The following pages link to phcpy (Q27427):
Displaying 10 items.
- The m-Bézout bound and distance geometry (Q831957) (← links)
- The method of Gauss-Newton to compute power series solutions of polynomial homotopies (Q2002799) (← links)
- On the multihomogeneous Bézout bound on the number of embeddings of minimally rigid graphs (Q2025442) (← links)
- Locating the closest singularity in a polynomial homotopy (Q2109994) (← links)
- On the maximal number of real embeddings of minimally rigid graphs in \(\mathbb{R}^2,\mathbb{R}^3\) and \(S^2\) (Q2200306) (← links)
- Computing All Space Curve Solutions of Polynomial Systems by Polyhedral Methods (Q2829992) (← links)
- Solving Polynomial Systems in the Cloud with Polynomial Homotopy Continuation (Q3454535) (← links)
- Harnessing elasticity to generate self-oscillation via an electrohydrodynamic instability (Q5217671) (← links)
- Polynomial homotopy continuation on GPUs (Q5270187) (← links)
- Numerical Schubert calculus via the Littlewood-Richardson homotopy algorithm (Q5856748) (← links)