1 | /*****************************************************************************\ |
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2 | * Computer Algebra System SINGULAR |
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3 | \*****************************************************************************/ |
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4 | /** @file facFqSquarefree.h |
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5 | * |
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6 | * This file provides functions for squarefrees factorizing over |
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7 | * \f$ F_{p} \f$ , \f$ F_{p}(\alpha ) \f$ or GF. |
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8 | * |
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9 | * @author Martin Lee |
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10 | * |
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11 | * @internal @version \$Id$ |
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12 | * |
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13 | **/ |
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14 | /*****************************************************************************/ |
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15 | |
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16 | #ifndef FAC_FQ_SQUAREFREE_H |
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17 | #define FAC_FQ_SQUAREFREE_H |
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18 | |
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19 | #include "cf_assert.h" |
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20 | |
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21 | |
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22 | /// squarefree factorization over a finite field |
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23 | /// @a return a list of squarefree factors with multiplicity |
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24 | CFFList |
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25 | squarefreeFactorization |
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26 | (const CanonicalForm & F, ///<[in] a poly |
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27 | const Variable & alpha ///<[in] either an algebraic variable, |
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28 | ///< i.e. we are over some F_p (alpha) |
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29 | ///< or a variable of level 1, i.e. |
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30 | ///< we are F_p or GF |
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31 | ); |
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32 | |
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33 | /// squarefree factorization over \f$ F_{p} \f$. |
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34 | /// If input is not monic, the leading coefficient is dropped |
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35 | /// |
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36 | /// @return a list of squarefree factors with multiplicity |
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37 | inline |
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38 | CFFList FpSqrf (const CanonicalForm& F ///< [in] a poly |
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39 | ) |
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40 | { |
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41 | Variable a= 1; |
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42 | CFFList result= squarefreeFactorization (F, a); |
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43 | result.insert (CFFactor (Lc(F), 1)); |
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44 | return result; |
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45 | } |
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46 | |
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47 | /// squarefree factorization over \f$ F_{p}(\alpha ) \f$. |
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48 | /// If input is not monic, the leading coefficient is dropped |
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49 | /// |
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50 | /// @return a list of squarefree factors with multiplicity |
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51 | inline |
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52 | CFFList FqSqrf (const CanonicalForm& F, ///< [in] a poly |
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53 | const Variable& alpha ///< [in] algebraic variable |
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54 | ) |
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55 | { |
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56 | CFFList result= squarefreeFactorization (F, alpha); |
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57 | result.insert (CFFactor (Lc(F), 1)); |
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58 | return result; |
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59 | } |
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60 | |
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61 | /// squarefree factorization over GF. |
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62 | /// If input is not monic, the leading coefficient is dropped |
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63 | /// |
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64 | /// @return a list of squarefree factors with multiplicity |
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65 | inline |
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66 | CFFList GFSqrf (const CanonicalForm& F ///< [in] a poly |
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67 | ) |
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68 | { |
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69 | ASSERT (CFFactory::gettype() == GaloisFieldDomain, |
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70 | "GF as base field expected"); |
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71 | Variable a= 1; |
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72 | CFFList result= squarefreeFactorization (F, a); |
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73 | result.insert (CFFactor (Lc(F), 1)); |
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74 | return result; |
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75 | } |
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76 | |
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77 | /// squarefree part of @a F/g, where g is the product of those squarefree |
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78 | /// factors whose multiplicity is 0 mod p, if @a F a pth power pthPower= F. |
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79 | /// |
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80 | /// @return @a sqrfPart returns 1, if F is a pthPower, else it returns the |
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81 | /// squarefree part of @a F/g, where g is the product of those |
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82 | /// squarefree factors whose multiplicity is 0 mod p |
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83 | CanonicalForm |
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84 | sqrfPart (const CanonicalForm& F, ///< [in] a poly |
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85 | CanonicalForm& pthPower, ///< [in,out] returns F is F is a pthPower |
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86 | const Variable& alpha ///< [in] algebraic variable |
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87 | ); |
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88 | |
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89 | /// p^l-th root extraction, where l is maximal |
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90 | /// |
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91 | /// @return @a maxpthRoot returns a p^l-th root of @a F, where @a l is maximal |
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92 | /// @sa pthRoot() |
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93 | CanonicalForm |
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94 | maxpthRoot (const CanonicalForm & F, ///< [in] a poly which is a pth power |
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95 | const int & q, ///< [in] size of the field |
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96 | int& l ///< [in,out] @a l maximal, s.t. @a F is |
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97 | ///< a p^l-th power |
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98 | ); |
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99 | |
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100 | #endif |
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101 | /* FAC_FQ_SQUAREFREE_H */ |
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102 | |
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