To go there we would have had to pass through woods and over small morassy creeks.
"Journal of Jasper Danckaerts, 1679-1680" by Jasper Danckaerts
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Similarly, we give another approach to the size estimate problem for the thin plate studied by Morassi, Rosset, and Vessella [7, 8].
Equivalence of inverse problems for 2D elasticity and for the thin plate with finite measurements and its applications
On the other hand, the estimate of the size of an inclusion for the thin plate studied by Morrassi, Rosset, and Vessella [7, 8] is equivalent to the same problem for 2D elasticity, which was solved by Alessandrini, Morassi, and Rosset (corrected in ).
Equivalence of inverse problems for 2D elasticity and for the thin plate with finite measurements and its applications
D elasticity with certain anisotropic media through the similar result for the thin plate obtained by Morassi, Rosset, and Vessella in .
Equivalence of inverse problems for 2D elasticity and for the thin plate with finite measurements and its applications
This problem has been studied by Morassi, Rosset, and Vessella . A key ingredient in the proof of is the three-ball inequality for the plate equation with elastic tensor C0 .
Equivalence of inverse problems for 2D elasticity and for the thin plate with finite measurements and its applications
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