Three questions without scientific answers

Although I have spoken about some of these things in other posts, I’ll put together here three questions that, for now, don’t have a scientific answer, and perhaps never will.

• Did the universe begin to exist at the Big Bang, or was there something before? This controversy is much older than many think. Three quarters of a millennium ago, Thomas Aquinas wrote this in his Summa Theologiae (Part I, Question 46):

It cannot be proven by demonstration that the world has not always existed.

In other words, according to Aquinas, the question of creatio originans (that the world had a beginning) cannot be solved by human reason. It should be noted, however, that creatio ex nihilo (the fact that the world was created) would be within the reach of reason. In other words: reason would let us reach the conclusion that the universe was created, but we cannot prove that it had a beginning.

The controversy came back to the forefront with the triumph of the Big Bang cosmological theory. Alternative theories (which I described in another post) disagree on whether the time associated with our universe began with the Big Bang. Our two main physical theories do not let us know what happened before Planck’s time (5×10^-44 seconds after the Big Bang), so those proposals must be considered, at least for the time being, speculations without a scientific basis.

On the other hand, the second principle of thermodynamics, which predicts the heat death of the universe, seems to imply that the universe must have had a beginning. Otherwise, we would be now in thermal death. We know that this principle applies throughout the known history of the universe, but did it also apply before the Big Bang, assuming this phrase makes sense? Nobody knows.

Aristotle

• Is the universe finite or infinite? Paraphrasing Aristotle, we could say that

Nature abhors infinities.

The two current physical theories present a problem: they both predict infinities. General relativity does that in gravitational singularities: the Big Bang and black holes, whose density would be literally infinite. Quantum mechanics, in the vacuum energy and other quantities that must be renormalized in quantum field theory. Some scientists think that a quantum theory of gravity, that we still don’t have, would eliminate these infinities. If so, we need to wait until a future genius will solve it.

But my initial question in this section refers to something else:

Is space finite or infinite?

Cosmologists disagree on the answer to this question. Some, like Einstein, would rather the universe be finite, although unlimited. Others say that it could be infinite, and draw the consequence that everything that happens and has happened on Earth, including our personal life, must be repeated in an infinite number of places in the universe. In 2014, Soler Gil and I published an article that refutes some of these arguments. That article contains the following paragraph:

[I]f we start from the standard cosmological model, the possibility that the universe is infinite can only be deduced if an additional postulate is accepted, namely the so-called ‘cosmological principle’, which asserts that the universe is homogeneous and isotropic at sufficiently large scales. This principle is necessary to extrapolate the cosmological description of the universe beyond the boundaries of the observable universe. However, its introduction gives rise to serious problems. In fact, the cosmological principle is being increasingly questioned from both sides: theoretical arguments and observational evidence. Therefore an agnostic position with respect to the extrapolation of the known universe beyond our horizon seems to be epistemologically reasonable, especially when that extrapolation leads to infinity.

Gregory Chaitin

• Is everything in the universe the work of chance? Perhaps this question does not make sense, since chance is undecidable, as Gregory Chaitin proved (see this post in my blog). His theorem, proven in 1975, says in essence the following:

The randomness of integers is undecidable. Although randomness can be defined accurately and can even be measured, in general it cannot be proved that a set of numbers is random. This sets a new limit to what is possible in mathematics. (Randomness and Mathematical Proof, Scientific American 232, No. 5, May 1975, pp. 47-52).

In the same post I described a thought experiment that shows that the discrimination between chance and design is undecidable. If, starting from my experiments on artificial life, I ended up by creating a world designed by me, where intelligent beings appeared, these beings could come to the conclusion that their existence was a consequence of chance, when in fact it would be a clear case of design. If they would decide that I don’t exist, it seems to me that they would be wrong.

One of my science fiction novels, Jacob’s Ladder, is based on this idea.

The same post in Spanish

Thematic Thread about Standard Cosmology: Previous Next

Manuel Alfonseca