Re: A set containing a nonempty open interval
- From: "Amanda" <sca18@xxxxxxxxxxx>
- Date: 26 Aug 2005 13:51:11 -0700
OK, the word "open" can be omitted. The problem is: If a set A has
positive Lebesgue measure, then show that (A + A)/2 = {(x + y)/2 | x
and y are in A} contains an interval (assuming intervals are non empty
sets).
Amanda
.
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- A set containing a nonempty open interval
- From: Amanda
- Re: A set containing a nonempty open interval
- From: Keith A. Lewis
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- A set containing a nonempty open interval
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