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Tensors, Dyads

2. Objective. The objective of this lecture is to introduce the student to the concept of tensors and to review some basic concepts relevant to tensors, including dyads.Many of the concepts reviewed in this lecture are useful or essential in discussions of elasticity and plasticity.. . 3. Tensors. Tensors are extremely useful for describing anisotropic properties in materials. They permit complicated behaviors to be described in a compact fashion that can be easily translated into numerical fo30384

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Tensors, Dyads

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    1. 1 Tensors, Dyads 27-750, Advanced Characterization and Microstructural Analysis, Spring 2002, A. D. Rollett

    2. 2 Objective The objective of this lecture is to introduce the student to the concept of tensors and to review some basic concepts relevant to tensors, including dyads. Many of the concepts reviewed in this lecture are useful or essential in discussions of elasticity and plasticity.

    3. 3 Tensors Tensors are extremely useful for describing anisotropic properties in materials. They permit complicated behaviors to be described in a compact fashion that can be easily translated into numerical form (i.e. programming).

    4. 4 Dyads: 1 We are familiar with constructing vectors as triples of coefficients multiplying the unit vectors: we call these tensors of first order. In order to work with higher order tensors, it is very useful to construct dyads from the unit vectors.

    5. 5 Dyads: 2 Define the dyadic product of two vectors. Note coordinate free. Properties are the following:

    6. 6 Dyads: 3 Transformation (l) of the dyadic product, from one coordinate system to another, leaves it invariant. This is demonstrated in the following construction:

    7. 7 Inner products from Dyadics The dyadic product is similar to the vector product: it is not commutative. Inner products can be combined with the dyadic product:

    8. 8 Unit Dyads We can construct unit dyads from the unit vectors: For now we will leave these as they are and not introduce any new symbols.

    9. 9 Dyad example: dislocation slip We commonly form a dyad for the strain, m, produced on a slip system (or twinning system) by combining unit vectors that represent slip (twin shear direction) direction, b, and slip plane [normal] (twin plane), n.

    10. 10 Second Order Tensors Unit dyads form the basis for second order (rank) tensors, just as the unit vectors do for vectors, where the Tij are the (nine) coefficients of the tensor.

    11. 11 Second Order Tensors example: strain from slip The dyad for crystallographic slip forms the basis for a second order (rank) strain tensor, eslip, where the magnitude of the tensor is given by the amount of shear strain, ?g, on the given system.

    12. 12 Unit (spherical) tensors The unit tensor, I, is formed from the unit dyad thus: Note that this tensor is invariant under transformations. An extension of this idea is the isotropic tensor, where C is a constant (scalar),

    13. 13 Symmetric, skew-symmetric tensors A (second order) tensor is said to be symmetric (e.g. stress, strain tensors) if Tij = Tji Similarly a tensor is said to be skew-symmetric or antisymmetric (as in small rotations) if Tij = -Tji Any tensor can be decomposed into a symmetric and a skew-symmetric part.

    14. 14 Tensor: transformations Transformation of tensors follows the rules set up for vectors and the unit vectors: thus:

    15. 15 Right, left inner products Right and left inner-products of the second-order tensor, T, with a vector: left: right: Note the order of the indices. Note also that we can speak of a tensor acting on a vector to send it onto another vector.

    16. 16 Inner products of tensors The composition of, or dot product between two second-order tensors in the dyadic notation: Notice that the dot product between two tensors involves a contraction of the inner indices, r & s. This is also called an inner product.

    17. 17 Outer products of tensors Consider the outer product of a tensor of second-order with a vector to produce a tensor of third-order: Fourth-order tensor is similar:

    18. 18 General Cartesian tensors More generally, Cartesian tensors of order n are defined by components by the expression: The nth order polydyadics form a complete orthogonal basis for tensors of order n.

    19. 19 nth order tensor transformations Changes in the coordinate frame change the components of the nth order tensor according to a simple extension:

    20. 20 Inner products of higher order tensors Inner-products on tensors of higher order are defined by contracting over one or more indices. For example, contracting the last n-p indices of tensor T (of order n) with the first n-p indices of a tensor U (of order m) gives a new tensor S (of order 2p+m-n) according to the following.

    21. 21 Higher order inner products

    22. 22 Higher order outer products A natural generalization of the outer product to higher-order tensors is obvious. The outer product of two tensors T and U (of order n and m, respectively) is a new tensor S of order n+m according to the expression

    23. 23 Eigenanalysis of tensors It is very useful to perform eigenanalysis on tensors of all kinds, whether rotations, physical quantities or properties. We look for solutions to this equation, where ľ is a scalar:

    24. 24 Characteristic equation The necessary condition for the relation above to have non-trivial solutions is given by: When the (cubic) characteristic equation is solved, three roots, ľi, are obtained which are the eigenvalues of the tensor T. They are also called the principal values of the tensor.

    25. 25 Eigenvectors Assume that the three eigenvalues are distinct. The ith eigenvalue, ľi, can be reintroduced into the previous relation in order to solve for the eigenvectors, v(i):

    26. 26 Real, Symmetric Tensors Consider the special case where the components of T are real and symmetric, e.g. stress, strain tensors. Now let’s evaluate the effect on the eigenvalues and eigenvectors: ,which the symmetric nature of the tensor allows it to be re-written as:

    27. 27 Eigenvalues of real, symmetric tensors Now take the complex conjugate of the components of each element in the above, keeping in mind that T is real: Next, take the left inner product of the previous relation with and subtract it from the right inner product of the above relation with :

    28. 28 real eigenvalues Given this consequence of non-trivial solutions for the eigenvectors, we see that the eigenvalues of a real-symmetric matrix must be themselves be real valued in order for the previous relation to be satisfied

    29. 29 eigenvectors Next, take the left inner product of the previous relation, with to obtain and subtract it from the right inner product of with :

    30. 30 Eigenvectors are orthogonal If inner (scalar) products of the eigenvectors are zero, then they are orthogonal. The eigenvectors of a real-symmetric tensor, associated with distinct eigenvalues, are orthogonal. In general the eigenvectors can be normalized by an appropriate selection of scalar multiplier to have unit length.

    31. 31 Orthonormal eigenvectors Convenient to select the set of eigenvectors in a right-handed manner such that: The axes of the coordinate system defined by this orthonormal set of eigenvectors are often called the principal axes of a tensor, T, and their directions are called principal directions.

    32. 32 Diagonalizing the tensor Consider the right and left inner product of tensor T with the eigenvectors according to: The left hand side of this relation can be expressed in the dyadic notation as:

    33. 33 Transformation to Diagonal form are the direction cosines linking the orthonormal set of eigenvectors to the original coordinate system for T. Combining the equations above, we get the following, where superscript “d” denotes the diagonal form of the tensor:

    34. 34 Principal values, diagonal matrix are components of the real-symmetric tensor T in the coordinate frame of its eigenvectors. It is evident that the matrix of components of is diagonal, with the eigenvalues appearing along the diagonal of the matrix. (The superscript d highlights the “diagonal” nature of the components in the frame of the eigenvectors.)

    35. 35 Invariants of 2nd order tensor The product of eigenvalues, ľ1ľ2ľ3, is equal to the determinant of tensor T.

    36. 36 Invariants 2 Other combinations of components which form (three) invariants of second-order tensors include, where T2=T•T (inner, or dot product): I3 = det T

    37. 37 Deviatoric tensors Another very useful concept in elasticity and plasticity problems is that of deviatoric tensors. A’ = A - 1/3I trA The tensor A’ has the property that its trace is zero. If A is symmetric then A’ is also symmetric with only five independent components (e.g. the strain tensor, e).

    38. 38 Deviatoric tensors: 2 Frequently we decompose a tensor into its deviatoric and spherical parts (e.g. stress): A = A’ + 1/3I trA e.g. s = s + 1/3I trs = s + sm Non-zero invariants of A’ : I’2=-1/2{(tr A’)2- tr A’2} I’3= det A’ = 1/3 tr A’3 Re-arrange: I’2=-1/3I12+I2. I’3=I3-(I1I2)/3+2/27I13

    39. 39 Positive definite tensors The tensor T is said to be positive definite if the above relation holds for any non-zero values of the vector u. A necessary and sufficient condition for T to be positive definite is that the eigenvalues of T are all positive.

    40. 40 Polar Decomposition Polar decomposition is defined as the unique representation of an arbitrary second-order tensor*, T, as the product of an orthogonal tensor, R, and a positive-definite symmetric tensor, either U or V, according to:

    41. 41 Polar Decomposition: 2 Define a new second-order tensor, A = T-1T. A is clearly symmetric, and that it is positive definite is clear from considering the following: The right-hand side ofthis equation is positive for any non-zero vector v, and hence vAv is positive for all non-zero v.

    42. 42 Polar Decomposition: 3 Having shown that A is symmetric, positive-definite, we are assured that A has positive eigenvalues. We shall denote these by ľ12, ľ22, ľ32, where, without loss of generality, ľ1, ľ2, ľ3, are taken to be positive. It is easily verified that the same eigenvectors which are obtained for T are also eigenvectors for A; thus

    43. 43 Polar Decomposition: 4 Next we define a new tensor, U, with a diagonal (principal values) matrix, D, and a rotation, R, according to:

    44. 44 Polar Decomposition: 5 Thus, D is a diagonal tensor whose elements are the eigenvalues of T, and R* is the rotation that takes the base vectors into the eigenvectors associated with T. U is symmetric and positive definite, and since R* is orthogonal

    45. 45 Polar Decomposition: 6 The (rotation) tensor R associated with the decomposition is defined by: That R has the required orthogonality is clear from the following:

    46. 46 Polar Decomposition: 7 Thus the (right) U-decomposition of tensor T is defined by relations (2.66) and (2.69). If the (left) V-decomposition is preferred then the following applies:

    47. 47 Summary The important properties and relationships for tensors have been reviewed. Second order tensors can written as combination sof coefficients and unit dyads. Orthogonal tensors can be used to represent rotations. Tensors can be diagonalized using eigenanalysis. Tensors can decomposed into a combination of a rotation (orthogonal tensor) and a stretch (positive-definite symmetric tensor).

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