/dports/math/pari/pari-2.13.3/src/functions/modular_symbols/ |
H A D | mscuspidal | 6 by msinit, return its cuspidal part S. If flag = 1, return [S,E] its 7 decomposition into Eisenstein and cuspidal parts. 10 return its cuspidal part $S$. If $\fl = 1$, return 11 $[S,E]$ its decomposition into cuspidal and Eisenstein parts.
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H A D | msnew | 6 return its new cuspidal subspace. 9 return the \emph{new} part of its cuspidal subspace. A subspace is given by
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H A D | mshecke | 29 ? N = msnew(M)[1] \\ Q-basis of new cuspidal subspace
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/dports/math/pari/pari-2.13.3/src/functions/modular_forms/ |
H A D | mfgaloistype | 7 types of Galois representations attached to each cuspidal eigenform, 13 representations attached to each cuspidal eigenform, 16 form space, nor whether it is a cuspidal eigenform). Types $A_4$, $S_4$,
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H A D | mftraceform | 8 (default), 1: the full cuspidal space. 12 1: the full cuspidal space.
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H A D | mfconductor | 7 Doc: \kbd{mf} being output by \kbd{mfinit} for the cuspidal space and 9 In particular, if $F$ is cuspidal and we write $F = \sum_j B(d_j) f_j$
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H A D | mfkohnenbasis | 5 Help: mfkohnenbasis(mf): mf being a cuspidal space of half-integral weight 8 Doc: \kbd{mf} being a cuspidal space of half-integral weight $k\ge3/2$
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H A D | mfspace | 6 in mf. Returns 0 (newspace), 1 (cuspidal space), 2 (old space), 11 Returns 0 (newspace), 1 (cuspidal space), 2 (old space),
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H A D | mfperiodpol | 5 Help: mfperiodpol(mf,f,{flag=0}): period polynomial of the cuspidal part of 10 Doc: period polynomial of the cuspidal part of the form $f$, in other words
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H A D | mftonew | 5 Help: mftonew(mf,F): mf being a full or cuspidal space with parameters [N,k,chi] 10 Doc: \kbd{mf} being being a full or cuspidal space with parameters $[N,k,\chi]$
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H A D | mfkohnenbijection | 5 Help: mfkohnenbijection(mf): mf being a cuspidal space of half-integral weight 10 Doc: \kbd{mf} being a cuspidal space of half-integral weight, returns 12 isomorphism from the cuspidal space \kbd{mf2} giving
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H A D | mfkohneneigenbasis | 5 Help: mfkohneneigenbasis(mf,bij): mf being a cuspidal space of half-integral 11 Doc: \kbd{mf} being a cuspidal space of half-integral weight $k\ge3/2$ and
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H A D | mfdim | 8 the newspace, 1 for the cuspidal space, 2 for the oldspace, 3 for the space 16 newspace $S_k^{\text{new}}(\Gamma_0(N),\chi)$, $1$ for the cuspidal
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H A D | mfinit | 10 1 for the cuspidal space, 2 for the oldspace, 3 for the space of Eisenstein 21 newspace $S_k^{\text{new}}(\Gamma_0(N),\chi)$, $1$ for the cuspidal
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H A D | HEADER | 19 \item The cuspidal space $S_k(\Gamma_0(N),\chi)$ (flag $1$). 41 larger than the new space (i.e. is the cuspidal or full space) we
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H A D | mfbasis | 15 basis of the space of Eisenstein series, and second, a basis of the cuspidal
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/dports/math/eclib/eclib-20210318/tests/ |
H A D | homtest.cc | 39 int cuspidal=0; local 63 homspace hplus(n,plus, cuspidal,verbose);
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H A D | tmanin.cc | 43 int output, verbose, sign=1, cuspidal=0; local
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/dports/math/gap/gap-4.11.0/pkg/fining/examples/gap/ |
H A D | examples_varieties.g | 21 cuspidal := ImagesSet(proj, List(curveminusx, t -> Span(x, t))); 22 coords := List(cuspidal, Coordinates);
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/dports/math/py-sympy/sympy-1.9/sympy/vector/tests/ |
H A D | test_implicitregion.py | 76 cuspidal = ImplicitRegion((x, y), (x**3 - y**2)) 77 assert cuspidal.rational_parametrization(t) == (t**2, t**3)
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/dports/math/eclib/eclib-20210318/libsrc/ |
H A D | homspace.cc | 70 cuspidal=hcusp; in homspace() 450 if(cuspidal) in homspace() 476 needed[i] = (cuspidal? ! trivial(kern.bas().row(i+1).as_vec()) in homspace() 485 if ((verbose>1)&&cuspidal) in homspace() 761 if(cuspidal) m = restrict_mat(smat(m),kern).as_mat(); in calcop() 830 if(cuspidal) in s_calcop() 921 if(cuspidal) m = restrict_mat(smat(m),kern).as_mat(); in newheckeop() 952 if(cuspidal) m = restrict_mat(smat(m),kern).as_mat(); in conj() 1010 if(cuspidal) in s_conj() 1305 if(cuspidal) in maninvector() [all …]
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H A D | nfd.cc | 291 if(h1->cuspidal) coordi = h1->cuspidalpart(coordi); in nfd() 399 if(h1->cuspidal) vt=h1->cuspidalpart(vt); in heckeop() 408 if(h1->cuspidal) vt=h1->cuspidalpart(vt); in heckeop()
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/dports/math/pari/pari-2.13.3/src/functions/l_functions/ |
H A D | lfunetaquo | 10 It is currently assumed that $f$ is a self-dual cuspidal form on
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/dports/math/eclib/eclib-20210318/progs/out_no_ntl/ |
H A D | moreap.out | 29 Filling in data for for newform #1: bases...type and cuspidal factors...cuspidalfactorplus = 5
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/dports/math/eclib/eclib-20210318/progs/out_ntl/ |
H A D | moreap.out | 29 Filling in data for for newform #1: bases...type and cuspidal factors...cuspidalfactorplus = 5
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