A New Look at Fundamentals of the Photometric Light Transport and Scattering Theory

ISSN 1812-3368. Вестник МГТУ им. Н.Э. Баумана. Сер. Естественные науки. 2017. № 5

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Fig. 2.

Radiant flux

F

(

x

) and a

formation of the flux decrement

inside

the sample with discrete absorbers

One can see, that defining





ln 1 ,

K

a



  

there is no way to distinguish

between continuous and discrete absorbers media using both the photometric

approach and measurements of

F

(

x

). Despite the stepwise nature of the function

Eq. (4), whose derivative, formally, does not exist at points of location of the

absorbers, i.e., at points of discontinuity of the first kind, a

smooth approximating

curve

for

F

(

x

) can be found with the use of the formal phenomenological approach

Eq. (2). Thus, there is no sense to consider models of discrete absorbers inside the

material medium.

2. Our note 2 concerns the correspondence between photometry and

electromagnetism. In spite of the lack of any needs in phenomenological photometry

to understand the wave nature of light and the Maxwell's electrodynamics,

nevertheless, it is important today to keep in mind the relationship between these two

approaches. Mainly, it concerns the right understanding of the absorption and

scattering properties of different turbid media in which light propagates. Many

articles were published on this issue, but we need to subtract only the simplest

statements what we are going to use for our next ''first principles'' approach. It

consists of the following.

If consider a plane-parallel wave propagating along axis

X

:

0

(

)

0

( , )

,

j kx t

E x t E e

 



(6)

where

E

0

is the amplitude of the electric field [V/m];

1,

j

 

2 /

k

  

is the wave

number [m

−1

];



is the wavelength [m];



0

is the angular (circular) frequency;

t

is

time, then the radiant flux

F

0

incident on the surface

A

at a point

x

is determined by

the equation [1]

2

0

( , ) ,

2

e

A F

E x t

Z



(7)

where

A

is a surface [m

2

];

Z

e

is the wave impedance of the medium [Ohm];

( , )

E x t

is

the time-average field amplitude. It is well-known, that in a material medium the

wave number

k

can be expressed through the complex refractive index

n*

of the me-

dium as follows:

0

0

0

2

*

(

)

(

),

k

n

n j

n j

c

c

 



      



(8)

where

c

is the speed of light in vacuum;

n

and



are the real and imaginary parts of

n*

respectively;



0

is the wavelength in a free space. Imaginary part



is proportional to