1 2 Differential Calculus Christopher Crawford PHY 416
- Slides: 14
§ 1. 2 Differential Calculus Christopher Crawford PHY 416 G 2014 -09 -08
Key Points up to Now • Linear spaces – – Linear combinations / projections -> basis / components Dot product reduces; Cross product builds up dimension (area, vol. ) Orthogonal projection (Dot = parallel, Cross = perpendicular) products Affine space of points, position vector • Linear operators – – Most general transformation is a rotation * stretch Rotations (orthogonal) appear in coordinate transformations Stretches (symmetric) occur in orthogonal directions (eigenspaces) APPLICATION to functions and differential operators! 2
Where are we heading? • Differential spaces – – – Everything follows from the differential (d) and chain rule (partials) Differential (line, area, vol. ) elements are ordered by dimension The derivative increases to one higher dimension There is only ONE 1 st derivative: d or in different dimensions There is only ONE 2 nd derivative: the Laplacian • Curvilinear coordinates – – Operations on points and vectors: affine combination Position vector: connection between point and vector Coordinates: used to parameterize a volume / surface / curve Differential d is more natural than for curvilinear coordinates • 2 classes: Integration / Stokes’ theorems / Poincaré lemma • 2 classes: Delta fn / Green’s fn / Helmholtz theorem / fn spaces – These 4 types of fundamental theorems map directly onto electrodynamic principles (and all classical fields) 3
Outline • Differential operator – `d’ Calculus of a single variable: chain rule, FTVC • • Partial differentials – partial chain rule Gradient, vector differential (del operator) Differential line, area, volume elements (dl, da, d¿) Relation between d, , dr • Curl and Divergence – differential `d’ in higher dimensions Geometric interpretation (boundary) • Laplacian – unique 2 nd derivative: curvature Projection into longitudinal / transverse components 4
Differential operator • Definition – Infinitesimal – Relation between differentials – Becoming finite: ratio / infinite sum – Chain rule 5
Partial differentials • Partial differential • Chain rule • Partial derivative • List of differentials 6
Gradient – del operator • Separate out vectors – Differential operator – Del operator – Line element • Relation between them – Differential basis: dx, dy, dz Example: d (x 2 y) 7
Example 2 d vs. 3 d gradients 8
Higher dimensional derivatives • Curl – circular flow • Divergence – outward flux – Derivative lies on the boundary – It is a higher dimensional density – More detail in Integral / Stokes / Gauss section 9
Unification of vector derivatives • Three rules: a) d 2=0 , b) dx dy = - dy dx , c) dx 2=0 • Differential (line, area, volume) elements as transformations 10
Summary of 3 derivatives • Three rules: a) d 2=0, b) dx 2 =0, c) dx dy = - dy dx • Differential (line, area, volume) elements as transformations 11
Product Rules • Combine vector and derivative rules • How many distinct products? (combinations of dot, cross) 12
nd 2 derivative: the Laplacian • Net curvature of a scalar function; Net ? ? ? of a vector function? • How many 2 nd derivatives? (combinations of dot, cross) 13
Projections of the Laplacian 14