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Differential inclusions and young measures involving prescribed Jacobians
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posted on 2023-06-09, 04:54 authored by Konstantinos KoumatosKonstantinos Koumatos, Filip Rindler, Emil WiedemannThis work presents a general principle, in the spirit of convex integration, leading to a method for the characterization of Young measures generated by gradients of maps in W^{1,p} with p less than the space dimension, whose Jacobian determinant is subjected to a range of constraints. Two special cases are particularly important in the theories of elasticity and fluid dynamics: when (a) the generating gradients have positive Jacobians that are uniformly bounded away from zero and (b) the underlying deformations are incompressible, corresponding to their Jacobian determinants being constantly one. This characterization result, along with its various corollaries, underlines the flexibility of the Jacobian determinant in subcritical Sobolev spaces and gives a more systematic and general perspective on previously known pathologies of the pointwise Jacobian. Finally, we show that, for p less than the dimension, W^{1,p}-quasiconvexity and W^{1,p}-orientation-preserving quasiconvexity are both unsuitable convexity conditions for nonlinear elasticity where the energy is assumed to blow up as the Jacobian approaches zero.
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Publication status
- Published
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- Published version
Journal
SIAM Journal on Mathematical AnalysisISSN
0036-1410Publisher
Society for Industrial and Applied MathematicsExternal DOI
Issue
2Volume
47Page range
1169-1195Department affiliated with
- Mathematics Publications
Research groups affiliated with
- Analysis and Partial Differential Equations Research Group Publications
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Peer reviewed?
- Yes
Legacy Posted Date
2017-01-24First Compliant Deposit (FCD) Date
2017-01-24Usage metrics
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