If mathematical platonism is true, how do biological brains governed by physical laws access eternal platonic mathematical truths? [duplicate]

Question

According to SEP:

Platonism in the Philosophy of Mathematics

Platonism about mathematics (or mathematical platonism) is the metaphysical view that there are abstract mathematical objects whose existence is independent of us and our language, thought, and practices. Just as electrons and planets exist independently of us, so do numbers and sets. And just as statements about electrons and planets are made true or false by the objects with which they are concerned and these objects’ perfectly objective properties, so are statements about numbers and sets. Mathematical truths are therefore discovered, not invented.

The most important argument for the existence of abstract mathematical objects derives from Gottlob Frege and goes as follows (Frege 1953). The language of mathematics purports to refer to and quantify over abstract mathematical objects. And a great number of mathematical theorems are true. But a sentence cannot be true unless its sub-expressions succeed in doing what they purport to do. So there exist abstract mathematical objects that these expressions refer to and quantify over.

Frege’s argument notwithstanding, philosophers have developed a variety of objections to mathematical platonism. Thus, abstract mathematical objects are claimed to be epistemologically inaccessible and metaphysically problematic. Mathematical platonism has been among the most hotly debated topics in the philosophy of mathematics over the past few decades.

If mathematical platonism is true, how did biological brains, shaped by millions of years of evolution, develop the capacity for epistemic access to the Platonic realm of mathematical objects and their properties? Does this Platonic realm causally interact with space and time, and if so, how? How does the physical universe, governed by physical laws, interact with the Platonic realm, such that mathematicians can be said to "discover" rather than "invent" eternal mathematical truths that transcend space and time?

I'm asking this motivated by the answer I accepted in my previous question: Since mathematicians are physical beings, does this mean that mathematics ultimately reduces to physics?

Answer 1

You are fallaciously assuming your own conclusion

You have, in your assumption here, and in the prior question, and in the answer you accepted, an unquestioned presumption that the material world is causally closed.

Make that assumption, and knowledge of mathematics, or any interaction with abstract objects, is of course inexplicable. You are just in conflict with your own circular presumption.

Matter is not causally closed

However, there is no justification behind this assumption. Matter is not fundamental per our modern physics. It can be created, and destroyed. What IS fundamental -- is not at all clear. We have math equations that seem to describe aspects of our universe that have no matter -- is the MATH fundamental? Some physicists think so. Most don't, but don't have any coherent alternative.

What we have with physics is not a fundamental ontology, we have a pragmatic practice. And that practice presumes several things:

• Mathematics
• Logic relations
• Matter
• Collections of matter into objects

Physics, therefore PRESUMES abstract objects: mathematics, logic relations, material objects (which are matter/abstraction fusions).

Summary

The interaction of abstractions with matter, is intrinsic to physics, and given physics, matter is not causally closed to abstractions.

Answer 2

1. We learn mathematics at school. Learning the concepts, the mathematical operations and some algorithms, e.g. how to multiply or how to divide in written form.

   The question, how we learn, is better addressed to experimental psychologists like Piaget, not to a philosopher and mystic like Plato.

2. A main source where Plato presents his theory of forms is Socrates’ speech in the Symposion (Search for “tale of love”). Here Socrates describes the ascend by continued abstraction from physical beauty to the idea of beauty. The final step, recognizing the abstract idea, is an act of mystic intuition.

3. Plato tells us a story and develops a metaphor. He does not explain the final mechanism. It is one of the characteristics of a metaphor to skip the explanation of the mechanism.

Hence I do not see that your title question finds an answer:

• First, the existence of Platonic ideas is debatable. It is controversial how useful Plato's model of cognition is.
• Secondly, Plato himself does not explain the mechanism underlying his theory. Probably he has no explanation.

Answer 3

This question, that question and your accepted answer partake of the same fallacy¹ I elaborated viz. You assume the physical brain = the non physical mind. And then you straightforwardly arrive at the fact that only the physical realm is apprehendable by mind (= brain) and so real. IOW you assume physicalism find yourself in physicalist jail and then protest:

Why don't others enjoy life in my prison?

Well... as the saying goes it's different strokes for different folks.

So consider that for some of us, we feel claustrophobic especially in voluntarily chosen prisons and the boot is really on the other foot:

If you are a human being and have any concept whatsoever that is space time independent — math is just an intensively developed example — how can you not be a Platonist?³

So even the trivial belief in the color green as something other than trees, grass etc makes you a Platonist.

Here is an older question where by not allowing for the letter 'e' to have Platonic existence apart from:

• what you see on your screen
• ditto mine
• the shape(s) of your handwriting
• ditto mine
• the ASCII (unicode²) number assigned
• The bits transmitted around the World-Wide-Web
• etc

one gets really wild and nonsensical conclusions.

---

¹ There are many more rebuttals there, some better than mine.

² Of course we all do have space time dependent thoughts also, in zillions: eg.

• I'm hungry!
• Where the &=@?* are my keys?
• And so on

³ The early Unicode standard making the same point actually recommended to think of characters as Platonic entities apart from glyphs, codes etc. I'm however not able to find that statement now.

Answer 4

The same way that fish "discovered" fluid dynamics and birds and insects discovered aerodynamics.

Evolution by natural selection tends to develop and enhance strategies that prove to be useful in the ecosystem of the organism. Abstract thought and mathematical abilities are simply two of those abilities that have become pronounced in humans. When you combine these abilities you get the ability to consider and discuss platonic ideals, among other things.

Is there really that much difference from our ability to discover physical laws, such as quantum mechanics and relativity? In both cases, we apply our abstraction and induction capabilities to imagine general processes and structures that explain what we've observed. When applying this to the physical world we get objects like atoms and subatomic particles; when applying it to math we get the platonic objects.

Answer 5

If mathematical platonism is true, how do biological brains governed by physical laws access eternal platonic mathematical truths?

What they are really accessing is which thoughts can be formed and which thoughts cannot be formed. Thoughts are physical patterns of neuron activation. We cannot imagine a flat Euclidean triangle whose corners sum to more than 180 degrees; we cannot physically form such a thought.

Is it possible to build a bridge spanning this river, capable of supporting a 10 ton truck and made of steel weighing less than 100 tons in total? This is the same kind of question as whether we can imagine a Euclidean triangle whose corners sum to more than 180 degrees. They are both questions about the feasibility of a physical object.

The universe is filled with infinite patterns that arise naturally. Which way the river flows, the height of the ridges formed by water in the sand. Mathematics studies how some of these patterns can form - and how some cannot form - within the human brain.