1 / 30

Prolog

Prolog. Website: http://ckw.phys.ncku.edu.tw Homework submission: class@ckw.phys.ncku.edu.tw. Algebra / Analysis vs Geometry Relativity → Riemannian Geometry Symmetry → Lie Derivatives → Lie Group → Lie Algebra Integration → Differential forms → Homotopy, Cohomology

callies
Download Presentation

Prolog

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript


  1. Prolog Website: http://ckw.phys.ncku.edu.tw Homework submission: class@ckw.phys.ncku.edu.tw • Algebra / Analysis vs Geometry • Relativity → Riemannian Geometry • Symmetry → Lie Derivatives → Lie Group → Lie Algebra • Integration → Differential forms → Homotopy, Cohomology • Tensor / Gauge Fields → Fibre Bundles • Topology • Hamiltonian dynamics • Electrodynamics • Thermodynamics • Statistics • Fluid Dynamics • Defects

  2. Main Textbook Supplementary B.F.Schutz, “Geometrical Methods of Mathematical Physics”, CUP (80) • Y.Choquet-Bruhat et al, “Analysis, Manifolds & Physics”, rev. ed., North Holland (82) • H.Flanders, “Differential Forms”, Academic Press (63) • R.Aldrovandi, J.G.Pereira, “An Introduction to Geometrical Physics”, World Scientific (95) • T.Frankel, “The Geometry of Physics”, 2nd ed., CUP (03)

  3. Geometrical Methods of Mathematical Physics Bernard F. Schutz, Cambridge University Press (80) • Some Basic Mathematics • Differentiable Manifolds And Tensors • Lie Derivatives And Lie Groups • Differential Forms • Applications In Physics • Connections For Riemannian Manifolds And Gauge Theories

  4. 1. Some Basic Mathematics 1.1 The Space Rn And Its Topology 1.2 Mappings 1.3 Real Analysis 1.4 Group Theory 1.5 Linear Algebra 1.6 The Algebra Of Square Matrices See: Choquet, Chapter I.

  5. Basic Algebraic Structures See Choquet, Chap 1 or Aldrovandi, Math.1. • Group ( G,  ) • Ring ( R, +,  ) : ( no e, x -1 ) • Field ( F, +,  ) : Ring with e & x-1 except for 0. • Module ( M, +,  ; R ) • Algebra ( A, +,  ; R with e ) • Vector space ( V, + ; F ) Prototypes: Ris a field. Rn is a vector space.

  6. 1.1. The Space Rn And Its Topology • Goal: Extend multi-variable calculus (on En) to curved spaces without metric. • Bonus: vector calculus on E3 in curvilinear coordinates • Basic calculus concepts & tools (metric built-in): • Limit, continuity, differentiability, … • r-ball neighborhood, δ-ε formulism, … • Essential concept in the absence of metric: Proximity → Topology.

  7. Real number R = complete Archimedian ordered field. = Set of all n-tuples of real numbers ~ Prototype of an n-D continuum Distance function (Euclidean metric): (Open) Neighborhood of radius r at x : A set S is open if A set S is discrete if Preview: Continuity of functions will be defined in terms of open sets. Hausdorff separated: Distinct points possess disjoint neighborhoods.

  8. A system U of subsets Uiof a set X defines a topology on X if ( Closure under arbitrary unions. ) ( Closure under finite intersections. ) Elements Uiof U are called open sets. A topological space is the minimal structure on which concepts of neighborhood, continuity, compactness, connectedness can be defined. Usual topology of Rn= Topologywith open balls as open sets Metric-free version: Define Nr(x) in terms of open intervals.

  9. Trivial topology: U= { , X } → every function on X is dis-continuous Discrete topology: U= 2X → every function on X is continuous Exact choice of topology is usually not very important: 2 topologies are equivalent if there exists an homeomorphism (bi-continuous bijection) between them. Tools for classification of topologies: topological invariances, homology, homotopy

  10. 1.2. Mappings Map f from set Xinto set Y, denoted, by associates each xXuniquely with y= f (x) Y. Domain of f = Range of f = Image of M under f = Inverse image of N under f = f1 exists iff f is 1-1 (injective): f is onto (surjective) if f (X) = Y.f is a bijection if it is 1-1 onto.

  11. Composition Given by by The composition of f & g is the map by

  12. Continuity Elementary calculus version: Let f : R → R. Then f is continuous at x0 if Open ball version: Let Then f is continuous at x0 if i.e., • Two possible interpretations in terms of open sets: • Every open set in Domain( f) is mapped into an open set in Range(f). • Every open set in Range( f) has an open inverse image.

  13. Every open set in Domain( f) is mapped into an open set in Range(f)? No! Open M → half-closed f(M) Every open set in Range( f) has an open inverse image? Yes. Open N→ half-closed f -1(N)

  14. Continuity at a point: f : X → Y is continuous at x if the inverse image of any open neighborhood of f (x) is open, i.e., f -1(N[f(x)]) is open. Continuity in a region: f is continuouson M Xif f is continuous  xM, i.e., the inverse image of every open set in M is open. Differentiability of f : Rn → R

  15. by Inverse function theorem : f is invertible in some neighborhood of x0 if ( Jacobian ) Let then where

  16. 1.3. Real Analysis is analytic at x0 if f (x) has a Taylor series at x0 if f is analytic over Domain( f) is square integrable on S Rn if exists. A square integrable function g can be approximated by an analytic function f s.t.

  17. An operator on functions defined on Rnmaps functions to functions. E.g., Commutator of operators: s.t. A & Bcommute if E.g., Domain (AB)  C2 but Domain ([A , B ])  C1

  18. 1.4. Group Theory A group (G,  ) is a set G with an internal operation  : GG → G that is 1. Associative: 2. Endowed with an identity element: 3. Endowed with an inverse for each element: A group (G, +) is Abelian if all of its elements commute: ( Identity is denoted by 0 ) Examples: (R,+) is an Abelian group. The set of all permutations of n objects form the permutation group Sn. All symmetries / transformations are members of some groups.

  19. Rough definition: A Lie group is a group whose elements can be continuously parametrized. ~ continuous symmetries. (S, ) is a subgroup of group (G, ) if S  G. E.g., The set of all even permutations is a subgroup of Sn. But the set of all odd permutations is not a subgroup of Sn (no e). Groups (G,) is homomorphic to (H,*) if  an onto map f : G → H s.t. It is an isomorphism if f is 1-1 onto. (R+,) & (R,+) are isomorphic with f = log so that

  20. 1.5. Linear Algebra • ( R,  , +) is a ring if • ( R, + ) is an Abelian group. • 2.  is associative & distributive wrt + , i.e.,  x,y,z R, E.g., The set of all nn matrices is a ring under matrix multiplication & addition. Ring ( R,  , +) is a field if 1.  eR s.t. ex = xe = x  xR. 2.  x-1 R s.t. x-1  x = x  x-1 = e  xR except 0. E.g., R & C are fields under algebraic multiplication & addition.

  21. ( V, + ; R ) is a module if • ( V, + ) is an Abelian group. • 2. R is a ring. • 3. The scalar multiplicationRV→V by (a,v)  av satisfies 4. If R has an identity e, then ev = v vV. We’ll only use F = K = R or C. Module ( V, + ; F ) is a linear (vector) space if F is a field. ( A, , + ; R ) is an algebraover ring Rif 1. ( A, , + ) is a ring. 2. ( A, + ; R ) is a module s.t.

  22. For historical reasons, the term “linear algebra” denotes the study of linear simultaneous equations, matrix algebra, & vector spaces. Mathematical justification: ( M, , + ; K) , where M is the set of all nn matrices, is an algebra . Linear combination: { vi} is linearly independent if A basis for V is a maximal linearly independent set of vectors in V. The dimension of V is the number of elements in its basis. An n-D space V is sometimes denoted by V n . Einstein’s notation Given a basis { ei }, we have vi are called the components of v. A subspace of V is a subset of V that is also a vector space.

  23. A norm on a linear space V over field KR or C is a mapping s.t. ( Triangular inequality ) ( Linear ) ( Positive semi-definite ) n is a semi- (pseudo-) norm if only 1 & 2 hold. A normed vector space is a linear space V endowed with a norm. Examples: Euclidean norm

  24. An inner product on a linear space (V, + ; K) is a mapping s.t. or, for physicists, ( Sesquilinear ) u & v are orthogonal

  25. Inner Product Spaces Inner product space linear space endowed with an inner product. An inner product  ,  induces a norm || || by Properties of an inner product space: ( Cauchy-Schwarz inequality ) ( Triangular inequality ) ( Parallelogram rule ) The parallelogram rule can be derived from the cosine rule : ( θ  angle between u & v )

  26. 1.6 . The Algebra of Square Matrices A linear transformationT on vector space (V, + ; K) is a map s.t. If { ei} is a basis of V, then  Setting we have  T ji= (j,i)-element of matrix T Writing vectors as a column matrix, we have (  =matrix multiplication )

  27. In linear algebra, linear operators are associative, then  ~ Similarly, ~ i.e., linear associative operators can be represented by matrices. We’ll henceforth drop the symbol 

  28. In general: Transpose: Adjoint: Unit matrix: Inverse: A is non-singular if A-1 exists. The set of all non-singular nn matrices forms the group GL(n,K). Determinant:

  29. Cofactor: cof(Aij) = (-)i+j determinant of submatrix obtained by deleting the i-th row & j-th column of A. Laplace expansion: j arbitrary See T.M.Apostol, “Linear Algebra” , Chap 5, for proof.  Trace: Similarity transform of A by non-singular B: ~ Det & Tr are invariant under a similarity transform:

  30. Miscellaneous formulae λ is an eigenvalue of A if  v  0 s.t. ~ v is then called the eigenvector belonging to λ. For an n-D space, λ satifies the secular equation: There are always n complex eigenvalues and m eigenvectors with m n. Eigenvalues of A & AT are the same.

More Related