Gradient of potential function of dynamic field

Dear Colleagues,

We open the new volume 
4 (2004), issue 1
of our journal 
"SELF Transactions",
publishing a new paper

" On gradient of potential function of dynamic field "

*Abstract*

We study the gradient of potential function of dynamic field and show
that in dynamic fields the gradient of function divides into
coordinate-dependent and time-dependent parts. We will show the
standard expression connecting the electric field strength with vector
and scalar potentials to be the consequence of this division of
gradient in dynamic fields. Due to this, curl of gradient of potential
function is not zero.

Please enjoy reading full text:

http://angelfire.lycos.com/la3/selftrans/v4_1/contents4.html#grad

I hope, it will be interesting for many of you, and look forward to
hear your opinion.

Sergey.