Your search keyword '"Contact geometry"' showing total 172 results

1. On particular integrability for (co)symplectic and (co)contact Hamiltonian systems.

Author

Azuaje, R and Escobar-Ruiz, A M

Subjects

*HAMILTON'S equations, *HAMILTONIAN mechanics, *CONTACT geometry, *EQUATIONS of motion, *CLASSICAL mechanics

Abstract

As a generalization and extension of our previous paper (Escobar-Ruiz and Azuaje 2024 J. Phys. A: Math. Theor. 57 105202), in this work, the notions of particular integral and particular integrability in classical mechanics are extended to the formalisms of cosymplectic, contact and cocontact geometries. This represents a natural framework for studying dissipative systems, enabling a reduction of the equations of motion and, in certain cases, allowing explicit solutions to be found within a subset of the overall dynamics where integrability conditions are met. Specifically, for Hamiltonian systems on cosymplectic, contact and cocontact manifolds, it is demonstrated that the existence of a particular integral allows us to find certain integral curves from a reduced, lower dimensional, set of Hamilton's equations. In the case of particular integrability, these trajectories can be obtained by quadratures. Notably, for dissipative systems described by contact geometry, a particular integral can be viewed as a generalization of the important concept of dissipated quantity as well. [ABSTRACT FROM AUTHOR]

Published

2025

2. Non-existence of proper η-Einstein Kenmotsu manifolds.

Author

Chaubey, Sudhakar Kumar and Suh, Young Jin

Subjects

*RICCI flow, *CONTACT geometry, *RIEMANNIAN manifolds, *SCHOLARLY periodical corrections, *CURVATURE

Abstract

In 1972, Kenmotsu [A class of almost contact Riemannian manifolds, Tohoku Math. J. (2) 24 (1972) 93–103] defined the notion of Kenmotsu manifolds. He has also studied the properties of proper η-Einstein Kenmotsu manifolds, and proved some basic interesting results. These results have been used by a plenty of authors in establishing their main results on Kenmotsu manifolds. Naturally, the question of existence of proper η-Einstein Kenmotsu manifold is a prime question in the study of contact geometry. The main goal of this paper is to discuss the existence of proper η-Einstein Kenmotsu manifolds and to refine some of Kenmotsu’s results. The results of this paper may be used as an erratum of many published papers on Kenmotsu manifolds. In this sequence, we also address the existence of conharmonically flat Kenmotsu manifolds, conformal Ricci flow and almost Ricci solitons on Kenmotsu manifolds. [ABSTRACT FROM AUTHOR]

Published

2024

3. Shot noise as a diagnostic in the ν = 2/3 fractional quantum Hall edge zoo.

Author

Manna, Sourav, Das, Ankur, Gefen, Yuval, and Goldstein, Moshe

Subjects

*QUANTUM point contacts, *CONTACT geometry, *ELECTRIC noise, *QUANTUM states, *RENORMALIZATION group

Abstract

The ν = 2 / 3 filling is the simplest paradigmatic example of a fractional quantum Hall state, which contains counter-propagating edge modes. These modes can be either in the unequilibrated regime or equilibrated to different extents, on top of a possible edge reconstruction. In the unequilibrated regime, two distinct renormalization group fixed points have been previously proposed, namely Kane–Fischer–Polchinski and Wang–Meir–Gefen. In the equilibration regime, different degree of thermal equilibration may occur, while charge is fully equilibrated. Here, we show that this rich variety of models can give rise to three possible conductance plateaus at e 2 / 2 h (recently observed in experiments), 5 e 2 / 9 h (predicted here), and e 2 / 3 h (observed earlier in experiments) in a quantum point contact geometry. We identify different mechanisms for electrical shot noise generation at these plateaus, which provides an experimentally accessible venue for distinguishing among the distinct models. [ABSTRACT FROM AUTHOR]

Published

2024

4. Hybrid TLM‐CTLM Test Structure for Determining Specific Contact Resistivity of Ohmic Contacts.

Author

Yue, Pan, Chi, Thanh Pham, and Holland, Anthony

Subjects

*CONTACT geometry, *ELECTRIC lines, *GEOMETRY

Abstract

Various test structures can be used to determine the specific contact resistivity of ohmic contacts. The transmission line model test structure and circular transmission line model test structure are the most commonly used. The analytical expressions of the former are straightforward and effectively describe the electrical behaviour of a contact, while the concentric geometry of the latter eliminates complications during fabrication. In this article, we present a hybrid test structure that combines the advantages of the transmission line and the circular transmission line models. The analytical expressions of the new structure are presented, and its finite‐element modelling is undertaken. The effect of contact geometry on this test structure is also discussed. Using the presented test structure, determining contact parameters does not require any error corrections. [ABSTRACT FROM AUTHOR]

Published

2024

5. Dynamical similarity in field theories.

Author

Sloan, David

Abstract

In previous work I have shown that Herglotz actions reproduce the dynamics of classical mechanical theories which exhibit dynamical similarities. Recent work has shown how to extend field theories in both the Lagrangian and de Donder-Weyl formalism to contact geometry (Gaset et al 2020 Ann. Phys., NY 414 168092; 2021 Rep. Math. Phys. 87 347–68; 2022 arXiv:2211.17058). In this article I show how dynamical similarity applies in field theory. This is applied in both the Lagrangian and Hamiltonian frameworks, producing the contact equivalents. The result can be applied to general relativity where I demonstrate how to construct a complete description of the dynamics, equivalent to those derived from the Einstein–Hilbert action, without reference to the conformal factor. [ABSTRACT FROM AUTHOR]

Published

2025

6. DEPENDENCE OF TERAHERTZ PHOTOCONDUCTIVE SWITCH PERFORMANCE ON METAL CONTACT GEOMETRY.

Author

Nevinskas, I., Kamarauskas, M., Geižutis, A., Kovalevskij, V., Gaspariūnas, M., Bičiūnas, A., Urbanowicz, A., Norkus, R., and Ikamas, K.

Subjects

*CONTACT geometry, *RESISTOR-inductor-capacitor circuits, *GALLIUM arsenide, *SPECTRAL sensitivity, *IMPEDANCE matching

Abstract

This study investigates the emission and spectral characteristics of photoconductive THz switches employing coplanar stripline contact geometries fabricated on a GaAs substrate. The experimental results reveal how the power outputs as well as the spectral shape are significantly influenced by the strip width dimension. Utilizing the Drude-Lorentz conductivity model, photocarrier dynamics were analyzed through an RLC circuit framework, offering insights into how the contact design influences the spectral response. Our findings suggest that matching the photocurrent impedance to that of the metallic contacts is critical to improving the efficiency of these devices. [ABSTRACT FROM AUTHOR]

Published

2024

7. Steiner and tube formulae in 3D contact sub-Riemannian geometry.

Author

Barilari, Davide and Bossio, Tania

Subjects

*RIEMANNIAN geometry, *THREE-dimensional modeling, *TUBES, *NEIGHBORHOODS, *CONTACT geometry

Abstract

We prove a Steiner formula for regular surfaces with no characteristic points in 3D contact sub-Riemannian manifolds endowed with an arbitrary smooth volume. The formula we obtain, which is equivalent to a half-tube formula, is of local nature. It can thus be applied to any surface in a region not containing characteristic points. We provide a geometrical interpretation of the coefficients appearing in the expansion, and compute them on some relevant examples in three-dimensional sub-Riemannian model spaces. These results generalize those obtained in [Z. M. Balogh, F. Ferrari, B. Franchi, E. Vecchi and K. Wildrick, Steiner's formula in the Heisenberg group, Nonlinear Anal. 126 (2015) 201–217; M. Ritoré, Tubular neighborhoods in the sub-Riemannian Heisenberg groups, Adv. Calc. Var. 14(1) (2021) 1–36] for the Heisenberg group. [ABSTRACT FROM AUTHOR]

Published

2024

8. The geometry of induced currents in two-dimensional media.

Author

Lopez-Monsalvo, Cesar S., Vargas-Serdio, Servando, Alzate-Cardenas, Julian A., and Flores-Alfonso, Daniel

Subjects

*GEODESIC flows, *SUPERCONDUCTIVITY, *ELECTROMAGNETIC fields, *SUPERCONDUCTORS, *GEODESICS

Abstract

We present a framework that allows us to clearly identify the geometric features underlying the phenomenon of superconductivity in two-dimensional materials. In particular, we show that any such medium whose response to an externally applied electromagnetic field is a geodesically flowing induced current, must be a superconductor. In this manner, we conclude that the underlying geometry of this type of media is that of a Lorentzian contact manifold. Moreover, we show that the macroscopic hallmark of their superconducting state is a purely topological condition equivalent to the geodesic nature of the induced current: the non-vanishing of its helicity. [ABSTRACT FROM AUTHOR]

Published

2024

9. Scaling symmetries and canonoid transformations in Hamiltonian systems.

Author

Azuaje, R. and Bravetti, A.

Subjects

*NONSTANDARD mathematical analysis, *SYMMETRY, *HAMILTONIAN systems, *NOETHER'S theorem

Abstract

In this paper, we investigate various types of symmetries and their mutual relationships in Hamiltonian systems defined on manifolds with different geometric structures: symplectic, cosymplectic, contact and cocontact. In each case, we pay special attention to non-standard (non-canonical) symmetries, in particular scaling symmetries and canonoid transformations, as they provide new interesting tools for the qualitative study of these systems. Our main results are the characterizations of these non-standard symmetries and the analysis of their relation with conserved (or dissipated) quantities. [ABSTRACT FROM AUTHOR]

Published

2024

10. On the asymptotic geometry of finite-type k-surfaces in three-dimensional hyperbolic space.

Author

Smith, Graham

Subjects

*HYPERBOLIC spaces, *HOLOMORPHIC functions, *VECTOR fields, *MATHEMATICAL formulas, *DATA analysis

Abstract

For 0 < k < 1, a finite-type k-surface in 3-dimensional hyperbolic space is a complete, immersed surface of finite area and of constant extrinsic curvature equal to k. In Smith (2021), we showed that such surfaces have finite genus and finitely many cusp-like ends. Each of these cusps is asymptotic to an immersed cylinder of exponentially decaying radius about a complete geodesic and terminates at an ideal point which we call the extremity of the cusp. We show that every cusp of any finite-type k-surface has a well-defined axis, which we will call the Steiner geodesic of the cusp. One of the end-points of this axis is the extremity, and we will call the other, which constitutes new geometric data, the Steiner point of the cusp. We prove a new identity involving extremities and Steiner points in terms of Möbius invariant vector fields over the Riemann sphere. We define two new functionals over the space of finite-type k-surfaces. The first, which will be called the generalized volume, is defined by the integral of a certain well-chosen form, and extends to the non-embedded case the concept of volume of the set bounded by the surface. The second, which will be called the renormalized energy, is related to the integral of the mean curvature of the surface, and is well-defined up to a choice of Busemann function. Upon describing natural parametrizations of the strata of the space of finite-type k-surfaces by open complex manifolds, we prove a new Schläfli-type formula relating the extremities and Steiner points to the first order variations of the generalized volume and the renormalized energy. In particular, Möbius invariance of this formula yields the aforementioned identity. We conclude by studying some applications of this identity and Schläfli-type formula. [ABSTRACT FROM AUTHOR]

Published

2024

11. An equivariant Reeb–Beltrami correspondence and the Kepler–Euler flow.

Author

Fontana-McNally, Josep, Miranda, Eva, and Peralta-Salas, Daniel

Subjects

*KEPLER problem, *VECTOR fields, *RIEMANNIAN metric, *FLUID flow, *CELESTIAL mechanics, *RIEMANNIAN manifolds

Abstract

We prove that the correspondence between Reeb and Beltrami vector fields presented in Etnyre & Ghrist (Etnyre, Ghrist 2000 Nonlinearity13, 441–458 (doi:10.1088/0951-7715/13/2/306)) can be made equivariant whenever additional symmetries of the underlying geometric structures are considered. As a corollary of this correspondence, we show that energy levels above the maximum of the potential energy of mechanical Hamiltonian systems can be viewed as stationary fluid flows, though the metric is not prescribed. In particular, we showcase the emblematic example of the n -body problem and focus on the Kepler problem. We explicitly construct a compatible Riemannian metric that makes the Kepler problem of celestial mechanics a stationary fluid flow (of Beltrami type) on a suitable manifold, the Kepler–Euler flow. [ABSTRACT FROM AUTHOR]

Published

2024

12. Canonical curves and Kropina metrics in Lagrangian contact geometry.

Author

Ma, Tianyu, Flood, Keegan J, Matveev, Vladimir S, and Žádník, Vojtěch

Subjects

*CURVES, *CONTACT geometry, *GEODESICS, *FINSLER geometry

Abstract

We present a Fefferman-type construction from Lagrangian contact to split-signature conformal structures and examine several related topics. In particular, we describe the canonical curves and their correspondence. We show that chains and null-chains of an integrable Lagrangian contact structure are the projections of null-geodesics of the Fefferman space. Employing the Fermat principle, we realize chains as geodesics of Kropina (pseudo-Finsler) metrics. Using recent rigidity results, we show that 'sufficiently many' chains determine the Lagrangian contact structure. Separately, we comment on Lagrangian contact structures induced by projective structures and the special case of dimension three. [ABSTRACT FROM AUTHOR]

Published

2024

13. On the vibration control of semi-active friction dampers with piecewise defined contact geometries.

Author

Aramendiz, Jimmy and Fidlin, Alexander

Subjects

*DRY friction, *ENERGY industries, *SMART structures, *NONLINEAR systems, *GEOMETRY, *FRICTION, *CONTACT geometry

Abstract

Suppressing unwanted vibrations has been a major challenge for more than a century. Semi-active dampers offer a compromise between the high energy costs of active solutions and their increased flexibility. A nonlinear system that utilizes dry friction and piecewise defined contact geometries is used as the basis for a semi-active damper. Furthermore, a slow frequency-based control that does not solely rely on dissipation is considered and compared to the conventional Skyhook Control. Simulations show that the strategy is an effective approach for vibration reduction. [ABSTRACT FROM AUTHOR]

Published

2023

14. Effect of Running-In Conditions on the Super Low EHD Sliding Friction of Si3N4 Ball and WC Plate in Glycerol–Water Solution.

Author

Cao, Renshui, Liu, Chenxu, Cao, Hui, Li, Yuanzhe, Khan, Zulfiqar, and Meng, Yonggang

Abstract

In water-based experiments exploring ultralow or super low friction, the implementation of a running-in period before reaching such states is necessary and important. However, the effect of the change in contact geometry has not been fully realized. In this paper, a series of running-in tests on a Si3N4 ball and a WC plate have been performed in glycerol–water mixtures with different concentrations. The shape of the wear scars and the chemical compositions of the worn surfaces were characterized in detail. A numerical EHD and mixed lubrication model was established to comprehensively analyze the effects of geometric profiles, surface roughness, and working/lubrication conditions on ultralow or super low sliding friction. The experiment and simulation results of the study have provided an in-depth understanding of the mechanism of super low friction of liquid lubricated sliding point contacts. [ABSTRACT FROM AUTHOR]

Published

2023

15. Scaling symmetries, contact reduction and Poincaré's dream.

Author

Bravetti, Alessandro, Jackman, Connor, and Sloan, David

Subjects

*HAMILTONIAN systems, *CLASSICAL mechanics, *VARIATIONAL principles, *SYMMETRY, *PHENOMENOLOGICAL theory (Physics)

Abstract

We state conditions under which a symplectic Hamiltonian system admitting a certain type of symmetry (a scaling symmetry) may be reduced to a type of contact Hamiltonian system, on a space of one less dimension. We observe that such contact reductions underly the well-known McGehee blow-up process from classical mechanics. As a consequence of this broader perspective, we associate a type of variational Herglotz principle associated to these classical blow-ups. Moreover, we consider some more flexible situations for certain Hamiltonian systems depending on parameters, to which the contact reduction may be applied to yield contact Hamiltonian systems along with their Herglotz variational counterparts as the underlying systems of the associated scale-invariant dynamics. From a philosophical perspective, one obtains an equivalent description for the same physical phenomenon, but with fewer inputs needed, thus realizing Poincaré's dream of a scale-invariant description of the Universe. [ABSTRACT FROM AUTHOR]

Published

2023

16. Influence of Pile Cap–Ground Contact Geometry on the Behavior of Piled Foundations.

Author

França, Azevedo Gabriela and Rodrigo, Garcia Jean

Subjects

*BUILDING foundations, *FINITE element method, *NUMERICAL analysis, *CURVES, *CONTACT geometry

Abstract

In piled raft foundations, the bearing capacity is the result of the combination of the resistance of the pile group and the contribution of the contact between the pile cap and the soil. Although this contact contribution is still neglected, studies show that in certain cases, the load capacity directly absorbed by the pile cap can exceed the load absorbed by the pile group. Among the various factors that influence the behavior of piled raft foundations, the effect of contact geometry on the foundation has been inadequately researched. In this study, three-dimensional numerical analyses were conducted using the finite element method with the LCPC-CESAR software to investigate how pile cap–soil contact geometries affect the behavior of piled raft foundations. The net contact area, diameter, length, and number of piles were kept constant in all cases analyzed. Despite the complex interface of the LCPC-CESAR software, which hinders problem remodeling, validation securely demonstrated that this tool could replicate the behavior of piled raft foundations. The study results showed that, regardless of the spacing between the piles, the contact geometry does not affect the load–settlement curve of the system but significantly alters the distribution of loads among the foundation elements and the transfer of loads from the piles to the surrounding soil. When comparing pile cap geometries, it was observed that the square geometry supports a larger portion of the load compared to other geometries, likely due to better coverage of the pile inside the pile cap provided by this square configuration. [ABSTRACT FROM AUTHOR]

Published

2023

17. Effect of contact geometry on temperature field distribution and thermal buckling of an in-wheel disc brake system.

Author

Koranteng, Kingsford, Shaahu, Joseph-Shaahu, and Yi, Yun-Bo

Subjects

*DISC brakes, *TEMPERATURE distribution, *BRAKE systems, *AUTOMOBILE brakes, *CRITICAL temperature, *NONLINEAR analysis, *CONTACT geometry

Abstract

This paper aims to determine the effect of contact geometry on temperature distribution and thermal buckling in an in-wheel brake system. Numerical analysis is conducted to investigate the variation of temperature field distribution on the brake disc a different cover angles of the pad while maintaining the same moment of friction. Also, different positions of the pads on the disc are considered. To verify the simulation results, an analytical solution is derived. The results show that, for the same work done by the pads on the disc, the resulting temperature field distributions have various effects on the disc. Moreover, certain contact geometry was found to cause the braking temperature to exceed the critical temperature, leading to thermal buckling of the disc during braking. [ABSTRACT FROM AUTHOR]

Published

2023

18. Thermodynamic Entropy as a Noether Invariant from Contact Geometry.

Author

Bravetti, Alessandro, García-Ariza, Miguel Ángel, and Tapias, Diego

Subjects

*NOETHER'S theorem, *ENTROPY, *CONTACT geometry

Abstract

We use a formulation of Noether's theorem for contact Hamiltonian systems to derive a relation between the thermodynamic entropy and the Noether invariant associated with time-translational symmetry. In the particular case of thermostatted systems at equilibrium, we show that the total entropy of the system plus the reservoir are conserved as a consequence thereof. Our results contribute to understanding thermodynamic entropy from a geometric point of view. [ABSTRACT FROM AUTHOR]

Published

2023

19. Generalized virial theorem for contact Hamiltonian systems.

Author

Ghosh, Aritra

Subjects

*VIRIAL theorem, *HAMILTONIAN systems, *SYMPLECTIC manifolds, *VERTICAL motion, *PARTICLE motion, *FREE convection

Abstract

We formulate and study a generalized virial theorem for contact Hamiltonian systems. Such systems describe mechanical systems in the presence of simple dissipative forces such as Rayleigh friction, or the vertical motion of a particle falling through a fluid (quadratic drag) under the action of constant gravity. We find a generalized virial theorem for contact Hamiltonian systems which is distinct from that obtained earlier for the symplectic case. The 'contact' generalized virial theorem is shown to reduce to the earlier result on symplectic manifolds as a special case. Various examples of dissipative mechanical systems are discussed. We also formulate a generalized virial theorem in the contact Lagrangian framework. [ABSTRACT FROM AUTHOR]

Published

2023

20. Semi-classical Monte Carlo study of the impact of contact geometry and transmissivity on quasi-ballistic nanoscale Si and In0.53Ga0.47As n-channel FinFETs.

Author

Bhatti, Aqyan A., Crum, Dax M., Valsaraj, Amithraj, Register, Leonard F., and Banerjee, Sanjay K.

Subjects

*MONTE Carlo method, *CONTACT dermatitis, *NANOSILICON, *INDIUM gallium zinc oxide, *CONTACT geometry

Abstract

The effects of contact geometry and specific contact resistivity on In0.53Ga0.47As (InGaAs) and silicon (Si) nanoscale (18 nm channel length) n-channel FinFETs performance, and the effects of models thereof, are studied using a quantum-corrected semiclassical Monte Carlo method. Saddle/slot, raised source and drain (RSD), and reference end contacts are modeled. Both ideal perfectly injecting and absorbing contacts and those with more realistic specific contact resistivities are considered. Far-from-equilibrium degenerate statistics, quantum-confinement effects on carrier distributions in real-space and among energy valleys and on scattering, and quasiballistic transport are modeled. Silicon ⟨ 110 ⟩ channel and Si ⟨ 100 ⟩ channel FinFETs, multivalley InGaAs channel FinFETs with conventionally reported InGaAs energy valley offsets, and reference idealized Γ-valley-only InGaAs (Γ-InGaAs) channel FinFETs are simulated. Among our findings, InGaAs channel FinFETs are highly sensitive to modeled contact geometry and specific contact resistivity and to the band structure model, while Si channel FinFETs showed still significant but much less sensitivity to the contact models. For example, for idealized unity transmissivity contacts, Γ-InGaAs channel FinFETs performed best for all contact geometries, at least in terms of transconductance, and end contacts provided the best performance for all considered channel materials. For realistic contact resistivities, however, the results are essentially reversed. Silicon channel FinFETs performed best for all contact geometries, and saddle/slot and RSD contacts outperformed end contacts. [ABSTRACT FROM AUTHOR]

Published

2019

21. Contact geometric approach to Glauber dynamics near a cusp and its limitation.

Author

Goto, Shin-itiro, Lerer, Shai, and Polterovich, Leonid

Subjects

*GEOMETRIC approach, *ISING model, *METASTABLE states, *LOW temperatures

Abstract

We study a nonequilibrium mean field Ising model in the low temperature phase regime, where metastable equilibrium states develop a cuspidal (spinodal) singularity. We focus on celebrated Glauber dynamics, and design a contact Hamiltonian flow which captures some of its rough features in this regime. We prove, however, that there is an inevitable discrepancy between the scaling laws for the relaxation time in the Glauber and the contact Hamiltonian dynamical systems. [ABSTRACT FROM AUTHOR]

Published

2023

22. Hamilton–Jacobi approach to thermodynamic transformations.

Author

Ghosh, Aritra

Abstract

In this note, we formulate and study a Hamilton–Jacobi approach for describing thermodynamic transformations. The thermodynamic phase space assumes the structure of a contact manifold with the points representing equilibrium states being restricted to certain submanifolds of this phase space. We demonstrate that Hamilton–Jacobi theory consistently describes thermodynamic transformations on the space of externally controllable parameters or equivalently the space of equilibrium states. It turns out that in the Hamilton–Jacobi description, the choice of the principal function is not unique but, the resultant dynamical description for a given transformation remains the same irrespective of this choice. Some examples involving thermodynamic transformations of the ideal gas are discussed where the characteristic curves on the space of equilibrium states completely describe the dynamics. The geometric Hamilton–Jacobi formulation which has emerged recently is also discussed in the context of thermodynamics. [ABSTRACT FROM AUTHOR]

Published

2023

23. Conformal Ricci soliton and almost conformal Ricci soliton in paracontact geometry.

Author

Dey, Santu

Subjects

*INFINITESIMAL transformations, *VECTOR fields, *GEOMETRY, *SCALAR field theory, *EINSTEIN manifolds, *RICCI flow, *CONTACT geometry

Abstract

In this paper, we study conformal Ricci soliton and almost conformal Ricci soliton within the framework of paracontact manifolds. Here, we have shown the characteristics of the soliton vector field and the nature of the manifold if para-Sasakian metric satisfies conformal Ricci soliton. We also demonstrate the feature of the soliton vector field V and scalar curvature when the para-Sasakian manifold admitting conformal Ricci soliton and vector field is pointwise collinear with the characteristic vector field ξ. Next, we prove that if a K-paracontact manifold confesses a gradient conformal Ricci soliton, then it is Einstein. Next, we show that a para-Sasakian metric reveals with an almost conformal Ricci soliton that is either Einstein or η -Einstein metric if the soliton vector field V is an infinitesimal contact transformation. Lastly, we decorate an example of conformal Ricci soliton on para-Sasakian manifold. [ABSTRACT FROM AUTHOR]

Published

2023

24. On geometric bases for quantum A-polynomials of knots.

Author

Galakhov, Dmitry and Morozov, Alexei

Subjects

*CONTACT geometry, *CHERN-Simons gauge theory, *CALCULUS, *POLYNOMIALS, *GENERALIZATION

Abstract

A simple geometric way is suggested to derive the Ward identities in the Chern-Simons theory, also known as quantum A - and C -polynomials for knots. In quasi-classical limit it is closely related to the well publicized augmentation theory and contact geometry. Quantization allows to present it in much simpler terms, what could make these techniques available to a broader audience. To avoid overloading of the presentation, only the case of the colored Jones polynomial for the trefoil knot is considered, though various generalizations are straightforward. Restriction to solely Jones polynomials (rather than full HOMFLY-PT) is related to a serious simplification, provided by the use of Kauffman calculus. Going beyond looks realistic, however it remains a problem, both challenging and promising. [ABSTRACT FROM AUTHOR]

Published

2025

25. Effect of contact geometry on lubricant replenishment in grease lubricated rolling contacts.

Author

Jin, Xuyang, Li, Xinming, Bai, Linqing, Guo, Feng, Gao, Junbin, and Poll, Gerhard

Subjects

*ROLLER bearings, *SURFACE tension, *CONFORMITY, *STARVATION, *ROLLING contact, *CONTACT geometry

Abstract

The contact geometries encountered in rolling element-outer race or inner race contacts in real bearings are not involved in conventional ball-on-flat disc configurations. However, the underlying lubricant replenishment mechanism induced by the contact conformity plays a significant role in maintaining a long-term operation of the rolling bearings. To reveal those replenishment mechanisms, the traditional flat disc is replaced by a grooved disc to reproduce the contact geometries. Additionally, a ball support structure consisting of dual arc-shaped rollers is employed to simulate the ball-inner race contact, aiming to explore the contributions of grease distributions to replenishment. The results show that the film thickness gradually diminishes to severe starvation states in the traditional contact configuration, while the lubrication states are efficiently improved as the ball-grooved or ball-arc shaped contact configuration is introduced, confirming the replenishment efficiency. The enhanced lubricant replenishment behaviors can be attributed to the high-strength shear exerted on the grease both at the inlet region and within the contacts where micro-slip occurs, as well as the surface tension and capillary force-induced lubricant replenishment. The findings of this study contribute to a comprehensive understanding of grease lubrication and replenishment in real bearings. [ABSTRACT FROM AUTHOR]

Published

2024

26. YAMABE SOLITONS IN CONTACT GEOMETRY.

Author

PODDAR, RAHUL, BALASUBRAMANIAN, S., and SHARMA, RAMESH

Subjects

*SASAKIAN manifolds, *VECTOR fields, *SOLITONS, *CURVATURE, *EIGENVECTORS, *CONTACT geometry

Abstract

It is shown that the scalar curvature of a Yamabe soliton as a Sasakian manifold is constant and the soliton vector field is Killing. The same conclusion is shown to hold for a Yamabe soliton as a K-contact manifold M2n+1 if any one of the following conditions hold: (i) its scalar curvature is constant along the soliton vector field V, (ii) V is an eigenvector of the Ricci operator with eigenvalue 2n, (iii) V is gradient. [ABSTRACT FROM AUTHOR]

Published

2023

27. Symplectic structure of equilibrium thermodynamics.

Author

Aragón-Muñoz, Luis and Quevedo, Hernando

Subjects

*THERMODYNAMIC equilibrium, *TANGENT bundles, *SYMPLECTIC geometry, *HAMILTONIAN systems, *EQUILIBRIUM

Abstract

The contact geometric structure of the thermodynamic phase space is used to introduce a novel symplectic structure on the tangent bundle of the equilibrium space. Moreover, it turns out that the equilibrium space can be interpreted as a Lagrange submanifold of the corresponding tangent bundle, if the fundamental equation is known explicitly. As a consequence, Hamiltonians can be defined that describe thermodynamic processes. [ABSTRACT FROM AUTHOR]

Published

2022

28. Application of Herglotz's variational principle to electromagnetic systems with dissipation.

Author

Gaset, Jordi and Marín-Salvador, Adrià

Subjects

*VARIATIONAL principles, *ELECTROMAGNETIC fields, *POYNTING theorem, *CLASSICAL mechanics, *LORENTZ force

Abstract

This work applies the contact formalism of classical mechanics and classical field theory, introduced by Herglotz and later developed in the context of contact geometry, to describe electromagnetic systems with dissipation. In particular, we study an electron in a non-perfect conductor and a variation of the cyclotron radiation. In order to apply the contact formalism to a system governed by the Lorentz force, it is necessary to generalize the classical electromagnetic gauge and add a new term in the Lagrangian. We also apply the k-contact theory for classical fields to model the behavior of electromagnetic fields themselves under external damping. In particular, we show how the theory describes the evolution of electromagnetic fields in media under some circumstances. The corresponding Poynting theorem is derived. We discuss its applicability to the Lorentz dipole model and to a highly resistive dielectric. [ABSTRACT FROM AUTHOR]

Published

2022

29. Model-Based 3D Contact Geometry Perception for Visual Tactile Sensor.

Author

Ji, Jingjing, Liu, Yuting, and Ma, Huan

Subjects

*TACTILE sensors, *VISUAL perception, *SPATIAL orientation, *DEPTH perception, *TOUCH, *CONTACT geometry

Abstract

Tactile sensing plays an important role for robots' perception, but the existing tactile technologies have multiple limitations. Visual-tactile sensor (VTS) is a newly developed tactile detector; it perceives the contacting surface shape, or even more refined texture, by way of the contact deformation image captured by a camera. A conventional visual perception is usually formulated as a data processing. It suffers issues of cumbersome training set and complicated calibration procedures. A novel model-based depth perceptual scheme is proposed where a mapping from the image intensity to the contact geometry is mathematically formulated with an associated tailored fast solver. The hardware calibration requires single image only, leading to an outstanding algorithmic robustness. The non-uniformity of the illumination condition is embodied by the stereo model, resulting in a robust depth perception precision. Compression tests on a prototype VTS showed the method's capability in high-quality geometry reconstruction. Both contacting shape and texture were captured at a root-mean-square error down to a sub-millimeter level. The feasibility of the proposed in a pose estimation application is further experimentally validated. The associated tests yielded estimation errors that were all less than 3° in terms of spatial orientation and all less than 1mm in terms of translation. [ABSTRACT FROM AUTHOR]

Published

2022

30. A novel three-dimensional wheel–rail contact geometry method in the switch panel considering variable cross-sections and yaw angle.

Author

Chen, Yu, Wang, Jian, Chen, Jiayin, Wang, Ping, Xu, Jingmang, and An, Boyang

Subjects

*ANGLES, *WHEELS, *STRESS concentration, *CONTACT angle, *CONTACT geometry

Abstract

Solving the wheel-turnout contact geometry is complex because the rail section is varying along its longitudinal position. Besides, a large yaw angle will occur, especially when the vehicle passes the switch panel in a diverging route. However, previous researches seldom considered the aforementioned factors simultaneously in performing wheel–rail local contact analysis. This paper therefore proposes a novel three-dimensional (3D) contact geometry method considering the combined effects of varying rail profiles and the yaw angle. This study uses S1002CN wheels and the switch panel of a 1:12 turnout as research objects to study the contact geometry, normal and tangential contact solution. The results indicate that the combined influences of rail profiles varying within the contact patch and the yaw angle on the contact solution are significant. The variable rail profiles obviously affect the position of the contact point. With a yaw angle, the normal gap, contact patch shape and stress distribution calculated by the novel 3D contact geometry method are asymmetric along the lateral and longitudinal directions, especially when the wheel flange contacts with a rail gauge corner. The proposed method can improve the accuracy of the wheel–rail contact solution and help predict rail damage in switch panels. [ABSTRACT FROM AUTHOR]

Published

2022

31. Generalized Quasi-Einstein Metrics and Contact Geometry.

Author

BISWAS, GOUR GOPAL, DE, UDAY CHAND, and YILDIZ, AHMET

Subjects

*EINSTEIN manifolds, *SASAKIAN manifolds, *CONTACT geometry

Abstract

The aim of this paper is to characterize K-contact and Sasakian manifolds whose metrics are generalized quasi-Einstein metric. It is proven that if the metric of a K-contact manifold is generalized quasi-Einstein metric, then the manifold is of constant scalar curvature and in the case of a Sasakian manifold the metric becomes Einstein under certain restriction on the potential function. Several corollaries have been provided. Finally, we consider Sasakian 3-manifold whose metric is generalized quasi-Einstein metric. [ABSTRACT FROM AUTHOR]

Published

2022

32. Strength of Contact Geometry for Multi‐material 3D‐Printed Samples.

Author

Ermolai, Vasile, Sover, Alexandru, and Nagit, Gheorghe

Subjects

*ENGINEERING standards, *EXPERIMENTAL design, *NOZZLES, *CONTACT geometry

Abstract

Fused filament fabrication is an extrusion‐based additive manufacturing technology with relatively low‐cost equipment and a great variety of materials from standard to engineering grade. Multiple extrusion systems allow for new opportunities regarding the manufacturing of multi‐color and multi‐material parts. However, regular bond formation of part's bodies provided by the slicing tool offers good results regarding the resulting product's dimensional stability but poor mechanical properties. For this reason, this paper aims to investigate if the mechanical properties of compatible polymers can be enhanced by modifying the regular flat to a flat surface with different shape interfaces and an overlap degree between them. Furthermore, for a broader understanding of the bond formation, the design of the experiment comprises two groups referring to the material blend along with their melting ranges and join geometry, which is constrained with regard to nozzle output size. The results show that the mechanical properties of multi‐material bonds can be enhanced conveniently by adding an overlap degree between mating bodies. [ABSTRACT FROM AUTHOR]

Published

2022

33. An exact equation for the average interparticle forces at contacts with similar orientations in granular materials.

Author

Duan, Ge, Zhao, Chaofa, Pan, Kun, and Chen, Yanni

Subjects

*GRANULAR materials, *CONTACT geometry, *MULTISCALE modeling, *STRAINS & stresses (Mechanics), *MICROSTRUCTURE

Abstract

The macro behaviour of granular materials is strongly influenced by their micro-structure. In developing multi-scale models for granular materials, group-averaged quantities (i.e. averages over groups of contacts with the same contact orientation) serve as a bridge between the micro and macro behaviours. In micromechanical models, the particle equilibrium equations are only used in deriving the micromechanical expression for the stress tensor. Here an additional, exact equation is derived for group-averaged forces of contacts with similar orientations, based on the particle equilibrium equations. The formulated equation is obtained by adding subsets of particle equilibrium equations and is independent of particle shapes and loading conditions. The equation involves a geometrical structure function that characterizes three-particle correlations for the particle positions. The obtained relationship is validated through two-dimensional DEM simulations on specimens with disk- and peanut-shaped particles. The research results contribute to developing multi-scale constitutive models that account for neighbouring contacts. [ABSTRACT FROM AUTHOR]

Published

2025

34. Contact geometry and contact time effect on 690TT alloy/405 stainless steel impact-sliding fretting wear processes.

Author

Mi, Xue, Tang, Pan, Zhang, Jun, Bai, Xiao-ming, Sun, Qi, and Zhu, Min-hao

Subjects

*CONTACT geometry, *FRETTING corrosion, *TANGENTIAL force, *STAINLESS steel, *AIR cylinders, *SLIDING wear, *STEAM generators

Abstract

Due to the inevitable flow-induced vibration and turbulent excitation in steam generator (SG), it is impossible to avoid fretting wear or impact between steam generator tubes (SGTs) and anti-vibration bars (AVBs). Therefore, the approach of this work was to simulate the real fretting problems between SGTs and AVBs. Thus, the impact-sliding fretting wear tests of 690TT alloy/405 stainless steel (405 SS) were investigated under various contact times in tube/plate configuration and tube/cylinder configuration in air at room temperature, respectively. The results indicated that the influences of contact geometry and contact time on the peak radial force (F rp) were insignificant, while the value of peak tangential force (F tp) was seen to increase with increasing contact time and was associated with the contribution of sliding wear to impact-sliding process. Meanwhile, the degree of wear damage increased with the increase of contact time, either line contact or point contact. The damage area of wear scar in tube/plate configuration was evidently larger than that of tube/cylinder configuration. Instead, the maximum wear depth of tube/cylinder configuration was larger than that of tube/plate configuration. Along the sliding direction, the "U" shape profiles were usually detected whether tube/plate configuration or tube/cylinder configuration. In general, both contact geometry and contact time had a direct influence on the behavior of wear debris, i.e., movement and oxidation. • The influences of contact geometry and contact time on peak radial force were insignificant. • The peak tangential force increased with increasing contact time and was associated with the contribution of sliding. • Contact geometry and contact time had a direct influence on the movement and oxidation of wear debris. [ABSTRACT FROM AUTHOR]

Published

2025

35. Transient mixed thermal elastohydrodynamic lubrication analysis of aero ball bearing under non-steady state conditions.

Author

Wu, Jiqiang, He, Tao, Wang, Dandan, Wang, Liqin, Jiang, Shengyuan, Wang, Yaqian, Chen, Kang, Zhang, Chuanwei, Shu, Kun, and Li, Zhen

Subjects

*CONTACT geometry, *BALL bearings, *NEW business enterprises, *PERFORMANCE theory, *VELOCITY

Abstract

A transient mixed thermal elastohydrodynamic lubrication model of bearing considering the thermal effect and the changes in velocity, load, and contact geometry is proposed. Based on the bearing dynamic and lubrication analysis, the effects of bearing rotational speed and start-stop conditions on the dynamic behavior and lubrication performance are studied. Results show that when the bearing rotational speed exceeds a certain critical value, the increasing speed will reduce the film thickness, especially the outer raceway. The increasing bearing acceleration can cause a higher slide-roll ratio and film temperature at the initial start-up process. Compared with the start-up process, the lubrication change in the shut-down process has a similar opposite trend, but the overall lubrication performance is better. [ABSTRACT FROM AUTHOR]

Published

2025

36. Concordance maps in HFK−.

Subjects

*FLOER homology, *KNOT theory, *HOMOMORPHISMS

Abstract

We show that a decorated knot concordance from K 0 to K 1 induces an [ U ] -module homomorphism G : HFK − (− S 3 , K 0) → HFK − (− S 3 , K 1) , which preserves the Alexander and absolute ℤ 2 -Maslov gradings. Our construction generalizes the concordance maps induced on HFK ̂ studied by Juhász and Marengon [Concordance maps in knot Floer homology, Geom. Topol.20 (2016) 3623–3673], but uses the description of HFK − as a direct limit of maps between sutured Floer homology groups discovered by Etnyre et al. [Sutured Floer homology and invariants of Legendrian and transverse knots, Geom. Topol.21 (2017) 1469–1582]. [ABSTRACT FROM AUTHOR]

Published

2022

37. Addendum To: Almost Ricci solitons and K-contact geometry.

Author

Sharma, Ramesh

Subjects

*EINSTEIN manifolds, *VECTOR fields, *CONTACT geometry

Abstract

We improve the previous result "A complete Ricci soliton whose metric g is K-contact and the soliton vector field X is strictly contact, is compact Sasakian Einstein" and show that, if a complete Ricci soliton (M, g, X) whose metric g is a contact metric and the soliton vector field X is strictly contact, then X is an infinitesimal automorphism and g is Einstein. Finally, for a Ricci soliton with X as the Reeb vector field, we show that (M, g) is compact Einstein and and Sasakian. [ABSTRACT FROM AUTHOR]

Published

2022

38. Detailed wheel/rail geometry processing using the planar contact approach.

Author

Vollebregt, E. A. H.

Subjects

*GEOMETRY, *RIGID bodies, *KINEMATICS, *WHEELS, *SOFTWARE architecture

Abstract

The use of detailed wheel/rail contact models has long been frustrated by the complicated preparations needed, to analyse the profiles for the local geometry and creep situation for the planar contact approach. A new software module is presented for this that automates the calculations in a generic way. Building on many components developed by others, this greatly simplifies the running of CONTACT for generic wheel/rail contact situations. Fully 3-d contact search algorithms are implemented. This uses the contact locus approach, that's simplified for wheel-on-rail situations and extended to wheel-on-roller contacts. A main characteristic of the new module is its extensive use of the multibody formalism, using markers to represent coordinate systems, using a newly designed, generic, object oriented-like software foundation. The contact geometry is analysed twice; first for the location of contact patches, and then for the local geometry of the contact patches. The contact search starts from profiles in their actual, overlapping positions. This yields the extent of interpenetration areas as needed for the potential contact definition. Different strategies may be employed for the tangent plane needed in the planar contact method. Creepages are formed automatically using rigid body kinematics, including wheel and track flexible bending. Numerical results illustrate the viability, generality, and robustness of the approach. The extension to conformal contacts is presented in an accompanying paper. [ABSTRACT FROM AUTHOR]

Published

2022

39. On the induced geometry on surfaces in 3D contact sub-Riemannian manifolds.

Author

Barilari, Davide, Boscain, Ugo, and Cannarsa, Daniele

Subjects

*SURFACE geometry, *GEOMETRIC surfaces, *GAUSSIAN curvature, *TOPOLOGY, *FINITE, The, *FOLIATIONS (Mathematics), *RIEMANNIAN manifolds

Abstract

Given a surface S in a 3D contact sub-Riemannian manifold M, we investigate the metric structure induced on S by M, in the sense of length spaces. First, we define a coefficient K̂ at characteristic points that determines locally the characteristic foliation of S. Next, we identify some global conditions for the induced distance to be finite. In particular, we prove that the induced distance is finite for surfaces with the topology of a sphere embedded in a tight coorientable distribution, with isolated characteristic points. [ABSTRACT FROM AUTHOR]

Published

2022

40. Almost quasi-Yamabe solitons and gradient almost quasi-Yamabe solitons in paracontact geometry.

Author

De, Krishnendu and De, Uday Chand

Subjects

*GEOMETRY, *QUASI-Newton methods, *SOLITONS, *CONTACT geometry

Abstract

The purpose of the present paper is to investigate the almost quasi-Yamabe soliton and gradient almost quasi-Yamabe solitons under the framework of three-dimensional normal almost paracontact metric manifolds. [ABSTRACT FROM AUTHOR]

Published

2021

41. Controlling the adhesive pull-off force via the change of contact geometry.

Author

Argatov, I. I.

Subjects

*POISSON'S ratio, *ADHESIVES, *CONTACT geometry

Abstract

A first-order asymptotic analysis of the Griffith energy balance in the Johnson-Kendall-Roberts model of adhesive contact under non-symmetric perturbation of the contact geometry is presented. The pull-off force is evaluated in explicit form. A particular case of adhesive contact between a relatively stiff sphere and an elastic half-space is considered under the assumption that the sphere geometry is changed by the application of an arbitrary lateral normal surface loading. The effect of the sphere Poisson's ratio on controlling the adhesive pull-off force is considered. [ABSTRACT FROM AUTHOR]

Published

2021

42. Force modeling of vertical surface grinding considering wheel-workpiece contact geometry.

Author

Gao, Binhua, Jin, Tan, Qu, Meina, Li, Ping, Xie, Guizhi, and Shang, Zhentao

Subjects

*GRINDING wheels, *GEOMETRY, *SURFACE interactions, *GRAIN, *MACHINING, *CONTACT geometry

Abstract

• Expressions of geometrical-kinematic parameters in vertical surface grinding were derived. • A single-grain grinding force model was developed from the energy perspective. • Multiple-grain interactions in vertical surface grinding were analyzed. • The influence mechanisms of the wheel-workpiece contact geometry on grinding forces were revealed. Vertical surface grinding (VSG) is an effective method that can adapt to multiple machining tasks, including stock removal machining to get high productivity and finish machining to obtain high-quality surfaces. Force prediction can reveal some mechanisms in the VSG process, conducing to the improved machining quality and efficiency. This paper aims to develop a novel analytical force model considering the actual wheel-workpiece contact geometry (WWCG). In the modeling process, the cup grinding wheel was divided into many micro-cutting layers along the wheel axis, and the expressions of geometrical-kinematic parameters were derived to characterize the material removal at different positions of the primary grinding zone (PGZ). A single-grain grinding force model was proposed based on chip formation and plastic pile-up mechanisms from an energy perspective. Based on the analysis of multiple-grain interactions at each micro-cutting layer, equations of the local and total grinding forces in the VSG process were then derived by synthesizing the single-grain forces. Findings show that the developed model could accurately predict the magnitudes of total grinding forces and provide the distributions of local grinding forces. The WWCG variation could significantly affect the grinding forces by altering the material removal rate of different micro-cutting layers. This work provides a new method for predicting grinding forces and theoretical guidance for optimizing machining parameters and tailoring the edge profiles of cup grinding wheels to adapt to specific machining tasks. [Display omitted] [ABSTRACT FROM AUTHOR]

Published

2024

43. Constructing Turing complete Euler flows in dimension 3.

Author

Cardona, Robert, Miranda, Eva, Peralta-Salas, Daniel, and Presas, Francisco

Subjects

*EULER equations, *NAVIER-Stokes equations, *TURING machines, *FLUID flow, *HYDRODYNAMICS

Abstract

Can every physical system simulate any Turing machine? This is a classical problem that is intimately connected with the undecidability of certain physical phenomena. Concerning fluid flows, Moore [C. Moore, Nonlinearity 4, 199 (1991)] asked if hydrodynamics is capable of performing computations. More recently, Tao launched a program based on the Turing completeness of the Euler equations to address the blow-up problem in the Navier-Stokes equations. In this direction, the undecidability of some physical systems has been studied in recent years, from the quantum gap problem to quantum-field theories. To the best of our knowledge, the existence of undecidable particle paths of threedimensional fluid flows has remained an elusive open problem since Moore's works in the early 1990s. In this article, we construct a Turing complete stationary Euler flow on a Riemannian S3 and speculate on its implications concerning Tao's approach to the blow-up problem in the Navier-Stokes equations. [ABSTRACT FROM AUTHOR]

Published

2021

44. Riemann soliton within the framework of contact geometry.

Author

Devaraja, M.N., Aruna Kumara, H., and Venkatesha, V.

Subjects

*EINSTEIN manifolds, *SASAKIAN manifolds, *VECTOR fields, *CURVATURE, *SPHERES, *CONTACT geometry

Abstract

In this paper, we study contact metric manifold whose metric is a Riemann soliton. First, we consider Riemann soliton (g, V) with V as contact vector field on a Sasakian manifold (M, g) and in this case we prove that M is either of constant curvature +1 (and V is Killing) or D-homothetically fixed η-Einstein manifold (and V leaves the structure tensor φ invariant). Next, we prove that if a compact K-contact manifold whose metric g is a gradient almost Riemann soliton, then it is Sasakian and isometric to a unit sphere S2n+1. Further, we study H-contact manifold admitting a Riemann soliton (g, V) where V is pointwise collinear with ξ. [ABSTRACT FROM AUTHOR]

Published

2021

45. Carbon nanotube field-effect devices with asymmetric electrode configuration by contact geometry.

Author

Yotprayoonsak, P., Talukdar, D., and Ahlskog, M.

Subjects

*SINGLE walled carbon nanotubes, *FIELD-effect devices, *ELECTRODES, *GOLD, *PALLADIUM, *SORBENTS, *CONTACT geometry

Abstract

We have studied experimentally the conductive properties of single walled carbon nanotube (SWNT) based field-effect type devices, with different contact geometries at the connecting electrode. The device designs are asymmetric with one end of the SWNT having the metal electrode deposited on top and immersing it, while at the other end, the SWNT is on top of the electrode. The devices were made with either gold or palladium as electrode materials, of which the latter resulted in different behavior of the different contact types. This is argued to be caused by the existence of a thin insulating layer of surface adsorbents on the palladium, possibly Pd5O4, the effect of which is enhanced by the 1D nature of the contact area in the configuration with SWNT on top of electrode. [ABSTRACT FROM AUTHOR]

Published

2014

46. Ricci almost solitons and contact geometry.

Author

Ghosh, Amalendu

Subjects

*SOLITONS, *CONTACT geometry

Abstract

We prove that on a K-contact manifold, a Ricci almost soliton is a Ricci soliton if and only if the potential vector field V is a Jacobi field along the Reeb vector field ξ. Then we study contact metric as a Ricci almost soliton with parallel Ricci tensor. To this end, we consider Ricci almost solitons whose potential vector field is a contact vector field and prove some rigidity results. [ABSTRACT FROM AUTHOR]

Published

2021

47. Tuning spin transport properties and molecular magnetoresistance through contact geometry.

Author

Ulman, Kanchan, Narasimhan, Shobhana, and Delin, Anna

Subjects

*MOLECULAR shapes, *SPINTRONICS, *MAGNETORESISTANCE, *GREEN'S functions, *NANOELECTRONICS, *CONTACT geometry

Abstract

Molecular spintronics seeks to unite the advantages of using organic molecules as nanoelectronic components, with the benefits of using spin as an additional degree of freedom. For technological applications, an important quantity is the molecular magnetoresistance. In this work, we show that this parameter is very sensitive to the contact geometry. To demonstrate this, we perform ab initio calculations, combining the non-equilibrium Green's function method with density functional theory, on a dithienylethene molecule placed between spin-polarized nickel leads of varying geometries.We find that, in general, the magnetoresistance is significantly higher when the contact is made to sharp tips than to flat surfaces. Interestingly, this holds true for both resonant and tunneling conduction regimes, i.e., when the molecule is in its "closed" and "open" conformations, respectively. We find that changing the lead geometry can increase the magnetoresistance by up to a factor of ∼5. We also introduce a simple model that, despite requiring minimal computational time, can recapture our ab initio results for the behavior of magnetoresistance as a function of bias voltage. This model requires as its input only the density of states on the anchoring atoms, at zero bias voltage. We also find that the non-resonant conductance in the open conformation of the molecule is significantly impacted by the lead geometry. As a result, the ratio of the current in the closed and open conformations can also be tuned by varying the geometry of the leads, and increased by ∼400%. [ABSTRACT FROM AUTHOR]

Published

2014

48. Jacobi geometry and Hamiltonian mechanics: The unit-free approach.

Author

Zapata-Carratalá, Carlos

Subjects

*HAMILTONIAN mechanics, *DIMENSIONAL analysis, *GEOMETRY, *VECTOR bundles, *PHYSICAL constants

Abstract

We present a systematic treatment of line bundle geometry and Jacobi manifolds with an application to geometric mechanics that has not been noted in the literature. We precisely identify categories that generalize the ordinary categories of smooth manifolds and vector bundles to account for a lack of choice of a preferred unit, which in standard differential geometry is always given by the global constant function 1. This is what we call the "unit-free" approach. After giving a characterization of local Lie brackets via their symbol maps, we apply our novel categorical language to review Jacobi manifolds and related notions such as Lichnerowicz brackets and Jacobi algebroids. The main advantage of our approach is that Jacobi geometry is recovered as the direct unit-free generalization of Poisson geometry, with all the familiar notions translating in a straightforward manner. We then apply this formalism to the question of whether there is a unit-free generalization of Hamiltonian mechanics. We identify the basic categorical structure of ordinary Hamiltonian mechanics to argue that it is indeed possible to find a unit-free analogue. This paper serves as a prelude to the investigation of dimensioned structures, an attempt at a general mathematical framework for the formal treatment of physical quantities and dimensional analysis. [ABSTRACT FROM AUTHOR]

Published

2020

49. Contact geometry for simple thermodynamical systems with friction.

Author

Simoes, Alexandre Anahory, de León, Manuel, Valcázar, Manuel Lainz, and de Diego, David Martín

Subjects

*SECOND law of thermodynamics, *FRICTION, *EVOLUTION equations, *VECTOR fields, *CONTACT geometry

Abstract

By means of the Jacobi structure associated with a contact structure, we use the so-called evolution vector field to propose a new characterization of isolated thermodynamical systems with friction, a simple but important class of thermodynamical systems which naturally satisfy the first and second laws of thermodynamics, i.e. total energy preservation of isolated systems and non-decreasing total entropy, respectively. We completely clarify its qualitative dynamics, the underlying geometrical structures and we also show how to apply discrete gradient methods to numerically integrate the evolution equations for these systems. [ABSTRACT FROM AUTHOR]

Published

2020

50. Interval topology in contact geometry.

Author

Chernov, Vladimir and Nemirovski, Stefan

Subjects

*TOPOLOGY, *SUBMANIFOLDS, *GEODESIC spaces, *DEFINITIONS, *CONTACT geometry

Abstract

A topology is introduced on spaces of Legendrian submanifolds and groups of contactomorphisms. The definition is motivated by the Alexandrov topology in Lorentz geometry. [ABSTRACT FROM AUTHOR]

Published

2020