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A Portal Special Presentation- Geometric Unity: A First Look: Difference between revisions

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<p>[01:46:44] Now the question is we've integrated so tight with the matter field, we have to ask ourselves the question, can we see unification here?
<p>[01:46:44] Now the question is we've integrated so tight with the matter field, we have to ask ourselves the question, can we see unification here?


<p>[01:47:01] Let's define matter content in the form of Omega zero tensor spinors, which is a fancy way of saying spinors together. Okay.
<p>[01:47:01] Let's define matter content in the form of $$\Omega^{0}($)$$, which is a fancy way of saying spinors, together with a copy of the $$\Omega^{1}($)$$. And let me come up with two other copies of the same data.


<p>[01:47:14] With a copy of the one forms tendered in the spinors, and let me come up with two other copies of the same data.
<p>[01:47:32] So I'll make $$\Omega^{d-1}$$ by duality so imagine that there's a [[Hodge star]] operator.
 
<p>[01:47:32] So I'll make Omega D minus one just by duality. So imagine that there's a [[Hodge star]] operator.


<p>[01:47:43] And , whereas a little kid, I had the [https://en.wikipedia.org/wiki/Soma_cube Soma cube]. I don't know if you've ever played with one of these things. They're fantastic. And, uh, I later found out that this guy who invented the Soma cube, which you had to put together as pieces, there was one piece that looked like this, this object. And he was like this amazing guy in the Resistance during World War II.
<p>[01:47:43] And , whereas a little kid, I had the [https://en.wikipedia.org/wiki/Soma_cube Soma cube]. I don't know if you've ever played with one of these things. They're fantastic. And, uh, I later found out that this guy who invented the Soma cube, which you had to put together as pieces, there was one piece that looked like this, this object. And he was like this amazing guy in the Resistance during World War II.
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