James Tauber

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Next Film After Alibi

After we finished principal photography on Alibi Phone Network, I suggested our next short film should expand in one of the following three dimensions:

• length
• format (i.e. MiniDV to HD)
• cast/crew/prop/location requirements

Tom has been working on a great script that I definitely want to produce—the problem is it expands on Alibi in all three dimensions simultaneously: 40 mins versus 14; really deserves HD rather than MiniDV; massive increase in cast/crew/prop/location requirements. To do well, it would take 5 times as long a shoot and 10-20 times the budget of Alibi and, particularly given my lack of experience on HD, just too much of a risk.

So today I suggested to Tom that we think about an intermediate project. One that is around 20-25 minutes, shot on HD but not requiring much more beyond Alibi in terms of cast/crew size, number of locations, etc.

I have an idea I came up with in 2001 that would probably fit well. Watch this space!

by jtauber : Created on Dec. 7, 2004 : Last modified Feb. 8, 2005 : Categories filmmaking in_the_light_of_day : (permalink)

MorphGNT v5.03 available

More corrections now and more coming soon.

Version 5.03 contains a major correction to the lemma PRO; a correction to MYRA; some spelling distinctions ENEKEN/ENEKA, BETHSAIDA(N), GOLGOTHA(N); and case corrections in proper names GERASENOS, STEFANOS, FOROS, TREIS, TABERNE, DIABLOS.

See MorphGNT.

by jtauber : Created on Dec. 7, 2004 : Last modified Feb. 8, 2005 : (permalink)

Poincare Project: Connectedness, Closed Sets and Topological Properties

Some topological spaces have the property that they can be decomposed into two disjoint non-empty open sets. In other words, there exist two non-empty open sets whose intersection is empty but whose union is the entire space. Take our ball of clay and cut it in half.

Such a topological space is said to be disconnected. Topological spaces for which this is not true are said to be connected.

Another way of defining the same notion of connectedness is via the notion of closed sets. (The existence of open sets suggested there would be something called closed sets right?)

A closed set of a topological space is simple one whose complement is open. In other words, if you have an open set, then the set of points not in that open set is a closed set. One interesting property of this definition is it allows a set to be both open and closed at the same time. If a set and its complement are both open, then both sets are also closed.

Because, by definition, the empty set and the set of all points in a topological space are open sets, they are also closed sets. And here is where we come to the definition of connectedness based on closed sets.

A topological space is connected if and only if the only two sets that are both open and closed are the empty set and the set of all points. If any other sets are both open and closed then the topological space must be disconnected.

It is fairly easy to see why this is true. If two disjoint non-empty open sets A and B have a union which is the entire space then A and B are each others complements. Therefore A must be closed (because B is open) and B must be closed (because A is open). Therefore A and B are both open and closed.

Connectedness is said to be a topological property because it is based purely on the open sets and no additional structure. Because topological properties are based only on the open sets, they are preserved by a homeomorphism. All homeomorphisms preserve all topological properties. So if a space is connected, then any space homeomorphic to it will also be connected. An important corollary is that you can never find a homeomorphism between a connected space and a disconnected one, or between any two spaces that have differing topological properties.

In the example of cutting our ball of clay in half, the before and after are not homeomorphic because the before is connected and the after is disconnected. Again, we've ripped apart points that were once in lots of open sets together so that now the only open set they share is the topological space as a whole.

UPDATE: next post

by jtauber : Created on Dec. 7, 2004 : Last modified Feb. 8, 2005 : Categories poincare_project : 1 comment (permalink)