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The paper deals with solutions of transonic potential flow problems handled in the weak form or as variational inequalities. Using suitable generalized methods, which are well known for elliptic partial differential equations of the second order, some properties of these solutions are derived. A maximum principle, a comparison principle and some conclusions from both ones can be established.

On some properties of the solution of the differential equation $u^{''} + \frac{2 u^{'}}{r} = u - u^{3}$

Valter Šeda, Ján Pekár (1990)

Aplikace matematiky

In the paper it is shown that each solution $u (r, α)$ ot the initial value problem (2), (3) has a finite limit for $r \to \infty$ , and an asymptotic formula for the nontrivial solution $u (r, α)$ tending to 0 is given. Further, the existence of such a solutions is established by examining the number of zeros of two different solutions $u (r, \bar{α})$ , $u (r, \hat{α})$ .

On some qualitative methods for systems of ordinary diferential equations in the large

Nemyckiĭ, V. V. (1963)

Differential Equations and Their Applications

On some quasimetrics and their applications.

Bachar, Imed, Mâagli, Habib (2009)

Journal of Inequalities and Applications [electronic only]

On some recent results on the numerical problems in semiconductor device simulation

Brezzi, Franco, Marini, L. D., Pietra, P. (1990)

Equadiff 7

On some results of Moser and of Bangert

P. H. Rabinowitz, E. Stredulinsky (2004)

Annales de l'I.H.P. Analyse non linéaire

On some Schrödinger operators with a singular complex potential

Tosio Kato (1978)

Annali della Scuola Normale Superiore di Pisa - Classe di Scienze

On some Schroedinger-type variational inequalities

Marco Luigi Bernardi, Fabio Luterotti (1997)

Rendiconti del Seminario Matematico della Università di Padova

On some semilinear Volterra diffusion equations arising in ecology

Yamada, Yoshio (1982)

Equadiff 5

On some sharp bounds for the off-diagonal elements of the homogenized tensor

Dag Lukkassen (1995)

Applications of Mathematics

In this paper we study bounds for the off-diagonal elements of the homogenized tensor for the stationary heat conduction problem. We also state that these bounds are sharp by proving a formula for the homogenized tensor in the case of laminate structures.

We will prove existence of weak solutions of a system, containing non-local terms $u$ , $w$ .

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On some problems of the theory of the difference schemes

On some properties of eigenvalues and eigenfunctions of certain differential equations of the fourth order

On some properties of solutions of quasilinear degenerate parabolic equations in $ℝ^{m} \times (0, + \infty)$

On some properties of solutions of the Cauchy problem for a quasilinear parabolic equation

On some properties of solutions of transonic potential flow problems

On some properties of the solution of the differential equation $u^{''} + \frac{2 u^{'}}{r} = u - u^{3}$

On some qualitative methods for systems of ordinary diferential equations in the large

On some quasimetrics and their applications.

On some recent results on the numerical problems in semiconductor device simulation

On some results of Moser and of Bangert

On some Schrödinger operators with a singular complex potential

On some Schroedinger-type variational inequalities

On some semilinear Volterra diffusion equations arising in ecology

On some sharp bounds for the off-diagonal elements of the homogenized tensor

On some singular boundary value problems for ordinary differential equations

On Some Singular Quasi-Linear Cauchy Problems.

On some singular systems of parabolic functional equations

On some stability problems

On some stochastic parabolic differential equations in a Hilbert space.

On some sufficient conditions for the blow-up solutions of the nonlinear Ginzburg-Landau-Schrödinger evolution equation.

Currently displaying 861 – 880 of 2162