# mathematical foundations of quantum mechanics in a sentence

- John von Neumann established a rigorous mathematical framework for quantum mechanics in his 1932 work "
*Mathematical Foundations of Quantum Mechanics* ". - In a chapter of " The
*Mathematical Foundations of Quantum Mechanics* ", von Neumann deeply analyzed the so-called measurement problem. - Heisenberg first came to Copenhagen in 1924, then returned to G鰐tingen in June 1925, shortly thereafter developing the
*mathematical foundations of quantum mechanics*. - In his 1932 book " The
*Mathematical Foundations of Quantum Mechanics* ", John von Neumann argued that the mathematics of quantum mechanics allows for the Consciousness and measurement. - The notion of a ringed topos has applications to deformation theory in algebraic geometry ( cf . cotangent complex ) and the
*mathematical foundation of quantum mechanics* ( see for example Bohr topos ). - It's difficult to find
*mathematical foundations of quantum mechanics* in a sentence. - Von Neumann was the first to establish a rigorous mathematical framework for quantum mechanics, known as the Dirac von Neumann axioms, with his 1932 work "
*Mathematical Foundations of Quantum Mechanics* ". - In this book he credits John von Neumann's "
*Mathematical Foundations of Quantum Mechanics* " ( 1955, 1932 ) with providing an " orthodox " quantum mechanics demonstrating mathematically the essential role of quantum physics in the mind. - The first complete mathematical formulation of this approach, known as the Dirac von Neumann axioms, is generally credited to John von Neumann's 1932 book "
*Mathematical Foundations of Quantum Mechanics* ", although Hermann Weyl had already referred to Hilbert spaces ( which he called " unitary spaces " ) in his 1927 classic paper and book.