%0 Book Section %1 1977chapter %A Truesdell, Clifford A., iii %B A First Course in Rational Continuum Mechanics: Vol 1: General Concepts %C New York %D 1977 %I Academic %K 74-02-mechanics-of-deformable-solids-research-exposition 74a05-kinematics-of-deformation %P 85-147 %R https://doi.org/10.1016/S0079-8169(08)60554-1 %T Chapter II Kinematics %U https://www.sciencedirect.com/science/article/pii/S0079816908605541 %V 71 %X In three-dimensional continuum mechanics, the integral-gradient theorem, which is the basis of Green's transformation, often called “the divergence theorem,” is a tool of central importance. All the shapes of bodies should be such as to make the integral-gradient theorem apply whenever the fields integrated are smooth to the degrees ordinarily assumed. The first statement in the theorem makes the sets of finite perimeter a Boolean algebra with respect to intersection and union. This chapter discusses a theorem that relates sets of finite perimeter directly to the integral-gradient theorem. The chapter presents a local analysis of the equilibrium and motion of continuous media. %7 First %& 2

@incollection{1977chapter, abstract = {In three-dimensional continuum mechanics, the integral-gradient theorem, which is the basis of Green's transformation, often called “the divergence theorem,” is a tool of central importance. All the shapes of bodies should be such as to make the integral-gradient theorem apply whenever the fields integrated are smooth to the degrees ordinarily assumed. The first statement in the theorem makes the sets of finite perimeter a Boolean algebra with respect to intersection and union. This chapter discusses a theorem that relates sets of finite perimeter directly to the integral-gradient theorem. The chapter presents a local analysis of the equilibrium and motion of continuous media.}, added-at = {2021-08-25T19:36:44.000+0200}, address = {New York}, author = {{Truesdell, Clifford A.}, iii}, biburl = {https://www.bibsonomy.org/bibtex/2dc1c1691520676418ad02633ed7f7993/gdmcbain}, booktitle = {A First Course in Rational Continuum Mechanics: Vol 1: General Concepts}, chapter = 2, doi = {https://doi.org/10.1016/S0079-8169(08)60554-1}, edition = {First}, interhash = {069ca9a4497d81c45fc02f345a68f3f6}, intrahash = {dc1c1691520676418ad02633ed7f7993}, issn = {0079-8169}, keywords = {74-02-mechanics-of-deformable-solids-research-exposition 74a05-kinematics-of-deformation}, pages = {85-147}, publisher = {Academic}, series = {Pure and Applied Mathematics}, timestamp = {2021-08-25T19:44:34.000+0200}, title = {Chapter II Kinematics}, url = {https://www.sciencedirect.com/science/article/pii/S0079816908605541}, volume = 71, year = 1977 }