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Basel problem (mathematical analysis) Bass's theorem (group theory) Basu's theorem ; Bauer–Fike theorem (spectral theory) Bayes' theorem (probability) Beatty's theorem (Diophantine approximation) Beauville–Laszlo theorem (vector bundles) Beck's monadicity theorem (category theory) Beck's theorem (incidence geometry)
Pages in category "Theorems in mathematical physics" The following 11 pages are in this category, out of 11 total. This list may not reflect recent changes. C.
It includes theorems (and lemmas, corollaries, conjectures, laws, and perhaps even the odd object) that are well known in mathematics, but which are not named for the originator. That is, these items on this list illustrate Stigler's law of eponymy (which is not, of course, due to Stephen Stigler , who credits Robert K Merton ).
The Pythagorean theorem has at least 370 known proofs. [1]In mathematics and formal logic, a theorem is a statement that has been proven, or can be proven. [a] [2] [3] The proof of a theorem is a logical argument that uses the inference rules of a deductive system to establish that the theorem is a logical consequence of the axioms and previously proved theorems.
Feit–Thompson theorem⇔trivially the "odd order theorem" that finite groups of odd order are solvable groups: 1968: Gerhard Ringel and John William Theodore Youngs: Heawood conjecture: graph theory: Ringel-Youngs theorem 1971: Daniel Quillen: Adams conjecture: algebraic topology: On the J-homomorphism, proposed 1963 by Frank Adams: 1973 ...
Theorems in mathematical physics (3 C, 11 P) N. No-go theorems (21 P) T. ... Pages in category "Physics theorems" The following 31 pages are in this category, out of ...
Despite the greatest strides in mathematics, these hard math problems remain unsolved. ... in 20th-century math: the solution to Fermat’s Last Theorem. Sir Andrew Wiles solved it using Elliptic ...
In mathematics, a fundamental theorem is a theorem which is considered to be central and conceptually important for some topic. For example, the fundamental theorem of calculus gives the relationship between differential calculus and integral calculus . [ 1 ]