On lattice oscillator-type Kirkwood - Salsburg equation with attractive manybody potentials
We consider a lattice oscillator-type Kirkwood–Salsburg (KS) equation with general one-body phase measurable space and many-body interaction potentials. For special choices of the measurable space, its solutions describe grand-canonical equilibrium states of lattice equilibrium classical and quantum...
Saved in:
| Date: | 2010 |
|---|---|
| Main Authors: | , |
| Format: | Article |
| Language: | English |
| Published: |
Institute of Mathematics, NAS of Ukraine
2010
|
| Online Access: | https://umj.imath.kiev.ua/index.php/umj/article/view/2992 |
| Tags: |
Add Tag
No Tags, Be the first to tag this record!
|
| Journal Title: | Ukrains’kyi Matematychnyi Zhurnal |
| Download file: |  |
Institution
Ukrains’kyi Matematychnyi ZhurnalSimilar Items
On the lattice oscillator-type Kirkwood–Salsburg equation with attractive many-body potentials
by: Skrypnik, W.I.
Published: (2010)
by: Skrypnik, W.I.
Published: (2010)
Kirkwood–Salsburg equation for a quantum lattice system of oscillators with many-particle interaction potentials
by: Skrypnik, W. I., et al.
Published: (2009)
by: Skrypnik, W. I., et al.
Published: (2009)
Solutions of the Kirkwood–Salsburg equation for a lattice classical system of one-dimensional oscillators with positive finite-range many-body interaction potentials
by: Skrypnik, W. I., et al.
Published: (2008)
by: Skrypnik, W. I., et al.
Published: (2008)
Solutions of the Kirkwood-Salsburg equation for particles with finite-range nonpairwise repulsion
by: Skrypnik, W. I., et al.
Published: (2008)
by: Skrypnik, W. I., et al.
Published: (2008)
On lattice oscillator-type Gibbs systems with superstable many-body potentials
by: W. I. Skrypnik
Published: (2012)
by: W. I. Skrypnik
Published: (2012)
On lattice oscillator equilibrium equation with positive infinite-range many-body potentials
by: Skrypnik, W.I.
Published: (2010)
by: Skrypnik, W.I.
Published: (2010)
On an unbounded order parameter in lattice equilibrium GKS-type oscillator systems
by: Skrypnik, W. I., et al.
Published: (2009)
by: Skrypnik, W. I., et al.
Published: (2009)
Long-range order in quantum lattice systems of linear oscillators
by: Skrypnik, W. I., et al.
Published: (2006)
by: Skrypnik, W. I., et al.
Published: (2006)
Long-range order in Gibbs lattice classical linear oscillator systems
by: Skrypnik, W. I., et al.
Published: (2006)
by: Skrypnik, W. I., et al.
Published: (2006)
On polymer expansions for generalized Gibbs lattice systems of oscillators with ternary interaction
by: Skrypnik, W. I., et al.
Published: (2013)
by: Skrypnik, W. I., et al.
Published: (2013)
Long-range order in quantum lattice systems of linear oscillators
by: Skrypnik, W.I.
Published: (2006)
by: Skrypnik, W.I.
Published: (2006)
Kirkwood–Salzburg equation for connected correlation functions
by: Rebenko, O., et al.
Published: (2026)
by: Rebenko, O., et al.
Published: (2026)
On polymer expansions for generalized Gibbs lattice systems of oscillators with ternary interaction
by: W. I. Skrypnik
Published: (2013)
by: W. I. Skrypnik
Published: (2013)
On polymer expansions for generalized Gibbs lattice systems of oscillators with ternary interaction
by: Skrypnik, W.I.
Published: (2013)
by: Skrypnik, W.I.
Published: (2013)
On the relations between some approaches to solving the Kirkwood – Salzburg equations
by: O. L. Rebenko
Published: (2021)
by: O. L. Rebenko
Published: (2021)
On the relations between some approaches to solving the Kirkwood – Salzburg equations
by: Rebenko, A. L., et al.
Published: (2021)
by: Rebenko, A. L., et al.
Published: (2021)
Long-range order in linear ferromagnetic oscillator systems. Strong pair quadratic n-n potential
by: Skrypnik, W. I., et al.
Published: (2004)
by: Skrypnik, W. I., et al.
Published: (2004)
On Polymer Expansions for Equilibrium Systems of Oscillators with Ternary Interaction
by: Skrypnik, W. I., et al.
Published: (2001)
by: Skrypnik, W. I., et al.
Published: (2001)
A new simple proof of cayles’s formula and its relationship with the Kirkwood – Salzburg equations
by: Rebenko, O. L., et al.
Published: (2022)
by: Rebenko, O. L., et al.
Published: (2022)
Long-range order in linear ferromagnetic oscillator systems. Strong pair quadratic n-n potential
by: Skrypnik, W.I.
Published: (2004)
by: Skrypnik, W.I.
Published: (2004)
On Polymer Expansion for Gibbsian States of Nonequilibrium Systems of Interacting Brownian Oscillators
by: Skrypnik, W. I., et al.
Published: (2003)
by: Skrypnik, W. I., et al.
Published: (2003)
A new simple proof of Cayles's formula and its relationship with the Kirkwood–Salzburg equations
by: O. L. Rebenko
Published: (2022)
by: O. L. Rebenko
Published: (2022)
Existence of Periodic Solutions in the System of Nonlinear Oscillators with Power Potentials on a Two-Dimensional Lattice
by: Бак, Сергій
Published: (2021)
by: Бак, Сергій
Published: (2021)
Global well-posedness of the Cauchy problem for system of oscillators on 2D-lattice with power potentials
by: S. M. Bak
Published: (2019)
by: S. M. Bak
Published: (2019)
Existence of Periodic Solutions in the System of Nonlinear Oscillators with Power Potentials on a Two-Dimensional Lattice
by: S. M. Bak
Published: (2020)
by: S. M. Bak
Published: (2020)
On the holomorphic solutions of Hamiltonian equations of motion of point charges
by: Skrypnik, W. I., et al.
Published: (2011)
by: Skrypnik, W. I., et al.
Published: (2011)
On Holomorphic Solutions of the Darwin Equations of Motion of Point Charges
by: Skrypnik, W. I., et al.
Published: (2013)
by: Skrypnik, W. I., et al.
Published: (2013)
Symmetries and Special Solutions of Reductions of the Lattice Potential KdV Equation
by: Ormerod, C.M.
Published: (2014)
by: Ormerod, C.M.
Published: (2014)
On Polymer Expansion for Gibbsian States of Nonequilibrium Systems of Interacting Brownian Oscillators
by: Skrypnik, W.I.
Published: (2003)
by: Skrypnik, W.I.
Published: (2003)
On the post-Darwin approximation of the Maxwell – Lorentz equations of motion
of point charges in the absence of neutrality
by: Skrypnik, W. I., et al.
Published: (2019)
by: Skrypnik, W. I., et al.
Published: (2019)
Periodic and Bounded Solutions of the Coulomb Equation of Motion of Two and Three Point Charges with Equilibrium in the Line
by: Skrypnik, W. I., et al.
Published: (2014)
by: Skrypnik, W. I., et al.
Published: (2014)
The Lattice Sine-Gordon Equation as a Superposition Formula for an NLS-Type System
by: Demskoi, Dmitry K.
Published: (2021)
by: Demskoi, Dmitry K.
Published: (2021)
Oscillations of all solutions of iterative equations
by: Nowakowska, W., et al.
Published: (2007)
by: Nowakowska, W., et al.
Published: (2007)
Positive solutions to singular non-linear Schrödinger-type equations
by: Liskevich, V., et al.
Published: (2009)
by: Liskevich, V., et al.
Published: (2009)
On oscillating-type solutions of the countable system of the differential equations in resonance case
by: S. A. Shchoholev, et al.
Published: (2019)
by: S. A. Shchoholev, et al.
Published: (2019)
Assessment of the Economic Potential and Investment Attractiveness of the Dnipropetrovsk Region
by: N. Osadcha, et al.
Published: (2022)
by: N. Osadcha, et al.
Published: (2022)
Assessment of the Economic Potential and Investment Attractiveness of the Dnipropetrovsk Region
by: Osadcha, N., et al.
Published: (2022)
by: Osadcha, N., et al.
Published: (2022)
Bäcklund Transformation for the BC-Type Toda Lattice
by: Kuznetsov, V., et al.
Published: (2007)
by: Kuznetsov, V., et al.
Published: (2007)
Oscillation of solutions of second order nonlinear functional differential equations of neutral type
by: Ivanov, A.F., et al.
Published: (1991)
by: Ivanov, A.F., et al.
Published: (1991)
Limiting behavior of the solutions to linear second-order parabolic equations
by: Skrypnik, I. I., et al.
Published: (1993)
by: Skrypnik, I. I., et al.
Published: (1993)