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Posted
Does anyone have an idea how to prove the following:

 

[math] h(A\cup B' date=' C\cup D) \leq \max\{h(A,C), h(B,D)\} [/math']

(I think that there might be a small problem with your notation, since if the sets in question are open, there is, in general, no maximum or minimum distance between them. You would have to use [math]\sup[/math] and [math]\inf[/math] instead of [math]\min[/math] and [math]\max[/math] respectively.)

 

As with most things in Topology, it really helps to have an intuitive notion of what a definition 'actually means'. In this case, here's what I have as my 'internal definition' of [math]h(A,B) = r[/math]

 

"Every point in [math]A[/math] is at most [math]r[/math] units away from a point in [math]B[/math]."

 

Thus, with this in mind, we can formulate an idea for the proof. (You should be able to handle the details on your own.)

 

So, what does [math]h(A\cup B, C\cup D) = r_1[/math] mean? It means that:

 

Every point in [math]A[/math] and [math]B[/math] is at most [math]r_1[/math] units away from some point in [math]C[/math] or [math]D[/math].

 

With this in mind, we can easily see that (i.e. you have to manipulate the definitions to prove this):

 

[math]h(A\cup B, C\cup D) \leq \max\{h(A, C\cup D),h(B,C\cup D)\}[/math].

 

However, it is also clear that (again, fill in the details):

 

[math]\max\{h(A, C\cup D),h(B,C\cup D)\} \leq[/math][math] \max\{h(A, C), h(B,D)\} [/math] (This part is simply a basic application of the definition of Hausdorff distance.)

 

Technically, [math] h(A\cup B, C\cup D) \leq \max\{h(A,D), h(B,C)\} [/math] as well, since the problem is 'symmetric with respect to the sets'.

Posted

Yes, it has to be with d14a0010402868c659cf97719a81a8c4.gif and 1fe856dba55c5f376906d1bfd2012c0b.gif instead of the 39671a121c7d9fc8a4e8b1ffb468f9ad.gif and 4a78fd5a3933c3ffd86782b3be7cacbd.gif. I mixed up two definitions.

 

By the way, in the meantime I was able to prove it in a different (but somewhat more tricky) way, you might be interested.

 

First, I give the definition of the e1671797c52e15f763380b45e841ec32.gif-thickening of a set 951196ca354c5c72b8356494f97c3b5d.gif:

a3c24ed36fa6758c5dc9ef1bb4ea1817.gif is the collection of all points within a distance 1a96d24b78a5995681e97e696f2065a8.gif of a point of A.

It's similar to a Ball in a metric space.

 

Next, let 94840e6503aec0d62862b69fdb9a932a.gif and daa8c355813df91469287bcf2c844dac.gif. Then it is easy to see that

968d05ebf8dcb21e5aef66843165529f.gif

3bd1a6317ffab940ea6a9e8fd46f7b2d.gif

 

Take e44c7b18c16ccda8249dd442f638a3df.gif, then is easely follows that

839b4d004ce5d3079fa8cc087dc0b938.gif

1a4b3f39b9e1254cba26c17dc51e9364.gif

 

Hence, bb9b4c1074729bd48579a0602b490616.gif

It is easy to show that 657ccd6aad1f652c3175b8d7edc94fd7.gif

 

Combining these last two inclusions we see 9cb615b41f3f92e7a005ebcddb4a767b.gif

You can prove, using the same arguments, that 6382a2ba0c84ad527ef8d1e5f9328b3f.gif

 

And so it follows that, 7383b517a0557e72c28502d50559042a.gif

 

But your approach is a tad more easy I think...

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