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Knops, R. J.; Payne, L. E. - Uniqueness Theorems in Linear Elasticity (Volume 19) - 9783642651038 - V9783642651038
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Uniqueness Theorems in Linear Elasticity (Volume 19)

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Description for Uniqueness Theorems in Linear Elasticity (Volume 19) paperback. Series: Springer Tracts in Natural Philosophy. Num Pages: 142 pages, biography. BIC Classification: PHD. Category: (P) Professional & Vocational. Dimension: 234 x 156 x 7. Weight in Grams: 229.
The classical result for uniqueness in elasticity theory is due to Kirchhoff. It states that the standard mixed boundary value problem for a homogeneous isotropic linear elastic material in equilibrium and occupying a bounded three-dimensional region of space possesses at most one solution in the classical sense, provided the Lame and shear moduli, A and J1 respectively, obey the inequalities (3 A + 2 J1) > 0 and J1>O. In linear elastodynamics the analogous result, due to Neumann, is that the initial-mixed boundary value problem possesses at most one solution provided the elastic moduli satisfy the same set of inequalities ... Read more

Product Details

Format
Paperback
Publication date
2011
Publisher
Springer/Sci-Tech/Trade Germany
Number of pages
142
Condition
New
Series
Springer Tracts in Natural Philosophy
Number of Pages
132
Place of Publication
Berlin, Germany
ISBN
9783642651038
SKU
V9783642651038
Shipping Time
Usually ships in 15 to 20 working days
Ref
99-15

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