The examination of roots of constrained polynomials dates back at least to Waring and to Littlewood. However, such delicate structures as fractals and holes have only recently been found. We study the space of roots to certain integer polynomials arising naturally in the context of Calabi-Yau spaces, notably Poincaré and Newton polynomials, and observe various salient features and geometrical patterns
A long-standing theme in algebraic combinatorics is to study bases of the rings of symmetric functio...
International audienceWe first recall the main features of Fractional calculus. In the expression of...
We study the roots of polynomials over Cayley--Dickson algebras over an arbitrary field and of arbit...
The examination of roots of constrained polynomials dates back at least to Waring and to Littlewood....
We study the Poincar´e polynomials of all known Calabi-Yau three-folds as constrained polynomials of...
Punca polinomial mempunyai pelbagai applikasi dalam kehidupan kita. Ia timbul bukan sahaja dalam bi...
Because polynomial functions are completely determined by their roots, every property of a polynomia...
Because polynomial functions are completely determined by their roots, every property of a polynomia...
We consider a systematic generalization of the well-known cube roots of -1 problem to include the Nt...
In this report, we present a simple geometric generation principle for the fractal that is obtained ...
With a bird’s-eye view, we survey the landscape of Calabi-Yau threefolds, compact and non-compact, s...
Newton\u27s method is a useful tool for finding roots of functions when analytical methods fail. The...
V. Golyshev conjectured that for any smooth polytope P of dimension at most five, the roots $z\in\C$...
Our observations show that the sets of real (respectively complex) roots of the derivatives of some ...
The algebraic operation of approximate roots provides a geometric approximation of the zeros of a po...
A long-standing theme in algebraic combinatorics is to study bases of the rings of symmetric functio...
International audienceWe first recall the main features of Fractional calculus. In the expression of...
We study the roots of polynomials over Cayley--Dickson algebras over an arbitrary field and of arbit...
The examination of roots of constrained polynomials dates back at least to Waring and to Littlewood....
We study the Poincar´e polynomials of all known Calabi-Yau three-folds as constrained polynomials of...
Punca polinomial mempunyai pelbagai applikasi dalam kehidupan kita. Ia timbul bukan sahaja dalam bi...
Because polynomial functions are completely determined by their roots, every property of a polynomia...
Because polynomial functions are completely determined by their roots, every property of a polynomia...
We consider a systematic generalization of the well-known cube roots of -1 problem to include the Nt...
In this report, we present a simple geometric generation principle for the fractal that is obtained ...
With a bird’s-eye view, we survey the landscape of Calabi-Yau threefolds, compact and non-compact, s...
Newton\u27s method is a useful tool for finding roots of functions when analytical methods fail. The...
V. Golyshev conjectured that for any smooth polytope P of dimension at most five, the roots $z\in\C$...
Our observations show that the sets of real (respectively complex) roots of the derivatives of some ...
The algebraic operation of approximate roots provides a geometric approximation of the zeros of a po...
A long-standing theme in algebraic combinatorics is to study bases of the rings of symmetric functio...
International audienceWe first recall the main features of Fractional calculus. In the expression of...
We study the roots of polynomials over Cayley--Dickson algebras over an arbitrary field and of arbit...