 About 35,700 results  books.google.com Differential equations with deviating arguments (cf. Differential equations,
ordinary, with distributed arguments) also belong to this general class. An
important class is the class of general functional differential equations of retarded
type, x = Kt x ... 

 books.google.com ... differences between neighboring argument values, one naturally arrives at
functional equations with continuous (or distributed) argument ... Combining the
notions of differential and functional equations, we obtain the notion of functional
dijj'erential equation [5, 44, 104—106, ... 1.1.2 Reducing to Ordinary Differential
Equations Sometimes Volterratype integro—differential equations can be
reduced to ... 

 books.google.com D.V. Anosov, V.I. Arnold  1997  Preview Thus, for different, but equally justifiable, reasons, systems with distributed
parameters, described by partial differential equations, might be called "
continuous". Besides, when DSs are understood in their widest sense as an
action of a ... 

 books.google.com We obtain that the multinomial distribution is close to the usual binomial
distribution, i.e., { ̃μn (ω, A × B) = k} ... Kotelenez (2002, Example 1.2) derives a
longrange smooth force through a heuristic scaling limit argument in the
passage from the ... 

 books.google.com In case of ordinary differential equation the operator H is the socalled locally
defined operator (local operator) ... Here and on ,=g(t) The equation with
distributed deviation of the argument (00 x t,J d'R(t,s)x(s)\ a ' is typical of the class
of ... 

 books.google.com This enables us to derive a homogeneous difference equation for the values of a
solution at the endpoints of the intervals of ... mildly weakened solutions of EPCA
to generalizedfunction solutions of ordinary differential and functional differential
equations. ... is the greatestinteger function, and in the second part of the book
the focus is on FDE with linearly transformed arguments. ... Many important areas
in mathematics and theoretical physics employ the methods of distribution theory. 

 books.google.com Oscillation theory of differential equations, originated from the monumental paper
of C. Sturm published in 1836, has now been ... as possible about the qualitative
properties of solutions of differential equations through the analysis of laws
governing the distribution of ... covering ordinary differential equations, functional
differential equations with deviating arguments, partial differential equations with
or ... 

 books.google.com Prove that if T is a distribution or order n, then (a) D*T is a distribution of order n +
k, (b) Any kth antiderivative of T is a distribution of ... into partial fractions and
follow the argument of Example 7. ... 468 PARTIAL DIFFERENTIAL EQUATIONS. 

 books.google.com Dombrovskii, V. A. [1] The stability of periodic solutions of systems with distributed
parameters and lag. [Russian] Ukrain. Mat. Z. 24 (1972) ... 70(1965), 149166; [3]
Ordinary and Delay Differential Equations. Springer Verlag, New York, 1977. 

 books.google.com Since such equations have solution only under rather restrictive assumptions, it
appears clearly that (L) can be written in ... [6] A. Kh. GELEG, The absolute
stability of nonlinear control systems with distributed parameters in critical cases,
Aut. 

 See the Differential Equations In the Rogue Wave IMSL Libraries.
 