- Synthetic Division: Polynomial Long Division, Algorithm, Algebra, Polynomial, Long Division, Ruffini's Rule, Polynomial Remainder Theorem, Euclidean Domain, Gröbner Basis
- The interlace polynomial: A new graph polynomial (Research report / International Business Machines Corporation. Research Division) by Richard Arratia, 2000
- Generalized characteristic polynomials (Report. University of California, Berkeley. Computer Science Division) by John Canny, 1988
- Root isolation and root approximation for polynomials in Bernstein form (Research report RC. International Business Machines Corporation. Research Division) by V. T Rajan, 1988
- Tables for graduating orthogonal polynomials, (Commonwealth Scientific and Industrial Research Organization, Australia. Division of Mathematical Statistics technical paper) by E. A Cornish, 1962
- Conditions Satisfied By Characteristic Polynomials in Fields and Division Algebras: MSRI 1000-009 by Zinovy; Boris Youssin Reichstein, 2000
- A fast algorithm for rational interpolation via orthogonal polynomials (Report, CS. University of California, Berkeley. Computer Science Division) by Ömer Nuri Eğecioğlu, 1987
- Neural networks, error-correcting codes and polynomials over the binary n-cube (Research report RJ. International Business Machines Corporation. Research Division) by Jehoshua Bruck, 1987
- On the numerical condition of Bernstein Polynomials (Research Report RC. International Business Machines Corporation. Research Division) by Rida T Farouki, 1987
- On the distance to the zero set of a homogeneous polynomial (Research report RC. International Business Machines Corporation. Research Division) by Michael Shub, 1989
- Some algebraic and geometric computations in PSPACE (Report. University of California, Berkeley. Computer Science Division) by John Canny, 1988
- On a problem of Chebyshev (Mimeograph series / Dept. of Statistics, Division of Mathematical Sciences) by W. J. (William J.) Studden, 1979
- D[subscript s]-optimal designs for polynomial regression using continued fractions (Mimeograph series / Dept. of Statistics, Division of Mathematical Sciences) by W. J. (William J.) Studden, 1979
- On the zeros of a polynomial vector field (Research report RC. International Business Machines Corporation. Research Division) by Takis Sakkalis, 1987
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