Showing total 4,335 results

1. A remark on a paper by F. Chiarenza and M.~Frasca.

Author

Krylov, N. V.

Subjects

*FRACTIONAL powers, *GENERALIZATION, *INTEGRALS

Abstract

In 1990 F. Chiarenza and M. Frasca published a paper in which they generalized a result of C. Fefferman on estimates of the integral of |bu|^{p} through the integral of |Du|^{p} for p>1. Formally their proof is valid only for d\geq 3. We present here further generalization with a different proof in which D is replaced with the fractional power of the Laplacian for any dimension d\geq 2. [ABSTRACT FROM AUTHOR]

Published

2024

2. How to Referee a (Math) Paper.

Author

Lozano-Robledo, Álvaro

Published

2023

3. A Feynman--Kac approach to a paper of Chung and Feller on fluctuations in the coin-tossing game.

Author

Grünbaum, F. Alberto

Subjects

*BROWNIAN motion, *GAMES

Abstract

A classical result of K. L. Chung and W. Feller deals with the partial sums S_k arising in a fair coin-tossing game. If N_n is the number of "positive" terms among S_1, S_2, ..., S_n then the quantity P(N_{2n} = 2r) takes an elegant form. We lift the restriction on an even number of tosses and give a simple expression for P(N_{2n+1} = r), r = 0, 1, 2, ..., 2n+1. We get to this ansatz by adaptating the Feynman–Kac methodology. [ABSTRACT FROM AUTHOR]

Published

2022

4. How to Referee a Math Paper.

Author

Rowland, Eric

Published

2024

5. Using Generative AI for Literature Searches and Scholarly Writing: Is the Integrity of the Scientific Discourse in Jeopardy?

Author

Schmidt, Paul G. and Meir, Amnon J.

Published

2024

6. Dear Early Career.

Published

2024

7. Journal of Complexity Lauds 2023 Best Paper.

Published

2024

8. PME Honors Undergraduates for Outstanding Paper Presentations.

Published

2024

9. What Happens to Your Paper, After It Is Submitted?

Author

Weibel, Chuck

Published

2021

10. Morrey regularity theory of Riviere's equation.

Author

Du, Hou-Wei, Kang, Yu-Ting, and Wang, Jixiu

Subjects

PARTIAL differential equations, HARMONIC maps, RIESZ spaces, SYSTEMS theory, MATHEMATICS

Abstract

This note is devoted to developing Morrey regularity theory for the following system of Rivière \begin{equation*} -\Delta u=\Omega \cdot \nabla u+f \qquad \text {in }B^{2}, \end{equation*} under the assumption that f belongs to some Morrey space. Our results extend the L^p regularity theory of Sharp and Topping [Trans. Amer. Math. Soc. 365 (2013), pp. 2317–2339], and also generalize a Hölder continuity result of Wang [Calc. Var. Partial Differential Equations 56 (2017), Paper No. 23, 24] on harmonic mappings. Potential applications of our results are also possible in second order conformally invariant geometrical problems as that of Wang [Calc. Var. Partial Differential Equations 56 (2017), Paper No. 23, 24]. [ABSTRACT FROM AUTHOR]

Published

2024

11. Some maximum principles for parabolic mixed local/nonlocal operators.

Author

Dipierro, Serena, Lippi, Edoardo Proietti, and Valdinoci, Enrico

Subjects

ALLEE effect, NEUMANN boundary conditions, ENDANGERED species, POPULATION dynamics, MATHEMATICS

Abstract

The goal of this paper is to establish new Maximum Principles for parabolic equations in the framework of mixed local/nonlocal operators. In particular, these results apply to the case of mixed local/nonlocal Neumann boundary conditions, as introduced by Dipierro, Proietti Lippi, and Valdinoci [Ann. Inst. H. Poincaré C Anal. Non Linéaire 40 (2023), pp. 1093–1166]. Moreover, they play an important role in the analysis of population dynamics involving the so-called Allee effect, which is performed by Dipierro, Proietti Lippi, and Valdinoci [J. Math. Biol. 89 (2024), Paper No. 19]. This is particularly relevant when studying biological populations, since the Allee effect detects a critical density below which the population is severely endangered and at risk of extinction. [ABSTRACT FROM AUTHOR]

Published

2024

12. Dear Early Career.

Published

2023

13. Another remark on a result of Ding-Jost-Li-Wang.

Author

Zhu, Xiaobao

Subjects

RIEMANN surfaces, PARTIAL differential equations, SMOOTHNESS of functions

Abstract

Let (M,g) be a compact Riemann surface, h be a positive smooth function on M. It is well known that the functional \begin{equation*} J(u)=\frac {1}{2}\int _M|\nabla u|^2dv_g+8\pi \int _M udv_g-8\pi \log \int _Mhe^{u}dv_g \end{equation*} achieves its minimum under Ding-Jost-Li-Wang condition. This result was generalized to nonnegative h by Yang and the author. Later, Sun and Zhu [ Existence of Kazdan-Warner equation with sign-changing prescribed function , arXiv: 2012.12840 , 2020] showed the Ding-Jost-Li-Wang condition is also sufficient when h changes sign, which was reproved later by Wang and Yang [J. Funct. Anal. 282 (2022), Paper No. 109449] and Li and Xu [Calc. Var. Partial Differential Equations 61 (2022), Paper No. 143] respectively using a flow approach. The aim of this note is to give a new proof of Sun and Zhu's result. Our proof is based on the variational method and the maximum principle. [ABSTRACT FROM AUTHOR]

Published

2024

14. Smooth solutions to the heat equation which are nowhere analytic in time.

Author

Yang, Xin, Zeng, Chulan, and Zhang, Qi S.

Subjects

ANALYTIC spaces, ANALYTIC functions, HEAT equation

Abstract

The existence of smooth but nowhere analytic functions is well-known (du Bois-Reymond [Math. Ann. 21 (1883), no. 1, pp. 109–117]). However, smooth solutions to the heat equation are usually analytic in the space variable. It is also well-known (Kowalevsky [Crelle 80 (1875), pp. 1–32]) that a solution to the heat equation may not be time-analytic at t=0 even if the initial function is real analytic. Recently, it was shown by Dong and Pan [J Math. Fluid Mech. 22 (2020), no. 4, Paper No. 53]; Dong and Zhang [J. Funct. Anal. 279 (2020), no. 4, Paper No. 108563]; Zhang [Proc. Amer. Math. Soc. 148 (2020), no. 4, pp. 1665–1670] that solutions to the heat equation in the whole space, or in the half space with zero boundary value, are analytic in time under an essentially optimal growth condition. In this paper, we show that time analyticity is not always true in domains with general boundary conditions or without suitable growth conditions. More precisely, we construct two bounded solutions to the heat equation in the half plane which are nowhere analytic in time. In addition, for any \delta >0, we find a solution to the heat equation on the whole plane, with exponential growth of order 2+\delta, which is nowhere analytic in time. [ABSTRACT FROM AUTHOR]

Published

2024

15. Discrete Schr\"{o}dinger equations and systems with mixed and concave-convex nonlinearities.

Author

Chen, Guanwei and Ma, Shiwang

Subjects

NONLINEAR equations, STANDING waves, NONLINEAR Schrodinger equation, MOUNTAIN pass theorem, SCHRODINGER equation, MATHEMATICAL models

Abstract

In this paper, we obtain the existence of at least two standing waves (and homoclinic solutions) for a class of time-dependent (and time-independent) discrete nonlinear Schrödinger systems or equations. The novelties of the paper are as follows. (1) Our nonlinearities are composed of three mixed growth terms, i.e., the nonlinearities are composed of sub-linear, asymptotically-linear and super-linear terms. (2) Our nonlinearities may be sign-changing. (3) Our results can also be applied to the cases of concave-convex nonlinear terms. (4) Our results can be applied to a wide range of mathematical models. [ABSTRACT FROM AUTHOR]

Published

2024

16. The chord log-Minkowski problem for 0.

Author

Qin, Lei

Subjects

MATHEMATICS

Abstract

The chord log-Minkowski problem asks for necessary and sufficient conditions for a finite Borel measure on the unit sphere so that it is the cone-chord measure of a convex body. The chord log-Minkowski problem has been extensively studied by Guo, Xi, and Zhao [Math. Ann. (2023), DOI 10.1007/s00208-023-02721-8]; Lutwak, Xi, Yang, and Zhang [Commun. Pure Appl. Math. (2023), DOI 10.1002/cpa.22190]; Qin [Adv. Math. 427 (2023), Paper No. 109132]. In this paper, we solve the chord log-Minkowski problem when q\in (0,1), without symmetry assumptions. [ABSTRACT FROM AUTHOR]

Published

2024

17. A Ramanujan integral and its derivatives: computation and analysis.

Author

Gautschi, Walter and Milovanović, Gradimir V.

Subjects

GAMMA functions, INTEGRALS, GAUSSIAN quadrature formulas, EULER equations

Abstract

The principal tool of computation used in this paper is classical Gaussian quadrature on the interval [0,1], which happens to be particularly effective here. Explicit expressions are found for the derivatives of the Ramanujan integral in question, and it is proved that the latter is completely monotone on (0,\infty). As a byproduct, known series expansions for incomplete gamma functions are examined with regard to their convergence properties. The paper also pays attention to another famous integral, the Euler integral — better known as the gamma function — revitalizing a largely neglected part of the function, the part corresponding to negative values of the argument, which plays a prominent role in our work. [ABSTRACT FROM AUTHOR]

Published

2024

18. Karate and the Art of Mathematical Maintenance.

Author

Tyler, Helene R.

Published

2024

19. JMSJ Outstanding Paper Prize for 2023 Honors Ros.

Published

2023

20. Asymptotic profiles of zero points of solutions to the heat equation.

Author

Ishii, Hiroshi

Subjects

THERMAL expansion

Abstract

In this paper, we consider the asymptotic profiles of zero points for the spatial variable of the solutions to the heat equation. By giving suitable conditions for the initial data, we prove the existence of zero points by extending the high-order asymptotic expansion theory for the heat equation. This reveals a previously unknown asymptotic profile of zero points diverging at O(t). In a one-dimensional spatial case, we show the zero point's second and third-order asymptotic profiles in a general situation. We also analyze a zero level set in high-dimensional spaces and obtain results that extend the results for the one-dimensional spatial case. [ABSTRACT FROM AUTHOR]

Published

2024

21. Classical freeness of orthosymplectic affine vertex superalgebras.

Author

Creutzig, Thomas, Linshaw, Andrew R., and Song, Bailin

Subjects

SUPERALGEBRAS, MATHEMATICAL physics, ALGEBRA, INTEGERS, MATHEMATICS

Abstract

The question of when a vertex algebra is a quantization of the arc space of its associated scheme has recently received a lot of attention in both the mathematics and physics literature. This property was first studied by Tomoyuki Arakawa and Anne Moreau (see their paper in the references), and was given the name \lq\lq classical freeness" by Jethro van Ekeren and Reimundo Heluani [Comm. Math. Phys. 386 (2021), no. 1, pp. 495-550] in their work on chiral homology. Later, it was extended to vertex superalgebras by Hao Li [Eur. J. Math. 7 (2021), pp. 1689–1728]. In this note, we prove the classical freeness of the simple affine vertex superalgebra L_n(\mathfrak {o}\mathfrak {s}\mathfrak {p}_{m|2r}) for all positive integers m,n,r satisfying -\frac {m}{2} + r +n+1 > 0. In particular, it holds for the rational vertex superalgebras L_n(\mathfrak {o}\mathfrak {s}\mathfrak {p}_{1|2r}) for all positive integers r,n. [ABSTRACT FROM AUTHOR]

Published

2024

22. Detecting nontrivial products in the stable homotopy ring of spheres via the third Morava stabilizer algebra.

Author

Wang, Xiangjun, Wu, Jianqiu, Zhang, Yu, and Zhong, Linan

Subjects

PRIME numbers, ALGEBRA, SPHERES, FAMILIES

Abstract

Let p \geq 7 be a prime number. Let S(3) denote the third Morava stabilizer algebra. In recent years, Kato-Shimomura and Gu-Wang-Wu found several families of nontrivial products in the stable homotopy ring of spheres \pi _* (S) using H^{*,*} (S(3)). In this paper, we determine all nontrivial products in \pi _* (S) of the Greek letter family elements \alpha _s, \beta _s, \gamma _s and Cohen's elements \zeta _n which are detectable by H^{*,*} (S(3)). In particular, we show \beta _1 \gamma _s \zeta _n \neq 0 \in \pi _*(S), if n \equiv 2 mod 3, s \not \equiv 0, \pm 1 mod p. [ABSTRACT FROM AUTHOR]

Published

2024

23. Ideals and strong axioms of determinacy.

Author

Adolf, Dominik, Sargsyan, Grigor, Trang, Nam, Wilson, Trevor M., and Zeman, Martin

Subjects

CONTINUUM hypothesis, BOOLEAN algebra, UNPUBLISHED materials, MODEL theory, SURJECTIONS, CARDINAL numbers

Abstract

\Theta is the least ordinal \alpha with the property that there is no surjection f:\mathbb {R}\rightarrow \alpha. {\mathsf {AD}}_{\mathbb {R}} is the Axiom of Determinacy for games played on the reals. It asserts that every game of length \omega of perfect information in which players take turns to play reals is determined. An ideal \mathcal {I} on \omega _1 is \omega _1-dense if the boolean algebra {\wp }(\omega _1)/ \mathcal {I} has a dense subset of size \omega _1. We consider the theories, where \mathsf {CH} stands for the Continuum Hypothesis, \begin{gather*} \mathsf {ZFC} + \mathsf {CH} + \text {"There is an \omega _1-dense ideal on \omega _1.''}\\ \mathsf {ZF}+{\mathsf {AD}}_{\mathbb {R}} + \text {"\Theta is a regular cardinal.''}\end{gather*} The main result of this paper is that the first theory given above implies the existence of a class model of the second theory given above. Woodin, in unpublished work, showed that the consistency of the second equation given above implies the consistency of the first equation given above. We will also give a proof of this result, which, together with our main theorem, establish the equiconsistency of both the equations given above. As a consequence, this resolves part of question 12 of W. Hugh Woodin [ The axiom of determinacy, forcing axioms, and the nonstationary ideal , Walter de Gruyter & Co., Berlin, 1999], in particular, it shows that the theories (b) and (c) in question 12 of W. Hugh Woodin [ The axiom of determinacy, forcing axioms, and the nonstationary ideal , Walter de Gruyter & Co., Berlin, 1999] are equiconsistent. Thus, our work completes the work that was started by Woodin and Ketchersid in [ Toward AD(\mathbb {R}) from the continuum hypothesis and an \omega _1-dense ideal , ProQuest LLC, Ann Arbor, MI, 2000] some 25 years ago. We also establish other theorems of similar nature in this paper, showing the equiconsistency of the second equation given above and the statement that the non-stationary ideal on {\wp }_{\omega _1}(\mathbb {R}) is strong and pseudo-homogeneous. The aforementioned results are the only known equiconsistency results at the level of \mathsf {AD}_{\mathbb {R}} + \text {"Θ is a regular cardinal.''} [ABSTRACT FROM AUTHOR]

Published

2024

24. A resolution of singularities of Drinfeld compactification with an Iwahori structure.

Author

Yang, Ruotao

Subjects

WEYL groups

Abstract

The Drinfeld compactification \overline {\operatorname {Bun}}{}_B' of the moduli stack \operatorname {Bun}_B' of Borel bundles on a curve X with an Iwahori structure is important in the geometric Langlands program. It is closely related to the study of representation theory. In this paper, we construct a resolution of singularities of it using a modification of Justin Campbell's construction of the Kontsevich compactification. Furthermore, the moduli stack {\operatorname {Bun}}_B' admits a stratification indexed by the Weyl group. For each stratum, we construct a resolution of singularities of its closure. Then we use this resolution of singularities to prove a universally local acyclicity property, which is useful in the quantum local Langlands program. [ABSTRACT FROM AUTHOR]

Published

2024

25. Arithmetic branching law and generic L-packets.

Author

Chen, Cheng, Jiang, Dihua, Liu, Dongwen, and Zhang, Lei

Subjects

NUMBER theory, ARITHMETIC, ALGEBRA, LOGICAL prediction

Abstract

Let G be a classical group defined over a local field F of characteristic zero. For any irreducible admissible representation \pi of G(F), which is of Casselman-Wallach type if F is archimedean, we extend the study of spectral decomposition of local descents by Jiang and Zhang [Algebra Number Theory 12 (2018), 1489–1535] for special orthogonal groups over non-archimedean local fields to more general classical groups over any local field F. In particular, if \pi has a generic local L-parameter, we introduce the spectral first occurrence index {\mathfrak {f}}_{\mathfrak {s}}(\pi) and the arithmetic first occurrence index {\mathfrak {f}}_{{\mathfrak {a}}}(\pi) of \pi and prove in this paper that {\mathfrak {f}}_{\mathfrak {s}}(\pi)={\mathfrak {f}}_{{\mathfrak {a}}}(\pi). Based on the theory of consecutive descents of enhanced L-parameters developed by Jiang, Liu, and Zhang [Arithmetic wavefront sets and generic L-packets, arXiv:2207.04700], we are able to show in this paper that the first descent spectrum consists of all discrete series representations, which determines explicitly the branching decomposition problem by means of the relevant arithmetic data and extends the main result (Jiang and Zhang [Algebra Number Theory 12 (2018), 1489–1535], Theorem 1.7) to broader generality. [ABSTRACT FROM AUTHOR]

Published

2024

26. Nilpotent global centers of generalized polynomial Kukles system with degree three.

Author

Chen, Hebai, Feng, Zhaosheng, and Zhang, Rui

Subjects

POLYNOMIALS, EQUILIBRIUM

Abstract

In this paper, we study and characterize the nilpotent global centers of a generalized polynomial Kukles system with degree three. A sufficient and necessary condition of global centers is established under certain parametric conditions. [ABSTRACT FROM AUTHOR]

Published

2024

27. Continuous ergodic capacities.

Author

Sheng, Yihao and Song, Yongsheng

Subjects

MATHEMATICS, PROBABILITY theory, INTEGRALS

Abstract

The objective of this paper is to characterize the structure of the set \Theta for a continuous ergodic upper probability \mathbb {V}=\sup _{P\in \Theta }P \Theta contains a finite number of ergodic probabilities; Any invariant probability in \Theta is a convex combination of those ergodic ones in \Theta; Any probability in \Theta coincides with an invariant one in \Theta on the invariant \sigma-algebra. The last property has already been obtained in Cerreia-Vioglio, Maccheroni, and Marinacci [Proc. Amer. Math. Soc. 144 (2016), pp. 3381–3396], which first studied the ergodicity of such capacities. As an application of the characterization, we prove an ergodicity result, which improves the result of Cerreia-Vioglio, Maccheroni, and Marinacci [Proc. Amer. Math. Soc. 144 (2016), pp. 3381–3396] in the sense that the limit of the time means of \xi is bounded by the upper expectation \sup _{P\in \Theta }E_P[\xi ], instead of the Choquet integral. Generally, the former is strictly smaller. [ABSTRACT FROM AUTHOR]

Published

2024

28. Optimizers of three-point energies and nearly orthogonal sets.

Author

Bilyk, Dmitriy, Ferizović, Damir, Glazyrin, Alexey, Matzke, Ryan W., Park, Josiah, and Vlasiuk, Oleksandr

Subjects

ORTHOGONALIZATION, GEGENBAUER polynomials, FRACTAL dimensions, SPHERE packings, SEMIDEFINITE programming

Abstract

This paper is devoted to spherical measures and point configurations optimizing three-point energies. Our main goal is to extend the classic optimization problems based on pairs of distances between points to the context of three-point potentials. In particular, we study three-point analogues of the sphere packing problem and the optimization problem for p-frame energies based on three points. It turns out that both problems are inherently connected to the problem of nearly orthogonal sets by Erdős. As the outcome, we provide a new solution of the Erdős problem from the three-point packing perspective. We also show that the orthogonal basis uniquely minimizes the p-frame three-point energy when 0

Published

2024

29. On covering systems of polynomial rings over finite fields.

Author

Li, Huixi, Wang, Biao, Wang, Chunlin, and Yi, Shaoyun

Subjects

FINITE rings, POLYNOMIAL rings, FINITE fields, ACADEMIC dissertations, MULTIPLICITY (Mathematics)

Abstract

In 1950, Erdős posed a question known as the minimum modulus problem on covering systems for \mathbb {Z}, which asked whether the minimum modulus of a covering system with distinct moduli is bounded. This long-standing problem was finally resolved by Hough [Ann. of Math. (2) 181 (2015), no. 1, pp. 361–382] in 2015, as he proved that the minimum modulus of any covering system with distinct moduli does not exceed 10^{16}. Recently, Balister, Bollobás, Morris, Sahasrabudhe, and Tiba [Invent. Math. 228 (2022), pp. 377–414] developed a versatile method called the distortion method and significantly reduced Hough's bound to 616,000. In this paper, we apply this method to present a proof that the smallest degree of the moduli in any covering system for \mathbb {F}_q[x] of multiplicity s is bounded by a constant depending only on s and q. Consequently, we successfully resolve the minimum modulus problem for \mathbb {F}_q[x] and disprove a conjecture by Azlin [ Covering Systems of Polynomial Rings Over Finite Fields , University of Mississippi, Electronic Theses and Dissertations. 39, 2011]. [ABSTRACT FROM AUTHOR]

Published

2024

30. Categorifying equivariant monoids.

Author

Graves, Daniel

Subjects

MONOIDS, ACTION theory (Psychology), PERMUTATIONS, ALGEBRA, MULTIPLICATION

Abstract

Equivariant monoids are very important objects in many branches of mathematics: they combine the notion of multiplication and the concept of a group action. In this paper we will construct categories which encode the structure borne by monoids with a group action by combining the theory of product and permutation categories (PROPs) and product and braid categories (PROBs) with the theory of crossed simplicial groups. PROPs and PROBs are categories used to encode structures borne by objects in symmetric and braided monoidal categories respectively, whilst crossed simplicial groups are categories which encode a unital, associative multiplication and a compatible group action. We will produce PROPs and PROBs whose categories of algebras are equivalent to the categories of monoids, comonoids and bimonoids with group action using extensions of the symmetric and braid crossed simplicial groups. We will extend this theory to balanced braided monoidal categories using the ribbon braid crossed simplicial group. Finally, we will use the hyperoctahedral crossed simplicial group to encode the structure of an involutive monoid with a compatible group action. [ABSTRACT FROM AUTHOR]

Published

2024

31. An Eulerian finite element method for tangential Navier-Stokes equations on evolving surfaces.

Author

Olshanskii, Maxim A., Reusken, Arnold, and Schwering, Paul

Subjects

FINITE element method, NAVIER-Stokes equations, NUMERICAL solutions to Navier-Stokes equations, FINITE difference method, EULERIAN graphs, FINITE differences

Abstract

The paper introduces a geometrically unfitted finite element method for the numerical solution of the tangential Navier–Stokes equations posed on a passively evolving smooth closed surface embedded in \mathbb {R}^3. The discrete formulation employs finite difference and finite elements methods to handle evolution in time and variation in space, respectively. A complete numerical analysis of the method is presented, including stability, optimal order convergence, and quantification of the geometric errors. Results of numerical experiments are also provided. [ABSTRACT FROM AUTHOR]

Published

2024

32. Holder regularity of solutions and physical quantities for the ideal electron magnetohydrodynamic equations.

Author

Wang, Yanqing, Liu, Jitao, and He, Guoliang

Subjects

PHYSICAL constants, EULER equations, ELECTRONS, QUANTUM dots, TRANSPORT equation, EQUATIONS

Abstract

In this paper, we make the first attempt to figure out the differences on Hölder regularity in time of solutions and conserved physical quantities between the ideal electron magnetohydrodynamic equations concerning Hall term and the incompressible Euler equations involving convection term. It is shown that the regularity in time of magnetic field B is C_{t}^{\frac {\alpha }2} provided it belongs to L_{t}^{\infty } C_{x}^{\alpha } for any \alpha >0, its energy is C_{t}^{\frac {2\alpha }{2-\alpha }} as long as B belongs to L_{t}^{\infty } \dot {B}^{\alpha }_{3,\infty } for any 0<\alpha <1 and its magnetic helicity is C_{t}^{\frac {2\alpha +1}{2-\alpha }} supposing B belongs to L_{t}^{\infty } \dot {B}^{\alpha }_{3,\infty } for any 0<\alpha <\frac 12, which are quite different from the classical incompressible Euler equations. [ABSTRACT FROM AUTHOR]

Published

2024

33. Scattering for quantum Zakharov system in two space dimensions.

Author

Segata, Jun-ichi

Subjects

QUANTUM scattering, MATHEMATICS

Abstract

In this paper, we study long time behavior of solution to the quantum Zakharov system in two dimensions. We construct a small global solution to the quantum Zakharov system which scatters to a given free solution by using space-time resonance method developed by Gustafson-Nakanishi-Tsai [Commun. Contemp. Math. 11 (2009), pp. 657–707] and Germain-Masmoudi-Shatah [Int. Math. Res. Not. IMRN 3 (2009), 414–432; J. Math. Pures Appl. (9) 97 (2012), pp. 505–543] etc. [ABSTRACT FROM AUTHOR]

Published

2024

34. Weyl asymptotics for functional difference operators with power to quadratic exponential potential.

Author

Qiu, Yaozhong

Subjects

DIFFERENCE operators, COHERENT states, EIGENVALUES, MATHEMATICS

Abstract

We continue the program first initiated by Laptev, Schimmer, and Takhtajan [Geom. Funct. Anal. 26 (2016), pp. 288–305] and develop a modification of the technique introduced in that paper to study the spectral asymptotics, namely the Riesz means and eigenvalue counting functions, of functional difference operators H_0 = \mathcal {F}^{-1} M_{\cosh (\xi)} \mathcal {F} with potentials of the form W(x) = \left \lvert {x} \right \rvert ^pe^{\left \lvert {x} \right \rvert ^\beta } for either \beta = 0 and p > 0 or \beta \in (0, 2] and p \geq 0. We provide a new method for studying general potentials which includes the potentials studied by Laptev, Schimmer, and Takhtajan [Geom. Funct. Anal. 26 (2016), pp. 288–305] and [J. Math. Phys. 60 (2019), p. 103505]. The proof involves dilating the variance of the gaussian defining the coherent state transform in a controlled manner preserving the expected asymptotics. [ABSTRACT FROM AUTHOR]

Published

2024

35. Accessibility of SPDEs driven by pure jump noise and its applications.

Author

Wang, Jian, Yang, Hao, Zhai, Jianliang, and Zhang, Tusheng

Subjects

STOCHASTIC partial differential equations, NAVIER-Stokes equations, LEVY processes, HEAT equation, POISSON processes

Abstract

In this paper, we develop a new method to obtain the accessibility of stochastic partial differential equations driven by additive pure jump noise. An important novelty of this paper is to allow the driving noises to be degenerate. As an application, for the first time, we obtain the accessibility of a class of stochastic equations driven by pure jump (possibly degenerate) noise, including stochastic 2D Navier-Stokes equations, stochastic Burgers equations, stochastic singular p-Laplace equations, and stochastic fast diffusion equations. As a further application, we establish the ergodicity of stochastic singular p-Laplace equations and stochastic fast diffusion equations driven by additive pure jump noise, and we remark that the driving noises could be Compound Poisson processes or Lévy processes with heavy tails. [ABSTRACT FROM AUTHOR]

Published

2024

36. Weak friezes and frieze pattern determinants.

Author

Holm, Thorsten and Jørgensen, Peter

Subjects

CLUSTER algebras, SYMMETRIC matrices, GLUE, POLYGONS, MATHEMATICS

Abstract

Frieze patterns have been introduced by Coxeter [Acta Arith. 18 (1971), pp. 297–310] in the 1970's and have recently attracted renewed interest due to their close connection with Fomin-Zelevinsky's cluster algebras. Frieze patterns can be interpreted as assignments of values to the diagonals of a triangulated polygon satisfying certain conditions for crossing diagonals (Ptolemy relations). Weak friezes, as introduced by Çanakçı and Jørgensen [Adv. in Appl. Math. 131 (2021), Paper No. 102253], are generalizing this concept by allowing to glue dissected polygons so that the Ptolemy relations only have to be satisfied for crossings involving one of the gluing diagonals. To any frieze pattern one can associate a symmetric matrix using a triangular fundamental domain of the frieze pattern in the upper and lower half of the matrix and putting zeroes on the diagonal. Broline, Crowe and Isaacs [Geometriae Dedicata 3 (1974), pp. 171–176] have found a formula for the determinants of these matrices and their work has later been generalized in various directions by other authors. These frieze pattern determinants are the main focus of our paper. As our main result we show that this determinant behaves well with respect to gluing weak friezes: the determinant is the product of the determinants for the pieces glued, up to a scalar factor coming from the gluing diagonal. Then we give several applications of this result, showing that formulas from the literature, obtained by Broline-Crowe-Isaacs, Baur-Marsh [J. Combin. Theory Ser. A 119 (2012), pp. 1110–1122], Bessenrodt-Holm-Jørgensen [J. Combin. Theory Ser. A 123 (2014), pp. 30–42] and Maldonado [ Frieze matrices and infinite frieze patterns with coefficients , Preprint, arXiv: 2207.04120 , 2022] can all be obtained as consequences of our result. [ABSTRACT FROM AUTHOR]

Published

2024

37. Spacetime integral bounds for the energy-critical nonlinear wave equation.

Author

Dodson, Benjamin

Subjects

NONLINEAR wave equations, SPACETIME, INTEGRALS, QUANTUM dots

Abstract

In this paper we prove a global spacetime bound for the quintic, nonlinear wave equation in three dimensions. This bound depends on the L_{t}^{\infty } L_{x}^{2} and L_{t}^{\infty } \dot {H}^{2} norms of the solution to the quintic problem. The main motivation for this paper is the use of an interaction Morawetz estimate for the nonlinear wave equation. [ABSTRACT FROM AUTHOR]

Published

2024

38. On input and Langlands parameters for epipelagic representations.

Author

Romano, Beth

Subjects

L-functions, MATHEMATICS

Abstract

A paper of Reeder–Yu [J. Amer. Math. Soc. 27 (2014), pp. 437–477] gives a construction of epipelagic supercuspidal representations of p-adic groups. The input for this construction is a pair (\lambda, \chi) where \lambda is a stable vector in a certain representation coming from a Moy–Prasad filtration, and \chi is a character of the additive group of the residue field. We say two such pairs are equivalent if the resulting supercuspidal representations are isomorphic. In this paper we describe the equivalence classes of such pairs. As an application, we give a classification of the simple supercuspidal representations for split adjoint groups. Finally, under an assumption about unramified base change, we describe properties of the Langlands parameters associated to these simple supercuspidals, showing that they have trivial L-functions and minimal Swan conductors, and showing that each of these simple supercuspidals lies in a singleton L-packet. [ABSTRACT FROM AUTHOR]

Published

2024

39. The Mathematician.

Author

Garrity, Thomas

Published

2024

40. Retraction notice.

Author

Salame, Khadime

Subjects

FIXED point theory, NONEXPANSIVE mappings

Abstract

This document is a retraction notice published in the Proceedings of the American Mathematical Society. The author, Khadime Salame, apologizes to the mathematical community and withdraws three papers related to fixed point theory. The papers attempted to address the question of whether left amenable semitopological semigroups have a certain fixed point property, but each paper contains errors. The author acknowledges these errors and suggests that Lau's conjecture should be regarded as an open question. The author hopes that this question will be resolved in the future. [Extracted from the article]

Published

2024

41. Pogorelov estimates for semi-convex solutions of k-curvature equations.

Author

Chen, Xiaojuan, Tu, Qiang, and Xiang, Ni

Subjects

PARTIAL differential equations, EQUATIONS

Abstract

In this paper, we consider k-curvature equations \sigma _k(\kappa [M_u])=f(x,u,\nabla u) subject to (k+1)-convex Dirichlet boundary data instead of affine Dirichlet data of Sheng, Urbas, and Wang [Duke Math. J. 123 (2004), pp. 235–264]. By using the crucial concavity inequality for Hessian operator of Lu [Calc. Var. Partial Differential Equations 62 (2023), p.23], we derive Pogorelov estimates of semi-convex admissible solutions for these k-curvature equations. [ABSTRACT FROM AUTHOR]

Published

2024

42. Diameter estimate for planar L_p dual Minkowski problem.

Author

Kim, Minhyun and Lee, Taehun

Subjects

OPTIMISM, DENSITY, DIAMETER

Abstract

In this paper, given a prescribed measure on \mathbb {S}^1 whose density is bounded and positive, we establish a uniform diameter estimate for solutions to the planar L_p dual Minkowski problem when 0

Published

2024

43. From hyperbolic to parabolic parameters along internal rays.

Author

Chen, Yi-Chiuan and Kawahira, Tomoki

Subjects

HOLDER spaces, POINT set theory

Abstract

For the quadratic family f_{c}(z) = z^2+c with c in a hyperbolic component of the Mandelbrot set, it is known that every point in the Julia set moves holomorphically. In this paper we give a uniform derivative estimate of such a motion when the parameter c converges to a parabolic parameter {\hat {c}} radially; in other words, it stays within a bounded Poincaré distance from the internal ray that lands on {\hat {c}}. We also show that the motion of each point in the Julia set is uniformly one-sided Hölder continuous at {\hat {c}} with exponent depending only on the petal number. This paper is a parabolic counterpart of the authors' paper "From Cantor to semi-hyperbolic parameters along external rays" [Trans. Amer. Math. Soc. 372 (2019), pp. 7959–7992]. [ABSTRACT FROM AUTHOR]

Published

2024

44. Laguerre inequalities and complete monotonicity for the Riemann Xi-function and the partition function.

Author

Wang, Larry X.W. and Yang, Neil N.Y.

Subjects

PARTITION functions, FINITE differences, INTEGRAL functions

Abstract

In this paper, we find some conditions under which a sequence \{\alpha (n)\} will satisfy the Laguerre inequality of any order asymptotically. Using this method, we prove that for any r and some constant c, the Maclaurin coefficients \gamma (n) of the Riemann Xi-function satisfy the Laguerre inequality of order r when n>cr^3, which provides a necessary condition for the Riemann hypothesis. We also prove that the partition function satisfies the Laguerre inequality of order r\geq 5 when n\geq 6r^4. As a consequence, it gives an affirmative answer to Wagner's conjecture on the threshold for the Laguerre inequalities of order no more than 10 for the partition function. Moreover, motivated by the study of Craven and Csordas on the complete monotonicity of the Maclaurin coefficients of entire functions in Laguerre-Pólya class, we consider the complete monotonicity of the sequences \{\alpha (n)\}. We give the criteria for the asymptotically complete monotonicity of the sequence \{\alpha (n)\} and \{\log \alpha (n)\}, respectively. With this criteria, we show that (-1)^r \Delta ^r \gamma (n)>0 for n>ce^{r^3} and (-1)^{r-1} \Delta ^r \log \gamma (n)>0 for n>cr^2. Furthermore, we propose some open problems. [ABSTRACT FROM AUTHOR]

Published

2024

45. Pairs of continuous linear bijective maps preserving fixed products of operators.

Author

Costara, Constantin

Subjects

BANACH spaces, LINEAR operators, ALGEBRA

Abstract

Let X be a complex Banach space, and denote by \mathcal {B}(X) the algebra of all bounded linear operators on X. Let C,D\in \mathcal {B} \left (X\right) be fixed operators. In this paper, we characterize linear, continuous and bijective maps \varphi and \psi on \mathcal {B}\left (X\right) for which there exist invertible operators T_0, W_0 \in \mathcal { B}(X) such that \varphi (T_0), \psi (W_0) \in \mathcal {B}(X) are both invertible, having the property that \varphi \left (A\right) \psi \left (B\right) =D in \mathcal {B}(X) whenever AB=C in \mathcal {B}(X). As a corollary, we deduce the form of linear, bijective and continuous maps \varphi on \mathcal {B}(X) having the property that \varphi \left (A\right) \varphi \left (B\right) =D in \mathcal {B}(X) whenever AB=C. [ABSTRACT FROM AUTHOR]

Published

2024

46. Complex submanifolds of indefinite complex space forms.

Author

Cheng, Xiaoliang, Hao, Yihong, Yuan, Yuan, and Zhang, Xu

Subjects

HYPERBOLIC spaces, PROJECTIVE spaces, ALGEBRA, SUBMANIFOLDS

Abstract

In this short paper, we derive a new result on Umehara algebra. As a consequence, we prove that an indefinite complex hyperbolic space and an indefinite complex projective space do not share a common complex submanifold with induced metrics, answering a question raised in Cheng et al. [ABSTRACT FROM AUTHOR]

Published

2024

47. On Liouville-type theorems for k-Hessian equations with gradient terms.

Author

Doerr, Cameron and Mohammed, Ahmed

Subjects

NONLINEAR equations, EQUATIONS

Abstract

In this paper, we investigate several Liouville-type theorems related to k-Hessian equations with non-linear gradient terms. More specifically, we study non-negative solutions to S_k[D^2u]\ge h(u,|Du|) in \mathbb {R}^n. The results depend on some qualified growth conditions of h at infinity. A Liouville-type result to subsolutions of a prototype equation S_k[D^2u]=f(u)+g(u)\varpi (|Du|) is investigated. A necessary and sufficient condition for the existence of a non-trivial non-negative entire solution to S_k[D^2u]=f(u)+g(u)|Du|^q for 0\le q

Published

2024

48. Hyperelliptic A_r-stable curves (and their moduli stack).

Author

Pernice, Michele

Subjects

INTEGRALS, HYPERGRAPHS

Abstract

This paper is the second in a series of four papers aiming to describe the (almost integral) Chow ring of \overline {\mathcal {M}}_3, the moduli stack of stable curves of genus 3. In this paper, we introduce the moduli stack \widetilde {\mathcal {H}}_g^r of hyperelliptic A_r-stable curves and generalize the theory of hyperelliptic stable curves to hyperelliptic A_r-stable curves. In particular, we prove that \widetilde {\mathcal {H}}_g^r is a smooth algebraic stack that can be described using cyclic covers of twisted curves of genus 0 and it embeds in \widetilde {\mathcal M}_g^r (the moduli stack of A_r-stable curves) as the closure of the moduli stack of smooth hyperelliptic curves. [ABSTRACT FROM AUTHOR]

Published

2024

49. Hyperbolic Anderson model with Levy white noise: Spatial ergodicity and fluctuation.

Author

Balan, Raluca M. and Zheng, Guangqu

Subjects

ANDERSON model, STOCHASTIC partial differential equations, CENTRAL limit theorem, LIMIT theorems, WHITE noise, LEVY processes, RANDOM noise theory

Abstract

In this paper, we study one-dimensional hyperbolic Anderson models (HAM) driven by space-time pure-jump Lévy white noise in a finite-variance setting. Motivated by recent active research on limit theorems for stochastic partial differential equations driven by Gaussian noises, we present the first study in this Lévy setting. In particular, we first establish the spatial ergodicity of the solution and then a quantitative central limit theorem (CLT) for the spatial averages of the solution to HAM in both Wasserstein distance and Kolmogorov distance, with the same rate of convergence. To achieve the first goal (i.e. spatial ergodicity), we exploit some basic properties of the solution and apply a Poincaré inequality in the Poisson setting, which requires delicate moment estimates on the Malliavin derivatives of the solution. Such moment estimates are obtained in a soft manner by observing a natural connection between the Malliavin derivatives of HAM and a HAM with Dirac delta velocity. To achieve the second goal (i.e. CLT), we need two key ingredients: (i) a univariate second-order Poincaré inequality in the Poisson setting that goes back to Last, Peccati, and Schulte (Probab. Theory Related Fields, 2016) and has been recently improved by Trauthwein (arXiv:2212.03782); (ii) aforementioned moment estimates of Malliavin derivatives up to second order. We also establish a corresponding functional CLT by (a) showing the convergence in finite-dimensional distributions and (b) verifying Kolmogorov's tightness criterion. Part (a) is made possible by a linearization trick and the univariate second-order Poincaré inequality, while part (b) follows from a standard moment estimate with an application of Rosenthal's inequality. [ABSTRACT FROM AUTHOR]

Published

2024

50. Meromorphic functions with a polar asymptotic value.

Author

Chen, Tao and Keen, Linda

Subjects

MEROMORPHIC functions, BOUQUETS

Abstract

This paper is part of a general program in complex dynamics to understand parameter spaces of transcendental maps with finitely many singular values. The simplest families of such functions have two asymptotic values and no critical values. These families, up to affine conjugation, depend on two complex parameters. Understanding their parameter spaces is key to understanding families with more asymptotic values, just as understanding quadratic polynomials was for rational maps more generally. The first such families studied were the one-dimensional slices of the exponential family, \exp (z) + a, and the tangent family \lambda \tan z. The exponential case exhibited phenomena not seen for rational maps: Cantor bouquets in both the dynamic and parameter spaces, and no bounded hyperbolic components. The tangent case, with its two finite asymptotic values \pm \lambda i, is closer to the rational case, a kind of infinite degree version of the latter. In this paper, we consider a general family that interpolates between \exp (z) + a and \lambda \tan z. Our new family has two asymptotic values and a one-dimensional slice for which one of the asymptotic values is constrained to be a pole, the "polar asymptotic value" of the title. We show how the dynamic and parameter planes for this slice exhibit behavior that is a surprisingly delicate interplay between that of the \exp (z) + a and \lambda \tan z families. [ABSTRACT FROM AUTHOR]

Published

2024