Difference between revisions of "ApCoCoA-1:Latte.Ehrhart"
(New page: <command> <title>Latte.Ehrhart</title> <short_description> Computes the ehrhart series as a rational funktion for a polyhedral P given by a number of linear constraints</short_description>...) |
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| − | + | Use S ::= QQ[x,y]; | |
| + | Equations := []; | ||
| + | LesserEq := [x-1, x+y-1]; | ||
| + | GreaterEq := [x,y]; | ||
| + | Latte.Ehrhart(Equations, LesserEq, GreaterEq); | ||
</example> | </example> | ||
Revision as of 09:35, 21 April 2009
Latte.Ehrhart
Computes the ehrhart series as a rational funktion for a polyhedral P given by a number of linear constraints
Syntax
Latte.Ehrhart(Equations: LIST, LesserEq: LIST, GreaterEq: LIST):RATFUN
Syntax
Latte.Ehrhart(Equations: LIST, LesserEq: LIST, GreaterEq: LIST, Degree: INT):RATFUN
Description
Please note: The function(s) explained on this page is/are using the ApCoCoAServer. You will have to start the ApCoCoAServer in order to use
it/them.
@param Equations: A list of linear polynomials, which are equivalent to the equality-part of the polyhedral constraints
@param LesserEq: A list of linear polynomials, which are equivalent to the lower or equal-part of the polyhedral constraints
@param GreaterEq: A list of linear polynomials, which are equivalent to the greater or equal-part of the polyhedral constraints
@param Degree: Integer n > 0, when using this parameter, the function computes the Taylor series expansion of the Ehrhart series to degree n
@return The Ehrhart-series (or the Taylor series expansion to degree n of the Ehrhart series) of the polyhedral P
Example
Use S ::= QQ[x,y]; Equations := []; LesserEq := [x-1, x+y-1]; GreaterEq := [x,y]; Latte.Ehrhart(Equations, LesserEq, GreaterEq);
