My question is related to explicit extractors and strong blenders. We can define explicit strong blender in a straight forward way.

I want to know if there are any known explicit strong blenders $\small\text{BLE}$ such that

$$\: (X,Y) \mapsto \small\text{BLE}\normalsize(Y,X) \:$$

is also a strong blender?

  • $\begingroup$ Hi -- is there another page that defines blenders? Googling "blenders and extractors" yields interesting, but ultimately irrelevant results. $\endgroup$
    – Henry Yuen
    Apr 28 '12 at 5:03
  • $\begingroup$ blender = "deterministic two-source extractor" $\:$ see books.google.com/… $\endgroup$
    – user6973
    Apr 28 '12 at 5:16

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