Paul Erlich

Paul Erlich (born 1972) is a guitarist and music theorist living near Boston, Massachusetts. He is known for his seminal role in developing the theory of regular temperaments, including being the first to define pajara temperament^[1][2] and its decatonic scales in 22-ET.^[3] He holds a Bachelor of Science degree in physics from Yale University.

His definition of harmonic entropy influenced by Ernst Terhardt^[4] has received attention from music theorists such as William Sethares. It is intended to model one of the components of dissonance as a measure of the uncertainty of the virtual pitch ("missing fundamental") evoked by a set of two or more pitches. This measures how easy or difficult it is to fit the pitches into a single harmonic series. For example, most listeners rank a ${\displaystyle {\tfrac {4/5/6/7}{1}}}$ harmonic seventh chord as far more consonant than a ${\displaystyle {\tfrac {1}{7/6/5/4}}}$ chord. Both have exactly the same set of intervals between the notes, under inversion, but the first one is easy to fit into a single harmonic series (overtones rather than undertones). Due to the least common multiple, the integers are much lower for the major chord, ${\displaystyle {\tfrac {4/5/6/7}{4}}}$, versus its inverse, ${\displaystyle {\tfrac {105/120/140/168/210}{105}}}$. Components of dissonance not modeled by this theory include critical band roughness as well as tonal context (e.g. an augmented second is more dissonant than a minor third even though both can be tuned to the same size, as in 12-ET).

For the nth iteration of the Farey diagram, the median between the jth element, ${\displaystyle f_{j}=a_{j}/b_{j}}$, and the next highest element, ${\displaystyle {\frac {a_{j}+a_{j+1}}{b_{j}+b_{j+1}}}}$, subtracted by the median between the element and the next lowest element, ${\displaystyle {\frac {a_{j-1}+a_{j}}{b_{j-1}+b_{j}}}}$. Distances, ${\displaystyle r_{j}}$, which are larger indicate less dissonance (more clarity) and smaller distances indicate more dissonance (more ambiguity).

• "Some music theory from Paul Erlich", Lumma.org.
• "A Middle Path: Between Just Intonation and the Equal Temperaments", DKeenan.com.