N-Homoclinic bifurcations for homoclinic orbits changing their twisting

We study bifurcations, calledN-homoclinic bifurcations, which produce homoclinic orbits roundingN times (N2) in some tubular neighborhood of original homoclinic orbit. A family of vector fields undergoes such a bifurcation when it is a perturbation of a vector field with a homoclinic orbit.N-Homoclinic bifurcations are divided into two cases; one is that the linearization at the equilibrium has only real principal eigenvalues, and the other is that it has complex principal eigenvalues. We treat the former case, espcially that linearization has only one unstable eigenvalue. As main tools we use a topological method, namely, Conley index theory, which enables us to treat more degenerate cases than those studied by analytical methods.     

Rheological properties of wheat flour doughs

Summary A comparative study was made of the large deformation and rupture properties of doughs from a medium strength and a weak wheat flour. Experiments were made by stretching, at a uniform rate, dough rings immersed in a liquid of matching density to prevent the rings from deforming under their own weight. Data were obtained on doughs differing in water content at temperatures from 5 to 45 °C and extension rates from 0.132 to 52.6 inches per minute.Essentially, the tensile properties of each dough could be represented by four characteristic functions, each dependent on only one of the variables: strain, time, temperature, and water content. The strain function (), equaled (In)/, where is the extension ratio, for extensions up to about 90% and, in some instances, up to nearly 200%. Thus, over extended ranges of strain, isochronal stress-strain data (representing comparable states of stress relaxation) gave a direct proportionality between true stress and theHencky strain, _H=In; the proportionality constant is the constant strain rate modulus,F (t^*), evaluated at the (isochronal) timet ^*. The modulusF(t,T,W — a function of timet, temperatureT, and water absorptionW-equals (T/T ₀)F (t ^*,T ₀,W ₀) (t/t ^* a _T a _W)ⁿ, wheren is a negative constant characteristic of the flour,F (t ^*,T ₀,W ₀) is the modulus at timet ^* at the reference temperatureT ₀ for a dough having the reference water absorptionW ₀;a _T anda _W are shift factors that account for the change of relaxation times with temperature and water content. The factor ay obeyed theArrhenius equation and gave activation energies of about 7.7 and 22.8 kcal for doughs from the medium strength and weak flour, respectively. Rupture data obtained at different temperatures and extension rates were superposed by usinga _T data and also were represented by failure envelopes. The shift factora _W appears to depend somewhat on temperature, especially for the weaker flour.Differences in the rheological behavior of doughs from the two flours were evident in: (1) the range over which the isochronal stress-strain behavior could be linearized; (2) the magnitude of the characteristic exponentn; (3) the magnitude and the temperature dependence of the moduli; (4) the activation energies; (5) the effect of temperature ona _W; and (6) several characterizing plots prepared to represent rupture data.

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Zusammenfassung Es wurde eine Vergleichsuntersuchung betreffend große Verformungen und Brucheigenschaften von Teigen aus zwei Weizenmehltypen durchgeführt. Die Versuche wurden in der Weise ausgeführt, daß man Teigringe, die in eine Flüssigkeit von entsprechender Dichte eingetaucht waren, um zu verhindern, daß sich die Ringe unter der Wirkung ihres eigenen Gewichtes verformten, mit gleichbleibender Geschwindigkeit streckte. Es wurden Werte für verschiedene Teige ermittelt, die sich durch ihren Wassergehalt unterschieden, und zwar bei Temperaturen von 5–45 °C und Dehnungsgeschwindigkeiten von 0,132–52,6 Zoll pro Minute.Die Zugeigenschaften eines jeden Teiges konnten im wesentlichen durch vier charakteristische Funktionen dargestellt werden, von denen jede lediglich von einer der Veränderlichen: Verformung, Zeit, Temperatur und Wassergehalt abhing. Die Verformungsfunktion () war gleich (In)/, worin das Dehnungsverhältnis bedeutet, und zwar für Dehnungen bis zu ungefähr 90%, in einigen Fällen sogar bis zu fast 200%. Somit ergab sich über einem ausgedehnten Verformungsbereich für die isochronen Kraft-Dehnungs-Werte (die vergleichbare Zustände der Spannungsrelaxation darstellen) eine direkte Proportionalität zwischen wahrer Spannung undHencky- Verformung, _H=In; die Proportionalitätskonstante ist der ModulF (t^*), genommen bei konstanter Verformungsgeschwindigkeit und der (isochronen) Zeit t^*. Der ModulF (t, T, W)eine Funktion der Zeitt, der TemperaturT und der WasserabsorptionW — läßt sich darstellen durch (T/T ₀)F (t ^*,T ₀,W ₀ ) (t/t ^* a _T a _W)ⁿ, worinn eine für das Mehl charakteristische negative Konstante undF (t ^*,T ₀,W ₀) der Modul zur Zeitt ^* bei der BezugstemperaturT ₀ ist für einen Teig, der die Bezugs-WasserabsorptionW ₀ hat;a _T unda _W sind Verschiebungsfaktoren, die der Veränderung der Relaxationszeiten mit der Temperatur und dem Wassergehalt Rechnung tragen. Der Faktor ay gehorcht derArrhenius-Gleichung und ergibt Aktivierungsenergien von ungefähr 7,7 bzw. 22,8 kcal für die Teige der beiden Mehltypen. Bruchwerte, die bei verschiedenen Temperaturen und verschiedenen Dehnungsgeschwindigkeiten erhalten wurden, ließen sich durch Verwendung vona _T-Daten überlagern und durch eine Brucheinhüllende (failure envelope) darstellen. Der Verschiebungsfaktora _W scheint etwas von der Temperatur abzuhängen, und zwar besonders bei dem schwächeren Mehl.Unterschiede im rheologischen Verhalten von Teigen aus den beiden Mehlsorten bestanden offensichtlich in Bezug auf: (1) den Bereich, über den das isochrone Kraft-Dehnungs-Verhalten linearisiert werden konnte, (2) die Größe des charakteristischen Exponentenn, (3) die Größe und die Temperaturabhängigkeit der Moduln, (4) die Aktivierungsenergien, (5) die Wirkung der Temperatur aufa _W und (6) einige graphische Darstellungen zur Charakterisierung der Bruchwerte.

     

Symbolic computation of flow in a rotating pipe

A perturbation solution of the fully developed flow through a pipe of circular cross-section, which rotates uniformly around an axis oriented perpendicularly to its own, is considered. The perturbation parameter is given by R = 2Ωa²/ν in terms of the angular velocity Ω, the pipe radius a and the kinematic viscosity ν of the fluid. The two coupled non-linear equations for the axial velocity ω and the streamfunction ? of the transverse (secondary) flow lead to an infinite system of linear equations. This system allows first the computation of a given order ?_n, n ? 1, of the perturbation expansion ? = ∑ Rⁿ?_n in terms of ω_n-1, the (n-1)-th order of the expansion ω = ∑ Rⁿω_n, and of the lower orders ?₁,…,?_{n ? 1}. Then it permits the computation of ω_n from ω₀,…,ω_{n ? 1} and ?₁,…,?;_n. The computation starts from the Hagen–Poiseuille flow ω₀, i.e. the perturbation is around this flow. The computations are performed analytically by computer, with the REDUCE and MAPLE systems. The essential elements for this are the appropriate co-ordinates: in the complex co-ordinates chosen the two-dimensional harmonic (Laplace, Δ) and biharmonic (Δ²) operators are ideally suited for (symbolic) quadratures. Symmetry considerations as well as analysis of the equations for ω_n, ?_n and of the boundary conditions lead to general (polynomial) formulae for these functions, with coeffcients to be determined. Their determination, order by order, implies, in complex co-ordinates, only (symbolic) differentiation and quadratures. The coefficients themselves are polynomials in the Reynolds number c of the (unperturbed) Hagen–Poiseuille flow. They are tabulated in the paper for the orders n ? 6 of the perturbation expansion.     

Bifurcation of Limit Cycles from a Polynomial Non-global Center

Consider the planar ordinary differential equation , where the set consists of k non-zero points. In this paper we perturb this vector field with a general polynomial perturbation of degree n and study how many limit cycles bifurcate from the period annulus of the origin in terms of k and n. One of the key points of our approach is that the Abelian integral that controls the bifurcation can be explicitly obtained as an application of the integral representation formula of harmonic functions through the Poisson kernel. Dedicated to Professor Zhifen Zhang on the occasion of her 80th birthday     

Dipole moments and near field potentials

Expressions are derived for the moments of electric and magnetic dipoles whose far field is equivalent to the Rayleigh term in the far field of a given radiating electromagnetic field. The equivalent dipole moments are expressed as integrals over an arbitrary closed surface of the near electromagnetic fields and simplification is achieved by rewriting these expressions in terms of the static potentials from which the near fields are derived. The results are valid regardless of the complexity of the field and the medium within the integration surface as long as the exterior is homogeneous, isotropic and source-free.Nomenclature B smooth closed bounded surface in 3-space - E, H radiating electric and magnetic field vectors - E ₀, H ₀ static near field limits of E and H - E ⁱ incident electric field vector - E ₀ ^t , H ₀ ^t total static field (incident plus scattered) - F, f arbitrary vector and scalar functions of position - k wave number - unit normal from B to exterior - p, m normalized electric and magnetic dipole moments - r position vector of field point with respect to origin in B - unit vector in direction of r - r magnitude of r - r _B position vector of point on B - V volume enclosed by B - , scalar potentials for E ₀ and H ₀ respectively - ^(e), ^(m) electric and magnetic Hertz vectors Research sponsored by the U.S. Air Force Office of Scientific Research under Grant No. AFOSR 69-1794.     

The Rellich-Kondrachov theorem for unbounded domains

Summary The full Kondrachov compactness theorem for Sobolev imbeddings of the type W ₀ ^m,p (G) W ₀ ^j,r (G) on bounded domains G in R ⁿ is extended to a large class of unbounded domains with reasonable n- 1 dimensional boundaries. A Poincaré inequality is obtained for such domains and a compactness theorem for traces of functions in W ₀ ^m,p (G) on lower dimensional hyperplanes is also proved.     

Intermittency as a codimension-three phenomenon

We analyze the interaction of three Hopf modes and show that locally a bifurcation gives rise to intermittency between three periodic solutions. This phenomenon can occur naturally in three-parameter families. Consider a vector fieldf with an equilibrium and suppose that the linearization off about this equilibrium has three rationally independent complex conjugate pairs of eigenvalues on the imaginary axis. As the parameters are varied, generically three branches of periodic solutions bifurcate from the steady-state solution. Using Birkhoff normal form, we can approximatef close to the bifurcation point by a vector field commuting with the symmetry group of the three-torus. The resulting system decouples into phase amplitude equations. The main part of the analysis concentrates on the amplitude equations in R³ that commute with an action ofZ ₂+Z ₂+Z ₂. Under certain conditions, there exists an asymptotically stable heteroclinic cycle. A similar example of such a phenomenon can be found in recent work by Guckenheimer and Holmes. The heteroclinic cycle connects three fixed points in the amplitude equations that correspond to three periodic orbits of the vector field in Birkhoff normal form. We can considerf as being an arbitrarily small perturbation of such a vector field. For this perturbation, the heteroclinic cycle disappears, but an invariant region where it was is still stable. Thus, we show that nearby solutions will still cycle around among the three periodic orbits.     

Error estimates for Rayleigh scattering density and temperature measurements in premixed flames

Rayleigh scattering has become an accepted technique for the determination of total number density during the combustion process. The interpretation of the ratio of total Rayleigh scattering signal as a ratio of densities or temperatures is hampered by the changing composition through a flame, since the average Rayleigh scattering cross-section depends on the gas composition. Typical correction factors as a function of degree of reaction, fuel and equivalence ratio were calculated. The fuels considered were H₂, CH₄, C₂H₄, C₂H₆ and C₃H₈. Factors as low as 0.7 and 0.56 were found for the heaviest hydrocarbon fuel at large equivalence ratio for interpreting the Rayleigh scattering intensity as gas density and inverse temperature, respectively. This is primarily due to the presence of CO and H₂ as intermediates. As CO and H₂ are subsequently oxidized to CO₂ and H₂O, these factors approach 1.0. Conversely, the worst case, when using H₂ as a fuel, occurs in the post flame zone. However, the correction factors for H₂ are near 1.0 and the errors involved will, in general, remain within the expected experimental accuracy of a typical Rayleigh scattering system. Linear correlations of correction factors with equivalene ratio and with the product of equivalence ratio and fuel molecular weight were found and presented. The interpretation of Rayleigh scattering as temperature was found to have larger errors than the interpretation as density. Corrections for changes in gas composition were applied to Rayleigh scattering temperature measurements in the post flame region of CH₄ and C₃H₈ flames with equivalence ratios of 0.75 and 1.0. The corrected temperatures were in excellent agreement with thermocouple measurements.List of symbols A ₁, A ₂ correlation coefficients - B ₁, B ₂ correlation coefficients - C ₁, C ₂ correlation coefficients - D ₁, D ₂ correlation coefficients - C calibration constant for Rayleigh scattering optics - H total enthalpy - Î I _R /I _RO - I _i incident laser intensity - I _R Rayleigh scattering intensity - I _R0 Rayleigh scattering intensity at reference condition - N total number density of gas - N ₀ total number density of gas at reference condition - n _i index of refraction of species i - – T/T _O - T temperature - T _a adiabatic flame temperature - T ₀ reference temperature - t time - W/W ₀ - W mean molecular weight - W ₀ mean molecular weight at reference condition - W _ij rate of production of species i by reaction j - X _i mole fraction of species i - degree of reaction (T – T ₀)/(T _a – T ₀) - laser wavelength - ₀ Loschmidt number - /₀ - density - ₀ density at reference condition - dimensionless mean Rayleigh scattering cross-section - _Ri Rayleigh scattering cross-section of species i - scattering angle measured from the electromagnetic field vector - equivalence ratio     

Determination of current flow in a plasma by a simulation method

A method is proposed which, for specific assumptions, allows us to determine the density distribution of a constant current flowing between electrodes in a plasma for plane parallel or radially symmetric electric and magnetic fields, allowing for anisotropic conductivity.Notation e_r, e, e_z unit vectors in a cylindrical coordinate system - E, e_r, e_z electric field strength vector and its components - V electric field potential - H, H_r, H, H_z magnetic field strength and its components - j current density vector - e electron charge - m electron mass - c velocity of light - momentum transfer time - ₀ normal plasma conductivity - _e electron cyclotron frequency - h unit vector in the direction of the magnetic field     

Weak turbulence in media with a decay spectrum

The theory of weak turbulence of a plasma has been investigated in many papers [1–5]. It has been established that weak turbulence may be described by means of the kinetic wave equations. Here the collision term in the kinetic equation is the sum of two substantially different components. The first of these has the character of nonlinear wave damping and differs from zero in those cases where interaction between waves and particles is significant. It has a comparatively simple mathematical nature and can be analyzed. The second component is specifically a collision term, it depends closely on the form of the spectrum in the medium and describes the exchange of energy between different groups of waves. The case when the second component plays the principal role in the collision term has scarcely been studied. The present paper is devoted to a study of this case.The analysis is carried out for a simple isotropic model of a medium with an almost linear dispersion law, but with a positive second derivative; we shall call such a spectrum a decay spectrum. This model is much closer to reality than the model considered in [6]. The results obtained from this model are evidently fairly general in character and express substantially the regularity of behavior of weak turbulence in media with a weak decay spectrum. The basic result of the paper is as follows: apart from the Rayleigh-Jeans solution, there exists another solution which reduces the collision term to zero. This solution corresponds to a process which is substantially nonequilibrium, and may be realized in actual problems, where there are always wave sources or transfer terms playing the same part, only in cases where there is wave damping in the medium with a coefficient which increases fairly rapidly into the region of large k. Here the universal character, as it were, of the nonequilibrium process is realized.Notation k wave vector - a parameter characteristic of the dispersion - _k wave frequency - _k density of wave sources - V _kkkk matrix element describing the wave interactions - (s) gamma function - u a variable describing the medium - k ₀ boundary of instability region - a _k complex wave amplitude - k ^a damping decrement - n _k wave density in k space - k ₁ boundary of the region of transparency - n _k wave density in spherical coordinates - v instability increment In conclusion the author thanks R. Z. Sagdeev for discussing the paper.     

A dynamic slip velocity model for molten polymers based on a network kinetic theory

In this paper the slip phenomenon is considered as a stochastic process where the polymer segments (taken as Hookean springs) break off the wall due to the excessive tension imposed by the bulk fluid motion. The convection equation arising in network theories is solved for the special case of a polymer/wall interface to determine the time evolution of the configuration distribution function (Q, t). The stress tensor and the slip velocity are calculated by averaging the proper relations over a large number of polymer segments. Due to the fact that the model is probabilistic and time dependent, dynamic slip velocity calculations become possible for the first time and therefore some new insight is gained on the slip phenomenon. Finally, the model predictions are found to match macroscopic experimental data satisfactorily.Nomenclature rate of creation of polymer segments - g(Q) constant of rate of creation of polymer segments - rate of loss of polymer segments - h(Q) constant of rate of loss of polymer segments - h(Q) constant of rate of loss of polymer segments due to destruction of its B-link - H Hookean spring constant - k Boltzmann's constant - n unit vector normal to the polymer/wall interface - n ₀ number density of polymer segments - n ₀ surface number density of polymer segments - Q vector defining the size and orientation of a polymer segment - Q ^* critical length of a segment beyond which the tension may overcome the W _adh - t time - t _h howering time of broken polymer segments - T absolute temperature - W _adh work of adhesion Greek Letters _n nominal strain - strain - _n nominal shear rate - shear rate - dimensionless constant in the expressions of h(Q), g(Q) - viscosity - ^T velocity gradient tensor - ₀ time constant - standard deviation of vectors Q at equilibrium - _w wall shear stress - stress tensor - ₀ equilibrium configuration distribution function of Q - configuration distribution function of Q     

Couette flow of a multicomponent ionized gas

We consider equilibrium flow of a multicomponent ionized gas between two catalytic plates of infinite length, one of which moves parallel to the other with constant velocity. The results of [1] are generalized for ionized gaseous mixtures which are in local thermodynamic equilibrium. Formulas are presented for calculating the thermal flux and the effective thermal conductivity for ambipolar diffusion.Then a special ionization case is discussed.Notation A_i chemical symbol of the i-th component - W_i projection of the molar diffusive flux vector of the i-th component on the y-axis - x_i molar concentration - H_i enthalpy - m_i molecular weight - Q_s heat of the s-th reaction - K_ps(T) equilibrium constant of the s-th reaction - W_i mass formation rate of the i-th component per unit volume - Z_i charge number - e unit charge (electron charge) - E electric field intensity - distance between the plates - N number of components - v _sl stoichiometric coefficients - density - T temperature - p pressure - u projection of average velocity on y-axis - viscosity - thermal conductivity - D_ij binary diffusion coefficient - R universal gas constant - k Boltzmann constant In conclusion, the author wishes to thank G. A. Tirskii for proposing the study and for suggestions made in the course of the investigation.     

Contributions to the theory of the method of steepest descent

Applying the method of steepest descent to F(x ₁,..., x _n ) one obtains a sequence of points _v . To obtain conditions for convergence of _v , the derived set H of the _v in the case of divergence is studied. In this case H is a continuum on which not only grad F vanishes everywhere, but also the rank of the Hessian of F is everywhere less than n-1.     

Numerical Simulation of Two Phase Turbulent Flow of Nanofluids in Confined Slot Impinging Jet

In this article, a numerical investigation is performed on flow and heat transfer of confined impinging slot jet, with a mixture of water and Al₂O₃ nanoparticles as the working fluid. Two-dimensional turbulent flow is considered and a constant temperature is applied on the impingement surface. The k ? ω turbulence model is used for the turbulence computations. Two-phase mixture model is implemented to study such a flow field. The governing equations are solved using the finite volume method. In order to consider the effect of obstacle angle on temperature fields in the channel, the numerical simulations were performed for different obstacle angles of 0° ? 60°. Also different geometrical parameters, volume fractions and Reynolds numbers have been considered to study the behavior of the system in terms of stagnation point, average and local Nusselt number and stream function contours. The results showed that the intensity and size of the vortex structures depend on jet- impingement surface distance ratio (H/W) and volume fraction. The maximum Nusselt number occurs at the stagnation point with the highest values at about H/W = 1. Increasing obstacle angle, from 15° to 60°, enhances the heat transfer rate. It was also revealed that the minimum value of average Nusselt number occurs in higher H/W ratios with decreasing the channel length.     

A Sharp-Interface Limit for a Two-Well Problem in Geometrically Linear Elasticity

In the theory of solid-solid phase transitions the deformation of an elastic body is determined via a functional containing a nonconvex energy density and a singular perturbation. We study Frame indifference, within a linearized setting, requires that W depends only on the symmetric part of ∇u. The potential W is nonnegative and vanishes on two wells, i.e., for d = 2, on two lines in the space of matrices. We determine, for d = 2, the Gamma limit I₀ = Γ− lim _ɛ→0 I_ɛ. The limit I₀[u] is finite only for deformations u that fulfill W(∇u)=0 almost everywhere and have sharp interfaces where ∇u has jumps. For these u, I₀[u] equals the line integral over the interfaces of a surface energy density.     

Micropolar squeeze films between rough rectangular plates

In this paper, the lubrication theory for squeezing with micropolar fluids in smooth surfaces has been advanced to analyze the effects arising from roughness considerations using the stochastic approach. This theory is subsequently applied to the problem of squeezing between rough rectangular plates. It is observed that the roughness effects are more pronounced for micropolar fluids as compared to the Newtonian fluids.Nomenclature a x-dimension of rectangular plate - A area of rectangular plate - b z-dimension of rectangular plate - B non-dimensional roughness parameter, c/h _n (for load capacity), c/h _n1 (for squeeze time) - c maximum asperity deviation from nominal film height - E expectancy operator - f(N, l, h) defined by equation (4) - F(N, L, H) defined by equation (31) - F ₁(N, L, B) defined by equation (29) - F ₂(N, L, B) defined by equation (30) - F ₃(N, L, H _n , B) defined by equation (34) - F ₄(N, L, H _n , B) defined by equation (35) - g probability density distribution function - h film height, h=h _n +h _s - h _n nominal film height - h _s deviation of film height from nominal level - h _n1 initial (nominal) film height - H, H _n , H _s non-dimensional forms of h, h _n , h _s respectively - l characteristic material length, (/4)^1/2 - L length ratio, h _n /l (for load capacity), h _n1/l (for squeeze time) - n integer - N coupling number, (/(2+))^1/2 - p pressure - q _x , q _z flow components in x- and z-directions, respectively - t time - T non-dimensional time - w load capacity - W non-dimensional load capacity - x, z cartesian coordinates - angular coordinate - Newtonian viscosity - , micropolar viscosity coefficients - aspect ratio, b/a - standard deviation - /h _n - random variable - defined by equation (19) - defined in equation (28) - defined in equation (33)     

The relaxation time spectrum of nearly monodisperse polybutadiene melts

The relaxation behavior of polymers with long linear flexible chains of uniform length has been investigated by means of dynamic mechanical analysis. The relaxation time spectrum (H()) follows a scaling relationship with two self-similar regions, one for the entanglement and terminal zone, and a second one for the transition to the glass. This can be described in its most general form (termed BSW spectrum) as H() = H _e ^ne + H _g ^– n _g for < _max and H() = 0 for _max < , where H _e , H _g , n _e , n _g are material constants and _max is the molecular weight dependent cut-off of the self-similar behavior. In this study, the dynamic mechanical response has been measured and analyzed for four highly entangled, nearly monodisperse polybutadienes with molecular weights from 20000 to 200000. The data are well represented by the BSW spectrum with scaling exponents of n _e = 0.23 and n _g = 0.67. The values of the exponents obtained in this work are about the same as those found for polystyrene samples in a previous study. This suggests that the two types of polymers have a similar relaxation pattern. However, at this point further refinement of the experiments is needed before being able to draw definite conclusions about the universality of the exponents.Dedicated to Professor Arthur S. Lodge on the occasion of his 70th birthday and his retirement from the University of Wisconsin.     

Spatial and Dynamical Chaos Generated by Reaction–Diffusion Systems in Unbounded Domains

We consider in this article a nonlinear reaction–diffusion system with a transport term (L,∇ _x )u, where L is a given vector field, in an unbounded domain Ω. We prove that, under natural assumptions, this system possesses a locally compact attractor in the corresponding phase space. Since the dimension of this attractor is usually infinite, we study its Kolmogorov’s ɛ-entropy and obtain upper and lower bounds of this entropy. Moreover, we give a more detailed study of the spatio-temporal chaos generated by the spatially homogeneous RDS in . In order to describe this chaos, we introduce an extended (n + 1)-parametrical semigroup, generated on the attractor by 1-parametrical temporal dynamics and by n-parametrical group of spatial shifts ( = spatial dynamics). We prove that this extended semigroup has finite topological entropy, in contrast to the case of purely temporal or purely spatial dynamics, where the topological entropy is infinite. We also modify the concept of topological entropy in such a way that the modified one is finite and strictly positive, in particular for purely temporal and for purely spatial dynamics on the attractor. In order to clarify the nature of the spatial and temporal chaos on the attractor, we use (following Zelik, 2003, Comm. Pure. Appl. Math. 56(5), 584–637) another model dynamical system, which is an adaptation of Bernoulli shifts to the case of infinite entropy and construct homeomorphic embeddings of it into the spatial and temporal dynamics on . As a corollary of the obtained embeddings, we finally prove that every finite dimensional dynamics can be realized (up to a homeomorphism) by restricting the temporal dynamics to the appropriate invariant subset of .     

A note on the unsteady motion of a viscous conducting liquid between two porous concentric circular cylinders acted on by a radial magnetic field

In this note the author has investigated some problems of a flow of conducting liquid through two porous non-conducting infinite circular cylinders rotating with various angular velocities for some time in the presence of a radial magnetic field.It is assumed that the rate of suction at the inner cylinder is equal to the rate of injection at the outer cylinder. Furthermore the induced electric and magnetic fields are neglected.Nomenclature a, b radii of coaxial cylinders - h ₁, h ₂ constants - m, n constants - P hydrostatic pressure - t time - A, B functions of r and b - B ₀ magnetic induction vector B ₀= _e H - H magnetic field vector - H intensity of magnetic field - L, M functions of a and b - S Suction parameter - Coefficient of viscosity - _e magnetic permeability - Kinematic coefficient of viscosity - density of liquid - conductivity of liquid - Small time - Constant - ₁, ₂ angular vrlocities - , ₁, ₂ angular velocities.     

Sobolev mappings with integrable dilatations

We show that each quasi-light mapping f in the Sobolev space W ¹ⁿ (, R ⁿ ) satisfying ¦Df(x)¦ ⁿ K(x, f)J(x, f) for almost every x and for some KL ^r (), r>n-1, is open and discrete. The assumption that f be quasilight can be dropped if, in addition, it is required that f W ^1p (, R ⁿ ) for some p > = n + 1/ (n-2). More generally, we consider mappings in the John Ball classes Axxx _p,q (), and give conditions that guarantee their discreteness and openness.