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Analysis: General
26Xxx
| [1] |
Jeffrey B. Farr and Shuhong Gao.
Gröbner bases and generalized Padé approximation.
Math. Comp., 75(253):461–473 (electronic), 2006. |
| [2] |
Jean-Charles Faugère, François Moreau de Saint-Martin, and Fabrice
Rouillier.
Design of regular nonseparable bidimensional wavelets using
Gröbner basis techniques.
IEEE Trans. Signal Process., 46(4):845–856, 1998. |
| [3] |
M. Kasatani, T. Miwa, A. N. Sergeev, and A. P. Veselov.
Coincident root loci and Jack and Macdonald polynomials for
special values of the parameters.
In Jack, Hall-Littlewood and Macdonald Polynomials,
volume 417 of Contemp. Math., pages 207–225. Amer. Math. Soc.,
Providence, RI, 2006. |
| [4] |
Kiran S. Kedlaya.
Search techniques for root-unitary polynomials.
In Computational arithmetic geometry, volume 463 of Contemp. Math., pages 71–81. Amer. Math. Soc., Providence, RI, 2008. |
| [5] |
J.C van der Meer.
Generic one-parameter versal unfoldings of symmetric hamiltonian
systems in 1:1 resonance.
Int. J. Pure Appl. Math, 53(4):547–561, 2009. |
| [6] |
Shayne Waldron and Nick Hay.
On computing all harmonic frames of n vectors in Cd.
Appl. Comput. Harmon. Anal., 21(2):168–181, 2006. |
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