Tensors are mathematical objects that are defined by their transformation properties under a change of coordinates. This means that if a quantity transforms according to a specific set of rules involving the partial derivatives of the coordinate systems, it's considered a tensor. Based on this definition, we can verify that several expressions are indeed tensors. For example, multiplying a tensor by a scalar, adding two tensors of the same rank, and taking the outer product of two tensors all result in a new quantity that also transforms according to the correct tensor rules, thus demonstrating that these operations preserve the tensor nature of the quantities involved.

<aside> <img src="/icons/profile_gray.svg" alt="/icons/profile_gray.svg" width="40px" />

$\complement\cdots$Counselor

</aside>

Operations That Preserve Tensor Nature.mp4

<aside> 📢

  1. Symmetric and Antisymmetric Components
  2. Symmetry and the Zero Tensor
  3. Independent Components and Tensor Symmetry
  4. Proof of the Contravariant Nature of the Inverse Metric Tensor
  5. Christoffel Symbols Geometric Change in Cylindrical Coordinates
  6. Geometric Meaning of Arc Length in Spherical Coordinates
  7. Curvilinear Coordinate Systems and Their Metrics
  8. Impact of Non-Orthogonal Coordinates on Geometric Measurement
  9. Partial vs Covariant Derivative The Core Difference
  10. Core Properties of the Covariant Derivative
  11. Tensor Derivation and Verification of Spherical Divergence
  12. Consistency of the Tensor-Based Laplace Operator in Cylindrical Coordinates
  13. Scale Factor Dependence of Tangent Basis Vector Divergence
  14. The General Coordinate Laplacian Formula
  15. Tensor Density Algebra-Weight and Rank Rules
  16. Path-Independence of Tensor Densities via the Jacobian Product Rule
  17. Impact of Coordinate Scaling on Metric and Cross Product
  18. Vanishing Divergence of the Levi-Civita Tensor Explained
  19. Tensor Formulation of Vector Calculus Operations
  20. Curl of the Dual Basis is Always Zero
  21. Dual Anti-Symmetry of the Generalised Kronecker Delta
  22. The Orthogonality and Invariance of Cartesian Affine Transformations
  23. Mass Density as the Integrating Factor
  24. Curvilinear Area Element Derivation via Jacobian
  25. The Interdependence of Elastic Constants
  26. Magnetic Stress Tensor via Field Tensors
  27. Field Tension Mediates Repulsion and Ensures Static Equilibrium
  28. Zero Total Force for a Source-Free Volume
  29. the Rotational Identity Derivation and Its Physical Significance
  30. Non-Constant Inertia and Dynamic Coupling
  31. Centrifugal Force Tensor Structure and Vanishing Conditions
  32. Properties and Physical Effects of the Gravitational Tidal Tensor
  33. Magnetic Force Transmission via the Stress Tensor
  34. Maxwell's Inhomogeneous Pair in Relativistic Notation
  35. The Metric Orthogonality and Curvature in Spherical Coordinates
  36. The Covariant Divergence of an Antisymmetric Tensor in Curved Spacetime
  37. Contraction of the Christoffel Symbol and Its Relation to the Metric's Logarithmic Derivative
  38. The Non-Tensorial Nature of Christoffel Symbols and Their Role in Connection and Fictitious Forces
  39. The Covariant Nature of a Scalar Field's Partial Derivatives (The Gradient)
  40. Using the Metric Tensor to Convert Contravariant to Covariant Components
  41. Decomposing Tensors into Unique Symmetric and Anti-Symmetric Components
  42. The Invariant Nature of Tensor Symmetry Under Coordinate Transformations
  43. Defining the Transformation Law for a Type (0,2) Tensor Through Scalar Invariance
  44. The Coordinate Invariance of Tensor Contraction
  45. Operations That Preserve Tensor Nature
  46. Current Density and Electric Field Alignment in Anisotropic Media
  47. Electric Susceptibility as a Rank Two Tensor
  48. Verification of the Rank Two Zero Tensor Properties
  49. Transformation of the Rotating Polar Tensor Basis to Cartesian Coordinates
  50. Derivation of Mixed Tensor Transformation Properties </aside>