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last edited 9 years ago by hemmecke |
Edit detail for SandBoxBugLaurentSeries revision 2 of 2
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Editor: hemmecke
Time: 2014/12/10 19:03:48 GMT+0 |
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changed: - It seems weird that the resulting series is aborted at a non-existing coefficient in the input list. added: There is obviously also a bug here, because the zero coefficient should have been removed. I would, however, accept such a result if the specification of "series":http://fricas.github.io/api/UnivariateLaurentSeriesCategory.html#l-univariate-laurent-series-category-series were made precise as to rely on the input stream not to contain zero coefficients. \begin{axiom} S ==> SparseUnivariateLaurentSeries(Q,z,0) series(l)$S series(l1)$S series(l2)$S \end{axiom}
fricas
(1) -> Z==>Integer; Q==>Fraction Z
Type: Void
fricas
z: Symbol := 'z; P==>UnivariatePolynomial(z,Q)
Type: Void
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t:P := monomial(1,1)
 | (1) |
Type: UnivariatePolynomial(z,
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p:P := (1-t)*(1-t^2)*(1-t^3)
 | (2) |
Type: UnivariatePolynomial(z,
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L==>UnivariateLaurentSeries(Q,z, 0)
Type: Void
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R ==> Record(k: Z,c: Q)
Type: Void
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l: List R := reverse [[degree m,leadingCoefficient m]$R for m in monomials p]
![\label{eq3}\begin{array}{@{}l}
\displaystyle
\left[{\left[{k = 0}, \:{c = 1}\right]}, \:{\left[{k = 1}, \:{c = - 1}\right]}, \:{\left[{k = 2}, \:{c = - 1}\right]}, \: \right.
\
\
\displaystyle
\left.{\left[{k = 4}, \:{c = 1}\right]}, \:{\left[{k = 5}, \:{c = 1}\right]}, \:{\left[{k = 6}, \:{c = - 1}\right]}\right]](images/6525160915666977928-16.0px.png "\label{eq3}\begin{array}{@{}l}
\displaystyle
\left[{\left[{k = 0}, \:{c = 1}\right]}, \:{\left[{k = 1}, \:{c = - 1}\right]}, \:{\left[{k = 2}, \:{c = - 1}\right]}, \: \right.
\
\
\displaystyle
\left.{\left[{k = 4}, \:{c = 1}\right]}, \:{\left[{k = 5}, \:{c = 1}\right]}, \:{\left[{k = 6}, \:{c = - 1}\right]}\right]") | (3) |
Type: List(Record(k: Integer,
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series(l)$L
 | (4) |
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l1: List R := [[n,if n=5 then 0 else n/1]$R for n in 1..7]
![\label{eq5}\begin{array}{@{}l}
\displaystyle
\left[{\left[{k = 1}, \:{c = 1}\right]}, \:{\left[{k = 2}, \:{c = 2}\right]}, \:{\left[{k = 3}, \:{c = 3}\right]}, \:{\left[{k = 4}, \:{c = 4}\right]}, \: \right.
\
\
\displaystyle
\left.{\left[{k = 5}, \:{c = 0}\right]}, \:{\left[{k = 6}, \:{c = 6}\right]}, \:{\left[{k = 7}, \:{c = 7}\right]}\right]](images/7521587284141078238-16.0px.png "\label{eq5}\begin{array}{@{}l}
\displaystyle
\left[{\left[{k = 1}, \:{c = 1}\right]}, \:{\left[{k = 2}, \:{c = 2}\right]}, \:{\left[{k = 3}, \:{c = 3}\right]}, \:{\left[{k = 4}, \:{c = 4}\right]}, \: \right.
\
\
\displaystyle
\left.{\left[{k = 5}, \:{c = 0}\right]}, \:{\left[{k = 6}, \:{c = 6}\right]}, \:{\left[{k = 7}, \:{c = 7}\right]}\right]") | (5) |
Type: List(Record(k: Integer,
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series(l1)$L
 | (6) |
It seems weird that the resulting series is aborted at a non-existing coefficient in the input list.
fricas
l2: List R := [[n,n/1]$R for n in 1..7|n~=5]
![\label{eq7}\begin{array}{@{}l}
\displaystyle
\left[{\left[{k = 1}, \:{c = 1}\right]}, \:{\left[{k = 2}, \:{c = 2}\right]}, \:{\left[{k = 3}, \:{c = 3}\right]}, \:{\left[{k = 4}, \:{c = 4}\right]}, \: \right.
\
\
\displaystyle
\left.{\left[{k = 6}, \:{c = 6}\right]}, \:{\left[{k = 7}, \:{c = 7}\right]}\right]](images/7352556098829288517-16.0px.png "\label{eq7}\begin{array}{@{}l}
\displaystyle
\left[{\left[{k = 1}, \:{c = 1}\right]}, \:{\left[{k = 2}, \:{c = 2}\right]}, \:{\left[{k = 3}, \:{c = 3}\right]}, \:{\left[{k = 4}, \:{c = 4}\right]}, \: \right.
\
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\displaystyle
\left.{\left[{k = 6}, \:{c = 6}\right]}, \:{\left[{k = 7}, \:{c = 7}\right]}\right]") | (7) |
Type: List(Record(k: Integer,
fricas
series(l2)$L
 | (8) |
There is obviously also a bug here, because the zero coefficient should have been removed. I would, however, accept such a result if the specification of series were made precise as to rely on the input stream not to contain zero coefficients.
fricas
S ==> SparseUnivariateLaurentSeries(Q,z, 0)
Type: Void
fricas
series(l)$S
 | (9) |
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series(l1)$S
 | (10) |
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series(l2)$S
 | (11) |