Add to ORKGIn this paper, we investigate several musical morphologies that can be represented as paths in abstract graphs. Our examples come from questions posed by composers in the compositional process. In particular, we focus on Hamiltonian paths and cycles, which are central to graph theory. Our results show the circumstances in which such a path exists in the graphs derived from these musical ideas
Using an algebra of paths we present abstract algebraic derivations for two problem classes concerni...
Using an algebra of paths we present abstract algebraic derivations for two problem classes concerni...
A la frontière entre musique et mathématiques, cette étude présente un espace musical géométrique or...
AbstractCayley graphs arise naturally in computer science, in the study of word-hyperbolic groups an...
The aim of this paper is twofold: on one side we review the classical concept of musical mode from t...
cote interne IRCAM: Mazzola07aNone / NoneNational audienceThis paper shows an interplay of music and...
International audienceThe notion of space is often summoned in music theory, both for the compositio...
AbstractMotivated by questions from digital topology, we present a particular class of graphs, here ...
This thesis introduces to the readers the basic characteristics of Hamiltonian cycles. Hamiltonian c...
This paper proves a sufficient condition for the existence of Hamiltonian paths in simple connected ...
International audienceIn Mathematical Music Theory, geometric models such as graphs and simplicial c...
Links between music and mathematics is always been an important research topic ever. Serious attempt...
AbstractSince finding whether a graph has a Hamiltonian path or Hamiltonian cycle are both NP-comple...
AbstractWe prove a lemma about mixing paths in interval graphs. This provides a foundation for obtai...
The abstract focuses on graphical representations of musical elements related to pitches, chords, an...
Using an algebra of paths we present abstract algebraic derivations for two problem classes concerni...
Using an algebra of paths we present abstract algebraic derivations for two problem classes concerni...
A la frontière entre musique et mathématiques, cette étude présente un espace musical géométrique or...
AbstractCayley graphs arise naturally in computer science, in the study of word-hyperbolic groups an...
The aim of this paper is twofold: on one side we review the classical concept of musical mode from t...
cote interne IRCAM: Mazzola07aNone / NoneNational audienceThis paper shows an interplay of music and...
International audienceThe notion of space is often summoned in music theory, both for the compositio...
AbstractMotivated by questions from digital topology, we present a particular class of graphs, here ...
This thesis introduces to the readers the basic characteristics of Hamiltonian cycles. Hamiltonian c...
This paper proves a sufficient condition for the existence of Hamiltonian paths in simple connected ...
International audienceIn Mathematical Music Theory, geometric models such as graphs and simplicial c...
Links between music and mathematics is always been an important research topic ever. Serious attempt...
AbstractSince finding whether a graph has a Hamiltonian path or Hamiltonian cycle are both NP-comple...
AbstractWe prove a lemma about mixing paths in interval graphs. This provides a foundation for obtai...
The abstract focuses on graphical representations of musical elements related to pitches, chords, an...
Using an algebra of paths we present abstract algebraic derivations for two problem classes concerni...
Using an algebra of paths we present abstract algebraic derivations for two problem classes concerni...
A la frontière entre musique et mathématiques, cette étude présente un espace musical géométrique or...