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Global Spherically Symmetric Solutions of the Multidimensional Full Compressible Navier–Stokes Equations with Large Data 大数据下多维全可压缩纳维-斯托克斯方程的全局球对称解
IF 2.6 1区 数学 Q1 MATHEMATICS, APPLIED Pub Date : 2024-10-22 DOI: 10.1007/s00205-024-02018-3
Gui-Qiang G. Chen, Yucong Huang, Shengguo Zhu

We establish the global-in-time existence of solutions of the Cauchy problem for the full Navier–Stokes equations for compressible heat-conducting flow in multidimensions with initial data that are large, discontinuous, spherically symmetric, and away from the vacuum. The solutions obtained here are of global finite total relative-energy including the origin, while cavitation may occur as balls centred at the origin of symmetry for which the interfaces between the fluid and the vacuum must be upper semi-continuous in space-time in the Eulerian coordinates. On any region strictly away from the possible vacuum, the velocity and specific internal energy are Hölder continuous, and the density has a uniform upper bound. To achieve this, our main strategy is to regard the Cauchy problem as the limit of a series of carefully designed initial-boundary value problems that are formulated in finite annular regions. For such approximation problems, we can derive uniform a priori estimates that are independent of both the inner and outer radii of the annuli considered in the spherically symmetric Lagrangian coordinates. The entropy inequality is recovered after taking the limit of the outer radius to infinity by using Mazur’s lemma and the convexity of the entropy function, which is required for the limit of the inner radius tending to zero. Then the global weak solutions of the original problem are attained via careful compactness arguments applied to the approximate solutions in the Eulerian coordinates.

我们建立了多维可压缩导热流的全纳维-斯托克斯方程的考奇问题解的全局-时间存在性,其初始数据是大的、不连续的、球形对称的和远离真空的。这里得到的解具有包括原点在内的全局有限总相对能量,而空化可能以对称原点为中心发生,流体与真空之间的界面在欧拉坐标中必须是上半连续的时空球。在严格远离可能真空的任何区域,速度和比内能都是荷尔德连续的,密度也有统一的上限。为了实现这一目标,我们的主要策略是将柯西问题视为一系列精心设计的初界值问题的极限,这些问题都是在有限环形区域内提出的。对于这类近似问题,我们可以推导出均匀的先验估计值,这些估计值与球对称拉格朗日坐标中考虑的环形区域的内外半径无关。利用马祖尔 Lemma 和熵函数的凸性(这是内半径趋于零的极限所必需的),将外半径的极限取为无穷大后,熵不等式就恢复了。然后,通过对欧拉坐标中的近似解进行细致的紧凑性论证,得到原始问题的全局弱解。
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引用次数: 0
An optimal ansatz space for moving least squares approximation on spheres 球面移动最小二乘法近似的最佳解析空间
IF 1.7 3区 数学 Q2 MATHEMATICS, APPLIED Pub Date : 2024-10-22 DOI: 10.1007/s10444-024-10201-z
Ralf Hielscher, Tim Pöschl

We revisit the moving least squares (MLS) approximation scheme on the sphere (mathbb S^{d-1} subset {mathbb R}^d), where (d>1). It is well known that using the spherical harmonics up to degree (L in {mathbb N}) as ansatz space yields for functions in (mathcal {C}^{L+1}(mathbb S^{d-1})) the approximation order (mathcal {O}left( h^{L+1} right) ), where h denotes the fill distance of the sampling nodes. In this paper, we show that the dimension of the ansatz space can be almost halved, by including only spherical harmonics of even or odd degrees up to L, while preserving the same order of approximation. Numerical experiments indicate that using the reduced ansatz space is essential to ensure the numerical stability of the MLS approximation scheme as (h rightarrow 0). Finally, we compare our approach with an MLS approximation scheme that uses polynomials on the tangent space of the sphere as ansatz space.

我们重温了球面 (mathbb S^{d-1} 子集 {mathbb R}^d)上的移动最小二乘(MLS)近似方案,其中 (d>1)。众所周知,使用度数为 (L in {mathbb N}) 的球面谐波作为解析空间,可以得到 (mathcal {C}^{L+1}(mathbb S^{d-1})) 中函数的近似阶数 (mathcal {O}left( h^{L+1} right) ),其中 h 表示采样节点的填充距离。在本文中,我们展示了在保持相同近似阶数的情况下,通过只包含偶数或奇数度数不超过 L 的球面谐波,可以将反演空间的维数几乎减半。数值实验表明,使用减小的解析空间对于确保 MLS 近似方案的数值稳定性至关重要。最后,我们将我们的方法与使用球面切线空间上的多项式作为安萨特空间的 MLS 近似方案进行了比较。
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引用次数: 0
Upper Bound for the Ground State Energy of a Dilute Bose Gas of Hard Spheres 硬球稀薄玻色气体基态能量的上限
IF 2.6 1区 数学 Q1 MATHEMATICS, APPLIED Pub Date : 2024-10-21 DOI: 10.1007/s00205-024-02049-w
Giulia Basti, Serena Cenatiempo, Alessandro Giuliani, Alessandro Olgiati, Giulio Pasqualetti, Benjamin Schlein

We consider a gas of bosons interacting through a hard-sphere potential with radius (mathfrak {a}) in the thermodynamic limit. We derive an upper bound for the ground state energy per particle at low density. Our bound captures the leading term (4pi rho mathfrak {a}) and shows that corrections are smaller than (C rho mathfrak {a} (rho {{mathfrak {a}}}^3)^{1/2}), for a sufficiently large constant (C > 0). In combination with a known lower bound, our result implies that the first sub-leading term to the ground state energy of a dilute gas of hard spheres is, in fact, of the order (rho mathfrak {a}(rho {{mathfrak {a}}}^3)^{1/2}), in agreement with the Lee–Huang–Yang prediction.

我们考虑了在热力学极限下通过半径为 ( ( (mathfrak {a})的硬球势相互作用的玻色子气体。我们推导出低密度时每个粒子基态能量的上限。我们的边界捕捉到了前导项(4/pirho mathfrak {a}),并表明对于足够大的常数(C >0),修正小于(C rho mathfrak {a} (rho {{mathfrak {a}}^3)^{1/2})。结合已知的下限,我们的结果意味着硬球稀释气体基态能量的第一个次导项实际上是 (rho mathfrak {a}(rho {{mathfrak {a}}^3)^{1/2}) 的量级,这与李-黄-杨的预测一致。
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引用次数: 0
Moduli of linear slices of high degree smooth hypersurfaces 高阶光滑超曲面线性切片的模量
IF 1.3 1区 数学 Q2 MATHEMATICS Pub Date : 2024-10-21 DOI: 10.2140/ant.2024.18.2133
Anand Patel, Eric Riedl, Dennis Tseng

We study the variation of linear sections of hypersurfaces in n. We completely classify all plane curves, necessarily singular, whose line sections do not vary maximally in moduli. In higher dimensions, we prove that the family of hyperplane sections of any smooth degree d hypersurface in n varies maximally for dn+ 3. In the process, we generalize the classical Grauert–Mülich theorem about lines in projective space, both to k-planes in projective space and to free rational curves on arbitrary varieties.

我们研究ℙn 中超曲面线段的变化。我们完整地分类了所有线段在模量上没有最大变化的平面曲线(必须是奇异曲线)。在更高维度上,我们证明了ℙn 中任何光滑度数为 d 的超曲面的超平面截面族在 d≥n+ 3 时变化最大。在此过程中,我们将关于投影空间中直线的经典格拉尔特-米利希定理推广到投影空间中的 k 平面和任意品种上的自由有理曲线。
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引用次数: 0
Discrete-time general fractional calculus
IF 3 2区 数学 Q1 MATHEMATICS Pub Date : 2024-10-21 DOI: 10.1007/s13540-024-00350-9
Alexandra V. Antoniouk, Anatoly N. Kochubei

In general fractional calculus (GFC), the counterpart of the fractional time derivative is a differential-convolution operator whose integral kernel satisfies some additional conditions, under which the Cauchy problem for the corresponding time-fractional equation is not only well-posed, but has properties similar to those of classical evolution equations of mathematical physics. In this work, we develop the GFC approach for the discrete-time fractional calculus. In particular, we define within GFC the appropriate resolvent families and use them to solve the discrete-time Cauchy problem with an appropriate analog of the Caputo fractional derivative.

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引用次数: 0
The well-posedness analysis in Besov-type spaces for multi-term time-fractional wave equations 多期时间分式波方程在贝索夫类型空间中的拟合分析
IF 3 2区 数学 Q1 MATHEMATICS Pub Date : 2024-10-21 DOI: 10.1007/s13540-024-00348-3
Yubin Liu, Li Peng

In this paper, we consider the initial value problems for multi-term time-fractional wave equations in the framework of Besov spaces, which can be described the Couette flow of viscoelastic fluid. Considering the initial data in Besov spaces, we obtain some results about the local well-posedness and the blow-up of mild solutions for the proposed problem. Further, we extend these results to Besov–Morrey spaces.

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引用次数: 0
Regular Polygonal Vortex Filament Evolution and Exponential Sums 正多边形涡旋纤丝演化与指数和
IF 1.2 4区 数学 Q2 MATHEMATICS, APPLIED Pub Date : 2024-10-21 DOI: 10.1007/s10440-024-00697-4
Fernando Chamizo, Francisco de la Hoz

When taking a regular planar polygon of (M) sides and length (2pi ) as the initial datum of the vortex filament equation, (mathbf{X}_{t}= mathbf{X}_{s}wedge mathbf{X}_{ss}), the solution becomes polygonal at times of the form (t_{pq} = (p/q)(2pi /M^{2})), with (gcd (p,q)=1), and the corresponding polygon has (Mq) sides, if (q) is odd, and (Mq/2) sides, if (q) is even. Moreover, that polygon is skew (except when (q = 1) or (q = 2), where the initial shape is recovered), and the angle (rho ) between two adjacent sides is a constant. In this paper, we give a rigorous proof of the conjecture that states that, at a time (t_{pq}), (cos ^{q}(rho /2) = cos (pi /M)), if (q) is odd, and (cos ^{q}(rho /2) = cos ^{2}(pi /M)), if (q) is even. Since the transition of one side of the polygon to the next one is given by a rotation in (mathbb{R}^{3}) determined by a generalized Gauss sum, the idea of the proof consists in showing that a certain product of those rotations is a rotation of angle (2pi /M), which is equivalent to proving that some exponential sums with arithmetic content are purely imaginary.

当把一个边长为 (M) 和长度为 (2pi ) 的规则平面多边形作为涡丝方程的初始基准时, (mathbf{X}_{t}= mathbf{X}_{s}wedge mathbf{X}_{ss})、t_{pq}=(p/q)(2/pi /M^{2}))时,解变成多边形,其中(gcd (p,q)=1),如果(q)是奇数,相应的多边形有(Mq)边;如果(q)是偶数,相应的多边形有(Mq/2)边。此外,该多边形是倾斜的(除非当(q = 1 )或(q = 2 )时,初始形状被恢复),并且相邻两边之间的夹角(rho )是一个常数。在本文中,我们给出了一个猜想的严格证明,这个猜想指出,在某个时间 (t_{pq}),如果 (q) 是奇数,则 (cos ^{q}(rho /2) = cos (pi /M));如果 (q) 是偶数,则 (cos ^{q}(rho /2) = cos ^{2}(pi /M))。由于多边形的一边到下一边的过渡是由(mathbb{R}^{3})中的旋转给出的,而这个旋转是由广义高斯和决定的,所以证明的思路在于证明这些旋转的某个乘积是角度(2pi /M)的旋转,这等同于证明某些有算术内容的指数和是纯虚的。
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引用次数: 0
Global Well-Posedness for the 2D Keller-Segel-Navier-Stokes System with Fractional Diffusion 具有分数扩散的二维凯勒-西格尔-纳维尔-斯托克斯系统的全局良好假设性
IF 1.2 4区 数学 Q2 MATHEMATICS, APPLIED Pub Date : 2024-10-21 DOI: 10.1007/s10440-024-00696-5
Chaoyong Wang, Qi Jia, Qian Zhang

In this paper, we consider Cauchy problem for the 2D incompressible Keller-Segel-Navier-Stokes equations with the fractional diffusion

$$begin{aligned} left { begin{aligned} &partial _{t}n+ucdot nabla n-Delta n=-nabla cdot (nnabla c)- n^{3}, &partial _{t}c+ucdot nabla c-Delta c=-c+n, &partial _{t}u+ucdot nabla u+wedge ^{2alpha }u+nabla P=-nnabla phi , end{aligned} right . end{aligned}$$

where (wedge :=(-Delta )^{frac{1}{2}}) and (alpha in [frac{1}{2},1]). We get the global well-posedness for the above system with the rough initial data by a new priori estimate of the solutions.

在本文中,我们考虑了二维不可压缩 Keller-Segel-Navier-Stokes 方程的 Cauchy 问题,该方程具有分数扩散 $$begin{aligned}partial _{t}n+ucdot nabla n-Delta n=-nabla cdot (nnabla c)- n^{3}, &;partial _{t}c+ucdot nabla c-Delta c=-c+n, (partial _{t}u+ucdot nabla u+wedge ^{2alpha }u+nabla P=-nnabla phi , (end{aligned})。right .end{aligned}$$ 其中 (wedge :=(-Delta )^{frac{1}{2}}) 和 (alpha in [frac{1}{2},1]).通过对解的先验估计,我们得到了上述系统在粗糙初始数据下的全局最优性。
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引用次数: 0
Separating G2-invariants of several octonions
IF 1.3 1区 数学 Q2 MATHEMATICS Pub Date : 2024-10-21 DOI: 10.2140/ant.2024.18.2157
Artem Lopatin, Alexandr N. Zubkov

We describe separating G2-invariants of several copies of the algebra of octonions over an algebraically closed field of characteristic two. We also obtain a minimal separating and a minimal generating set for G2-invariants of several copies of the algebra of octonions in case of a field of odd characteristic.

我们描述了特征为二的代数封闭域上的八元数代数的几份 G2 变式的分离式。我们还得到了在奇特征域情况下几份八元数代数的 G2 变式的最小分离集和最小生成集。
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引用次数: 0
Matrix Kloosterman sums
IF 1.3 1区 数学 Q2 MATHEMATICS Pub Date : 2024-10-21 DOI: 10.2140/ant.2024.18.2247
Márton Erdélyi, Árpád Tóth

We study a family of exponential sums that arises in the study of expanding horospheres on GL n. We prove an explicit version of general purity and find optimal bounds for these sums.

我们研究了在 GL n 上扩展角球研究中出现的指数和族。我们证明了一般纯度的显式版本,并找到了这些和的最优边界。
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引用次数: 0
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