[1] | 1 | \begin{lisp:documentation}{ratpoly+}{FUNCTION}{p q }
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| 2 | Add polynomials P and Q.
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| 3 | \end{lisp:documentation}
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| 4 |
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| 5 | \begin{lisp:documentation}{ratpoly$-$}{FUNCTION}{p q }
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| 6 | {\ } % NO DOCUMENTATION FOR RATPOLY-
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| 7 | \end{lisp:documentation}
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| 8 |
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| 9 | \begin{lisp:documentation}{ratpoly$-$uminus}{FUNCTION}{p }
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| 10 | {\ } % NO DOCUMENTATION FOR RATPOLY-UMINUS
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| 11 | \end{lisp:documentation}
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| 12 |
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| 13 | \begin{lisp:documentation}{ratpoly*}{FUNCTION}{p q }
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| 14 | Multiply polynomials P and Q.
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| 15 | \end{lisp:documentation}
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| 16 |
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| 17 | \begin{lisp:documentation}{scalar$-$times$-$ratpoly}{FUNCTION}{scalar p }
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| 18 | Multiply scalar SCALAR by a polynomial P.
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| 19 | \end{lisp:documentation}
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| 20 |
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| 21 | \begin{lisp:documentation}{rat$-$times$-$ratpoly}{FUNCTION}{scalar p }
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| 22 | Multiply rational function SCALAR by a polynomial P.
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| 23 | \end{lisp:documentation}
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| 24 |
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| 25 | \begin{lisp:documentation}{ratpoly$-$divide}{FUNCTION}{f g }
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| 26 | Divide polynomial F by G. Return quotient and remainder as multiple
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| 27 | values.
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| 28 | \end{lisp:documentation}
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| 29 |
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| 30 | \begin{lisp:documentation}{ratpoly$-$remainder}{FUNCTION}{f g }
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| 31 | The remainder of the division of a polynomial F by G.
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| 32 | \end{lisp:documentation}
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| 33 |
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| 34 | \begin{lisp:documentation}{ratpoly$-$gcd}{FUNCTION}{f g }
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| 35 | Return GCD of polynomials F and G.
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| 36 | \end{lisp:documentation}
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| 37 |
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| 38 | \begin{lisp:documentation}{ratpoly$-$diff}{FUNCTION}{f }
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| 39 | Differentiate a polynomial.
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| 40 | \end{lisp:documentation}
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| 41 |
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| 42 | \begin{lisp:documentation}{ratpoly$-$square$-$free}{FUNCTION}{f }
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| 43 | Return the square$-$free part of a polynomial F.
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| 44 | \end{lisp:documentation}
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| 45 |
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| 46 | \begin{lisp:documentation}{ratpoly$-$normalize}{FUNCTION}{f }
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| 47 | Divide a non$-$zero polynomial by the coefficient at the highest
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| 48 | power.
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| 49 | \end{lisp:documentation}
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| 50 |
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| 51 | \begin{lisp:documentation}{ratpoly$-$resultant}{FUNCTION}{f g }
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| 52 | Return the resultant of polynomials F and G.
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| 53 | \end{lisp:documentation}
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| 54 |
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| 55 | \begin{lisp:documentation}{deg}{FUNCTION}{s }
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| 56 | {\ } % NO DOCUMENTATION FOR DEG
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| 57 | \end{lisp:documentation}
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| 58 |
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| 59 | \begin{lisp:documentation}{lead}{FUNCTION}{s }
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| 60 | {\ } % NO DOCUMENTATION FOR LEAD
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| 61 | \end{lisp:documentation}
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| 62 |
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| 63 | \begin{lisp:documentation}{ratpoly$-$discriminant}{FUNCTION}{p {\sf \&aux} (l (deg p)) }
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| 64 | The discriminant of a polynomial P.
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| 65 | \end{lisp:documentation}
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| 66 |
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| 67 | \begin{lisp:documentation}{ratpoly$-$print}{FUNCTION}{p vars {\sf \&optional} (stream t) (beg t) (p$-$orig p) }
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| 68 | {\ } % NO DOCUMENTATION FOR RATPOLY-PRINT
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| 69 | \end{lisp:documentation}
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| 70 |
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| 71 | \begin{lisp:documentation}{poly$-$to$-$ratpoly}{FUNCTION}{p }
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| 72 | {\ } % NO DOCUMENTATION FOR POLY-TO-RATPOLY
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| 73 | \end{lisp:documentation}
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| 74 |
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| 75 | \begin{lisp:documentation}{poly$-$to$-$poly1}{FUNCTION}{p {\sf \&aux} (htab (make$-$hash$-$table)) q }
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| 76 | {\ } % NO DOCUMENTATION FOR POLY-TO-POLY1
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| 77 | \end{lisp:documentation}
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| 78 |
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| 79 | \begin{lisp:documentation}{poly1$-$to$-$ratpoly}{FUNCTION}{p }
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| 80 | {\ } % NO DOCUMENTATION FOR POLY1-TO-RATPOLY
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| 81 | \end{lisp:documentation}
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| 82 |
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| 83 | \begin{lisp:documentation}{ratpoly$-$to$-$poly1}{FUNCTION}{p }
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| 84 | Convert every coefficient of ratpoly to polynomial if possible
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| 85 | \end{lisp:documentation}
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| 86 |
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| 87 | \begin{lisp:documentation}{poly1$-$to$-$poly}{FUNCTION}{p }
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| 88 | Convert a ratpoly, whose coeffs have been converted to poly,
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| 89 | into a poly structure, i.e. tack in powers of first variable.
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| 90 | \end{lisp:documentation}
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| 91 |
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| 92 | \begin{lisp:documentation}{ratpoly$-$to$-$poly}{FUNCTION}{p }
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| 93 | {\ } % NO DOCUMENTATION FOR RATPOLY-TO-POLY
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| 94 | \end{lisp:documentation}
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| 95 |
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| 96 | \begin{lisp:documentation}{poly$-$resultant}{FUNCTION}{f g }
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| 97 | Calculate resultant of F and G given in poly i.e. alist
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| 98 | representation.
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| 99 | \end{lisp:documentation}
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| 100 |
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