0708-1300/Class notes for Tuesday, September 11: Difference between revisions

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In Small Scales, Everything's Linear

	${\displaystyle \longrightarrow }$
${\displaystyle z}$	${\displaystyle \mapsto }$	${\displaystyle z^{2}}$

Code in Mathematica:

QuiltPlot[{f_,g_}, {x_, xmin_, xmax_, nx_}, {y_, ymin_, ymax_, ny_}] :=
Module[
  {dx, dy, grid, ix, iy},
  SeedRandom[1];
  dx=(xmax-xmin)/nx;
  dy=(ymax-ymin)/ny;
  grid = Table[
    {x -> xmin+ix*dx, y -> ymin+iy*dy},
    {ix, 0, nx}, {iy, 0, ny}
  ];
  grid = Map[({f, g} /. #)&, grid, {2}];
  Show[
    Graphics[Table[
      {
        RGBColor[Random[], Random[], Random[]],
        Polygon[{
          grid[[ix, iy]],
          grid[[ix+1, iy]],
          grid[[ix+1, iy+1]],
          grid[[ix, iy+1]]
        }]
      },
      {ix, nx}, {iy, ny}
    ]],
    Frame -> True
  ]
]

QuiltPlot[{x, y}, {x, -10, 10, 8}, {y, 5, 10, 8}]
QuiltPlot[{x^2-y^2, 2*x*y}, {x, -10, 10, 8}, {y, 5, 10, 8}]

See also 06-240/Linear Algebra - Why We Care.

Class Notes

Let ${\displaystyle U}$, ${\displaystyle V}$ and ${\displaystyle W}$ be two normed finite dimensional vector spaces and let ${\displaystyle f:V\rightarrow W}$ be a function defined on a neighborhood of the point ${\displaystyle x}$

Definition:

We say that ${\displaystyle f}$ is differentiable (diffable) if there is a linear map ${\displaystyle L}$ so that Failed to parse (SVG (MathML can be enabled via browser plugin): Invalid response ("Math extension cannot connect to Restbase.") from server "https://wikimedia.org/api/rest_v1/":): {\displaystyle \[\lim_{h\rightarrow0}\frac{|f(x+h)-f(x)-L(h)|}{|h|}.\]} In this case we will say that ${\displaystyle L}$ is a differential of ${\displaystyle f}$ and will denote it by ${\displaystyle df_{x}}$.

Theorem

If ${\displaystyle f:V\rightarrow W}$ and ${\displaystyle g:U\rightarrow V}$ are diffable maps then the following asertions holds:

1)${\displaystyle df_{x}}$ is unique.

2)${\displaystyle d(f+g)_{x}=df_{x}+dg_{x}}$

3)If ${\displaystyle f}$ is linear then ${\displaystyle d(f)_{x}=f}$

4)${\displaystyle d(f\circ g)_{x}=df_{g(x)}\circ dg_{x}}$

5)For every scalar number ${\displaystyle \alpha }$ it holds ${\displaystyle d(\alpha f)_{x}=\alpha df_{x}}$