Difference between revisions of "Absorbing Schroedinger"

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The Absorbing Schroedinger can be written as follows:
 
The Absorbing Schroedinger can be written as follows:
:$ \displaystyle \!\!\!\!\!\!\!\!\!\! (1) ~ ~ ~ \mathrm i \dot \Psi = \hat H ~ \Psi -\mathrm i ~ \hat V ~ \Psi $
+
:\( \displaystyle \!\!\!\!\!\!\!\!\!\! (1) ~ ~ ~ \mathrm i \dot \Psi = \hat H ~ \Psi -\mathrm i ~ \hat V ~ \Psi \)
 
where
 
where
$\Psi$ is wave function, the dot differentiats it with respect to time,
+
\(\Psi\) is wave function, the dot differentiats it with respect to time,
$\hat H$ is the conventional, Hermitian part [[Hamiltonian]], and
+
\(\hat H\) is the conventional, Hermitian part [[Hamiltonian]], and
$\hat V$ is the Hermitian operators that represents the entanglement of the state with some other degrees of freedom, that are taken into account only phenomenologocally.
+
\(\hat V\) is the Hermitian operators that represents the entanglement of the state with some other degrees of freedom, that are taken into account only phenomenologocally.
   
 
The [[Absorbing Schroedinger]] describes the evolution of the quantum state of a particle slightly coupled to other particles, [[environment]], giving evolution of the component of the [[wave function]] that "did not yet interact" with the environment.
 
The [[Absorbing Schroedinger]] describes the evolution of the quantum state of a particle slightly coupled to other particles, [[environment]], giving evolution of the component of the [[wave function]] that "did not yet interact" with the environment.
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In the simplest case of movement of a single particle in vicinity of some device, that tries to observe it, the Nonlinear Schroedinger can be written as follows:
 
In the simplest case of movement of a single particle in vicinity of some device, that tries to observe it, the Nonlinear Schroedinger can be written as follows:
:$ \displaystyle \!\!\!\!\!\!\!\!\!\! (2) ~ ~ ~ \mathrm i ~ \hbar ~ \dot \Psi = \frac{-\hbar^2 \nabla^2}{2m} \Psi + U(\vec x) ~ \Psi -\mathrm i ~ V(\vec x) ~ \Psi $
+
:\( \displaystyle \!\!\!\!\!\!\!\!\!\! (2) ~ ~ ~ \mathrm i ~ \hbar ~ \dot \Psi = \frac{-\hbar^2 \nabla^2}{2m} \Psi + U(\vec x) ~ \Psi -\mathrm i ~ V(\vec x) ~ \Psi \)
where $\Psi=\Psi(\vec x, t)$ is [[wave function]] of a particle in the coordinate representation, $m$ is its mass, $\hbar$ is the [[Planck constant]], $U$ is conventional potential, and $V(x)$ describes the probability of absorption ("registration") of the particle at the point with coordinate $x$
+
where \(\Psi=\Psi(\vec x, t)\) is [[wave function]] of a particle in the coordinate representation, \(m\) is its mass, \(\hbar\) is the [[Planck constant]], \(U\) is conventional potential, and \(V(x)\) describes the probability of absorption ("registration") of the particle at the point with coordinate \(x\)
   
 
The distortion of the wave function of the particle due to the observation (or attempt of its observation) is called [[Zeno effect]]
 
The distortion of the wave function of the particle due to the observation (or attempt of its observation) is called [[Zeno effect]]
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</ref>. The Absorbing Schroedinger describes the [[quantum reflection]] of particles from the region of their absorption.
 
</ref>. The Absorbing Schroedinger describes the [[quantum reflection]] of particles from the region of their absorption.
   
Often, there is no [[ab initio]] description for the relaxation, absorption of the particle; in this case, it is convenient to use the "normalized" absorpbig schroedinger, setting the Plansk constant $\hbar$ to unity. Also, in the simplest case, the uniform absorption takes place in the part of space.
+
Often, there is no [[ab initio]] description for the relaxation, absorption of the particle; in this case, it is convenient to use the "normalized" absorpbig schroedinger, setting the Plansk constant \(\hbar\) to unity. Also, in the simplest case, the uniform absorption takes place in the part of space.
Let $\theta(\vec x)=1$ in the regions where the particle can be observed, and
+
Let \(\theta(\vec x)=1\) in the regions where the particle can be observed, and
let $\theta(\vec x)=0$ in the regions where the particle cannot be observed. For the dimention-less case, the Absorbing Schroedinger can be written as follows:
+
let \(\theta(\vec x)=0\) in the regions where the particle cannot be observed. For the dimention-less case, the Absorbing Schroedinger can be written as follows:
:$ \displaystyle \!\!\!\!\!\!\!\!\!\! (3) ~ ~ ~ \mathrm i \dot \Psi +\Psi '' = U(\vec x) \Psi -\mathrm i \theta(\vec x) \gamma \Psi $
+
:\( \displaystyle \!\!\!\!\!\!\!\!\!\! (3) ~ ~ ~ \mathrm i \dot \Psi +\Psi '' = U(\vec x) \Psi -\mathrm i \theta(\vec x) \gamma \Psi \)
where the double primes represent the second ferivatives with respect to the coordinates., and positive parameter $\gamma$ describes the efficiency of absorption. (Any observation is also interpreted as absorption.)
+
where the double primes represent the second ferivatives with respect to the coordinates., and positive parameter \(\gamma\) describes the efficiency of absorption. (Any observation is also interpreted as absorption.)
   
 
==Paraxial propagation==
 
==Paraxial propagation==
In the simple paraxial case, the particle propagates mainly along some coordinate, let it be $z$, and the potential depends only on the transversal coordinates.
+
In the simple paraxial case, the particle propagates mainly along some coordinate, let it be \(z\), and the potential depends only on the transversal coordinates.
Neglecting the conventional potential $U$, and assuming the exponential decay of the wave function along the propagation, the Absorbing Schroedinger can be written for
+
Neglecting the conventional potential \(U\), and assuming the exponential decay of the wave function along the propagation, the Absorbing Schroedinger can be written for
: $\displaystyle \!\!\!\!\!\!\!\!\!\! (4) ~ ~ ~ \Psi=\mathrm e ^{- \mathrm i \omega t} \psi$
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\! (4) ~ ~ ~ \Psi=\mathrm e ^{- \mathrm i \omega t} \psi\)
 
in the following form:
 
in the following form:
:$ \displaystyle \!\!\!\!\!\!\!\!\!\! (5) ~ ~ ~ \omega \psi + \psi '' = -\mathrm i \gamma \theta(\vec x) \psi $
+
:\( \displaystyle \!\!\!\!\!\!\!\!\!\! (5) ~ ~ ~ \omega \psi + \psi '' = -\mathrm i \gamma \theta(\vec x) \psi \)
 
==Uniform absorption==
 
==Uniform absorption==
The simplest and important case is the uniform absorption (detection) of the particle. This case reveals the physical sense of constant $\gamma$ in the equaiton (5) above. Let
+
The simplest and important case is the uniform absorption (detection) of the particle. This case reveals the physical sense of constant \(\gamma\) in the equaiton (5) above. Let
: $\displaystyle \!\!\!\!\!\!\!\!\!\! (6) ~ ~ ~ \psi=\mathrm e ^{\mathrm i (c+\mathrm i s) z }$
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\! (6) ~ ~ ~ \psi=\mathrm e ^{\mathrm i (c+\mathrm i s) z }\)
where $c$ and $s$ are real numbers, and let $\theta(\vec x)=1$ in the whole space. The substitution into (5) gives
+
where \(c\) and \(s\) are real numbers, and let \(\theta(\vec x)=1\) in the whole space. The substitution into (5) gives
: $\displaystyle \!\!\!\!\!\!\!\!\!\! (7) ~ ~ ~ \omega - (c+\mathrm i s)^2 = -\mathrm i \gamma$
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\! (7) ~ ~ ~ \omega - (c+\mathrm i s)^2 = -\mathrm i \gamma\)
: $\displaystyle \!\!\!\!\!\!\!\!\!\! (8) ~ ~ ~ (c+\mathrm i s)^2 = \omega + i \gamma$
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\! (8) ~ ~ ~ (c+\mathrm i s)^2 = \omega + i \gamma\)
: $\displaystyle \!\!\!\!\!\!\!\!\!\! (9) ~ ~ ~ c^2- s^2+ 2\, \mathrm i \,c\, s = \omega + i \gamma$
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\! (9) ~ ~ ~ c^2- s^2+ 2\, \mathrm i \,c\, s = \omega + i \gamma\)
 
which means that
 
which means that
: $\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (10) ~ ~ ~ c^2-s^2= \omega$
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (10) ~ ~ ~ c^2-s^2= \omega\)
: $\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (11) ~ ~ ~ 2~c~s= \gamma$
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (11) ~ ~ ~ 2~c~s= \gamma\)
In these expressions, $c$ has physical sense of wavenumber of the wave, and $s$ means the absorption rate. Both parameters allow the direct measurements in the experiments with photons, atoms or any other kinds of waves. In the physical applications, the case $~ s/c \ll 1 ~$ is of the most interest; in this case, there is no need to make difference between $c$ and wavenumber of particle before the entry in the absorbing (detecting) medium.
+
In these expressions, \(c\) has physical sense of wavenumber of the wave, and \(s\) means the absorption rate. Both parameters allow the direct measurements in the experiments with photons, atoms or any other kinds of waves. In the physical applications, the case \(~ s/c \ll 1 ~\) is of the most interest; in this case, there is no need to make difference between \(c\) and wavenumber of particle before the entry in the absorbing (detecting) medium.
   
However, one may consider as given between the "initial" wavenumber $\sqrt{\omega}$ and absorption $s$; then
+
However, one may consider as given between the "initial" wavenumber \(\sqrt{\omega}\) and absorption \(s\); then
: $\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (12) ~ ~ ~ c=\sqrt{\omega+s^2} ~ ~$, $~ ~ ~ \gamma= 2\, s\, \sqrt{\omega+s^2}$
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (12) ~ ~ ~ c=\sqrt{\omega+s^2} ~ ~\), \(~ ~ ~ \gamma= 2\, s\, \sqrt{\omega+s^2}\)
In this notations, $\sqrt{\omega}$ has sense of the initial wavenumber, before the particle enters the area with absorption, and
+
In this notations, \(\sqrt{\omega}\) has sense of the initial wavenumber, before the particle enters the area with absorption, and
$s$ is jus the absorption.
+
\(s\) is jus the absorption.
   
 
Hope, the recovery of dimensions for the atom optics causes no problems.
 
Hope, the recovery of dimensions for the atom optics causes no problems.
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The zeno-reflection of particle crom absorbing wall had been presented in 2005 showing very good agreement with experiments on quantum reflection of particles invoming on the ridged mirror at the grazing angle,
 
The zeno-reflection of particle crom absorbing wall had been presented in 2005 showing very good agreement with experiments on quantum reflection of particles invoming on the ridged mirror at the grazing angle,
 
<ref name="zeno">zeno</ref>. The reflection coefficient is estimated as
 
<ref name="zeno">zeno</ref>. The reflection coefficient is estimated as
: $\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (13) ~ ~ ~ r_{\mathrm{ zeno}}=\frac
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (13) ~ ~ ~ r_{\mathrm{ zeno}}=\frac
 
{\sqrt{\sqrt{1/\chi^4+1}+1}-\sqrt{2}}
 
{\sqrt{\sqrt{1/\chi^4+1}+1}-\sqrt{2}}
 
{\sqrt{\sqrt{1/\chi^4+1}+1}+\sqrt{2}}
 
{\sqrt{\sqrt{1/\chi^4+1}+1}+\sqrt{2}}
 
\approx \exp\big(-\sqrt{8}\, \chi \Big)
 
\approx \exp\big(-\sqrt{8}\, \chi \Big)
  +
\)
$
 
 
where
 
where
: $\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (14) ~ ~ ~ \chi=\sqrt{KL} \theta$
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (14) ~ ~ ~ \chi=\sqrt{KL} \theta\)
$K=\sqrt{\omega}$ is wavenumber, $L=1/s$ is absorption length and $\theta$ is the grazing angle.
+
\(K=\sqrt{\omega}\) is wavenumber, \(L=1/s\) is absorption length and \(\theta\) is the grazing angle.
In the experiments, $L$ corresponds to the distance between absorbing ridges. Such an absorption is not continuous, so, initially only a qualitative agreement was expected. Instead, the quantitative agreement has been observed for various sets of parameters, varying for orders of magnitude, so, the approximation (13) happens to be pretty universal.
+
In the experiments, \(L\) corresponds to the distance between absorbing ridges. Such an absorption is not continuous, so, initially only a qualitative agreement was expected. Instead, the quantitative agreement has been observed for various sets of parameters, varying for orders of magnitude, so, the approximation (13) happens to be pretty universal.
   
 
==Channeling of particle between absorbing walls==
 
==Channeling of particle between absorbing walls==
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==Euristic estimate==
 
==Euristic estimate==
 
For the good channeling conditions, the effective absorption can be approximated with
 
For the good channeling conditions, the effective absorption can be approximated with
: $\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (15) ~ ~ ~ a=\frac{1-r_{\rm zeno}}{2 \,d /\theta}$
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (15) ~ ~ ~ a=\frac{1-r_{\rm zeno}}{2 \,d /\theta}\)
where $d$ is half-width of the channel and $\theta=p/K$ is ratio of the transversal wavenumber
+
where \(d\) is half-width of the channel and \(\theta=p/K\) is ratio of the transversal wavenumber
: $\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (16) ~ ~ ~ p=\frac{\pi}{2\,d}$
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (16) ~ ~ ~ p=\frac{\pi}{2\,d}\)
to the wavenumber $K$. At the reflection of wave from a ridged mirror, $\theta=p/K$ has sense of the [[grazing angle]].
+
to the wavenumber \(K\). At the reflection of wave from a ridged mirror, \(\theta=p/K\) has sense of the [[grazing angle]].
   
 
Substitution of (13) and (16) into (15) gives the following expression for the absorption
 
Substitution of (13) and (16) into (15) gives the following expression for the absorption
: $\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (17) ~ ~ ~
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (17) ~ ~ ~
a \approx \sqrt{8 K L} \frac{\theta^2}{2d}$
+
a \approx \sqrt{8 K L} \frac{\theta^2}{2d}\)
   
 
The grazing angle can be approximated with
 
The grazing angle can be approximated with
: $\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (18) ~ ~ ~
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (18) ~ ~ ~
\theta \approx \frac{\pi}{2\, d\, K}$
+
\theta \approx \frac{\pi}{2\, d\, K}\)
 
giving the estimate for the efficient absorption
 
giving the estimate for the efficient absorption
: $\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (19) ~ ~ ~
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (19) ~ ~ ~
 
a \approx \sqrt{8 K L} \frac{\pi^2}{4 d^3 K^2}
 
a \approx \sqrt{8 K L} \frac{\pi^2}{4 d^3 K^2}
 
\approx
 
\approx
\sqrt{ \frac{L}{2 K^3} } \frac{\pi^2}{d^3}$
+
\sqrt{ \frac{L}{2 K^3} } \frac{\pi^2}{d^3}\)
 
For the higher transversal modes, the absorption should scale proportionally to the square of the transversal wavenumber, so,
 
For the higher transversal modes, the absorption should scale proportionally to the square of the transversal wavenumber, so,
: $\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (20) ~ ~ ~
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (20) ~ ~ ~
a_n\approx a~ (1+2n)^2$
+
a_n\approx a~ (1+2n)^2\)
 
for the even modes modes and
 
for the even modes modes and
: $\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (21) ~ ~ ~
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (21) ~ ~ ~
a_n\approx a~ (2n)^2$
+
a_n\approx a~ (2n)^2\)
 
for the odd mode; it is assumed that numeration of even modes begins with zero and that for the odd modes begins with unity.
 
for the odd mode; it is assumed that numeration of even modes begins with zero and that for the odd modes begins with unity.
   
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At the naive construction of the absorbed mode, the resulting expression for the effective absorption deviates from the estimate (19) above.
 
At the naive construction of the absorbed mode, the resulting expression for the effective absorption deviates from the estimate (19) above.
   
The example of the mode $f$ guided by the absorbing walls is shown in figure at right.
+
The example of the mode \(f\) guided by the absorbing walls is shown in figure at right.
 
The mode is constructed in the following way.
 
The mode is constructed in the following way.
   
 
Instead of the plane decaying wave (6), consider equation (5) with
 
Instead of the plane decaying wave (6), consider equation (5) with
: $\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (22) ~ ~ ~
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (22) ~ ~ ~
\psi=\exp( \mathrm i \kappa z) f(x)$
+
\psi=\exp( \mathrm i \kappa z) f(x)\)
where $\kappa \in \mathrm C$ is constant, and $x$ is transversal coordinate (for simplicity, just one);
+
where \(\kappa \in \mathrm C\) is constant, and \(x\) is transversal coordinate (for simplicity, just one);
 
let
 
let
: $\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (23) ~ ~ ~
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (23) ~ ~ ~
\theta(x)= \mathrm{UnitStep} \big( |x|-d \Big)$
+
\theta(x)= \mathrm{UnitStep} \big( |x|-d \Big)\)
where $d>0$ has sense of half–width of the channel. The substitution hives the equation for $f$:
+
where \(d>0\) has sense of half–width of the channel. The substitution hives the equation for \(f\):
: $\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (24) ~ ~ ~
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (24) ~ ~ ~
 
\omega f -\kappa^2 f +f''= -\mathrm i ~ \gamma ~ \mathrm{UnitStep} \Big( |x|-d \Big) ~ f
 
\omega f -\kappa^2 f +f''= -\mathrm i ~ \gamma ~ \mathrm{UnitStep} \Big( |x|-d \Big) ~ f
  +
\)
$
 
where $f=f(x)$ and $f''=f''(x)$. The efficient channeling is expected for the case of $\omega \approx \kappa^2$.
+
where \(f=f(x)\) and \(f''=f''(x)\). The efficient channeling is expected for the case of \(\omega \approx \kappa^2\).
Search the solution $f$ of equation (24) in the following form:
+
Search the solution \(f\) of equation (24) in the following form:
: $\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (25) ~ ~ ~
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (25) ~ ~ ~
 
f(x)=\left\{ \begin{array}{ccc} \cos(px) &,& |x|\le d \\ r \exp\Big( q~ \big(|x|\!-\!d\big) \Big) &,& |x|\ge d
 
f(x)=\left\{ \begin{array}{ccc} \cos(px) &,& |x|\le d \\ r \exp\Big( q~ \big(|x|\!-\!d\big) \Big) &,& |x|\ge d
\end{array}\right.$
+
\end{array}\right.\)
Substitution of (25) into (24) gives the equations for the complex parameters $p$ and $q$:
+
Substitution of (25) into (24) gives the equations for the complex parameters \(p\) and \(q\):
: $\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (26) ~ ~ ~ \omega~ - ~ \kappa^2 - p^2 =0 $
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (26) ~ ~ ~ \omega~ - ~ \kappa^2 - p^2 =0 \)
: $\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (27) ~ ~ ~ \omega~ - ~\kappa^2 + q^2 = - \mathrm i \gamma$
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (27) ~ ~ ~ \omega~ - ~\kappa^2 + q^2 = - \mathrm i \gamma\)
Conditions of continuity of function $f$ and its first derivative give equations
+
Conditions of continuity of function \(f\) and its first derivative give equations
: $\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (28) ~ ~ ~ ~ ~\cos(pd)= ~ ~ r $
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (28) ~ ~ ~ ~ ~\cos(pd)= ~ ~ r \)
: $\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (29) ~ ~ ~ - p ~ \sin(pd)= - q ~ r$
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (29) ~ ~ ~ - p ~ \sin(pd)= - q ~ r\)
Complex parameters $p$, $q$, $r$, $\kappa$ are determined by equations (26)–(29).
+
Complex parameters \(p\), \(q\), \(r\), \(\kappa\) are determined by equations (26)–(29).
 
Subtraction of (26) from (27) gives the equation
 
Subtraction of (26) from (27) gives the equation
: $\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (30) ~ ~ ~ p^2+q^2= - \mathrm i \gamma $
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (30) ~ ~ ~ p^2+q^2= - \mathrm i \gamma \)
 
Dividing (29) by (28) gives
 
Dividing (29) by (28) gives
: $\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (31) ~ ~ ~ p \tan(pd)= q $
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (31) ~ ~ ~ p \tan(pd)= q \)
 
Combination of (30) and (31) gives
 
Combination of (30) and (31) gives
: $\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (32) ~ ~ ~ p^2(1+\tan(pd)^2)= - \mathrm i \gamma $
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (32) ~ ~ ~ p^2(1+\tan(pd)^2)= - \mathrm i \gamma \)
Using relation $1+\tan(z)^2=\frac{1}{\cos(z)^2}$, equation (32) can be rewritten as follows:
+
Using relation \(1+\tan(z)^2=\frac{1}{\cos(z)^2}\), equation (32) can be rewritten as follows:
: $\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (33) ~ ~ ~ \frac{p^2}{\cos(pd)^2}= - \mathrm i \gamma $
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (33) ~ ~ ~ \frac{p^2}{\cos(pd)^2}= - \mathrm i \gamma \)
: $\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (34) ~ ~ ~ \frac{\cos(pd)^2}{p^2 d^2}=$ $ \frac{\mathrm i }{ \gamma ~ d^2} $
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (34) ~ ~ ~ \frac{\cos(pd)^2}{p^2 d^2}=\) \( \frac{\mathrm i }{ \gamma ~ d^2} \)
: $\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (35) ~ ~ ~ \mathrm{cosc}(pd) = \sqrt{ \frac{\mathrm i ~ d^2}{ \gamma} } = \exp(\mathrm i \pi/4) \frac{1}{d ~\sqrt{\gamma}}=\exp(\mathrm i \pi/4) \alpha$
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (35) ~ ~ ~ \mathrm{cosc}(pd) = \sqrt{ \frac{\mathrm i ~ d^2}{ \gamma} } = \exp(\mathrm i \pi/4) \frac{1}{d ~\sqrt{\gamma}}=\exp(\mathrm i \pi/4) \alpha\)
where [[cosc]]$(x)=\cos(x)/x$ and
+
where [[cosc]]\((x)=\cos(x)/x\) and
: $\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (36) ~ ~ ~ \alpha = \frac{1}{d ~\sqrt{\gamma}}$
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (36) ~ ~ ~ \alpha = \frac{1}{d ~\sqrt{\gamma}}\)
is [[damping parameter]] that determines the damping, decay of the guided mode and, therefore, the efficiency of the guiding. Then, the transversal wavenymber $p$ can be expressed through the [[ArcCosc]] function, $\mathrm{acosc}=\mathrm{cosc}^{-1}$:
+
is [[damping parameter]] that determines the damping, decay of the guided mode and, therefore, the efficiency of the guiding. Then, the transversal wavenymber \(p\) can be expressed through the [[ArcCosc]] function, \(\mathrm{acosc}=\mathrm{cosc}^{-1}\):
: $\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (37) ~ ~ ~ pd = \mathrm{acosc}(pd) = \mathrm{acosc}\Big( \exp(\mathrm i \pi/4) ~ \alpha\Big)= \mathrm{acosq}(\alpha)$
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (37) ~ ~ ~ pd = \mathrm{acosc}(pd) = \mathrm{acosc}\Big( \exp(\mathrm i \pi/4) ~ \alpha\Big)= \mathrm{acosq}(\alpha)\)
where [[acosq]] is modified [[acosc]] function; properties of function [[acosq]] are known. Then, $q$ is determined with equation (30) or (31). For the case
+
where [[acosq]] is modified [[acosc]] function; properties of function [[acosq]] are known. Then, \(q\) is determined with equation (30) or (31). For the case
$\alpha=1/4$, the construction of the guided mode is shown in the figure above.
+
\(\alpha=1/4\), the construction of the guided mode is shown in the figure above.
   
 
The effective absorption of the mode is
 
The effective absorption of the mode is
: $\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (38) ~ ~ ~ A = \Im(\kappa)$
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (38) ~ ~ ~ A = \Im(\kappa)\)
where $\kappa$ is determined by, for example, (26), id est,
+
where \(\kappa\) is determined by, for example, (26), id est,
: $\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (39) ~ ~ ~ \kappa=\sqrt{\omega ~–~ p^2} \approx \sqrt{\omega} \Big(1-\frac{p^2}{2\omega}\Big)
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (39) ~ ~ ~ \kappa=\sqrt{\omega ~–~ p^2} \approx \sqrt{\omega} \Big(1-\frac{p^2}{2\omega}\Big)
 
\approx\sqrt{\omega} - \frac{p^2}{2\sqrt{\omega}}
 
\approx\sqrt{\omega} - \frac{p^2}{2\sqrt{\omega}}
  +
\)
$
 
 
then
 
then
: $\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (40) ~ ~ ~ A \approx - \Re(p) \Im(p)/ \sqrt{\omega}$
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (40) ~ ~ ~ A \approx - \Re(p) \Im(p)/ \sqrt{\omega}\)
In order to provide the flux of probability from the center of mode to the absorbing walls, the imaginary part of the transversal wavenumber should be negative, $\Im(p)<0$.
+
In order to provide the flux of probability from the center of mode to the absorbing walls, the imaginary part of the transversal wavenumber should be negative, \(\Im(p)<0\).
   
 
==Asymptotic estimate of the guiding efficiency==
 
==Asymptotic estimate of the guiding efficiency==
The guiding efficiency can be characterizes with effective length of absorption $S=1/A$. For the physical application, the case of weak effective absorption is especially interesting; this correspond to small values of $A$ and $\alpha$, and large local absorption in the walls of the channel. In this section, this case is considered asymptotically.
+
The guiding efficiency can be characterizes with effective length of absorption \(S=1/A\). For the physical application, the case of weak effective absorption is especially interesting; this correspond to small values of \(A\) and \(\alpha\), and large local absorption in the walls of the channel. In this section, this case is considered asymptotically.
   
 
The expansion of function [[acosq]] (which appears in equation (37)) at zero has to following form:
 
The expansion of function [[acosq]] (which appears in equation (37)) at zero has to following form:
: $\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (41) ~ ~ ~ \mathrm{acosq}(z) =
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (41) ~ ~ ~ \mathrm{acosq}(z) =
\frac{\pi}{2}-\frac{\pi}{2} \mathrm e^{\mathrm i \pi/4} z +O(z^2)$
+
\frac{\pi}{2}-\frac{\pi}{2} \mathrm e^{\mathrm i \pi/4} z +O(z^2)\)
This gives the approximation for the tranzversal wavenumber $p$ in the following form:
+
This gives the approximation for the tranzversal wavenumber \(p\) in the following form:
: $\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (42) ~ ~ ~ pd \approx \frac{\pi}{2} -\frac{\pi}{2} \mathrm e ^{\mathrm i \pi/4} \alpha$
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (42) ~ ~ ~ pd \approx \frac{\pi}{2} -\frac{\pi}{2} \mathrm e ^{\mathrm i \pi/4} \alpha\)
 
and, from (40), the estimate for the effective absorption
 
and, from (40), the estimate for the effective absorption
: $\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (43) ~ ~ ~ A\approx \frac{\pi}{2d} \times \frac{\pi}{d\sqrt{2}} \alpha
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (43) ~ ~ ~ A\approx \frac{\pi}{2d} \times \frac{\pi}{d\sqrt{2}} \alpha
\times \frac{1}{\sqrt{\omega}}$
+
\times \frac{1}{\sqrt{\omega}}\)
Then, $~\alpha\!=\!\frac{1}{d \sqrt{\gamma}}~$ by (36) and $~\gamma\approx 2 s \sqrt{\omega} \approx 2 s c~$ should be used, giving $\displaystyle ~\alpha \approx \frac{1}{d \sqrt{2 s c}}~$. Then, the effective absorption of the mode
+
Then, \(~\alpha\!=\!\frac{1}{d \sqrt{\gamma}}~\) by (36) and \(~\gamma\approx 2 s \sqrt{\omega} \approx 2 s c~\) should be used, giving \(\displaystyle ~\alpha \approx \frac{1}{d \sqrt{2 s c}}~\). Then, the effective absorption of the mode
: $\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (44) ~ ~ ~ A\approx \frac{\pi^2}{\sqrt{8}d^2} \times \frac{1}{d\sqrt{2sc}} \times \frac{1}{c} = \frac{\pi^2}{4~ d^3 c^{3/2} s^{1/2}}
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (44) ~ ~ ~ A\approx \frac{\pi^2}{\sqrt{8}d^2} \times \frac{1}{d\sqrt{2sc}} \times \frac{1}{c} = \frac{\pi^2}{4~ d^3 c^{3/2} s^{1/2}}
  +
\)
$
 
where $c$ has sense of wavenumber, and $s$ is the absorption in the wall.
+
where \(c\) has sense of wavenumber, and \(s\) is the absorption in the wall.
   
 
This estimate should be compared to (19), where
 
This estimate should be compared to (19), where
$L$ should be replaced to $1/(2s)$ and $K$ should be replaced to $c$, giving the absorption by probapility
+
\(L\) should be replaced to \(1/(2s)\) and \(K\) should be replaced to \(c\), giving the absorption by probapility
: $\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (45) ~ ~ ~ a\approx \frac{\pi^2}{2~d^3 c^{3/2} s^{1/2}}
+
: \(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (45) ~ ~ ~ a\approx \frac{\pi^2}{2~d^3 c^{3/2} s^{1/2}}
  +
\)
$
 
However, the amplitude decays half slower than probability, so, $A=a/2$.
+
However, the amplitude decays half slower than probability, so, \(A=a/2\).
 
In such a way, the asymptotic estimates (44) and (45) agree.
 
In such a way, the asymptotic estimates (44) and (45) agree.
   
Line 184: Line 184:
 
</ref>.
 
</ref>.
   
<!-- The dimensional analysis indicates that ($~ ~$) is just wrong.!-->
+
<!-- The dimensional analysis indicates that (\(~ ~\)) is just wrong.!-->
   
 
==References==
 
==References==

Latest revision as of 18:47, 30 July 2019

Absorbing Schroedinger (or Absorbing Schrödinger) is phenomenological modification of the Schrödinger equation, that corresponds to absorption of particles.

The Absorbing Schroedinger can be written as follows:

\( \displaystyle \!\!\!\!\!\!\!\!\!\! (1) ~ ~ ~ \mathrm i \dot \Psi = \hat H ~ \Psi -\mathrm i ~ \hat V ~ \Psi \)

where \(\Psi\) is wave function, the dot differentiats it with respect to time, \(\hat H\) is the conventional, Hermitian part Hamiltonian, and \(\hat V\) is the Hermitian operators that represents the entanglement of the state with some other degrees of freedom, that are taken into account only phenomenologocally.

The Absorbing Schroedinger describes the evolution of the quantum state of a particle slightly coupled to other particles, environment, giving evolution of the component of the wave function that "did not yet interact" with the environment.

WARNING! This article is UNDER CONSTRUCTION! The formulas should be checked before to use.

Absorption in some part of space

In the simplest case of movement of a single particle in vicinity of some device, that tries to observe it, the Nonlinear Schroedinger can be written as follows:

\( \displaystyle \!\!\!\!\!\!\!\!\!\! (2) ~ ~ ~ \mathrm i ~ \hbar ~ \dot \Psi = \frac{-\hbar^2 \nabla^2}{2m} \Psi + U(\vec x) ~ \Psi -\mathrm i ~ V(\vec x) ~ \Psi \)

where \(\Psi=\Psi(\vec x, t)\) is wave function of a particle in the coordinate representation, \(m\) is its mass, \(\hbar\) is the Planck constant, \(U\) is conventional potential, and \(V(x)\) describes the probability of absorption ("registration") of the particle at the point with coordinate \(x\)

The distortion of the wave function of the particle due to the observation (or attempt of its observation) is called Zeno effect [1]. The Absorbing Schroedinger describes the quantum reflection of particles from the region of their absorption.

Often, there is no ab initio description for the relaxation, absorption of the particle; in this case, it is convenient to use the "normalized" absorpbig schroedinger, setting the Plansk constant \(\hbar\) to unity. Also, in the simplest case, the uniform absorption takes place in the part of space. Let \(\theta(\vec x)=1\) in the regions where the particle can be observed, and let \(\theta(\vec x)=0\) in the regions where the particle cannot be observed. For the dimention-less case, the Absorbing Schroedinger can be written as follows:

\( \displaystyle \!\!\!\!\!\!\!\!\!\! (3) ~ ~ ~ \mathrm i \dot \Psi +\Psi '' = U(\vec x) \Psi -\mathrm i \theta(\vec x) \gamma \Psi \)

where the double primes represent the second ferivatives with respect to the coordinates., and positive parameter \(\gamma\) describes the efficiency of absorption. (Any observation is also interpreted as absorption.)

Paraxial propagation

In the simple paraxial case, the particle propagates mainly along some coordinate, let it be \(z\), and the potential depends only on the transversal coordinates. Neglecting the conventional potential \(U\), and assuming the exponential decay of the wave function along the propagation, the Absorbing Schroedinger can be written for

\(\displaystyle \!\!\!\!\!\!\!\!\!\! (4) ~ ~ ~ \Psi=\mathrm e ^{- \mathrm i \omega t} \psi\)

in the following form:

\( \displaystyle \!\!\!\!\!\!\!\!\!\! (5) ~ ~ ~ \omega \psi + \psi '' = -\mathrm i \gamma \theta(\vec x) \psi \)

Uniform absorption

The simplest and important case is the uniform absorption (detection) of the particle. This case reveals the physical sense of constant \(\gamma\) in the equaiton (5) above. Let

\(\displaystyle \!\!\!\!\!\!\!\!\!\! (6) ~ ~ ~ \psi=\mathrm e ^{\mathrm i (c+\mathrm i s) z }\)

where \(c\) and \(s\) are real numbers, and let \(\theta(\vec x)=1\) in the whole space. The substitution into (5) gives

\(\displaystyle \!\!\!\!\!\!\!\!\!\! (7) ~ ~ ~ \omega - (c+\mathrm i s)^2 = -\mathrm i \gamma\)
\(\displaystyle \!\!\!\!\!\!\!\!\!\! (8) ~ ~ ~ (c+\mathrm i s)^2 = \omega + i \gamma\)
\(\displaystyle \!\!\!\!\!\!\!\!\!\! (9) ~ ~ ~ c^2- s^2+ 2\, \mathrm i \,c\, s = \omega + i \gamma\)

which means that

\(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (10) ~ ~ ~ c^2-s^2= \omega\)
\(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (11) ~ ~ ~ 2~c~s= \gamma\)

In these expressions, \(c\) has physical sense of wavenumber of the wave, and \(s\) means the absorption rate. Both parameters allow the direct measurements in the experiments with photons, atoms or any other kinds of waves. In the physical applications, the case \(~ s/c \ll 1 ~\) is of the most interest; in this case, there is no need to make difference between \(c\) and wavenumber of particle before the entry in the absorbing (detecting) medium.

However, one may consider as given between the "initial" wavenumber \(\sqrt{\omega}\) and absorption \(s\); then

\(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (12) ~ ~ ~ c=\sqrt{\omega+s^2} ~ ~\), \(~ ~ ~ \gamma= 2\, s\, \sqrt{\omega+s^2}\)

In this notations, \(\sqrt{\omega}\) has sense of the initial wavenumber, before the particle enters the area with absorption, and \(s\) is jus the absorption.

Hope, the recovery of dimensions for the atom optics causes no problems.

Reflection of particle from the absorption wall

The zeno-reflection of particle crom absorbing wall had been presented in 2005 showing very good agreement with experiments on quantum reflection of particles invoming on the ridged mirror at the grazing angle, [1]. The reflection coefficient is estimated as

\(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (13) ~ ~ ~ r_{\mathrm{ zeno}}=\frac {\sqrt{\sqrt{1/\chi^4+1}+1}-\sqrt{2}} {\sqrt{\sqrt{1/\chi^4+1}+1}+\sqrt{2}} \approx \exp\big(-\sqrt{8}\, \chi \Big) \)

where

\(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (14) ~ ~ ~ \chi=\sqrt{KL} \theta\)

\(K=\sqrt{\omega}\) is wavenumber, \(L=1/s\) is absorption length and \(\theta\) is the grazing angle. In the experiments, \(L\) corresponds to the distance between absorbing ridges. Such an absorption is not continuous, so, initially only a qualitative agreement was expected. Instead, the quantitative agreement has been observed for various sets of parameters, varying for orders of magnitude, so, the approximation (13) happens to be pretty universal.

Channeling of particle between absorbing walls

The important case of Absorbing Schroedinger describes the channeling of particles between absorbing walls.

Euristic estimate

For the good channeling conditions, the effective absorption can be approximated with

\(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (15) ~ ~ ~ a=\frac{1-r_{\rm zeno}}{2 \,d /\theta}\)

where \(d\) is half-width of the channel and \(\theta=p/K\) is ratio of the transversal wavenumber

\(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (16) ~ ~ ~ p=\frac{\pi}{2\,d}\)

to the wavenumber \(K\). At the reflection of wave from a ridged mirror, \(\theta=p/K\) has sense of the grazing angle.

Substitution of (13) and (16) into (15) gives the following expression for the absorption

\(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (17) ~ ~ ~ a \approx \sqrt{8 K L} \frac{\theta^2}{2d}\)

The grazing angle can be approximated with

\(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (18) ~ ~ ~ \theta \approx \frac{\pi}{2\, d\, K}\)

giving the estimate for the efficient absorption

\(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (19) ~ ~ ~ a \approx \sqrt{8 K L} \frac{\pi^2}{4 d^3 K^2} \approx \sqrt{ \frac{L}{2 K^3} } \frac{\pi^2}{d^3}\)

For the higher transversal modes, the absorption should scale proportionally to the square of the transversal wavenumber, so,

\(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (20) ~ ~ ~ a_n\approx a~ (1+2n)^2\)

for the even modes modes and

\(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (21) ~ ~ ~ a_n\approx a~ (2n)^2\)

for the odd mode; it is assumed that numeration of even modes begins with zero and that for the odd modes begins with unity.

Modal analysis

Composition of mode guided by absorbing walls

At the naive construction of the absorbed mode, the resulting expression for the effective absorption deviates from the estimate (19) above.

The example of the mode \(f\) guided by the absorbing walls is shown in figure at right. The mode is constructed in the following way.

Instead of the plane decaying wave (6), consider equation (5) with

\(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (22) ~ ~ ~ \psi=\exp( \mathrm i \kappa z) f(x)\)

where \(\kappa \in \mathrm C\) is constant, and \(x\) is transversal coordinate (for simplicity, just one); let

\(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (23) ~ ~ ~ \theta(x)= \mathrm{UnitStep} \big( |x|-d \Big)\)

where \(d>0\) has sense of half–width of the channel. The substitution hives the equation for \(f\):

\(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (24) ~ ~ ~ \omega f -\kappa^2 f +f''= -\mathrm i ~ \gamma ~ \mathrm{UnitStep} \Big( |x|-d \Big) ~ f \)

where \(f=f(x)\) and \(f''=f''(x)\). The efficient channeling is expected for the case of \(\omega \approx \kappa^2\). Search the solution \(f\) of equation (24) in the following form:

\(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (25) ~ ~ ~ f(x)=\left\{ \begin{array}{ccc} \cos(px) &,& |x|\le d \\ r \exp\Big( q~ \big(|x|\!-\!d\big) \Big) &,& |x|\ge d \end{array}\right.\)

Substitution of (25) into (24) gives the equations for the complex parameters \(p\) and \(q\):

\(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (26) ~ ~ ~ \omega~ - ~ \kappa^2 - p^2 =0 \)
\(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (27) ~ ~ ~ \omega~ - ~\kappa^2 + q^2 = - \mathrm i \gamma\)

Conditions of continuity of function \(f\) and its first derivative give equations

\(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (28) ~ ~ ~ ~ ~\cos(pd)= ~ ~ r \)
\(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (29) ~ ~ ~ - p ~ \sin(pd)= - q ~ r\)

Complex parameters \(p\), \(q\), \(r\), \(\kappa\) are determined by equations (26)–(29). Subtraction of (26) from (27) gives the equation

\(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (30) ~ ~ ~ p^2+q^2= - \mathrm i \gamma \)

Dividing (29) by (28) gives

\(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (31) ~ ~ ~ p \tan(pd)= q \)

Combination of (30) and (31) gives

\(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (32) ~ ~ ~ p^2(1+\tan(pd)^2)= - \mathrm i \gamma \)

Using relation \(1+\tan(z)^2=\frac{1}{\cos(z)^2}\), equation (32) can be rewritten as follows:

\(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (33) ~ ~ ~ \frac{p^2}{\cos(pd)^2}= - \mathrm i \gamma \)
\(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (34) ~ ~ ~ \frac{\cos(pd)^2}{p^2 d^2}=\) \( \frac{\mathrm i }{ \gamma ~ d^2} \)
\(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (35) ~ ~ ~ \mathrm{cosc}(pd) = \sqrt{ \frac{\mathrm i ~ d^2}{ \gamma} } = \exp(\mathrm i \pi/4) \frac{1}{d ~\sqrt{\gamma}}=\exp(\mathrm i \pi/4) \alpha\)

where cosc\((x)=\cos(x)/x\) and

\(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (36) ~ ~ ~ \alpha = \frac{1}{d ~\sqrt{\gamma}}\)

is damping parameter that determines the damping, decay of the guided mode and, therefore, the efficiency of the guiding. Then, the transversal wavenymber \(p\) can be expressed through the ArcCosc function, \(\mathrm{acosc}=\mathrm{cosc}^{-1}\):

\(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (37) ~ ~ ~ pd = \mathrm{acosc}(pd) = \mathrm{acosc}\Big( \exp(\mathrm i \pi/4) ~ \alpha\Big)= \mathrm{acosq}(\alpha)\)

where acosq is modified acosc function; properties of function acosq are known. Then, \(q\) is determined with equation (30) or (31). For the case \(\alpha=1/4\), the construction of the guided mode is shown in the figure above.

The effective absorption of the mode is

\(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (38) ~ ~ ~ A = \Im(\kappa)\)

where \(\kappa\) is determined by, for example, (26), id est,

\(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (39) ~ ~ ~ \kappa=\sqrt{\omega ~–~ p^2} \approx \sqrt{\omega} \Big(1-\frac{p^2}{2\omega}\Big) \approx\sqrt{\omega} - \frac{p^2}{2\sqrt{\omega}} \)

then

\(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (40) ~ ~ ~ A \approx - \Re(p) \Im(p)/ \sqrt{\omega}\)

In order to provide the flux of probability from the center of mode to the absorbing walls, the imaginary part of the transversal wavenumber should be negative, \(\Im(p)<0\).

Asymptotic estimate of the guiding efficiency

The guiding efficiency can be characterizes with effective length of absorption \(S=1/A\). For the physical application, the case of weak effective absorption is especially interesting; this correspond to small values of \(A\) and \(\alpha\), and large local absorption in the walls of the channel. In this section, this case is considered asymptotically.

The expansion of function acosq (which appears in equation (37)) at zero has to following form:

\(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (41) ~ ~ ~ \mathrm{acosq}(z) = \frac{\pi}{2}-\frac{\pi}{2} \mathrm e^{\mathrm i \pi/4} z +O(z^2)\)

This gives the approximation for the tranzversal wavenumber \(p\) in the following form:

\(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (42) ~ ~ ~ pd \approx \frac{\pi}{2} -\frac{\pi}{2} \mathrm e ^{\mathrm i \pi/4} \alpha\)

and, from (40), the estimate for the effective absorption

\(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (43) ~ ~ ~ A\approx \frac{\pi}{2d} \times \frac{\pi}{d\sqrt{2}} \alpha \times \frac{1}{\sqrt{\omega}}\)

Then, \(~\alpha\!=\!\frac{1}{d \sqrt{\gamma}}~\) by (36) and \(~\gamma\approx 2 s \sqrt{\omega} \approx 2 s c~\) should be used, giving \(\displaystyle ~\alpha \approx \frac{1}{d \sqrt{2 s c}}~\). Then, the effective absorption of the mode

\(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (44) ~ ~ ~ A\approx \frac{\pi^2}{\sqrt{8}d^2} \times \frac{1}{d\sqrt{2sc}} \times \frac{1}{c} = \frac{\pi^2}{4~ d^3 c^{3/2} s^{1/2}} \)

where \(c\) has sense of wavenumber, and \(s\) is the absorption in the wall.

This estimate should be compared to (19), where \(L\) should be replaced to \(1/(2s)\) and \(K\) should be replaced to \(c\), giving the absorption by probapility

\(\displaystyle \!\!\!\!\!\!\!\!\!\!\!\! (45) ~ ~ ~ a\approx \frac{\pi^2}{2~d^3 c^{3/2} s^{1/2}} \)

However, the amplitude decays half slower than probability, so, \(A=a/2\). In such a way, the asymptotic estimates (44) and (45) agree.

In the first approximation, the consideration of the multiple reflection from absorbing walls and the consideration of mode guided between the absorbing walls give the same prediction about effective absorption of this mode [2].


References

  1. 1.0 1.1 http://tori.ils.uec.ac.jp/PAPERS/optrevri.pdf D.Kouznetsov, H.Obrest. Reflection of waves from a ridged surface and the Zeno effect. Optical Review, 2005, v.12, No.5, p.363-366. Cite error: Invalid <ref> tag; name "zeno" defined multiple times with different content
  2. http://tori.ils.uec.ac.jp/PAPERS/2012guiding.pdf Dmitrii Kouznetsov, Makoto Morinaga. Guiding of Waves between Absorbing Walls. Journal of Modern Physics, 2012, 3, 553-560 doi:10.4236/jmp.2012.37076 Published Online July 2012. (http://www.SciRP.org/journal/jmp)

http://m.ils.uec.ac.jp/slits.pdf M.Morinaga. Wave propagating through array of slits. August 6, 2012.

http://m.ils.uec.ac.jp/DIMA/iwls.pdf M.Morinaga and D.Kouznetsov. Waveguide Composed of Pinhole Array. Institute for Laser Science, UEC Chofu, Tokyo 182-8585, JAPAN. 2012-10-05 IWLS. (slideshow and poster)