In algebra, a sextic polynomial is a polynomial of degree six. A sextic equation or hexic equation is a polynomial equation of degree six—that is, an… (More)

Semantic Scholar uses AI to extract papers important to this topic.

2008

2008

We study the rational potentials V (x), with sextic growth at infinity , such that the corresponding one-dimensional Schrödinger… (More)

Is this relevant?

2008

2008

- A. N. Degtyarev
- 2008

We analyze irreducible plane sextics whose fundamental group factors to D14. We produce explicit equations for all curves and… (More)

Is this relevant?

2008

2008

- Abdelleh Lamnii, Hamid Mraoui, Driss Sbibih, Ahmed Tijini
- Mathematics and Computers in Simulation
- 2008

A numerical method based on septic B-spline function is presented for the solution of linear and nonlinear fifth-order boundary… (More)

Is this relevant?

2005

2005

- C. Boswell, M. L. Glasser
- 2005

Criteria are given for determining whether an irreducible sextic equation with rational coefficients is algebraically solvable… (More)

Is this relevant?

2005

2005

We determine the possible even sets of nodes on sextic surfaces in P, showing in particular that their cardinalities are exactly… (More)

Is this relevant?

2005

2005

- István Járási
- 2005

In the present paper we give an algorithm to compute generators of power integral bases having ”small” coordinates in an integral… (More)

Is this relevant?

2004

2004

- Ivan Cheltsov, Jihun Park
- 2004

We study properties of double covers of P ramified along nodal sextic surfaces such as non-rationality, Q-factoriality, potential… (More)

Is this relevant?

2000

2000

The family of complex PT-symmetric sextic potentials is studied to show that for various cases the system is essentially quasi… (More)

Is this relevant?

1999

1999

- Scott Crass
- Experimental Mathematics
- 1999

Recently, [Doyle and McMullen 1989] devised an iterative solution to the fifth degree polynomial. At the method’s core is a… (More)

Is this relevant?

1996

1996

- István Gaál, Michael E. Pohst
- J. Symb. Comput.
- 1996

We give an efficient algorithm for the resolution of index form equations, especially for determining power integral bases, in… (More)

Is this relevant?