A Model of Expressive Timing in Tonal Music

1. A Model of Expressive Timing in Tonal Music Neil Todd Presented by Xiaodan Wu

2. Goal • Combine the generative musical theory with the principle of phrase-final lengthening to generate a duration structure corresponding to the rubato in a performance.

3. Introduction • Duration and Intensity • Music is organized hierarchically. Mozart - A Major Sonata K331

4. Phrase-Final Lengthening • Phenomenon • Boundary Marker

5. Generative Music Theory • Grouping structure • Metrical structure • Time-span reduction • Prolongation reduction

6. Unit Time Span • It was introduced when we need to compare the real-time duration with metrical duration.

7. Structural Endings and Embedding Depth • C is an ordered set of time spans. • cj is the time span containing the jth structural ending. • n is the total number of structural endings. • E is an ordered set of numbers with one-one correspondence with the elements of C. • ej is the embedding depth of the jth structure ending.

8. Tree diagram of a time-span reduction Red for Cadence C = (4, 8, 12, 16) E = (1, 3, 1, 5) That is, E = [(0+1), (1+2), (0+1), (3+2)]

9. Duration • Timing is organized on about 3 levels: • Global component • Intermediate components • Local components

10. A model for Intermediate Components • Formulate it as a parabola m is rubato amplitude constant A is tempo constant

11. A hypothetical performance duration structure generated by the model with the given TSR

12. The Application • Mozart A Major Sonata K.331 • Haydn Sonata 59 Adagio • Chopin Trois Nouvelles Etudes No.3

13. Conclusion • Is a approximation only. • Should consider harmonic structure or prolongation reduction in the future model. • Should consider intensity and other secondary expressive variables in the future model.

14. Question?