Progress in Particle and Nuclear Physics, ISSN 0146-6410, 04/2007, Volume 58, Issue 2, pp. 351 - 386

Quantum chromodynamics (QCD), the gauge field theory of strong interaction, has specific features, asymptotic freedom and confinement, which determine the behaviour of quarks and gluons in particle reactions at high and low energy scales...

3-JET EVENTS | ENERGY-DEPENDENCE | QUANTUM CHROMODYNAMICS | BETA-FUNCTION | 4-JET EVENTS | POWER CORRECTIONS | PHYSICS, NUCLEAR | LEADING ORDER | DEEP-INELASTIC SCATTERING | STRONG-COUPLING CONSTANT | E+E-ANNIHILATION | PHYSICS, PARTICLES & FIELDS

3-JET EVENTS | ENERGY-DEPENDENCE | QUANTUM CHROMODYNAMICS | BETA-FUNCTION | 4-JET EVENTS | POWER CORRECTIONS | PHYSICS, NUCLEAR | LEADING ORDER | DEEP-INELASTIC SCATTERING | STRONG-COUPLING CONSTANT | E+E-ANNIHILATION | PHYSICS, PARTICLES & FIELDS

Journal Article

Physics Letters A, ISSN 0375-9601, 06/2014, Volume 378, Issue 30-31, pp. 2091 - 2095

....•Spectral asymptotics is determined by the geometry of the interaction support. We derive asymptotic expansion for the spectrum of Hamiltonians with a strong attractive δ...

Strong coupling expansion | [formula omitted] surface interaction | delta ' surface interaction | BOUND-STATES | PHYSICS, MULTIDISCIPLINARY

Strong coupling expansion | [formula omitted] surface interaction | delta ' surface interaction | BOUND-STATES | PHYSICS, MULTIDISCIPLINARY

Journal Article

Communications in Partial Differential Equations, ISSN 0360-5302, 02/2014, Volume 39, Issue 2, pp. 193 - 212

We consider a singular Schrödinger operator in L 2 (ℝ 2 ) written formally as − Δ − βδ(x − γ) where γ is a C 4 smooth open arc in ℝ 2 of length L with regular...

Eigenvalue | Strong coupling | Singular interaction | Schrödinger operator | 35J10 | MATHEMATICS | EIGENVALUES | MATHEMATICS, APPLIED | 35P15 | Schrodinger operator | 35Q40 | GRAPHS | Operators | Asymptotic properties | Mathematical analysis | Images | Eigenvalues | Dirichlet problem | Schroedinger equation | Curvature

Eigenvalue | Strong coupling | Singular interaction | Schrödinger operator | 35J10 | MATHEMATICS | EIGENVALUES | MATHEMATICS, APPLIED | 35P15 | Schrodinger operator | 35Q40 | GRAPHS | Operators | Asymptotic properties | Mathematical analysis | Images | Eigenvalues | Dirichlet problem | Schroedinger equation | Curvature

Journal Article

4.
Full Text
On eigenvalue asymptotics for strong δ-interactions supported by surfaces with boundaries

Asymptotic Analysis, ISSN 0921-7134, 03/2016, Volume 97, Issue 1-2, pp. 1 - 25

... on S. We show that for each fixed j one has the asymptotic expansion E-j(beta) = -beta(2)/4 + mu(D)(j) + o(1) as beta -> +infinity where mu(D)(j) is the jth eigenvalue of the operator -Delta...

δ-interaction | singular Schrödinger operator | strong coupling | eigenvalue | MATHEMATICS, APPLIED | CURVE | CONVERGENCE | singular Schrodinger operator | delta-interaction | SCHRODINGER-OPERATORS | QUANTUM GRAPHS

δ-interaction | singular Schrödinger operator | strong coupling | eigenvalue | MATHEMATICS, APPLIED | CURVE | CONVERGENCE | singular Schrodinger operator | delta-interaction | SCHRODINGER-OPERATORS | QUANTUM GRAPHS

Journal Article

Physics of Atomic Nuclei, ISSN 1063-7788, 5/2015, Volume 78, Issue 3, pp. 443 - 446

..., where the asymptotic behavior of field propagators becomes ultralocal.

Physics | Particle and Nuclear Physics | PHYSICS, NUCLEAR | PHYSICS, PARTICLES & FIELDS | PHYSICS OF ELEMENTARY PARTICLES AND FIELDS | SCALAR FIELDS | STRONG-COUPLING MODEL | EUCLIDEAN SPACE | COUPLING CONSTANTS | SCHWINGER FUNCTIONAL EQUATIONS | ASYMPTOTIC SOLUTIONS | PROPAGATOR

Physics | Particle and Nuclear Physics | PHYSICS, NUCLEAR | PHYSICS, PARTICLES & FIELDS | PHYSICS OF ELEMENTARY PARTICLES AND FIELDS | SCALAR FIELDS | STRONG-COUPLING MODEL | EUCLIDEAN SPACE | COUPLING CONSTANTS | SCHWINGER FUNCTIONAL EQUATIONS | ASYMPTOTIC SOLUTIONS | PROPAGATOR

Journal Article

Journal of High Energy Physics, ISSN 1126-6708, 2013, Volume 2013, Issue 9, p. 1

Correlation functions of Wilson lines are relevant for describing the infrared structure of scattering amplitudes. We develop a new method for evaluating a...

Strong coupling expansion | Supersymmetric gauge theory | Scattering amplitudes | Scattering Amplitudes | ASYMPTOTICS | LOOPS | Strong Coupling Expansion | RENORMALIZATION | PHYSICS, PARTICLES & FIELDS

Strong coupling expansion | Supersymmetric gauge theory | Scattering amplitudes | Scattering Amplitudes | ASYMPTOTICS | LOOPS | Strong Coupling Expansion | RENORMALIZATION | PHYSICS, PARTICLES & FIELDS

Journal Article

Acta Applicandae Mathematicae, ISSN 0167-8019, 6/2016, Volume 143, Issue 1, pp. 29 - 43

In this paper, we consider the incompressible micropolar fluid flowing through a multiple pipe system via asymptotic analysis...

Micropolar Leray problem | Theoretical, Mathematical and Computational Physics | Mechanics | Mathematics, general | Mathematics | Strong coupling | Computer Science, general | Statistical Physics, Dynamical Systems and Complexity | Asymptotic analysis | Junction of thin pipes | Micropolar fluid | MATHEMATICS, APPLIED | HELICAL PIPE | TUBE | LAW | CHANNEL | VISCOUS-FLUID | Studies | Fluid mechanics | Microstructure | Mathematical analysis | Asymptotic methods | Fluids | Computational fluid dynamics | Asymptotic properties | Micropolar fluids | Fluid flow | Mathematical models | Pipe

Micropolar Leray problem | Theoretical, Mathematical and Computational Physics | Mechanics | Mathematics, general | Mathematics | Strong coupling | Computer Science, general | Statistical Physics, Dynamical Systems and Complexity | Asymptotic analysis | Junction of thin pipes | Micropolar fluid | MATHEMATICS, APPLIED | HELICAL PIPE | TUBE | LAW | CHANNEL | VISCOUS-FLUID | Studies | Fluid mechanics | Microstructure | Mathematical analysis | Asymptotic methods | Fluids | Computational fluid dynamics | Asymptotic properties | Micropolar fluids | Fluid flow | Mathematical models | Pipe

Journal Article

Physical Review D - Particles, Fields, Gravitation and Cosmology, ISSN 1550-7998, 08/2008, Volume 78, Issue 4

We give a representation of the parity-even part of the planar two-loop six-gluon maximally helicity violating (MHV) amplitude of N = 4 super-Yang-Mills...

SCATTERING-AMPLITUDES | GAUGE-THEORY | WILSON LOOPS | ASTRONOMY & ASTROPHYSICS | QCD AMPLITUDES | ONE-LOOP AMPLITUDES | STRONG-COUPLING LIMIT | SUDAKOV FORM-FACTOR | N=4 SYM THEORY | TO-LEADING ORDER | ASYMPTOTIC-BEHAVIOR | PHYSICS, PARTICLES & FIELDS

SCATTERING-AMPLITUDES | GAUGE-THEORY | WILSON LOOPS | ASTRONOMY & ASTROPHYSICS | QCD AMPLITUDES | ONE-LOOP AMPLITUDES | STRONG-COUPLING LIMIT | SUDAKOV FORM-FACTOR | N=4 SYM THEORY | TO-LEADING ORDER | ASYMPTOTIC-BEHAVIOR | PHYSICS, PARTICLES & FIELDS

Journal Article

Physics Letters A, ISSN 0375-9601, 06/2005, Volume 340, Issue 5-6, pp. 388 - 396

In a previous paper [J. Phys. A 36 (2003) 11807], we introduced the ‘asymptotic iteration method...

Asymptotic iteration method | Perturbation series | Eigenvalue problems | Schrödinger equation | perturbation series | CUBIC OSCILLATOR | ENERGY | PHYSICS, MULTIDISCIPLINARY | SCHRODINGER-EQUATION | eigenvalue problems | QUARTIC ANHARMONIC-OSCILLATOR | asymptotic iteration method | STRONG-COUPLING EXPANSIONS | Schrodinger equation | SPHEROIDAL WAVE-FUNCTIONS | UNIFORM ASYMPTOTIC EXPANSIONS | HAMILTONIANS | SYMMETRIC QUANTUM-MECHANICS

Asymptotic iteration method | Perturbation series | Eigenvalue problems | Schrödinger equation | perturbation series | CUBIC OSCILLATOR | ENERGY | PHYSICS, MULTIDISCIPLINARY | SCHRODINGER-EQUATION | eigenvalue problems | QUARTIC ANHARMONIC-OSCILLATOR | asymptotic iteration method | STRONG-COUPLING EXPANSIONS | Schrodinger equation | SPHEROIDAL WAVE-FUNCTIONS | UNIFORM ASYMPTOTIC EXPANSIONS | HAMILTONIANS | SYMMETRIC QUANTUM-MECHANICS

Journal Article

10.
Full Text
Cusp anomalous dimension in maximally supersymmetric yang-mills theory at strong coupling

Physical Review Letters, ISSN 0031-9007, 03/2008, Volume 100, Issue 9, p. 091601

We construct an analytical solution to the integral equation which is believed to describe logarithmic growth of the anomalous dimensions of high-spin...

STRINGS | GAUGE/STRING CORRESPONDENCE | GAUGE-THEORY | INTEGRABILITY | QCD | PHYSICS, MULTIDISCIPLINARY | EQUATIONS | LIMIT | ASYMPTOTICS | BETHE-ANSATZ | PHYSICS OF ELEMENTARY PARTICLES AND FIELDS | YANG-MILLS THEORY | SUPERSYMMETRY | SPIN | QUANTUM OPERATORS | INTEGRAL EQUATIONS | STRONG-COUPLING MODEL | ANOMALOUS DIMENSION | CUSPED GEOMETRIES | ANALYTICAL SOLUTION

STRINGS | GAUGE/STRING CORRESPONDENCE | GAUGE-THEORY | INTEGRABILITY | QCD | PHYSICS, MULTIDISCIPLINARY | EQUATIONS | LIMIT | ASYMPTOTICS | BETHE-ANSATZ | PHYSICS OF ELEMENTARY PARTICLES AND FIELDS | YANG-MILLS THEORY | SUPERSYMMETRY | SPIN | QUANTUM OPERATORS | INTEGRAL EQUATIONS | STRONG-COUPLING MODEL | ANOMALOUS DIMENSION | CUSPED GEOMETRIES | ANALYTICAL SOLUTION

Journal Article

Journal of Experimental and Theoretical Physics, ISSN 1063-7761, 09/2010, Volume 111, Issue 3

The previously-obtained analytical asymptotic expressions for the Gell-Mann-Low function {beta}(g...

PHYSICS OF ELEMENTARY PARTICLES AND FIELDS | MATHEMATICAL MODELS | SCALE DIMENSION | ASYMPTOTIC SOLUTIONS | FIELD THEORIES | MATHEMATICAL SOLUTIONS | MASS | SINGULARITY | STRONG-COUPLING MODEL | PHI4-FIELD THEORY | ANOMALOUS DIMENSION | QUANTUM FIELD THEORY | PARTICLE MODELS

PHYSICS OF ELEMENTARY PARTICLES AND FIELDS | MATHEMATICAL MODELS | SCALE DIMENSION | ASYMPTOTIC SOLUTIONS | FIELD THEORIES | MATHEMATICAL SOLUTIONS | MASS | SINGULARITY | STRONG-COUPLING MODEL | PHI4-FIELD THEORY | ANOMALOUS DIMENSION | QUANTUM FIELD THEORY | PARTICLE MODELS

Journal Article

Physical Review D - Particles, Fields, Gravitation and Cosmology, ISSN 1550-7998, 09/2012, Volume 86, Issue 5

We present a determination of parton distribution functions (ABM11) and the strong coupling constant alpha(s) at next-to-leading order and...

OPERATOR MATRIX-ELEMENTS | NUCLEON STRUCTURE FUNCTIONS | DEEP-INELASTIC-SCATTERING | D-ASTERISK(+/-) MESON PRODUCTION | ASTRONOMY & ASTROPHYSICS | DEUTERON STRUCTURE FUNCTIONS | 3-LOOP SPLITTING FUNCTIONS | HEAVY FLAVOR CONTRIBUTIONS | ASYMPTOTIC VALUES Q | HIGH STATISTICS MEASUREMENT | STRONG-COUPLING CONSTANT | PHYSICS, PARTICLES & FIELDS

OPERATOR MATRIX-ELEMENTS | NUCLEON STRUCTURE FUNCTIONS | DEEP-INELASTIC-SCATTERING | D-ASTERISK(+/-) MESON PRODUCTION | ASTRONOMY & ASTROPHYSICS | DEUTERON STRUCTURE FUNCTIONS | 3-LOOP SPLITTING FUNCTIONS | HEAVY FLAVOR CONTRIBUTIONS | ASYMPTOTIC VALUES Q | HIGH STATISTICS MEASUREMENT | STRONG-COUPLING CONSTANT | PHYSICS, PARTICLES & FIELDS

Journal Article

European Physical Journal C, ISSN 1434-6044, 2010, Volume 68, Issue 3, pp. 487 - 503

We study the gluon gluon ghost propagators of lattice Landau gauge in the strong-coupling limit beta = 0 in pure SU(2) lattice gauge theory to find evidence of...

Strong coupling | Gluon and ghost propagators | Landau gauge | Infrared behavior | DYSON-SCHWINGER EQUATIONS | GLUON PROPAGATOR | QCD | GHOST PROPAGATORS | BEHAVIOR | CONFINEMENT | PHYSICS, PARTICLES & FIELDS | Gauge theory | Coupling | Gluons | Asymptotic properties | Asymptotic methods | Ghosts | Infrared | Lattices | Deviation | Gages | Gauges | Physics - High Energy Physics - Lattice

Strong coupling | Gluon and ghost propagators | Landau gauge | Infrared behavior | DYSON-SCHWINGER EQUATIONS | GLUON PROPAGATOR | QCD | GHOST PROPAGATORS | BEHAVIOR | CONFINEMENT | PHYSICS, PARTICLES & FIELDS | Gauge theory | Coupling | Gluons | Asymptotic properties | Asymptotic methods | Ghosts | Infrared | Lattices | Deviation | Gages | Gauges | Physics - High Energy Physics - Lattice

Journal Article

AIP Conference Proceedings, ISSN 0094-243X, 2010, Volume 1246, Issue 1, pp. 199 - 202

The properties of many-particle quantum systems can change drastically if the particles are attractive overall (e.g. a Fermi gas of atoms can become a Bose gas...

Laplace's method | helium dimers | asymptotic approximation of integrals | Mellin transform technique | BOSE-EINSTEIN GAS | LAPLACE EQUATION | POTENTIAL ENERGY | APPROXIMATIONS | CALCULATION METHODS | EQUATIONS | STABLE ISOTOPES | FUNCTIONS | ASYMPTOTIC SOLUTIONS | WAVE FUNCTIONS | INTEGRALS | ELEMENTS | MATHEMATICAL SOLUTIONS | MECHANICS | STRONG-COUPLING MODEL | ATOMS | HELIUM 4 | HELIUM 3 | LIGHT NUCLEI | HELIUM | RARE GASES | DIFFERENTIAL EQUATIONS | FLUIDS | GASES | ENERGY | HELIUM ISOTOPES | CLASSICAL AND QUANTUM MECHANICS, GENERAL PHYSICS | MATHEMATICAL MODELS | EVEN-EVEN NUCLEI | ATOMIC AND MOLECULAR PHYSICS | DIMERS | QUANTUM MECHANICS | NONMETALS | VARIATIONAL METHODS | ISOTOPES | NUCLEI | PARTIAL DIFFERENTIAL EQUATIONS | FERMI GAS | EVEN-ODD NUCLEI | BINDING ENERGY | PARTICLE MODELS

Laplace's method | helium dimers | asymptotic approximation of integrals | Mellin transform technique | BOSE-EINSTEIN GAS | LAPLACE EQUATION | POTENTIAL ENERGY | APPROXIMATIONS | CALCULATION METHODS | EQUATIONS | STABLE ISOTOPES | FUNCTIONS | ASYMPTOTIC SOLUTIONS | WAVE FUNCTIONS | INTEGRALS | ELEMENTS | MATHEMATICAL SOLUTIONS | MECHANICS | STRONG-COUPLING MODEL | ATOMS | HELIUM 4 | HELIUM 3 | LIGHT NUCLEI | HELIUM | RARE GASES | DIFFERENTIAL EQUATIONS | FLUIDS | GASES | ENERGY | HELIUM ISOTOPES | CLASSICAL AND QUANTUM MECHANICS, GENERAL PHYSICS | MATHEMATICAL MODELS | EVEN-EVEN NUCLEI | ATOMIC AND MOLECULAR PHYSICS | DIMERS | QUANTUM MECHANICS | NONMETALS | VARIATIONAL METHODS | ISOTOPES | NUCLEI | PARTIAL DIFFERENTIAL EQUATIONS | FERMI GAS | EVEN-ODD NUCLEI | BINDING ENERGY | PARTICLE MODELS

Conference Proceeding

ISSN 0370-2693, 2017

We combine the known asymptotic behaviour of the QCD perturbation series expansion, which relates the pole mass of a heavy quark to the $\overline{MS...

asymptotic behavior [quantum chromodynamics] | color | mass [heavy quark] | perturbation | renormalon | Experiment | pole [mass] | Physics | Lattice | flavor | Phenomenology | High Energy Physics - Phenomenology | High Energy Physics | strong coupling

asymptotic behavior [quantum chromodynamics] | color | mass [heavy quark] | perturbation | renormalon | Experiment | pole [mass] | Physics | Lattice | flavor | Phenomenology | High Energy Physics - Phenomenology | High Energy Physics | strong coupling

Journal Article

Physical Review Letters, ISSN 0031-9007, 05/2010, Volume 104, Issue 21, p. 211601

We compute the full dimension of the Konishi operator in planar N = 4 super Yang-Mills theory for a wide range of couplings, from weak to strong coupling regime, and predict the subleading terms in its strong coupling asymptotics...

STATES | OPERATOR | PHYSICS, MULTIDISCIPLINARY | FIELD-THEORIES | EQUATIONS | LIMIT | BETHE-ANSATZ | High Energy Physics - Theory | Physics | CONFORMAL INVARIANCE | EXCITED STATES | PHYSICS OF ELEMENTARY PARTICLES AND FIELDS | YANG-MILLS THEORY | SUPERSYMMETRY | MATHEMATICAL MODELS | SYMMETRY GROUPS | ENERGY LEVELS | ASYMPTOTIC SOLUTIONS | ANTI DE SITTER GROUP | MATHEMATICAL SOLUTIONS | SYMMETRY | LIE GROUPS | STRONG-COUPLING MODEL | INVARIANCE PRINCIPLES | SPECTRA | PARTICLE MODELS

STATES | OPERATOR | PHYSICS, MULTIDISCIPLINARY | FIELD-THEORIES | EQUATIONS | LIMIT | BETHE-ANSATZ | High Energy Physics - Theory | Physics | CONFORMAL INVARIANCE | EXCITED STATES | PHYSICS OF ELEMENTARY PARTICLES AND FIELDS | YANG-MILLS THEORY | SUPERSYMMETRY | MATHEMATICAL MODELS | SYMMETRY GROUPS | ENERGY LEVELS | ASYMPTOTIC SOLUTIONS | ANTI DE SITTER GROUP | MATHEMATICAL SOLUTIONS | SYMMETRY | LIE GROUPS | STRONG-COUPLING MODEL | INVARIANCE PRINCIPLES | SPECTRA | PARTICLE MODELS

Journal Article

Physics Letters B, ISSN 0370-2693, 01/2012, Volume 706, Issue 4-5, pp. 340 - 344

...) and the singularity-free analytic perturbation theory (APT). The analysis of the PT series for CBj(αs) gives a hint to its asymptotic nature manifesting itself in the region Q...

Q-DEPENDENCE | ANALYTIC PERTURBATION-THEORY | STRUCTURE FUNCTIONS G(P) | ASTRONOMY & ASTROPHYSICS | EXPANSION | PHYSICS, NUCLEAR | MODEL | STRONG-COUPLING CONSTANT | DEPENDENCE | MOMENTS | PHYSICS, PARTICLES & FIELDS | Perturbation theory | Heat treatment | Momentum transfer | Equivalence | Asymptotic properties | Mathematical analysis | Elementary particles | Sum rules

Q-DEPENDENCE | ANALYTIC PERTURBATION-THEORY | STRUCTURE FUNCTIONS G(P) | ASTRONOMY & ASTROPHYSICS | EXPANSION | PHYSICS, NUCLEAR | MODEL | STRONG-COUPLING CONSTANT | DEPENDENCE | MOMENTS | PHYSICS, PARTICLES & FIELDS | Perturbation theory | Heat treatment | Momentum transfer | Equivalence | Asymptotic properties | Mathematical analysis | Elementary particles | Sum rules

Journal Article

Journal of Mathematical Chemistry, ISSN 0259-9791, 2010, Volume 48, Issue 4, pp. 883 - 913

The problem is addressed of defining the values of functions, whose variables tend to infinity, from the knowledge of these functions at asymptotically small...

Strong-coupling limit | Asymptotic series | Extrapolation of asymptotic series | Weak-coupling expansions | Self-similar approximation theory | STATISTICAL-MECHANICS | SERIES | THERMODYNAMIC POTENTIALS | CHEMISTRY, MULTIDISCIPLINARY | INTERACTING BOSE-GAS | SIMILAR FACTOR APPROXIMANTS | EXCLUDED-VOLUME INTERACTION | POLYMER-CHAIN | PERTURBATION-THEORY | MATHEMATICS, INTERDISCIPLINARY APPLICATIONS | SYSTEMS | TRANSFORMS | Asymptotic expansions | Approximation theory | Research | Variables (Mathematics) | Quantum chemistry

Strong-coupling limit | Asymptotic series | Extrapolation of asymptotic series | Weak-coupling expansions | Self-similar approximation theory | STATISTICAL-MECHANICS | SERIES | THERMODYNAMIC POTENTIALS | CHEMISTRY, MULTIDISCIPLINARY | INTERACTING BOSE-GAS | SIMILAR FACTOR APPROXIMANTS | EXCLUDED-VOLUME INTERACTION | POLYMER-CHAIN | PERTURBATION-THEORY | MATHEMATICS, INTERDISCIPLINARY APPLICATIONS | SYSTEMS | TRANSFORMS | Asymptotic expansions | Approximation theory | Research | Variables (Mathematics) | Quantum chemistry

Journal Article

Reviews in Mathematical Physics, ISSN 0129-055X, 06/2004, Volume 16, Issue 5, pp. 559 - 582

.... We find a strong-coupling asymptotic expansion of the discrete spectrum in the case when Γ...

singular interaction | Schrödinger operators | strong-coupling asymptotics

singular interaction | Schrödinger operators | strong-coupling asymptotics

Journal Article

Applicable Analysis, ISSN 0003-6811, 06/2019, Volume 98, Issue 8, pp. 1451 - 1460

We consider the problem of geometric optimization for the lowest eigenvalue of the two-dimensional Schrödinger operator with an attractive -interaction...

Robin Laplacian on planes with slits | Primary: 35P15 | lowest eigenvalue | spectral isoperimetric inequality | Secondary: 58J50 | Birman-Schwinger principle | interaction on an open arc | Birman–Schwinger principle | (Formula presented.)-interaction on an open arc | MATHEMATICS, APPLIED | delta-interaction on an open arc | STRONG-COUPLING ASYMPTOTICS | SCHRODINGER-OPERATORS | Operators (mathematics) | Eigenvalues | Spectra | Line spectra | Optimization | Eigen values

Robin Laplacian on planes with slits | Primary: 35P15 | lowest eigenvalue | spectral isoperimetric inequality | Secondary: 58J50 | Birman-Schwinger principle | interaction on an open arc | Birman–Schwinger principle | (Formula presented.)-interaction on an open arc | MATHEMATICS, APPLIED | delta-interaction on an open arc | STRONG-COUPLING ASYMPTOTICS | SCHRODINGER-OPERATORS | Operators (mathematics) | Eigenvalues | Spectra | Line spectra | Optimization | Eigen values

Journal Article

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