Putting the Elephants to Work by Jonathan J. Dickau

Jonathan,

You say, " ... it is necessary to assume that the geometry becomes both non-commutative and non-associative at that point. That is the gist of what Tevian primarily agreed with."

The geometry never becomes non-commutative or non-associative. That's impossible, because geometry (generalized to topology) is continuous. The properties are mathematical artifacts--the point I was making.

The least (only) representation of a complete algebra is the 2 dimensional complex plane, facilitating 4 dimension analysis -- and the least physically complete representation of 4 dimension geometry is the Minkowski space-time.

One gets a 16 point matrix from this artifact, 6 points of which are redundant with the 3-space coordinates of ordinary existence, leaving 10. So plenty of connections/relations available--with the constraint that the time parameter is included, not calculated out, nor normalized. This one extra degree of freedom compels the nonlinearity of the time metric (and accelerated relative motion) consistent with Einstein's observation that,

"The law of heat conduction is represented as a local relation (differential equation), which embraces all special cases of the conduction of heat. The temperature is here a simple example of the concept of field. This is a quantity (or a complex of quantities), which is a function of the co-ordinates and the time."

And the definition, also given by Einstein,

"I think of a quantum as a singularity, surrounded by a large vector field. With a large number of quanta a vector field can be composed that differs little from the one we presume for radiation."

All of which points to a complete field theory of quantum gravity--and by implication--to the origin of consciousness.

How does one account for the integrated role of time in your static model?

Dear Jonathan,

To say like "It seems silly to ask how aimless Math can give life and the universe a sense of

direction, when Mathematics is anything but aimless......" is quite wrong within itself because, the mathematical terms as we derive in circular motion, v^2/r is actually mindless terms but see my essay 'Newtonian Dynamics: An explict diversion...' how big scientific breakthrough could it posses when a bit sense is applied on it. And saying like "Seeing Math as dry - as though it was mindless and lifeless - is the real problem, and the mystery of where evolution..........." is always not to be true as our mathematical framing are based on mostly in virtual or imaginary tendency whose real applicants are only observed indirectly through a different path way than it directly refers..and to observe its real presence we need to create the 'sixth sense'.

Dear Jonathan,

".........and I am sure that you can appreciate how a wheel without friction continues spinning endlessly"- please note that this term directly reflect the conservation of angular-momentum which is impossible in none of frame or place in reality because, to move endlessly requires setting no friction but in real practical world it is impossible...whether you perform in empty space or here on earth surface....most of time we refer the perfect empty-space as a possible test of different thought experiments but we all forget that the extrinsic-effect interactions on any body is almost impossible there.. and so, the impeding force you say is never effective to any body extrinsically there in one aspect and in other way in gravitating surface we could not reduced the friction zero.....

best regards from Nepal

Hi Jonathan,

Good to be in another contest with you and to read your excellent paper.

I am reluctant to put a crown on language or mathematics. I consider mathematics as an evolution of language. And mathematics itself is a forever evolving ring of power. And as a ring of power it is a false god. The ring of power caused Frodo no end of trouble!

Nevertheless this essay is one of the best.

Put on your never ending list of things to do (it's important) to read my two papers on gravity and dark energy. These are listed in my about the author section.

Will mathematics grow up (evolve) and solve its own problems :)

Don Limuti

Hi dear Jonathan,

It is a pleasure to re-meet you here in FQXi Essay Contest.

I have just read your nice Essay. As usual, you released a remarkable contribution. In this case, your Essay seems also a bit provocative, but I strongly appreciate people "thinking outside the box". Hence, your Essay deserves the highest score that I am going to give you. Good luck in the Contest!

Cheers, Ch.

Jonathan,

I've been looking forward to reading an essay arguing the more minority view and I found you did an excellent job, though I can't say you reversed my support of physical 'causality' in the universe, which at times your language seemed to challenge; i.e. mathematics 'giving rise to processes' and 'telling the universe what to create'.

I assume you really haven't abandoned cause and effect, i.e. an action producing an effect not the mathematics that describes it, but if that's true then appearing to do so did seem to need a little more explanation.

I have a rudimentary understanding of non-commutativity and non-associative geometry but both seemed in need of your definition before invoking them so heavily. Similarly I never did see or fully understand your own view of what the elephant in the room actually was. I've long understood and rationalised octonians, fractals and perturbation theory (to higher orders), loved the amplituhedron, and know those in QG see it as the only way ahead, but do you felt you introduced any new argument to win over those less sold on the concepts?

I was interested in your comments on the '2D' higher order case that some math posits, (which seems rather at odds with 10D!). What I first saw I tended to dismiss as 'unreal' understanding but for me such responses are always provisional so can you provide any good links on that?

Nicely written and argued as usual and I think should certainly be a finalist.

I hope you may also offer a mathematical perspective on classical momentum transfer distributions I describe in my own essay appearing to reproduce QM's predictions.

Best wishes

Peter

Hi Jonathan,

I read your submission and I am glad that you are one of the many people in this contest that choose the math aspect of the contest question to answer instead of the the mind aspect. Reading your article I find out you are a fan of string theory. That does not make me happy, but I can't count it against your article. What I do count against your article is the fault in your logic over two of your sentences that seems to be the basis of your whole article. The bold words in the quote of yours are mine to make my point. Here are your sentences.

"The Principle of Indeterminacy could then arise in a natural fashion from relativistic considerations, making quantum theory a consequence of an underlying 8-dimensional hidden-variable process, very much in the flavor of the theories of de Broglie and Bohm." [3] So we see that octonion Math dictates emergence."

You've taken a could and turned it into a dictates. That to me is a fault in logic.

The other problem I seem to be having is this disease of "math predates the universe". I just wrote this post to James Stanfield on his submission page and I feel it is equally valid here. I quote the relevant parts.

"I read your interesting submission and if I had excepted its premise (math predates universe) I would give it high marks. But I don't except its premise because I was working on the very same idea years ago and I found out where the idea fails. If you disagree on my conclusion, please tell me where I went wrong.

The stumbling block for me concerning the idea that math predates the universe was how is this communicated to the universe. Math is no small subject in terms of quantity of information in contains. While I was trying to figure this out, I had also decided to read a book that had been on my shelf for many years "Adventures In Group Theory" by David Joyner. the book explains group theory through the puzzle of Rubik's Cube, which I learned to solve independent of books teaching how to solve. I figured my knowledge of Rubik's Cube would help me in understanding group theory. So I learned some group theory and it impressed on me the the consequences of numbers and their relationship to other numbers of the same quantity. So then I asked the very simple question; the universe started out as one object and went on to many objects, between that time it passed through six objects, those six objects instantly possessed the rules of group theory for six objects, where did it get them? My current answer is that it didn't get them from anywhere, the rules for six objects in group theory are there only if we asked them. I am not pioneering a new thing in math here. You, yourself already know that spacetime is only considered Euclidean if the rules of Euclidean geometry apply, otherwise it is non-euclidean. All I am saying is that the rules of any particular topic of math when applied to this universe only apply when asked and give an answer in the positive or the negative. To exaggerate my statement. Do the rules of topology apply to the color of my grass in my backyard? No. Do the rules of topology apply to the surface of the donut I eat this morning? Yes. Euclidean geometry only shows up where the rules of Euclidean geometry are valid. Topology only shows up where the rules of topology are valid. Group theory only shows up where the rules of group theory are valid. Set theory only shows up where the rules of set theory are valid. I could go on all day like this."

If you also feel I have errored in some way, I would like to know.

Jim Akerlund

Jonathan J. Dickau,

Evolution starts from biological virus.

Knowledge of virology, linguistic, memes, contagion and mechanics of computer virus can help us solve this problem.

Johnathan, I am pleasantly surprised by how accessible and enjoyable your essay was considering it was primarily about mathematics.Well done. I think the point you make about complex algebras being non commutative and naturally related to geometry and sequential change very important as that is what a description of the material universe requires. Quaternions have that non commutative characteristic. They are sufficient or modelling evolving 3 dimensional objects and fractals too. I 'm not sure that higher (than 4) dimensional algebras are needed for modelling the material universe we inhabit, though I'm sure they do produce interesting models. Isn't it just that the 3 spatial dimensions unobserved don't have an orientation? we could say they are in all orientations, any orientation or no orientation as orientation is relative and without the observer viewpoint orientation doesn't apply.Could 248 dimensional E8 be an approximation of that? What is it about the higher (than 4) dimensional algebras that makes them particularly relevant. You mentioned hidden variables, and sphere packing -is there something else that in your opinion make them necessary, rather than just appealing? Kind regards Georgina

Thanks Jonathan.

Yes, I completely agree with you that awakening people to part of what we have inside of the box with us is important in the same way that thinking outside the box. What is important in both of the cases is starting from plausible hypotheses and proceeding with mathematical rigor. Your aphorism on elephants is very nice.

I hope that you will have a chance to read our Essay.

Cheers, Ch.