
x, y | x y. | ||
root |
b, x | The root base b of x. | ||
sec |
x | Secant of x. | ||
sech |
x | Hyperbolic secant of x. | ||
sqr |
x | x2. | ||
sqrt |
x | √x. | x > 0 | sqrt(x) ≥ 0 |
sin |
x | Sine of x. | ||
sinh |
x | Hyperbolic sine of x. | ||
tan |
x | Tangent of x. | x ≠ n*π/2, for odd integer n | |
tanh |
x | Hyperbolic tangent of x. | ||
and |
x, y, z... | Boolean and(x, y, z...): returns true if all of its arguments are true. Note that and is an n-ary function, taking 0 or more arguments, and that and() returns true . |
All arguments must be Boolean | |
not |
x | Boolean not(x) | x must be Boolean | |
or |
x, y, z... | Boolean or(x, y, z...): returns true if at least one of its arguments is true. Note that or is an n-ary function, taking 0 or more arguments, and that or() returns false . |
All arguments must be Boolean | |
xor |
x, y, z... | Boolean xor(x, y, z...): returns true if an odd number of its arguments is true. Note that xor is an n-ary function, taking 0 or more arguments, and that xor() returns false . |
All arguments must be Boolean | |
eq |
x, y, z... | Boolean eq(x, y, z...): returns true if all arguments are equal. Note that eq is an n-ary function, but must take 2 or more arguments. |
||
geq |
x, y, z... | Boolean geq(x, y, z...): returns true if each argument is greater than or equal to the argument following it. Note that geq is an n-ary function, but must take 2 or more arguments. |
||
gt |
x, y, z... | Boolean gt(x, y, z...): returns true if each argument is greater than the argument following it. Note that gt is an n-ary function, but must take 2 or more arguments. |
||
leq |
x, y, z... | Boolean leq(x, y, z...): returns true if each argument is less than or equal to the argument following it. Note that leq is an n-ary function, but must take 2 or more arguments. |
||
lt |
x, y, z... | Boolean lt(x, y, z...): returns true if each argument is less than the argument following it. Note that lt is an n-ary function, but must take 2 or more arguments. |
||
neq |
x, y | Boolean x != y: returns true unless x and y are equal. |
||
plus |
x, y, z... | x + y + z + ...: The sum of the arguments of the function. Note that plus is an n-ary function taking 0 or more arguments, and that plus() returns 0 . |
||
times |
x, y, z... | x * y * z * ...: The product of the arguments of the function. Note that times is an n-ary function taking 0 or more arguments, and that times() returns 1 . |
||
minus |
x, y | x – y. | ||
divide |
x, y | x / y. |
Parsing of the various MathML functions and constants are all case-insensitive by default: function names such as cos
, Cos
and COS
are all parsed as the MathML cosine operator, <cos>
. However, when a Model object is used in conjunction with either SBML_parseL3FormulaWithModel() or SBML_parseL3FormulaWithSettings(), any identifiers found in that model will be parsed in a case-sensitive way. For example, if a model contains a Species having the identifier Pi
, the parser will parse "Pi
" in the input as "<ci> Pi </ci>
" but will continue to parse the symbols "pi
" and "PI
" as "<pi>
".
As mentioned above, the manner in which the "L3" versions of the formula parser and formatter interpret the function "log
" can be changed. To do so, callers should use the function SBML_parseL3FormulaWithSettings() and pass it an appropriate L3ParserSettings object. By default, unlike the SBML Level 1 parser implemented by SBML_parseFormula(), the string "log
" is interpreted as the base 10 logarithm, and not as the natural logarithm. However, you can change the interpretation to be base-10 log, natural log, or as an error; since the name "log" by itself is ambiguous, you require that the parser uses log10
or ln
instead, which are more clear. Please refer to SBML_parseL3FormulaWithSettings().
In addition, the following symbols will be translated to their MathML equivalents, if no symbol with the same SId
identifier string exists in the Model object provided:
Name | Meaning | MathML |
---|---|---|
true |
Boolean value true |
<true/> |
false |
Boolean value false |
<false/> |
pi |
Mathematical constant pi | <pi/> |
avogadro |
Value of Avogadro's constant stipulated by SBML | <csymbol encoding="text" definitionURL="http://www.sbml.org/sbml/symbols/avogadro"> avogadro </csymbol/> |
time |
Simulation time as defined in SBML | <csymbol encoding="text" definitionURL="http://www.sbml.org/sbml/symbols/time"> time </csymbol/> |
inf , infinity |
Mathematical constant "infinity" | <infinity/> |
nan , notanumber |
Mathematical concept "not a number" | <notanumber/> |
Again, as mentioned above, whether the string "avogadro
" is parsed as an AST node of type AST_NAME_AVOGADRO or AST_NAME is configurable; use the version of the parser function called SBML_parseL3FormulaWithSettings(). This Avogadro-related functionality is provided because SBML Level 2 models may not use AST_NAME_AVOGADRO AST nodes.
For more details about the parser, please see the definition of L3ParserSettings and SBML_parseL3Formula().
char* SBML_getLastParseL3Error | ( | ) |
Returns the last error reported by the "L3" mathematical formula parser.
If the functions SBML_parseL3Formula(), SBML_parseL3FormulaWithSettings(), or SBML_parseL3FormulaWithModel() return NULL
, an error is set internally. This function allows callers to retrieve information about the error.
ASTNode_t* SBML_parseL3Formula | ( | const char * | formula | ) |
Parses a text string as a mathematical formula and returns an AST representation of it.
The following lists the main differences in the formula syntax supported by the Level 3 ("L3") versions of the formula parsers and formatters, compared to what is supported by the Level 1-oriented SBML_parseFormula() and SBML_formulaToString():
SId
in the SBML specifications). The whitespace between number and unit is optional.&&
(and), ||
(or), !
(not), and !=
(not equals) may be used.%
and will produce a <piecewise>
function in the corresponding MathML output by default, or can produce the MathML function rem
, depending on the L3ParserSettings object (see L3ParserSettings_setParseModuloL3v2() ).arc
as a prefix or simply a
; in other words, both arccsc
and acsc
are interpreted as the operator arccosecant as defined in MathML 2.0. (Many functions in the simpler SBML Level 1 oriented parser implemented by SBML_parseFormula() are defined this way as well, but not all.)(integer/integer)Spaces are not allowed in this construct; in other words, "
(3 / 4)
" (with whitespace between the numbers and the operator) will be parsed into the MathML <divide>
construct rather than a rational number. You can, however, assign units to a rational number as a whole; here is an example: "(3/4) ml
". (In the case of division rather than a rational number, units are not interpreted in this way.)The function log
with a single argument ("log(x)
") can be parsed as log10(x)
, ln(x)
, or treated as an error, as desired.
Unary minus signs can be collapsed or preserved; that is, sequential pairs of unary minuses (e.g., "- -3
") can be removed from the input entirely and single unary minuses can be incorporated into the number node, or all minuses can be preserved in the AST node structure.
Parsing of units embedded in the input string can be turned on and off.
The string avogadro
can be parsed as a MathML csymbol or as an identifier.
The string % can be parsed either as a piecewise function or as the 'rem' function: a % b
will either become
piecewise(a - b*ceil(a/b), xor((a < 0), (b < 0)), a - b*floor(a/b))
or
rem(a, b)
.
The latter is simpler, but the rem
MathML is only allowed as of SBML Level 3 Version 2.
A Model object may optionally be provided to the parser using the variant function call SBML_parseL3FormulaWithModel() or stored in a L3ParserSettings object passed to the variant function SBML_parseL3FormulaWithSettings(). When a Model object is provided, identifiers (values of type SId
) from that model are used in preference to pre-defined MathML definitions for both symbols and functions. More precisely:
In the case of symbols: the Model entities whose identifiers will shadow identical symbols in the mathematical formula are: Species, Compartment, Parameter, Reaction, and SpeciesReference. For instance, if the parser is given a Model containing a Species with the identifier "pi
", and the formula to be parsed is "3*pi
", the MathML produced will contain the construct <ci> pi </ci>
instead of the construct <pi/>
.
SId
values of user-defined functions present in the model will be used preferentially over pre-defined MathML functions. For example, if the passed-in Model contains a FunctionDefinition object with the identifier "sin
", that function will be used instead of the predefined MathML function <sin/>
. These configuration settings cannot be changed directly using the basic parser and formatter functions, but can be changed on a per-call basis by using the alternative functions SBML_parseL3FormulaWithSettings() and SBML_formulaToL3StringWithSettings().
Neither SBML nor the MathML standard define a "string-form" equivalent to MathML expressions. The approach taken by libSBML is to start with the formula syntax defined by SBML Level 1 (which in fact used a custom text-string representation of formulas, and not MathML), and expand it to include the functionality described above. This formula syntax is based mostly on C programming syntax, and may contain operators, function calls, symbols, and white space characters. The following table provides the precedence rules for the different entities that may appear in formula strings.
Token | Operation | Class | Preced. | Assoc. |
---|---|---|---|---|
name | symbol reference | operand | 8 | n/a |
( expression) | expression grouping | operand | 8 | n/a |
f( ...) | function call | prefix | 8 | left |
^ | power | binary | 7 | left |
-, ! | negation, Boolean 'not' | unary | 6 | right |
*, /, % | multip., div., modulo | binary | 5 | left |
+, - | addition and subtraction | binary | 4 | left |
==, <, >, <=, >=, != | Boolean comparisons | binary | 3 | left |
&&, || | Boolean 'and' and 'or' | binary | 2 | left |
, | argument delimiter | binary | 1 | left |
In the table above, operand implies the construct is an operand, prefix implies the operation is applied to the following arguments, unary implies there is one argument, and binary implies there are two arguments. The values in the Precedence column show how the order of different types of operation are determined. For example, the expression a + b * c
is evaluated as a + (b * c)
because the *
operator has higher precedence. The Associates column shows how the order of similar precedence operations is determined; for example, a && b || c
is evaluated as (a && b) || c
because the &&
and ||
operators are left-associative and have the same precedence.
The function call syntax consists of a function name, followed by optional white space, followed by an opening parenthesis token, followed by a sequence of zero or more arguments separated by commas (with each comma optionally preceded and/or followed by zero or more white space characters), followed by a closing parenthesis token. The function name must be chosen from one of the pre-defined functions in SBML or a user-defined function in the model. The following table lists the names of certain common mathematical functions; this table corresponds to Table 6 in the SBML Level 1 Version 2 specification with additions based on the functions added in SBML Level 2 and Level 3:
Name | Argument(s) | Formula or meaning | Argument Constraints | Result constraints |
---|---|---|---|---|
abs |
x | Absolute value of x. | ||
acos , arccos |
x | Arccosine of x in radians. | –1.0 ≤ x ≤ 1.0 | 0 ≤ acos(x) ≤ π |
acosh , arccosh |
x | Hyperbolic arccosine of x in radians. | ||
acot , arccot |
x | Arccotangent of x in radians. | ||
acoth , arccoth |
x | Hyperbolic arccotangent of x in radians. | ||
acsc , arccsc |
x | Arccosecant of x in radians. | ||
acsch , arccsch |
x | Hyperbolic arccosecant of x in radians. | ||
asec , arcsec |
x | Arcsecant of x in radians. | ||
asech , arcsech |
x | Hyperbolic arcsecant of x in radians. | ||
asin , arcsin |
x | Arcsine of x in radians. | –1.0 ≤ x ≤ 1.0 | 0 ≤ asin(x) ≤ π |
atan , arctan |
x | Arctangent of x in radians. | 0 ≤ atan(x) ≤ π | |
atanh , arctanh |
x | Hyperbolic arctangent of x in radians. | ||
ceil , ceiling |
x | Smallest number not less than x whose value is an exact integer. | ||
cos |
x | Cosine of x | ||
cosh |
x | Hyperbolic cosine of x. | ||
cot |
x | Cotangent of x. | ||
coth |
x | Hyperbolic cotangent of x. | ||
csc |
x | Cosecant of x. | ||
csch |
x | Hyperbolic cosecant of x. | ||
delay |
x, y | The value of x at y time units in the past. | ||
factorial |
n | The factorial of n. Factorials are defined by n! = n*(n–1)* ... * 1. | n must be an integer. | |
exp |
x | e x, where e is the base of the natural logarithm. | ||
floor |
x | The largest number not greater than x whose value is an exact integer. | ||
ln |
x | Natural logarithm of x. | x > 0 | |
log |
x | By default, the base 10 logarithm of x, but can be set to be the natural logarithm of x, or to be an illegal construct. | x > 0 | |
log |
x, y | The base x logarithm of y. | y > 0 | |
log10 |
x | Base 10 logarithm of x. | x > 0 | |
piecewise |
x1, y1, [x2, y2,] [...] [z] | A piecewise function: if (y1), x1. Otherwise, if (y2), x2, etc. Otherwise, z. | y1, y2, y3 [etc] must be Boolean | |
pow , power |
x, y | x y. | ||
root |
b, x | The root base b of x. | ||
sec |
x | Secant of x. | ||
sech |
x | Hyperbolic secant of x. | ||
sqr |
x | x2. | ||
sqrt |
x | √x. | x > 0 | sqrt(x) ≥ 0 |
sin |
x | Sine of x. | ||
sinh |
x | Hyperbolic sine of x. | ||
tan |
x | Tangent of x. | x ≠ n*π/2, for odd integer n | |
tanh |
x | Hyperbolic tangent of x. | ||
and |
x, y, z... | Boolean and(x, y, z...): returns true if all of its arguments are true. Note that and is an n-ary function, taking 0 or more arguments, and that and() returns true . |
All arguments must be Boolean | |
not |
x | Boolean not(x) | x must be Boolean | |
or |
x, y, z... | Boolean or(x, y, z...): returns true if at least one of its arguments is true. Note that or is an n-ary function, taking 0 or more arguments, and that or() returns false . |
All arguments must be Boolean | |
xor |
x, y, z... | Boolean xor(x, y, z...): returns true if an odd number of its arguments is true. Note that xor is an n-ary function, taking 0 or more arguments, and that xor() returns false . |
All arguments must be Boolean | |
eq |
x, y, z... | Boolean eq(x, y, z...): returns true if all arguments are equal. Note that eq is an n-ary function, but must take 2 or more arguments. |
||
geq |
x, y, z... | Boolean geq(x, y, z...): returns true if each argument is greater than or equal to the argument following it. Note that geq is an n-ary function, but must take 2 or more arguments. |
||
gt |
x, y, z... | Boolean gt(x, y, z...): returns true if each argument is greater than the argument following it. Note that gt is an n-ary function, but must take 2 or more arguments. |
||
leq |
x, y, z... | Boolean leq(x, y, z...): returns true if each argument is less than or equal to the argument following it. Note that leq is an n-ary function, but must take 2 or more arguments. |
||
lt |
x, y, z... | Boolean lt(x, y, z...): returns true if each argument is less than the argument following it. Note that lt is an n-ary function, but must take 2 or more arguments. |
||
neq |
x, y | Boolean x != y: returns true unless x and y are equal. |
||
plus |
x, y, z... | x + y + z + ...: The sum of the arguments of the function. Note that plus is an n-ary function taking 0 or more arguments, and that plus() returns 0 . |
||
times |
x, y, z... | x * y * z * ...: The product of the arguments of the function. Note that times is an n-ary function taking 0 or more arguments, and that times() returns 1 . |
||
minus |
x, y | x – y. | ||
divide |
x, y | x / y. |
Parsing of the various MathML functions and constants are all case-insensitive by default: function names such as cos
, Cos
and COS
are all parsed as the MathML cosine operator, <cos>
. However, when a Model object is used in conjunction with either SBML_parseL3FormulaWithModel() or SBML_parseL3FormulaWithSettings(), any identifiers found in that model will be parsed in a case-sensitive way. For example, if a model contains a Species having the identifier Pi
, the parser will parse "Pi
" in the input as "<ci> Pi </ci>
" but will continue to parse the symbols "pi
" and "PI
" as "<pi>
".
As mentioned above, the manner in which the "L3" versions of the formula parser and formatter interpret the function "log
" can be changed. To do so, callers should use the function SBML_parseL3FormulaWithSettings() and pass it an appropriate L3ParserSettings object. By default, unlike the SBML Level 1 parser implemented by SBML_parseFormula(), the string "log
" is interpreted as the base 10 logarithm, and not as the natural logarithm. However, you can change the interpretation to be base-10 log, natural log, or as an error; since the name "log" by itself is ambiguous, you require that the parser uses log10
or ln
instead, which are more clear. Please refer to SBML_parseL3FormulaWithSettings().
In addition, the following symbols will be translated to their MathML equivalents, if no symbol with the same SId
identifier string exists in the Model object provided:
Name | Meaning | MathML |
---|---|---|
true |
Boolean value true |
<true/> |
false |
Boolean value false |
<false/> |
pi |
Mathematical constant pi | <pi/> |
avogadro |
Value of Avogadro's constant stipulated by SBML | <csymbol encoding="text" definitionURL="http://www.sbml.org/sbml/symbols/avogadro"> avogadro </csymbol/> |
time |
Simulation time as defined in SBML | <csymbol encoding="text" definitionURL="http://www.sbml.org/sbml/symbols/time"> time </csymbol/> |
inf , infinity |
Mathematical constant "infinity" | <infinity/> |
nan , notanumber |
Mathematical concept "not a number" | <notanumber/> |
Again, as mentioned above, whether the string "avogadro
" is parsed as an AST node of type AST_NAME_AVOGADRO or AST_NAME is configurable; use the version of the parser function called SBML_parseL3FormulaWithSettings(). This Avogadro-related functionality is provided because SBML Level 2 models may not use AST_NAME_AVOGADRO AST nodes.
formula | the text-string formula expression to be parsed. |
NULL
if an error occurred while parsing the formula. When NULL
is returned, an error is recorded internally; information about the error can be retrieved using SBML_getLastParseL3Error().Parses a text string as a mathematical formula using a Model to resolve symbols, and returns an AST representation of the result.
This is identical to SBML_parseL3Formula(), except that this function uses the given model in the argument model
to check against identifiers that appear in the formula
. For more information about the parser, please see the definition of L3ParserSettings and the function SBML_parseL3Formula().
formula | the mathematical formula expression to be parsed. |
model | the Model object to use for checking identifiers. |
NULL
if an error occurred while parsing the formula. When NULL
is returned, an error is recorded internally; information about the error can be retrieved using SBML_getLastParseL3Error().ASTNode_t* SBML_parseL3FormulaWithSettings | ( | const char * | formula, |
const L3ParserSettings_t * | settings | ||
) |
Parses a text string as a mathematical formula using specific parser settings and returns an AST representation of the result.
This is identical to SBML_parseL3Formula(), except that this function uses the parser settings given in the argument settings
. The settings override the default parsing behavior. The following parsing behaviors can be configured:
SId
) from the model in preference to pre-defined MathML symbols More precisely, the Model entities whose identifiers will shadow identical symbols in the mathematical formula are: Species, Compartment, Parameter, Reaction, and SpeciesReference. For instance, if the parser is given a Model containing a Species with the identifier "pi
", and the formula to be parsed is "3*pi
", the MathML produced by the parser will contain the construct <ci> pi </ci>
instead of the construct <pi/>
. Another example, if the passed-in Model contains a FunctionDefinition with the identifier "sin
", that function will be used instead of the predefined MathML function <sin/>
. log
with a single argument ("log(x)
") can be parsed as log10(x)
, ln(x)
, or treated as an error, as desired. - -3
") from the input and incorporate single unary minuses into the number node, or (2) preserve all minuses in the AST node structure, turning them into ASTNode objects of type AST_MINUS. number id
" can be interpreted as a numerical value number
followed by units of measurement indicated by id
, or it can be treated as a syntax error. (In Level 3, MathML <cn>
elements can have an attribute named units
placed in the SBML namespace, which can be used to indicate the units to be associated with the number. The text-string infix formula parser allows units to be placed after raw numbers; they are interpreted as unit identifiers for units defined by the SBML specification or in the containing Model object.) avogadro
can be parsed either as a MathML csymbol or as a identifier. More specifically, "avogadro
" can be treated as an ASTNode of type AST_NAME_AVOGADRO or of type AST_NAME. For more details about the parser, please see the definition of L3ParserSettings and SBML_parseL3FormulaWithSettings().
formula | the mathematical formula expression to be parsed. |
settings | the settings to be used for this parser invocation. |
NULL
if an error occurred while parsing the formula. When NULL
is returned, an error is recorded internally; information about the error can be retrieved using SBML_getLastParseL3Error().