As mentioned in previous notes, there exist derivations of the Schrodinger equation in the literature based on stochastic equations and spatial density. In this note, we focus on a particular derivation (1) which makes use of osmotic velocity using an operator which describes a Brownian type motion. The Schrodinger equation follows in (1) from a Newton type equation with d/dt being replaced by an operator which tracks stochastic motion. In particular, the spatial density is set equal to W*(x,t)W(x,t) at the last moment, where W(x,t) is a complex function. We compare the approach of (1) to one in which statistical ideas are applied from the beginning to obtain a conditional probability P(p/x)=a(p)exp(ipx)/W. This together with KEave(x) +...
In a quantum bound state,spatial density is given by W(x)W(x), where W(x) is the wavefunction, avera...
In the frames of classical mechanics, the generalized Langevin equation is derived for an arbitrary ...
An extension ofstochastic mechanics which allows for non-local potentials i described. It leads, in ...
As mentioned in previous notes, there exist derivations of the Schrodinger equation in the literatur...
In the literature, stochastic approaches employed to derive the Schrodinger equation seem to focus o...
Brownian motion is formulated in the form d/dt (partial) spatial density = D d/dx d/dx density. This...
In this note, we investigate two velocities present in a quantum bound state. The first is the root...
In this paper, I review the link between stochastic processes and partial dif-ferential equations. I...
The theory of Brownian motion of a quantum oscillator is developed. The Brownian motion is described...
In a previous note (1) i.e. Part 1, we argued that the time dependent Schrodinger equation could inc...
In a series of notes (1), we argued that the time-independent Schrodinger equation may be considered...
As in a previous paper1) an elastically bound particle, linearly coupled with a bath of small oscill...
In this paper we are interested in unraveling the mathematical connections between the stochastic de...
In this note, we argue that the Schrodinger equation for one particle represents ensemble averages t...
Summary: "The stochastization of Jacobi's second equality of classical mechanics by Gaussian white n...
In a quantum bound state,spatial density is given by W(x)W(x), where W(x) is the wavefunction, avera...
In the frames of classical mechanics, the generalized Langevin equation is derived for an arbitrary ...
An extension ofstochastic mechanics which allows for non-local potentials i described. It leads, in ...
As mentioned in previous notes, there exist derivations of the Schrodinger equation in the literatur...
In the literature, stochastic approaches employed to derive the Schrodinger equation seem to focus o...
Brownian motion is formulated in the form d/dt (partial) spatial density = D d/dx d/dx density. This...
In this note, we investigate two velocities present in a quantum bound state. The first is the root...
In this paper, I review the link between stochastic processes and partial dif-ferential equations. I...
The theory of Brownian motion of a quantum oscillator is developed. The Brownian motion is described...
In a previous note (1) i.e. Part 1, we argued that the time dependent Schrodinger equation could inc...
In a series of notes (1), we argued that the time-independent Schrodinger equation may be considered...
As in a previous paper1) an elastically bound particle, linearly coupled with a bath of small oscill...
In this paper we are interested in unraveling the mathematical connections between the stochastic de...
In this note, we argue that the Schrodinger equation for one particle represents ensemble averages t...
Summary: "The stochastization of Jacobi's second equality of classical mechanics by Gaussian white n...
In a quantum bound state,spatial density is given by W(x)W(x), where W(x) is the wavefunction, avera...
In the frames of classical mechanics, the generalized Langevin equation is derived for an arbitrary ...
An extension ofstochastic mechanics which allows for non-local potentials i described. It leads, in ...