In quantum mechanics, a free electron is described by exp(i(kx-wt) where E = hbar w =(hbar k)2/2m. This has the math form of a “wave”. If, on the other hand, one tries to define a complex conditional probability for a bound electron in the following manner: P(p/x) = [fp exp(ipx)]/ [Sum on p fp exp(ipx) ] ((1)) some unusual properties of this probability arise. The purpose of this note is to try to examine these
In part I of this note, we argued that exp(ipx) written as a 2-vector is solution of a 2x2 rotation ...
In a previous note, we argued that a quantum wavefunction W(x) is a relative conditional probability...
Free quantum particles may be represented by a wavefunction of exp(ipx) where “px” suggests a resolu...
In previous notes, we argued that the quantum wavefunction W(x) is associated with a conditional pro...
Bound state quantum mechanics is formulated as a statistical theory in which averages seem to be giv...
If one defines a conditional probability P(p/x) = a(p) exp(ipx) / W(x) where W(x)=wavefunction then ...
In Part II of this note, we argued that if one describes a bound particle in a potential in a statis...
Traditional quantum mechanics seems to start with the Schrodinger equation which is solved for a fun...
Two common classical waves are sound waves in pipes and waves on strings which may have various “end...
In a previous note (1), we argued that quantum bound states may follow from a postulate regarding re...
Recently, there have been a number of papers in the literature dealing with the calculation of Sp + ...
In a number of previous notes, we suggested writing a quantum conditional probability P(p/x)=a(p)exp...
In a number of previous notes, we have argued that the bound state quantum problem may be considered...
In earlier notes, quantum mechanics was described in terms of conditional probability yielding an av...
In a previous note (1), we argued that W(x+dx)= W(x) exp(i dx ) where = - i d/dx lnW mimicking the b...
In part I of this note, we argued that exp(ipx) written as a 2-vector is solution of a 2x2 rotation ...
In a previous note, we argued that a quantum wavefunction W(x) is a relative conditional probability...
Free quantum particles may be represented by a wavefunction of exp(ipx) where “px” suggests a resolu...
In previous notes, we argued that the quantum wavefunction W(x) is associated with a conditional pro...
Bound state quantum mechanics is formulated as a statistical theory in which averages seem to be giv...
If one defines a conditional probability P(p/x) = a(p) exp(ipx) / W(x) where W(x)=wavefunction then ...
In Part II of this note, we argued that if one describes a bound particle in a potential in a statis...
Traditional quantum mechanics seems to start with the Schrodinger equation which is solved for a fun...
Two common classical waves are sound waves in pipes and waves on strings which may have various “end...
In a previous note (1), we argued that quantum bound states may follow from a postulate regarding re...
Recently, there have been a number of papers in the literature dealing with the calculation of Sp + ...
In a number of previous notes, we suggested writing a quantum conditional probability P(p/x)=a(p)exp...
In a number of previous notes, we have argued that the bound state quantum problem may be considered...
In earlier notes, quantum mechanics was described in terms of conditional probability yielding an av...
In a previous note (1), we argued that W(x+dx)= W(x) exp(i dx ) where = - i d/dx lnW mimicking the b...
In part I of this note, we argued that exp(ipx) written as a 2-vector is solution of a 2x2 rotation ...
In a previous note, we argued that a quantum wavefunction W(x) is a relative conditional probability...
Free quantum particles may be represented by a wavefunction of exp(ipx) where “px” suggests a resolu...
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