Add to ORKGIn this senior thesis we examine the relationship between math, specifically group theory, and tonal music systems. In particular, we examine the 12-note tonal system of western music and identify some of its fundamental properties. From there we establish criteria that an alternative tonal system must meet to be considered an acceptable alternative to the 12-note tonal system. We build a mathematical model for n-note tonal systems using cyclic groups of order n. Ultimately we conclude that in order for an n-note tonal system to be acceptable, the system must be composed of n notes where n is divisible by 4, but not divisible by 8
This dissertation develops and exp and s certain aspects of a theory of diatonic sets, as first form...
This paper presents a formal model of Schoenberg’s guidelines for convincing chord root progressions...
This article shows how the intervals produced by specific realizations of the row can define the mus...
There has often been a connection between music and mathematics. The world of musical composition is...
Math and music have always been closely tied in the minds of great thinkers. From Pythagoras’ perfec...
This paper briefly illustrates the concepts of tone-lattices, scales, periodicity and notational sys...
AbstractThis paper surveys some combinatorial problems that have arisen in Music Theory, or which ha...
In this paper, some concepts of modular arithmetic and group theory are firstly introduced. Then, so...
Being a mathematician and a musician (I play the flute) I found it very interesting to deal with Pó...
Since the time of Pythagoras (c.550BC), mathematicians interested in music have asked, “What governs...
Mathematics and Music, the most sharply contrasted fields of scientific activity which can be found,...
Numerous studies have explored the special mathematical properties of the diatonic set. However, muc...
There is a deep connection between mathematics and music. The music was created first, however, and ...
Extended tonality is a central system that characterizes the music from the 19th up to the 21st cent...
Math and music, two things that to most people, seem entirely different. However, they are more alik...
This dissertation develops and exp and s certain aspects of a theory of diatonic sets, as first form...
This paper presents a formal model of Schoenberg’s guidelines for convincing chord root progressions...
This article shows how the intervals produced by specific realizations of the row can define the mus...
There has often been a connection between music and mathematics. The world of musical composition is...
Math and music have always been closely tied in the minds of great thinkers. From Pythagoras’ perfec...
This paper briefly illustrates the concepts of tone-lattices, scales, periodicity and notational sys...
AbstractThis paper surveys some combinatorial problems that have arisen in Music Theory, or which ha...
In this paper, some concepts of modular arithmetic and group theory are firstly introduced. Then, so...
Being a mathematician and a musician (I play the flute) I found it very interesting to deal with Pó...
Since the time of Pythagoras (c.550BC), mathematicians interested in music have asked, “What governs...
Mathematics and Music, the most sharply contrasted fields of scientific activity which can be found,...
Numerous studies have explored the special mathematical properties of the diatonic set. However, muc...
There is a deep connection between mathematics and music. The music was created first, however, and ...
Extended tonality is a central system that characterizes the music from the 19th up to the 21st cent...
Math and music, two things that to most people, seem entirely different. However, they are more alik...
This dissertation develops and exp and s certain aspects of a theory of diatonic sets, as first form...
This paper presents a formal model of Schoenberg’s guidelines for convincing chord root progressions...
This article shows how the intervals produced by specific realizations of the row can define the mus...