Your search keyword '"Analytic continuation"' showing total 5,729 results

1. An elliptical compressible liquid inclusion in an infinite nonlinearly coupled thermoelectric matrix.

Author

Wang, Xu and Schiavone, Peter

Abstract

AbstractWe study the plane strain problem associated with an elliptical thermoelectrically insulated and compressible liquid inclusion embedded in an infinite homogeneous and isotropic nonlinearly coupled thermoelectric matrix under uniform remote electric current density and energy flux. With the aid of conformal mapping and analytic continuation, an exact closed-form solution to the problem is derived. In particular, an elementary expression for the internal uniform hydrostatic tension within the compressible liquid inclusion is obtained. Our result shows that the internal uniform hydrostatic tension is unaffected by the remote energy flux and is proportional to the square of the two components of the remote electric current density vector. Also presented is the hoop stress distribution along the elliptical interface on the matrix side. [ABSTRACT FROM AUTHOR]

Published

2024

2. Interaction between an edge dislocation and a circular incompressible liquid inclusion.

Author

Wang, Xu and Schiavone, Peter

Subjects

*FLUID inclusions, *EDGE dislocations, *POISSON'S ratio, *HYDROSTATIC stress, *STRAINS & stresses (Mechanics), *HYDROSTATIC extrusion

Abstract

We use Muskhelishvili's complex variable formulation to study the interaction problem associated with a circular incompressible liquid inclusion embedded in an infinite isotropic elastic matrix subjected to the action of an edge dislocation at an arbitrary position. A closed-form solution to the problem is derived largely with the aid of analytic continuation. We obtain, in explicit form, expressions for the internal uniform hydrostatic stresses, nonuniform strains and nonuniform rigid body rotation within the liquid inclusion; the hoop stress along the liquid-solid interface on the matrix side and the image force acting on the edge dislocation. We observe that (1) the internal strains and rigid body rotation within the liquid inclusion are independent of the elastic property of the matrix; (2) the internal hydrostatic stress field within the liquid inclusion is unaffected by Poisson's ratio of the matrix and is proportional to the shear modulus of the matrix; and (3) an unstable equilibrium position always exists for a climbing dislocation. [ABSTRACT FROM AUTHOR]

Published

2024

3. Reasonable mechanical model on shallow tunnel excavation to eliminate displacement singularity caused by unbalanced resultant.

Author

Lin, Luobin, Chen, Fuquan, and Huang, Xianhai

Abstract

When considering initial stress field in geomaterial, nonzero resultant of shallow tunnel excavation exists, which produces logarithmic items in complex potentials, and would further lead to a unique displacement singularity at infinity to violate geo-engineering fact in real world. The mechanical and mathematical reasons of such a unique displacement singularity in the existing mechanical models are elaborated, and a new mechanical model is subsequently proposed to eliminate this singularity by constraining far-field ground surface displacement, and the original unbalanced resultant problem is converted into an equilibrium one with mixed boundary conditions. To solve stress and displacement in the new model, the analytic continuation is applied to transform the mixed boundary conditions into a homogenerous Riemann-Hilbert problem with extra constraints, which is then solved using an approximate and iterative method with good numerical stability. The Lanczos filtering is applied to the stress and displacement solution to reduce the Gibbs phenomena caused by abrupt change of the boundary conditions along ground surface. Several numerical cases are conducted to verify the proposed mechanical model and the results strongly validate that the proposed mechanical model successfully eliminates the displacement singularity caused by unbalanced resultant with good convergence and accuracy to obtain stress and displacement for shallow tunnel excavation. A parametric investigation is subsequently conducted to study the influence of tunnel depth, lateral coefficient, and free surface range on stress and displacement distribution in geomaterial. • A new mechanical model is proposed to obtain reasonable stress and displacement for shallow tunnel excavation. • The displacement singularity caused by unbalanced resultant of shallow tunnel excavation is eliminated. • Solution convergence is guaranteed using an approximate and iterative method. [ABSTRACT FROM AUTHOR]

Published

2024

4. On the Analytic Extension of Lauricella–Saran's Hypergeometric Function F K to Symmetric Domains.

Author

Dmytryshyn, Roman and Goran, Vitaliy

Subjects

*SYMMETRIC domains, *CONTINUED fractions, *HYPERGEOMETRIC functions, *FUNCTIONS of several complex variables, *ANALYTIC functions, *SPECIAL functions

Abstract

In this paper, we consider the representation and extension of the analytic functions of three variables by special families of functions, namely branched continued fractions. In particular, we establish new symmetric domains of the analytical continuation of Lauricella–Saran's hypergeometric function  F K  with certain conditions on real and complex parameters using their branched continued fraction representations. We use a technique that extends the convergence, which is already known for a small domain, to a larger domain to obtain domains of convergence of branched continued fractions and the PC method to prove that they are also domains of analytical continuation. In addition, we discuss some applicable special cases and vital remarks. [ABSTRACT FROM AUTHOR]

Published

2024

5. A liquid inclusion having an n-fold axis of symmetry in an infinite isotropic elastic matrix.

Author

Wang, Xu and Schiavone, Peter

Subjects

*FLUID inclusions, *HYDROSTATIC stress, *STRAINS & stresses (Mechanics), *CONFORMAL mapping, *ANALYTIC functions, *DIFFERENTIAL inclusions

Abstract

We first study the plane strain problem associated with an incompressible liquid inclusion having an n-fold axis of symmetry which is embedded in an infinite isotropic elastic matrix subjected to uniform remote hydrostatic stresses. A closed-form solution is derived using Muskhelishvili's complex variable formulation, a four-term conformal mapping function and the application of analytic continuation. The pair of analytic functions characterizing the elastic field in the matrix is completely determined in elementary closed-form. Explicit expressions are obtained and graphically illustrated for the internal uniform hydrostatic stresses within the liquid inclusion and the hoop stress along the liquid–solid interface on the matrix side. The closed-form solution for a linearly compressible liquid inclusion having an n-fold axis of symmetry is also obtained. [ABSTRACT FROM AUTHOR]

Published

2024

6. The *-product of domains in several complex variables.

Author

Zając, Sylwester

Subjects

*COMPLEX variables, *CONVEX domains, *HOLOMORPHIC functions, *GEOMETRY, *FUNCTION spaces, *CONVEX geometry

Abstract

In this article, we investigate the problem of computing the $ * $ ∗ -product of domains in $ \mathbb {C}^N $ C N . Assuming that $ 0\in G\subset \mathbb {C}^N $ 0 ∈ G ⊂ C N is an arbitrary Runge domain and $ 0\in D\subset \mathbb {C}^N $ 0 ∈ D ⊂ C N is a bounded, smooth and linearly convex domain (or a non-decreasing union of such ones), we establish a geometric relation between $ D*G $ D ∗ G and another domain in $ \mathbb {C}^N $ C N which is 'extremal' (in an appropriate sense) with respect to a special coefficient multiplier dependent only on the dimension N. Next, for N = 2, we derive a characterization of the latter domain expressed in terms of planar geometry. These two results, when combined together, give a formula which allows to calculate $ D*G $ D ∗ G for two-dimensional domains D and G satisfying the outlined assumptions. [ABSTRACT FROM AUTHOR]

Published

2024

7. Complex manifolds of Sobolev mappings and a Hartogs-type theorem in loop spaces.

Author

Anakkar, M.

Subjects

*COMPLEX manifolds, *GENERALIZED spaces, *HOLOMORPHIC functions, *SOBOLEV spaces

Abstract

We recall the complex structure on the generalized loop spaces Wk,2(S, X), where S is a compact real manifold with boundary and X is a complex manifold, and prove a Hartogs-type extension theorem for holomorphic maps from certain domains in generalized loop spaces. [ABSTRACT FROM AUTHOR]

Published

2023

8. Sectorial Paley–Wiener theorem.

Author

Vagharshakyan, Armen

Subjects

*EXPONENTIAL functions, *FUNCTIONALS, *GRAVITY

Abstract

We consider the problem of restoring a two‐dimensional convex source of gravity based on values of its potential function on a union of half‐planes. With that aim we prove a Paley–Wiener type theorem for functions of exponential type in a sector. In particular, we find the maximal set of analytic continuation whose complement is convex inside a sector. Our result serves as a sectorial analog of G. Polya's indicator theorem. It corrects, simplifies, and extends a result of M. Morimoto. It also improves a related result of M. Dzhrbashyan and A. Avetisyan. [ABSTRACT FROM AUTHOR]

Published

2023

9. Generalization of the Notion of Completeness of a Riemannian Analytic Manifold.

Author

Popov, V. A.

Subjects

*VECTOR fields, *LIE algebras, *RIEMANNIAN metric, *GENERALIZATION, *LIE groups, *RIEMANNIAN manifolds

Abstract

In this paper, we discuss the concept of an analytic prolongation of a local Riemannian metric. We propose a generalization of the notion of completeness realized as an analytic prolongation of an arbitrary Riemannian metric. Various Riemannian metrics are studied, primarily those related to the structure of the Lie algebra 픤 of all Killing vector fields for a local metric. We introduce the notion of a quasi-complete manifold, which possesses the property of prolongability of all local isometries to isometries of the whole manifold. A classification of pseudo-complete manifolds of small dimensions is obtained. We present conditions for the Lie algebra of all Killing vector fields 픤 and its stationary subalgebra 픥 of a locally homogeneous pseudo-Riemannian manifold under which a locally homogeneous manifold can be analytically prolonged to a homogeneous manifold. [ABSTRACT FROM AUTHOR]

Published

2023

10. Euclidean Wormhole with k-essence field in the presence of Gauss–Bonnet term.

Author

Dutta, M. K., Biswas, Gargi, and Modak, B.

Subjects

*DILATON, *KINETIC energy, *ANALYTICAL solutions, *POTENTIAL energy, *EUCLIDEAN algorithm, *RADIATION

Abstract

In this paper, we present some analytical solutions of wormhole in four-dimensional Robertson–Walker Euclidean background considering Einstein–Gauss–Bonnet dilaton interaction with a k -essence field for k = 0. The solutions are obtained assuming some restrictions on coupling function with a form of potential or with the ratio of kinetic to potential energy of the dilaton field. Euclidean wormhole, in one case, evolves through early transient inflationary era and after graceful exit from inflation, it asymptotically yields a radiation dominated era or a matter dominated era. In another solution, initial Euclidean wormhole is accompanied by oscillation of scale factor in Euclidean time at some late era which asymptotically yields exponential expansion. The violation of the null energy condition can be avoided asymptotically. The potential is also found to decay sharply. [ABSTRACT FROM AUTHOR]

Published

2023

11. Formulas for Computing Euler-Type Integrals and Their Application to the Problem of Constructing a Conformal Mapping of Polygons.

Author

Bezrodnykh, S. I.

Subjects

*CONFORMAL mapping, *POLYGONS, *HYPERGEOMETRIC series, *INTEGRAL functions, *INTEGRALS, *HYPERGEOMETRIC functions

Abstract

This paper deals with Euler-type integrals and the closely related Lauricella function , which is a hypergeometric function of many complex variables . For new analytic continuation formulas are found that represent it in the form of Horn hypergeometric series exponentially converging in corresponding subdomains of , including near hyperplanes of the form , , . The continuation formulas and identities for found in this paper make up an effective apparatus for computing this function and Euler-type integrals expressed in terms of it in the entire complex space , including complicated cases when the variables form one or several groups of closely spaced neighbors. The results are used to compute parameters of the Schwarz–Christoffel integral in the case of crowding and to construct conformal mappings of polygons. [ABSTRACT FROM AUTHOR]

Published

2023

12. On the Analytic Continuation of Lauricella–Saran Hypergeometric Function F K (a 1 , a 2 , b 1 , b 2 ; a 1 , b 2 , c 3 ; z).

Author

Antonova, Tamara, Dmytryshyn, Roman, and Goran, Vitaliy

Subjects

*HYPERGEOMETRIC functions, *CONTINUED fractions, *FUNCTIONS of several complex variables, *POWER series

Abstract

The paper establishes an analytical extension of two ratios of Lauricella–Saran hypergeometric functions F K with some parameter values to the corresponding branched continued fractions in their domain of convergence. The PC method used here is based on the correspondence between a formal triple power series and a branched continued fraction. As additional results, analytical extensions of the Lauricella–Saran hypergeometric functions F K (a 1 , a 2 , 1 , b 2 ; a 1 , b 2 , c 3 ; z) and F K (a 1 , 1 , b 1 , b 2 ; a 1 , b 2 , c 3 ; z) to the corresponding branched continued fractions were obtained. To illustrate this, we provide some numerical experiments at the end. [ABSTRACT FROM AUTHOR]

Published

2023

13. Interaction between an edge dislocation and a circular elastic inhomogeneity with Steigmann–Ogden interface.

Author

Wang, Xu and Schiavone, Peter

Subjects

*EDGE dislocations, *ANALYTIC functions, *TRIGONOMETRIC functions, *ANALYTICAL solutions

Abstract

We propose an effective method for the solution of the plane problem of an edge dislocation in the vicinity of a circular inhomogeneity with Steigmann–Ogden interface. Using analytic continuation, the pair of analytic functions defined in the infinite matrix surrounding the inhomogeneity can be expressed in terms of the pair of analytic functions defined inside the circular inhomogeneity. Once the two analytic functions defined in the circular inhomogeneity are expanded in Taylor series with unknown complex coefficients, the Steigmann–Ogden interface condition can be written explicitly in complex form. Consequently, all of the complex coefficients appearing in the Taylor series can be uniquely determined so that the two pairs of analytic functions are then completely determined. An explicit and general expression of the image force acting on the edge dislocation is derived using the Peach–Koehler formula. [ABSTRACT FROM AUTHOR]

Published

2023

14. Constructing basises in solution space of the system of equations for the Lauricella Function FD(N).

Author

Bezrodnykh, S. I.

Subjects

*HYPERGEOMETRIC functions, *PARTIAL differential equations, *CONFORMAL mapping, *HYPERGEOMETRIC series, *EQUATIONS, *COMPLEX variables

Abstract

The paper considers the issue of constructing basises in the solution space of the system of partial differential equations, which is satisfied by the Lauricella hypergeometric function F D (N) (a ; b , c ; z) , depending on N complex variables (z 1 , ... , z N) =: z and having complex parameters (a 1 , ... , a N) =: a , b, c. For an arbitrary number N of variables, we have obtained explicit representations for such basis functions in the vicinity of points (0 , ... , 0) and (∞ , ... , ∞) in terms of the Horn type hypergeometric series in N variables. For some of these functions we have obtained formulas of analytic continuation. The found continuation formulas are important for calculating the solution of the Riemann – Hilbert problem with piecewise constant coefficients and studying its geometrical meaning. Besides, these formulas are effective for solving the parameters problem for the Schwarz – Christoffel integral and calculating conformal mapping of complex-shaped polygons. [ABSTRACT FROM AUTHOR]

Published

2023

15. Exploring the electronic transport, magnetic, and optical properties of strongly correlated systems: A numerical analytical continuation approach.

Author

Rai, R. K., Kaphle, G. C., Ray, R. B., and Niraula, O. P.

Abstract

The electronic, magnetic and optical properties of the double perovskites Ca2NiOsO6 and Fe-doped derivative were calculated using the full potential linearized augmented plane wave technique through the GGA + U with PBE exchange correlation functionals. The calculations show that both of the systems are half-metallic with Fe-doped system as a ferromagnet, whereas the undoped system shows the ferrimagnetic ordering. Additionally, the study is extended for calculating the Mott parameters through dynamical mean field theory (DMFT) with the maximum entropy model (MEM). It is found that the MIT model parameters (U, β) for Ca2NiOsO6 and Ca2Fe0.50Ni0.50OsO6 systems are (5.7eV, 6.0(eV)−1) and (6.0eV, 6.0(eV)−1), respectively. Furthermore, the calculations agree with optical Drude peak analysis. The optical conductivity, reflectivity, absorptivity, ELOSS function, dielectric function refractive index and sum-rule are also explored in relation to the photoinduced behaviors of the materials. [ABSTRACT FROM AUTHOR]

Published

2023

16. Model Spaces

Author

Garcia, Stephan Ramon, Haskell, Deirdre, Editorial Board Member, Jeffrey, Lisa, Editorial Board Member, Li, Winnie, Editorial Board Member, Murty, V. Kumar, Editorial Board Member, Vakil, Ravi, Editorial Board Member, and Mashreghi, Javad, editor

Published

2023

17. On the Analytic Extension of Lauricella–Saran’s Hypergeometric Function FK to Symmetric Domains

Author

Roman Dmytryshyn and Vitaliy Goran

Subjects

Lauricella–Saran’s hypergeometric function, branched continued fraction, holomorphic functions of several complex variables, analytic continuation, convergence, Mathematics, QA1-939

Abstract

In this paper, we consider the representation and extension of the analytic functions of three variables by special families of functions, namely branched continued fractions. In particular, we establish new symmetric domains of the analytical continuation of Lauricella–Saran’s hypergeometric function FK with certain conditions on real and complex parameters using their branched continued fraction representations. We use a technique that extends the convergence, which is already known for a small domain, to a larger domain to obtain domains of convergence of branched continued fractions and the PC method to prove that they are also domains of analytical continuation. In addition, we discuss some applicable special cases and vital remarks.

Published

2024

18. A Characterization of Nontrivial Zeros of Riemann Zeta Function.

Author

Dasan, J., Sajikumar, S., Anitha, P., and Hema, V.

Subjects

*ZETA functions, *RIEMANN hypothesis

Abstract

In this article, we give a characterization of nontrivial zeros of the Riemann zeta function using two real integrals. Using this characterization we can provide simple proof of the fact that the Riemann zeta function has no nontrivial real zeros. We also establish that this function takes negative values on the real axis within the critical region. [ABSTRACT FROM AUTHOR]

Published

2023

19. Regularized limit, analytic continuation and finite-part integration.

Author

Galapon, Eric A.

Subjects

*STIELTJES transform, *MELLIN transform, *LOGARITHMIC functions, *ARBITRARY constants, *VALUES (Ethics), *SINGULAR integrals

Abstract

Finite-part integration is a recent method of evaluating a convergent integral in terms of the finite-parts of divergent integrals deliberately induced from the convergent integral itself [E. A. Galapon, The problem of missing terms in term by term integration involving divergent integrals, Proc. R. Soc. A 473 (2017) 20160567]. Within the context of finite-part integration of the Stieltjes transform of functions with logarithmic growths at the origin, the relationship is established between the analytic continuation of the Mellin transform and the finite-part of the resulting divergent integral when the Mellin integral is extended beyond its strip of analyticity. It is settled that the analytic continuation and the finite-part integral coincide at the regular points of the analytic continuation. To establish the connection between the two at the isolated singularities of the analytic continuation, the concept of regularized limit is introduced to replace the usual concept of limit due to Cauchy when the later leads to a division by zero. It is then shown that the regularized limit of the analytic continuation at its isolated singularities equals the finite-part integrals at the singularities themselves. The treatment gives the exact evaluation of the Stieltjes transform in terms of finite-part integrals and yields the dominant asymptotic behavior of the transform for arbitrarily small values of the parameter in the presence of arbitrary logarithmic singularities at the origin. [ABSTRACT FROM AUTHOR]

Published

2023

20. The Tribonacci Dirichlet series.

Author

Serrano Holgado, Á

Subjects

*MEROMORPHIC functions, *ZETA functions

Abstract

We study some of the analytic properties of a Dirichlet series defined by the sequence of the Tribonacci numbers, such as its analytic continuation to a meromorphic function of the whole plane and some of its special values. These results are generalisations of earlier properties already established for the Fibonacci Dirichlet series and other Dirichlet series defined by degree 2 recurrence sequences. [ABSTRACT FROM AUTHOR]

Published

2023

21. Constructing basises in solution space of the system of equations for the Lauricella Function FD(N).

Author

Bezrodnykh, S. I.

Subjects

HYPERGEOMETRIC functions, PARTIAL differential equations, CONFORMAL mapping, HYPERGEOMETRIC series, EQUATIONS, COMPLEX variables

Abstract

The paper considers the issue of constructing basises in the solution space of the system of partial differential equations, which is satisfied by the Lauricella hypergeometric function F D (N) (a ; b , c ; z) , depending on N complex variables (z 1 , ... , z N) =: z and having complex parameters (a 1 , ... , a N) =: a , b, c. For an arbitrary number N of variables, we have obtained explicit representations for such basis functions in the vicinity of points (0 , ... , 0) and (∞ , ... , ∞) in terms of the Horn type hypergeometric series in N variables. For some of these functions we have obtained formulas of analytic continuation. The found continuation formulas are important for calculating the solution of the Riemann – Hilbert problem with piecewise constant coefficients and studying its geometrical meaning. Besides, these formulas are effective for solving the parameters problem for the Schwarz – Christoffel integral and calculating conformal mapping of complex-shaped polygons. [ABSTRACT FROM AUTHOR]

Published

2023

22. A Residue Formula for Meromorphic Connections and Applications to Stable Sets of Foliations.

Author

Adachi, Masanori, Biard, Séverine, and Brinkschulte, Judith

Abstract

We discuss residue formulae that localize the first Chern class of a line bundle to the singular locus of a given holomorphic connection. As an application, we explain a proof for Brunella’s conjecture about exceptional minimal sets of codimension one holomorphic foliations with ample normal bundle and for a non-existence theorem of Levi flat hypersurfaces with transversely affine Levi foliation in compact Kähler surfaces. [ABSTRACT FROM AUTHOR]

Published

2023

23. Numerical analytic continuation.

Author

Trefethen, Lloyd N.

Abstract

Let f be an analytic function on a simply-connected compact continuum E of the complex z-plane. This might be an interval of the real line, where f might be real analytic. How can we calculate good estimates of the analytic continuation of f to other points z ∈ C ? How can we estimate the locations of real or complex singularities of f? We review both the theory and the practice of some existing methods for these problems and propose that excellent results can be obtained from the computation of rational approximations of f by the AAA algorithm. In the case of analytic functions of two or more variables, the rational approximations are applied along line segments or other analytic arcs. [ABSTRACT FROM AUTHOR]

Published

2023

24. Some Numerical Significance of the Riemann Zeta Function

Author

Opeyemi O. Enoch and Lukman O. Salaudeen

Subjects

Analytic Continuation, Polynomial, Numerical Estimate, Non-trivial zeros, Science

Abstract

In this paper, the Riemann analytic continuation formula (RACF) is derived from Euler’s quadratic equation. A nonlinear function and a polynomial function that were required in the derivation were also obtained. The connections between the roots of Euler’s quadratic equation and the Riemann Zeta function (RZF) are also presented in this paper. The method of partial summation was applied to the series that was obtained from the transformation of Euler’s quadratic equation (EQE). This led to the derivation of the RACF. A general equation for the generation of the zeros of the analytic continuation formula of the Riemann Zeta equation via a polynomial approach was also derived and thus presented in this work. An expression, which was based on a polynomial function and the products of prime numbers, was also obtained. The obtained function thus afforded us an alternative approach to defining the analytic continuation formula of the Riemann Zeta equation (ACFR). With the new representation, the Riemann Zeta function was shown to be a type of function. We were able to show that the solutions of the RACF are connected to some algebraic functions, and these algebraic functions were shown to be connected to the polynomial and the nonlinear functions. The tables and graphs of the numerical values of the polynomial and the nonlinear function were computed for a generating parameter, k, and shown to be some types of the solutions of some algebraic functions. In conclusion, the RZF was redefined as the product of a derived function, R(tn,s), and it was shown to be dependent on the obtained polynomial function.

Published

2023

25. Representation of functions on a line by a series of exponential monomials

Author

Krivosheev, Alexander Sergeevich and Krivosheeva, Olesya Alexandrovna

Subjects

series of exponential monomials, weight space, analytic continuation, condensation index, Mathematics, QA1-939

Abstract

In this work, we consider the weight spaces of integrable functions $L_p^\omega$ ($p\geq 1$) and continuous functions $C^\omega$ on the real line. Let $\Lambda=\{\lambda_k,n_k\}$ be an unbounded increasing sequence of positive numbers $\lambda_k$ and their multiplicities $n_k$, $\mathcal{E}(\Lambda)=\{t^n e^{\lambda_k t}\}$ be a system of exponential monomials constructed from the sequence $\Lambda$. We study the subspaces $W^p (\Lambda,\omega)$ and $W^0 (\Lambda,\omega)$, which are the closures of the linear span of the system $\mathcal{E}(\Lambda)$ in the spaces $L_p^\omega$ and $C^\omega$, respectively. Under natural constraints on $\Lambda$ (the finiteness of the condensation index $S_\Lambda$ and $n_k/\lambda_k\leq c$, $k\geq 1$) and on the convex weight $\omega$, conditions are obtained under which each function of these subspaces continues to an entire function and is represented by a series in the system $\mathcal{E}(\Lambda)$ that converges absolutely and uniformly on compact sets in the plane. In contrast to the previously known results for the specified representation problem, we do not require that the sequence $\Lambda$ has a density, and we do not impose the separability condition: $\lambda_{k+1}-\lambda_k\geq h$, $k\geq 1$ (instead, the condition of equality to zero of the special condensation index is used).

Published

2022

26. Locating the Closest Singularity in a Polynomial Homotopy

Author

Verschelde, Jan, Viswanathan, Kylash, Goos, Gerhard, Founding Editor, Hartmanis, Juris, Founding Editor, Bertino, Elisa, Editorial Board Member, Gao, Wen, Editorial Board Member, Steffen, Bernhard, Editorial Board Member, Yung, Moti, Editorial Board Member, Boulier, François, editor, England, Matthew, editor, Sadykov, Timur M., editor, and Vorozhtsov, Evgenii V., editor

Published

2022

27. Evaluation of integrals with fractional Brownian motion for different Hurst indices.

Author

Gao, Fei, Liu, Shuaiqiang, Oosterlee, Cornelis W., and Temme, Nico M.

Subjects

*FRACTIONAL integrals, *BROWNIAN motion, *CONDITIONAL expectations, *INTEGRAL domains, *CHARACTERISTIC functions, *STOCHASTIC processes

Abstract

In this paper, we will evaluate integrals that define the conditional expectation, variance and characteristic function of stochastic processes with respect to fractional Brownian motion (fBm) for all relevant Hurst indices, i.e. H ∈ (0 , 1). Particularly, the fractional Ornstein–Uhlenbeck (fOU) process gives rise to highly nontrivial integration formulas that need careful analysis when considering the whole range of Hurst indices. We will show that the classical technique of analytic continuation, from complex analysis, provides a way of extending the domain of validity of an integral from H ∈ (1 / 2 , 1) to the larger domain H ∈ (0 , 1). Numerical experiments for different Hurst indices confirm the robustness and efficiency of the integral formulations presented. Moreover, we provide accurate and highly efficient financial option pricing results for processes that are related to the fOU process, with the help of Fourier cosine expansions. [ABSTRACT FROM AUTHOR]

Published

2023

28. On solutions of matrix soliton equations.

Author

Shumkin, M. A.

Subjects

*KORTEWEG-de Vries equation, *NONLINEAR Schrodinger equation, *EQUATIONS, *MEROMORPHIC functions

Abstract

We show that all local holomorphic solutions of matrix soliton equations of parabolic type admit an analytic continuation to globally meromorphic functions of a spatial variable. As examples, we consider the matrix Korteweg–de Vries equation and the matrix modified Korteweg–de Vries equation, as well as various versions of the matrix nonlinear Schrödinger equation. [ABSTRACT FROM AUTHOR]

Published

2023

29. An Eshelby inclusion of arbitrary shape in a nonlinearly coupled thermoelectric material.

Author

Wang, Xu and Schiavone, Peter

Subjects

*THERMOELECTRIC materials, *CURRENT density (Electromagnetism), *BOUNDARY value problems, *CONFORMAL mapping, *DIFFERENTIAL inclusions, *CONTINUATION methods

Abstract

In this paper, we present a general method, based on the techniques of analytic continuation and conformal mapping, for the analytic solution of Eshelby's problem concerned with a two-dimensional inclusion of arbitrary shape in an infinite homogeneous and isotropic nonlinearly coupled thermoelectric plane. The inclusion is subjected to a prescribed uniform electric current-free thermoelectric potential gradient and a uniform energy flux-free temperature gradient. The corresponding boundary value problem is studied in both the physical and image planes. The closed-form general solution is found to be exact provided that the associated mapping function contains only a finite number of terms. Elementary expressions for the internal electric current density and energy flux in the physical plane are obtained. Examples of elliptical, hypotrochoidal and rectangular inclusions are presented to demonstrate the solution method. Interestingly, in this case Eshelby's uniformity property is found invalid for an elliptical inclusion. [ABSTRACT FROM AUTHOR]

Published

2023

30. Analytic continuation of harmonic sums with purely imaginary indices near the integer values.

Author

Velizhanin, V. N.

Subjects

*CONTINUATION methods, *QUANTUM chromodynamics, *EIGENVALUES

Abstract

We present a simple algebraic method for the analytic continuation of harmonic sums with integer real or purely imaginary indices near negative and positive integers. We provide a MATHEMATICA code for exact expansion of harmonic sums in a small parameter near these integers. As an application, we consider the analytic continuation of the anomalous dimension of twist-1 operators in the ABJM model, which contains nested harmonic sums with purely imaginary indices. We found that in the BFKL-like limit the result has the same single-logarithmic behavior as in = 4 SYM and QCD, however, we did not find a general expression for the "BFKL Pomeron" eigenvalue in this model. For the slope function, we found full agreement with the expansion of the known general result and give predictions for the first three perturbative terms in the expansion of the next-to-slope function. The proposed method of analytic continuation can also be used for other generalization of nested harmonic sums. [ABSTRACT FROM AUTHOR]

Published

2023

31. Progress on stochastic analytic continuation of quantum Monte Carlo data.

Author

Shao, Hui and Sandvik, Anders W.

Subjects

*MONTE Carlo method, *CONTINUATION methods, *QUASIPARTICLES, *STATISTICAL correlation, *QUANTUM computing, *MAXIMUM entropy method, *TOPOLOGICAL entropy

Abstract

We report multipronged progress on the stochastic averaging approach to numerical analytic continuation of imaginary-time correlation functions computed by quantum Monte Carlo simulations. After reviewing the conventional maximum-entropy approach and established stochastic analytic continuation methods, we present several new developments in which the configurational entropy of the sampled spectrum plays a key role. Parametrizing the spectrum as a large number of δ -functions in continuous frequency space, an exact calculation of the entropy lends support to a simple goodness-of-fit criterion for the optimal sampling temperature. We also compare spectra sampled in continuous frequency with those from amplitudes sampled on a fixed frequency grid. Insights into the functional form of the entropy in different cases allow us to demonstrate equivalence in a generalized thermodynamic limit (large number of degrees of freedom) of the average spectrum and the maximum-entropy solution, with different parametrizations corresponding to different forms of the entropy in the prior probability. These results revise prevailing notions of the maximum-entropy method and its relationship to stochastic analytic continuation. In further developments of the sampling approach, we explore various adjustable (optimized) constraints that allow sharp low-temperature spectral features to be resolved, in particular at the lower frequency edge. The constraints, e.g., the location of the edge or the spectral weight of a quasi-particle peak, are optimized using a statistical criterion based on entropy minimization under the condition of optimal fit. We show with several examples that this method can correctly reproduce both narrow and broad quasi-particle peaks. We next introduce a parametrization for more intricate spectral functions with sharp edges, e.g., power-law singularities. We present tests with synthetic data as well as with real simulation data for the spin-1/2 Heisenberg chain, where a divergent edge of the dynamic structure factor is due to deconfined spinon excitations. Our results demonstrate that distortions of sharp edges or quasi-particle peaks, which arise with other analytic continuation methods, propagate and cause artificial spectral features also at higher energies. The constrained sampling methods overcome this problem and allow analytic continuation of spectra with sharp edge features at unprecedented fidelity. We present results for S = 1 / 2 Heisenberg 2-leg and 3-leg ladders to illustrate the ability of the methods to resolve spectral features arising from both elementary and composite excitations. Finally, we also propose how the methods developed here could be used as "pre processors" for analytic continuation by machine learning. Edge singularities and narrow quasi-particle peaks being ubiquitous in quantum many-body systems, we expect the new methods to be broadly useful and take numerical analytic continuation to a new quantitative level in many applications. [ABSTRACT FROM AUTHOR]

Published

2023

32. The Zeta Function of a Recurrence Sequence of Arbitrary Degree.

Author

Serrano Holgado, Álvaro and Navas Vicente, Luis Manuel

Abstract

We consider a Dirichlet series ∑ n = 1 ∞ a n - s where a n satisfies a linear recurrence of arbitrary degree with integer coefficients. Under suitable hypotheses, we prove that it has a meromorphic continuation to the complex plane, giving explicit formulas for its pole set and residues, as well as for its finite values at negative integers, which are shown to be rational numbers. To illustrate the results, we focus on some concrete examples which have also been studied previously by other authors. [ABSTRACT FROM AUTHOR]

Published

2023

33. Multi-coil MRI by analytic continuation.

Author

Webber, James W.

Subjects

*FREDHOLM equations, *SINGULAR value decomposition, *MAGNETIC resonance imaging, *FREDHOLM operators, *INVERSE problems, *ECHO-planar imaging

Abstract

We present novel reconstruction and stability analysis methodologies for two-dimensional, multi-coil MRI, based on analytic continuation ideas. We show that the 2-D, limited-data MRI inverse problem, whereby the missing parts of 퐤 -space (Fourier space) are lines parallel to either k 1 or k 2 (i.e., the 퐤 -space axis), can be reduced to a set of 1-D Fredholm type inverse problems. The Fredholm equations are then solved to recover the 2-D image on 1-D line profiles ("slice-by-slice" imaging). The technique is tested on a range of medical in vivo images (e.g., brain, spine, cardiac), and phantom data. Our method is shown to offer optimal performance, in terms of structural similarity, when compared against similar methods from the literature, and when the 퐤 -space data is sub-sampled at random so as to simulate motion corruption. In addition, we present a Singular Value Decomposition (SVD) and stability analysis of the Fredholm operators, and compare the stability properties of different 퐤 -space sub-sampling schemes (e.g., random vs uniform accelerated sampling). [ABSTRACT FROM AUTHOR]

Published

2023

34. Exponential asymptotics of woodpile chain nanoptera using numerical analytic continuation.

Author

Deng, Guo and Lustri, Christopher J.

Subjects

*CONTINUATION methods, *OSCILLATIONS

Abstract

Traveling waves in woodpile chains are typically nanoptera, which are composed of a central solitary wave and exponentially small oscillations. These oscillations have been studied using exponential asymptotic methods, which typically require an explicit form for the leading‐order behavior. For many nonlinear systems, such as granular woodpile chains, it is not possible to calculate the leading‐order solution explicitly. We show that accurate asymptotic approximations can be obtained using numerical approximation in place of the exact leading‐order behavior. We calculate the oscillation behavior for Toda woodpile chains, and compare the results to exponential asymptotics based on previous methods from the literature: long‐wave approximation and tanh‐fitting. We then use numerical analytic continuation methods based on Padé approximants and the adaptive Antoulas–Anderson (AAA) method. These methods are shown to produce accurate predictions of the amplitude of the oscillations and the mass ratios for which the oscillations vanish. Exponential asymptotics using an AAA approximation for the leading‐order behavior is then applied to study granular woodpile chains, including chains with Hertzian interactions—this method is able to calculate behavior that could not be accurately approximated in previous studies. [ABSTRACT FROM AUTHOR]

Published

2023

35. On Meijer's G function Gm,np,p for m + n = p.

Author

Karp, D. B. and Prilepkina, E. G.

Subjects

*HYPERGEOMETRIC functions, *POWER series, *BRANCH banks

Abstract

The paper is devoted to the piece-wise analytic case of Meijer's G function G p , p m , n . While the problem of its analytic continuation was solved in principle by Meijer and Braaksma we show that in the 'balanced' case m + n = p the formulas take a particularly simple form. We derive explicit expressions for the values of these analytic continuations on the banks of the branch cuts. It is further demonstrated that particular cases of this type of G function having integer parameter differences satisfy identities similar to the Miller–Paris transformations of the generalized hypergeometric function. Finally, we give a presumably new integral evaluation involving G p , p m , n function with m = n and apply it for summing a series involving digamma function and related to the power series coefficients of the product of two generalized hypergeometric functions with shifted parameters. [ABSTRACT FROM AUTHOR]

Published

2023

36. On some formulae related to Euler sums.

Author

Coppo, Marc-Antoine and Candelpergher, Bernard

Abstract

Using the Ramanujan summation method, we derive some unusual formulas for a class of Euler sums (including divergent Euler sums) similar to the classical relations due to Euler. [ABSTRACT FROM AUTHOR]

Published

2023

37. On Analytic Continuation of Conformal Mapping of a Circular Triangle.

Author

Pikulin, S. V.

Subjects

*CONFORMAL mapping, *ANALYTIC mappings, *TRIANGLES, *QUASICONFORMAL mappings, *SYMMETRY, *ANGLES

Abstract

Given a circular triangle T having a zero angle at a point at infinity and two equal nonzero angles, it is shown that a conformal mapping of T onto a half-plane can be continued to a semi-infinite strip by applying the Riemann–Schwarz symmetry principle. The problem of analytic continuation of such a mapping arises as an auxiliary problem in constructing a conformal mapping of an L-shaped domain onto a half-plane. [ABSTRACT FROM AUTHOR]

Published

2022

38. Formulas for Computing the Lauricella Function in the Case of Crowding of Variables.

Author

Bezrodnykh, S. I.

Subjects

*FUNCTIONS of several complex variables, *INTERSECTION numbers, *HYPERGEOMETRIC functions, *HYPERGEOMETRIC series, *PARTIAL differential equations, *INTEGRAL functions, *CONFORMAL mapping

Abstract

For the Lauricella function , which is a hypergeometric function of several complex variables , analytic continuation formulas are constructed that correspond to the intersection of an arbitrary number of singular hyperplanes of the form , , These formulas give an expression for the considered function in the form of linear combinations of Horn hypergeometric series in variables satisfying the same system of partial differential equations as the original series defining in the unit polydisk. By applying these formulas, the function and Euler-type integrals expressed in terms of can be efficiently computed (with the help of exponentially convergent series) in the entire complex space in the complicated cases when the variables form one or several groups of "very close" quantities. This situation is referred to as crowding, with the term taken from works concerned with conformal maps. [ABSTRACT FROM AUTHOR]

Published

2022

39. Cutkosky’s theorem for massive one-loop Feynman integrals: part 1.

Author

Mühlbauer, Maximilian

Abstract

We formulate and prove Cutkosky’s Theorem regarding the discontinuity of Feynman integrals in the massive one-loop case up to the involved intersection index. This is done by applying the techniques to treat singular integrals developed in Fotiadi et al. (Topology 4(2):159–191, 1965). We write one-loop integrals as an integral of a holomorphic family of holomorphic forms over a compact cycle. Then, we determine at which points simple pinches occur and explicitly compute a representative of the corresponding vanishing sphere. This also yields an algorithm to compute the Landau surface of a one-loop graph without explicitly solving the Landau equations. We also discuss the bubble, triangle and box graph in detail. [ABSTRACT FROM AUTHOR]

Published

2022

40. Iterative analytic extension in tomographic imaging

Author

Gengsheng L. Zeng

Subjects

Analytic continuation, Entire function, Iterative projections onto convex sets algorithm, Image reconstruction, Limited angle tomography, Drawing. Design. Illustration, NC1-1940, Computer applications to medicine. Medical informatics, R858-859.7, Computer software, QA76.75-76.765

Abstract

Abstract If a spatial-domain function has a finite support, its Fourier transform is an entire function. The Taylor series expansion of an entire function converges at every finite point in the complex plane. The analytic continuation theory suggests that a finite-sized object can be uniquely determined by its frequency components in a very small neighborhood. Trying to obtain such an exact Taylor expansion is difficult. This paper proposes an iterative algorithm to extend the measured frequency components to unmeasured regions. Computer simulations show that the proposed algorithm converges very slowly, indicating that the problem is too ill-posed to be practically solvable using available methods.

Published

2022

41. Real-analyticity of generalized sine functions with two parameters

Author

Ding, Pisheng

Published

2023

42. ESTIMATES FOR INITIAL COEFFICIENTS OF CERTAIN SUBCLASSES OF BI-CLOSE-TO-CONVEX ANALYTIC FUNCTIONS.

Author

BARIK, SARBESWAR and MISHRA, AKSHYA KUMAR

Subjects

UNIVALENT functions, ANALYTIC functions

Abstract

In this paper we Ąnd bounds on the modulii of the second, third and fourth Taylor-Maclaurin's coefficients for functions in a subclass of bi-close-to-convex analytic functions, which includes the class studied by Srivastava et al. as particular case. Our estimates on the second and third coefficients improve upon earlier bounds. The result on the fourth coefficient is new. Our bounds are obtained by reĄning well known estimates for the initial coefficients of the Carthéodory functions. [ABSTRACT FROM AUTHOR]

Published

2023

43. Analytic continuation of the Kampé de Fériet function and the general double Horn series.

Author

Bezrodnykh, S. I.

Abstract

For the Kampé de Fériet function, such analytic continuation formulas are obtained that allow one to represent this function as exponentially converging hypergeometric series in the complement to the convergence domain of the original series. This result has been obtained using the found formulas for the analytic continuation of the Horn series in two variables. [ABSTRACT FROM AUTHOR]

Published

2022

44. Lauricella Function and the Conformal Mapping of Polygons.

Author

Bezrodnykh, S. I.

Subjects

*CONFORMAL mapping, *HYPERGEOMETRIC functions, *POLYGONS, *COMPLEX variables, *PROBLEM solving, *QUASICONFORMAL mappings, *CONTINUATION methods

Abstract

In this paper, some progress has been made in solving the problem of calculating the parameters of the Schwarz–Christoffel integral realizing a conformal mapping of a canonical domain onto a polygon. It is shown that an effective solution of this problem can be found by applying the formulas of analytic continuation of the Lauricella function , which is a hypergeometric function of complex variables. Several new formulas for such a continuation of the function are presented that are oriented to the calculation of the parameters of the Schwarz–Christoffel integral in the "crowding" situation. An example of solving the parameter problem for a complicated polygon is given. [ABSTRACT FROM AUTHOR]

Published

2022

45. Resonant states 3+ and 2− of the Boron isotope 8B.

Author

Tshipi, T. J., Rakityansky, S. A., and Ershov, S. N.

Subjects

*RESONANT states, *EIGENFUNCTIONS, *ANALYTIC functions, *RIEMANN surfaces, *DELOCALIZATION energy, *BORON isotopes

Abstract

The Jost functions, constructed by fitting available partial cross-sections for the elastic p7Be scattering with J π = 3 + , 2 − , are analytically continued to complex energies, where the resonances are located as their zeros. In addition to the resonance energies and widths, the residues of the S -matrix at the corresponding poles, as well as the Asymptotic Normalization Constants (ANC) are determined. The fitting is done using the semi-analytic representation of the Jost function with proper analytic structure, defined on the Riemann surface whose topology involves not only the square-root but also the logarithmic branching caused by the Coulomb interaction. [ABSTRACT FROM AUTHOR]

Published

2022

46. Finite difference formulas in the complex plane.

Author

Fornberg, Bengt

Abstract

Among general functions of two variables f(x, y), analytic functions f(z) with z = x + iy form a very important special case. One consequence of analyticity turns out to be that 2-D finite difference (FD) formulas can be made remarkably accurate already for small stencil sizes. This article discusses some key properties of such complex plane FD formulas. Application areas include numerical differentiation, interpolation, contour integration, and analytic continuation. [ABSTRACT FROM AUTHOR]

Published

2022

47. In-plane deformations of a circular elastic inhomogeneity with an eccentric interphase layer.

Author

Wang, Xu and Schiavone, Peter

Subjects

*POISSON'S ratio, *ELASTIC deformation, *STRAINS & stresses (Mechanics), *MODULUS of rigidity

Abstract

We use complex variable methods to derive an analytical solution to the problem in plane elasticity associated with a circular elastic inhomogeneity with an eccentric interphase layer when the matrix is subjected to uniform remote in-plane stresses and the interphase layer undergoes uniform in-plane eigenstrains. The complex coefficients appearing in all three pairs of analytic functions characterizing the elastic fields in the composite are uniquely determined by solving two decoupled sets of linear algebraic equations obtained by enforcing the continuity conditions of tractions and displacements across the two perfect circular interfaces with the aid of analytic continuation. A simple analytical solution is also derived when the circular inhomogeneity becomes a traction-free hole and the interphase layer and the matrix have equal shear modulus but distinct Poisson's ratios. The non-uniform mean stress inside the circular inhomogeneity and the hoop stress along the edge of the circular hole are calculated and illustrated graphically. [ABSTRACT FROM AUTHOR]

Published

2022

48. Formulas for Analytic Continuation of Horn Functions of Two Variables.

Author

Bezrodnykh, S. I.

Subjects

*PARTIAL differential equations, *HYPERGEOMETRIC functions

Abstract

The Horn hypergeometric series of two variables and corresponding systems of partial differential equations are considered. A method is proposed for deriving formulas for analytic continuation of arbitrary series of this type in the form of linear combinations of other solutions of the system of equations satisfied by the original series. As an example, formulas for continuation of two series from the well-known Horn list are constructed. [ABSTRACT FROM AUTHOR]

Published

2022

49. On Solutions to the Matrix Nonlinear Schrödinger Equation.

Author

Domrin, A. V.

Subjects

*NONLINEAR Schrodinger equation, *SCHRODINGER equation, *ANALYTIC functions, *MEROMORPHIC functions

Abstract

It is shown that any real analytic solution can be continued to a globally meromorphic function of the spatial variable at each fixed value of the time variable . In the totally focusing case, it is also shown that any local real analytic solution can be extended to a real analytic function on a maximum strip that is parallel to the axis and depends on the solution. [ABSTRACT FROM AUTHOR]

Published

2022

50. Soliton Equations and Their Holomorphic Solutions

Author

Domrin, A. V., Kielanowski, Piotr, editor, Odzijewicz, Anatol, editor, and Previato, Emma, editor

Published

2020