The derivation of the equation of one-dimensional movement of a solitary shock wave is given. This derivation shows, that the differential equation of movement of a solitary plane shock wave in the channel with variable area, is exact, if simplifying assumptions, made during derivation, are realized. But these assumptions in plane geometry it is possible to realize only approximately; situation with spherical and cylindrical shock waves is opposite
AbstractWe consider the one dimensional wave equation where the domain available for the wave proces...
Asymptotic evolution laws for plane dilatational shock waves travelling in simple materials with mem...
To study the position and strength of a shock discontinuity as it propagates into a medium at rest, ...
Converging shock waves in an almost ideal medium are considered. The kinematics of one-dimensional m...
An explicit representation of an analytical solution to the problem of decay of a plane shock wave o...
Singular surface theory is used to study the evolutionary behaviour of an unsteady three-dimensional...
We study the problem of impact-induced shock wave propagation through a model one-dimensional hetero...
The shock propagation theory of Brinkley & Kirkwood (1947) is extended to provide a uniformly va...
The well-known ideal wave equation is valid only for homogeneous media, where the wave propagation s...
The theory of shock dynamics in two dimensions is reformulated to treat shock propagation in a non-u...
Colloque avec actes et comité de lecture. Internationale.International audienceIn the paper `` Bound...
It has been shown that the kinematics of a shock front in an ideal gas with constant specific heat c...
In this paper the kinematics of a curved shock of arbitrary strength has been discussed using the th...
Using numerical schemes, this paper demonstrates how viscous resistance to volume changes modifies t...
This paper investigates the propagation of a strong shock into an inhomogeneous medium using the new...
AbstractWe consider the one dimensional wave equation where the domain available for the wave proces...
Asymptotic evolution laws for plane dilatational shock waves travelling in simple materials with mem...
To study the position and strength of a shock discontinuity as it propagates into a medium at rest, ...
Converging shock waves in an almost ideal medium are considered. The kinematics of one-dimensional m...
An explicit representation of an analytical solution to the problem of decay of a plane shock wave o...
Singular surface theory is used to study the evolutionary behaviour of an unsteady three-dimensional...
We study the problem of impact-induced shock wave propagation through a model one-dimensional hetero...
The shock propagation theory of Brinkley & Kirkwood (1947) is extended to provide a uniformly va...
The well-known ideal wave equation is valid only for homogeneous media, where the wave propagation s...
The theory of shock dynamics in two dimensions is reformulated to treat shock propagation in a non-u...
Colloque avec actes et comité de lecture. Internationale.International audienceIn the paper `` Bound...
It has been shown that the kinematics of a shock front in an ideal gas with constant specific heat c...
In this paper the kinematics of a curved shock of arbitrary strength has been discussed using the th...
Using numerical schemes, this paper demonstrates how viscous resistance to volume changes modifies t...
This paper investigates the propagation of a strong shock into an inhomogeneous medium using the new...
AbstractWe consider the one dimensional wave equation where the domain available for the wave proces...
Asymptotic evolution laws for plane dilatational shock waves travelling in simple materials with mem...
To study the position and strength of a shock discontinuity as it propagates into a medium at rest, ...