Jacobi polynomials
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Broader term:Used for:- Polynomials, Jacobi
![[X-Info]](https://onlinebooks.library.upenn.edu/infouc.gif)
Line and area orthogonality of Jacobi polynomials (Dept. of Computer Science, University of Illinois, 1969), by M M Chawla and M. K. Jain (page images at HathiTrust)- Projections associated with Jacobi polynomials (Washington, D.C. : United States Air Force Office of Scientific Research, [1957], 1957), by I. I. Hirschman, United States. Air Force. Office of Scientific Research, and Mo.). Department of Mathematics Washington University (Saint Louis (page images at HathiTrust)
Items below (if any) are from related and broader terms.
Filed under: Orthogonal polynomials![[Info]](https://onlinebooks.library.upenn.edu/info.gif)
Orthogonal Polynomials (American Mathematical Society Colloquium Publications v23, revised edition; 1959), by Gábor Szegő (page images at HathiTrust)- Fourier Series and Orthogonal Polynomials (Carus Mathematical Monograph #6; c1941), by Dunham Jackson (page images at HathiTrust)
- Tables of orthogonal polynomial values extended to N=104 (Agricultural Experiment Station, Iowa State College of Agriculture and Mechanic Arts, 1942), by R. L. Anderson and Earl E. Houseman (page images at HathiTrust; US access only)
- Legendre polynomials Pn(cos [theta]) for N = 0 (1) 20, and [theta] = 0 degrees (1) 180 degrees to six decimals (Atomic Energy Commission, 1947), by W. Lane, D. Sweeny, U.S. Atomic Energy Commission, and Los Alamos Scientific Laboratory (page images at HathiTrust)
- Genoro : a general data fitting and linear functional evaluation computer code for the IBM 7090 (U.S. Atomic Energy Commission, 1963), by C. A. Oster, United States. National Bureau of Standards, United States. Department of Energy. Office of Fusion Energy, United States. National Bureau of Standards. Fracture and Deformation Division, U.S. Atomic Energy Commission, United States. Energy Research and Development Administration, Hanford Works, and Hanford Atomic Products Operation. Contract and Accounting Operation (page images at HathiTrust)
- NASA TN D-5785 (National Aeronautics and Space Administration :, 1970), by Paul F. Byrd, David C. Galant, Ames Research Center, and United States National Aeronautics and Space Administration (page images at HathiTrust; US access only)
- NASA TN D-5713 (National Aeronautics and Space Administration ; [For sale by the Clearinghouse for Federal Scientific and Technical Information, Springfield, Virginia 22151], 1970), by Howard Tashjian, Ames Research Center, and United States National Aeronautics and Space Administration (page images at HathiTrust; US access only)
- Variation diminishing transformations and orthogonal polynomials (Washington D. C. : Office of Scientific Research, U.S. Air Force, 1960., 1960), by Isidor I. Jr Hirschman, United States. Air Force. Office of Scientific Research, and Mo.). Department of Mathematics Washington University (Saint Louis (page images at HathiTrust)
- Chebyshev and Fourier Spectral Methods (second edition), by John P. Boyd (PDF with commentary at Citeseer)
- Tables of Chebyshev polynomials, Sn(X0 and Cn(X). (U.S. Govt. Print. Off., 1952), by United States. National Bureau of Standards (page images at HathiTrust)
- Approximations in LP and tchebycheff approximations (University of Illinois, Digital Computer Laboratory, 1962), by J. Descloux, National Science Foundation (U.S.), and University of Illinois (Urbana-Champaign campus). Digital Computer Laboratory (page images at HathiTrust; US access only)
- Orthogonality relations for Chebyshev polynomials (Dept. of Computer Science, University of Illinois, 1970), by Mahendra Kumar Jain and M M Chawla (page images at HathiTrust)
- A treatise on Lissajous figures and Tchebycheff polynomials. ([s.n.], 1958), by Toma Riabokin (page images at HathiTrust; US access only)
- Notes on Tchebycheff polynomials (n. p., 1960), by J. Shohat and I. M. Sheffer (page images at HathiTrust; US access only)
- A comparison of Young's method with iterative procedures : using Chebyshev polynomials (Pittsburgh, Pennsylvania. : Bettis Plant, 1956., 1956), by Richard S. Varga, U.S. Atomic Energy Commission, and Bettis Atomic Power Laboratory (page images at HathiTrust)
- Fonctions hypergéométriques et hypersphériques : polynomes d'Hermite (Gauthier-Villars, 1926), by Paul Appell and Joseph Kampé de Fériet (page images at HathiTrust; US access only)
- Convergence of the hermite wavelet expansion (Hanscom Air Force Base, Massachusetts : Phillips Laboratory, Directorate of Geophysics, Air Force Systems Command, United States Air Force, 1992., 1992), by G. v. H. Sandri, USAF Phillips Laboratory. Geophysics Directorate, and Boston University (page images at HathiTrust)
- A Generalization of a theorem of Laguerre (Washington, D.C. : United States Air Force, Office of Scientific Research, 1958., 1958), by Yudell L. Luke, United States. Air Force. Office of Scientific Research, and Mo.) Midwest Research Institute (Kansas City (page images at HathiTrust)
- NASA TN D-7924 (National Aeronautics and Space Administration ;, 1975), by Robert N. Desmarais, Langley Research Center, and United States National Aeronautics and Space Administration (page images at HathiTrust)
- Legendre polynomials Pn(cos [theta]) for N = 0 (1) 20, and [theta] = 0 degrees (1) 180 degrees to six decimals (Atomic Energy Commission, 1947), by W. Lane, D. Sweeny, U.S. Atomic Energy Commission, and Los Alamos Scientific Laboratory (page images at HathiTrust)
- NASA TN D-2400 (National Aeronautics and Space Administration :, 1964), by Lawrence Flax, Edmund E. Callaghan, Lewis Research Center, and United States National Aeronautics and Space Administration (page images at HathiTrust; US access only)