This collection aims first to establish a structure-independent, language-independent definition of pragmatic voice, and more specifically then a universal functional definition of “inverse”. The grammar and pragmatic function of the four major voice constructions — direct-active, inverse, passive, antipassive — are surveyed using narrative texts from 14 languages: Koyukon (Athabascan), Plains Cree (Algonquian), Chepang (Tibeto-Burman), Squamish and Bella Coola (Salish), Sahaptin (Sahaptian), Kutenai (isolate), Surinam Carib (Carib), Spanish and Greek (Indo-European), Korean, Maasai (Nilotic), Cebuano and Karao (Philippine).
With mathematical and computational models furthering our understanding of lung mechanics, function and disease, this book provides an all-inclusive introduction to the topic from a quantitative standpoint. Focusing on inverse modeling, the reader is guided through the theory in a logical progression, from the simplest models up to state-of-the-art models that are both dynamic and nonlinear.
Nonlinear Ocean Waves & the Inverse Scattering Transform
For more than 200 years, the Fourier Transform has been one of the most important mathematical tools for understanding the dynamics of linear wave trains. Nonlinear Ocean Waves and the Inverse Scattering Transform presents the development of the nonlinear Fourier analysis of measured space and time series, which can be found in a wide variety of physical settings including surface water waves, internal waves, and equatorial Rossby waves.
Additive Number Theory: Inverse Problems and the Geometry of Sumsets
Many classical problems in additive number theory are direct problems, in which one starts with a set A of natural numbers and an integer H -> 2, and tries to describe the structure of the sumset hA consisting of all sums of h elements of A. By contrast, in an inverse problem, one starts with a sumset hA, and attempts to describe the structure of the underlying set A.