[1] F. Chen and W. Wang. The ji-basis of a planar rational curve: properties and computation, Graphical Models, 64, 368-381. 2002.
[2] F. Chen and W. Wang. Revisiting the ji-basis of a rational ruled surface Journal of Symbolic Computation 36 (5), 699-716. 2003.
[3] D. A. Cox, R. Goldman, and M. Zhang. On the validity ofimplicitization by moving quadrics for rational surfaces with no base points, Journal of Symbolic Computation, 29, 419-440.
2000.
[4] D. A. Cox, J. Little and D. O'Shea. Using algebraic geometry, Springer, 1998.
[5] D. A. Cox, T. Sederberg, and F. Chen. The moving line ideal basis of planar rational curves,
Computer Aided Geometric Design 15, 803-827. 1998.
[ 6] D. Eisenbud. Commutative algebra with a view toward algebraic geometry, Springer, 1994. [ 7] T. W. Sederberg and F. Chen. Implicitization using moving curves and surfaces Proceeding
of SIGGRAPH, 301-308. 1995.
[8] T. Sederberg, R. Goldman, and H. Du. Implicitizing rational curves by the method of moving algebraic curves, Journal of Symbolic Computation, 23, 153-175. 1997.
[9] T. Sederberg, T. Saito, D. Qi, and K. Klimaszewski. Curve implicitization using moving lines, Computer Aided Geometric Design 11, 687-706. 1994.
[10] N. Song and R. Goldman. j-bases for polynomial systems in one variable, Computer Aided
Geometric Design, 26(2), 217-230, 2009.
[11] X. Wang and R. Goldman. j-Basesfor complex rational curves, Computer Aided Geometric
Design, 30(7), 623-635, 2013.
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