Add to ORKGIf physics is a science that unveils the fundamental laws of nature, then the appearance of mathematical concepts in its language can be surprising or even mysterious. This was Eugene Wigner's argument in 1960. I show that another approach to physical theory accommodates mathematics in a perfectly reasonable way. To explore unknown processes or phenomena, one builds a theory from fundamental principles, employing them as constraints within a general mathematical framework. The rise of such theories of the unknown, which I call blackbox models, drives home the unsurprising effectiveness of mathematics. I illustrate it on the examples of Einstein's principle theories, the $S$-matrix approach in quantum field theory, effective field theories, ...
This paper aims to provide a contribution to the research in physics education regarding the interpl...
T he nature of the relationship between mathematics and the physical world has been a source of deba...
Extraordinary mathematicality of physics is also shown by dimensionlessness of Planck spacetime and ...
If physics is a science that unveils the fundamental laws of nature, then the appearance of mathemat...
The validity of a mathematical statement is judged by its logical consistency. The validity of a phy...
In his essay The Unreasonable Effectiveness of Mathematics in the Natural Sciences, the physicist Eu...
Why does mathematics work so well in describing some parts of the natural world? This question is pr...
It is generally expected that the laws of nature are obtained as the end-product of the scientific p...
We argue that E. Wigner’s well-known claim that mathematics is unreasonably effective in physics (an...
In 1960, E.P.Wigner, a joint winner of the 1963 Nobel Prize for Physics, published a paper titled On...
The mathematical nature of modern physics suggests that mathematics is bound to play some role in ex...
A thought experiment involving an omniscient being and quantum mechanics is used to justify non-dedu...
It has been almost eighty years since Paul Dirac delivered a lecture on the relationship between ma...
One of the most unsettling problems in the history of philosophy examines how mathematics can be use...
This paper aims to provide a contribution to the research in physics education regarding the interpl...
T he nature of the relationship between mathematics and the physical world has been a source of deba...
Extraordinary mathematicality of physics is also shown by dimensionlessness of Planck spacetime and ...
If physics is a science that unveils the fundamental laws of nature, then the appearance of mathemat...
The validity of a mathematical statement is judged by its logical consistency. The validity of a phy...
In his essay The Unreasonable Effectiveness of Mathematics in the Natural Sciences, the physicist Eu...
Why does mathematics work so well in describing some parts of the natural world? This question is pr...
It is generally expected that the laws of nature are obtained as the end-product of the scientific p...
We argue that E. Wigner’s well-known claim that mathematics is unreasonably effective in physics (an...
In 1960, E.P.Wigner, a joint winner of the 1963 Nobel Prize for Physics, published a paper titled On...
The mathematical nature of modern physics suggests that mathematics is bound to play some role in ex...
A thought experiment involving an omniscient being and quantum mechanics is used to justify non-dedu...
It has been almost eighty years since Paul Dirac delivered a lecture on the relationship between ma...
One of the most unsettling problems in the history of philosophy examines how mathematics can be use...
This paper aims to provide a contribution to the research in physics education regarding the interpl...
T he nature of the relationship between mathematics and the physical world has been a source of deba...
Extraordinary mathematicality of physics is also shown by dimensionlessness of Planck spacetime and ...