A Suggested Interpretation of the Quantum Theory in Terms of
... the same physical results as are obtained from the of the quantum theory. These usual interpretation three special assumptions are: (1) The P-field satisfies Schroedinger's equation. (2) U we write it =E exp(is/5), then the particle momentum is restricted to y= VS(x). (3) We have a statistical ensem ...
... the same physical results as are obtained from the of the quantum theory. These usual interpretation three special assumptions are: (1) The P-field satisfies Schroedinger's equation. (2) U we write it =E exp(is/5), then the particle momentum is restricted to y= VS(x). (3) We have a statistical ensem ...
Introduction CHAPTER 1
... diffusivity. This equation also describes heat conduction in incompressible liquids if the convective term is negligibly small compared to the conductive term and is the case when the liquid is at rest or the temperature of the liquid changes much faster than the liquid flows. The heat conduction eq ...
... diffusivity. This equation also describes heat conduction in incompressible liquids if the convective term is negligibly small compared to the conductive term and is the case when the liquid is at rest or the temperature of the liquid changes much faster than the liquid flows. The heat conduction eq ...
Comparisons between classical and quantum mechanical
... Satyendra Nath Bose (whom they are named after) and Albert Einstein in 19241925 [20, 37, 38]. It was Einstein who realized that a macroscopic fraction of noninteracting massive bosons will accumulate in the lowest single particle quantum state for sufficiently low temperatures. This new phase of mat ...
... Satyendra Nath Bose (whom they are named after) and Albert Einstein in 19241925 [20, 37, 38]. It was Einstein who realized that a macroscopic fraction of noninteracting massive bosons will accumulate in the lowest single particle quantum state for sufficiently low temperatures. This new phase of mat ...
p-ADIC DIFFERENCE-DIFFERENCE LOTKA
... Accordingly, we must check the well-definedness of these formal solutions. Noting that from Remark 2.4(3), pZp is the domain of the exponential function and 1 + pZp is the domain of the logarithm function [26]. Further addition of elements of pZp belongs to pZp because pZp is an ideal [16, 26]. Let k ...
... Accordingly, we must check the well-definedness of these formal solutions. Noting that from Remark 2.4(3), pZp is the domain of the exponential function and 1 + pZp is the domain of the logarithm function [26]. Further addition of elements of pZp belongs to pZp because pZp is an ideal [16, 26]. Let k ...
