 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 1000009 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 OÌˆmer Nuri EgÌ†eciogÌ†lu, 1987
 Neural networks, errorcorrecting codes and polynomials over the binary ncube (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
