Add to ORKGThe purpose of this note is to report, in narrative rather than rigorous style, about the nice geometry of $6$-division points on the Fermat cubic $F$ and various conics naturally attached to them. Most facts presented here were derived by symbolic algebra programs and the idea of the note is to propose a research direction for searching for conceptual proofs of facts stated here and their generalisations. Extensions in several directions seem possible (taking curves of higher degree and contact to $F$, studying higher degree curves passing through higher order division points on $F$, studying curves passing through intersection points of already constructed curves, taking the duals etc.) and we hope some younger colleagues might find pleas...
Projectiles follow parabolic paths and planets move in elliptical orbits. Circles, hyperbolas, parab...
AbstractIn Galois’ last letter he found the values of the primes p for which the group PSL(2,p) acts...
In this document we formulate and discuss conjecture 1.2.1, giving an upper bound for the number of ...
In the present note we construct new families of free and nearly free curves starting from a plane c...
The purpose of this note is to present and study a new series of the so-called unexpected curves. Th...
In this paper we construct several arrangements of lines and/or conics that are derived from the geo...
Made available in DSpace on 2016-12-23T14:34:48Z (GMT). No. of bitstreams: 1 Dissert_Stanley.pdf: 30...
In this paper we geometrically provide a necessary and sufficient condition for points on a cubic to...
A conic section is a plane quadratic curve, that is, the graph of an equation of the form ax² + bxy ...
Dr. Ron Knott constructed a graph of all Primitive Pythagorean Triples (PPTs) with legs up to length...
AbstractThis paper is devoted to improve the efficiency of the algorithm introduced in [A. Eigenwill...
We revisit constructions based on triads of conics with foci at pairs of vertices of a reference tri...
International audienceWe show how the study of the geometry of the nine flex tangents to a cubic pro...
The Bentley-Ottmann sweep-line method can compute the arrangement of planar curves, provided a numbe...
We study the structure of collections of algebraic curves in three dimensions that have many curve-c...
Projectiles follow parabolic paths and planets move in elliptical orbits. Circles, hyperbolas, parab...
AbstractIn Galois’ last letter he found the values of the primes p for which the group PSL(2,p) acts...
In this document we formulate and discuss conjecture 1.2.1, giving an upper bound for the number of ...
In the present note we construct new families of free and nearly free curves starting from a plane c...
The purpose of this note is to present and study a new series of the so-called unexpected curves. Th...
In this paper we construct several arrangements of lines and/or conics that are derived from the geo...
Made available in DSpace on 2016-12-23T14:34:48Z (GMT). No. of bitstreams: 1 Dissert_Stanley.pdf: 30...
In this paper we geometrically provide a necessary and sufficient condition for points on a cubic to...
A conic section is a plane quadratic curve, that is, the graph of an equation of the form ax² + bxy ...
Dr. Ron Knott constructed a graph of all Primitive Pythagorean Triples (PPTs) with legs up to length...
AbstractThis paper is devoted to improve the efficiency of the algorithm introduced in [A. Eigenwill...
We revisit constructions based on triads of conics with foci at pairs of vertices of a reference tri...
International audienceWe show how the study of the geometry of the nine flex tangents to a cubic pro...
The Bentley-Ottmann sweep-line method can compute the arrangement of planar curves, provided a numbe...
We study the structure of collections of algebraic curves in three dimensions that have many curve-c...
Projectiles follow parabolic paths and planets move in elliptical orbits. Circles, hyperbolas, parab...
AbstractIn Galois’ last letter he found the values of the primes p for which the group PSL(2,p) acts...
In this document we formulate and discuss conjecture 1.2.1, giving an upper bound for the number of ...