Line 3: Line 3:
 
----
 
----
 
Some 2D signals are <math>\ \delta\left (\mathit{x}, \mathit{y}\right )</math>,Rect<math>\left (\mathit{x}, \mathit{y}\right )</math>,Sinc<math>\left (\mathit{x}, \mathit{y}\right )</math>.One important property of 2D functions is that they are separable,when they are a product of two 1D signals.They are of the form :
 
Some 2D signals are <math>\ \delta\left (\mathit{x}, \mathit{y}\right )</math>,Rect<math>\left (\mathit{x}, \mathit{y}\right )</math>,Sinc<math>\left (\mathit{x}, \mathit{y}\right )</math>.One important property of 2D functions is that they are separable,when they are a product of two 1D signals.They are of the form :
   <math>\ \mathbf{f}\left (\mathit{x}, \mathit{y}\right )=\mathbf{g}\left (\mathit{x}\right )</math> \*\mathbf{h}\left (\mathit{y}\right)
+
   <math>\ \mathbf{f}\left (\mathit{x}, \mathit{y}\right )=\mathbf{g}\left (\mathit{x}\right )</math> \times\mathbf{h}\left (\mathit{y}\right)

Revision as of 20:32, 5 November 2009

TWO DIMENSIONAL SIGNALS


Some 2D signals are $ \ \delta\left (\mathit{x}, \mathit{y}\right ) $,Rect$ \left (\mathit{x}, \mathit{y}\right ) $,Sinc$ \left (\mathit{x}, \mathit{y}\right ) $.One important property of 2D functions is that they are separable,when they are a product of two 1D signals.They are of the form :

  $ \ \mathbf{f}\left (\mathit{x}, \mathit{y}\right )=\mathbf{g}\left (\mathit{x}\right ) $ \times\mathbf{h}\left (\mathit{y}\right)

Alumni Liaison

Ph.D. on Applied Mathematics in Aug 2007. Involved on applications of image super-resolution to electron microscopy

Francisco Blanco-Silva