Almost perfect sequences based on cyclic difference sets

The perfect sequences are so ideal that all out-of-phase autocorrelation coefficients are zero, and if the sequences are used as the coding modulating signal for the phase-modulated radar, there will be no interference of side lobes theoretically. However, it has been proved that there are no binary perfect sequences of period 4 〈 n ≤ 12100. Hence, the almost perfect sequences with all out-of-phase autocorrelation coefficients as zero except one are of great practice in engineering. Currently, the cyclic difference set is one of most effective tools to analyze the binary sequences with perfect periodic autocorrelation function. In this article, two characteristic formulas corresponding to the autocorrelation and symmetric structure of almost perfect sequences are calculated respectively. All almost perfect sequences with period n, which is a multiple of 4, can be figured out by the two formulas. Several almost perfect sequences with different periods have been hunted by the program based on the two formulas and then applied to the simulation program and practical application for ionospheric sounding.

A Solution of a Problem of I. P. Natanson Concerning the Decomposition of an Interval into Disjoint Perfect Sets

In a previous paper published in this journal, it was demonstrated that any bounded, closed interval of the real line can, except for a set of Lebesgue measure 0, be expressed as a union of c pairwise disjoint perfect sets, where c is the cardinality of the continuum. It turns out that the methodology presented there cannot be used to show that such an interval is actually decomposable into c nonoverlapping perfect sets without the exception of a set of Lebesgue measure 0. We shall show, utilizing a Hilbert-type space-filling curve, that such a decomposition is possible. Furthermore, we prove that, in fact, any interval, bounded or not, can be so expressed.

THE LOWER DENSITIES OF SYMMETRIC PERFECT SETS

In this paper, we give the exact lower density of Hausdorff measure of a class of symmetric perfect sets.

基于ResUNet和Dense CRF模型的地震裂缝识别方法

针对人工解释地震资料耗时长、效率低、受主观因素影响较大的不足,提出了一种基于ResUNet和全连接条件随机场(dense conditional random field, Dense CRF)模型的裂缝识别方法。该方法首先使用ResUNet模型提取地震振幅数据体中裂缝的不同分辨率的特征,实现地震裂缝识别;然后利用Dense CRF模型进一步优化识别结果,从而实现地震裂缝的精准识别。将该方法与传统UNet、ResUNet模型在合成地震振幅数据体和F3工区地震数据体进行了实验比较,结果表明运用所提方法识别的裂缝更准确、裂缝尺寸更细、连续性更好。

Constructions for almost perfect binary sequence pairs with even length

The concept of the binary sequence pair is generalized from a single binary sequence. Binary sequence pairs are applied in many fields of radar, sonar or communication systems, in which signals with optimal periodic correlation are required. Several types of almost perfect binary sequence pairs of length T = 2q are constructed, where q is an odd number. These almost perfect binary sequence pairs are based on binary ideal sequence or binary ideal two-level correlation sequence pairs by using Chinese remainder theorem. For these almost perfect binary sequence pairs with good balanced property, their corresponding divisible difference set pairs(DDSPs) are also derived.

On the Decomposition of a Bounded Closed Interval of the Real Line into Closed Sets

It has been shown by Sierpinski that a compact, Hausdorff, connected topological space (otherwise known as a continuum) cannot be decomposed into either a finite number of two or more disjoint, nonempty, closed sets or a countably infinite family of such sets. In particular, for a closed interval of the real line endowed with the usual topology, we see that we cannot partition it into a countably infinite number of disjoint, nonempty closed sets. On the positive side, however, one can certainly express such an interval as a union of c disjoint closed sets, where c is the cardinality of the real line. For example, a closed interval is surely the union of its points, each set consisting of a single point being closed. Surprisingly enough, except for a set of Lebesgue measure 0, these closed sets can be chosen to be perfect sets, i.e., closed sets every point of which is an accumulation point. They even turn out to be nowhere dense (containing no intervals). Such nowhere dense, perfect sets are sometimes called Cantor sets.

GPR图像的数据集构建及其DRDU-Net去噪算法

为了解决生成对抗网络(Generative Adversarial Network,GAN)在生成探地雷达(Ground Penetrating Radar,GPR)图像时存在训练不稳定的问题,提出利用带有梯度惩罚的Wasserstein距离生成对抗网络(WGAN-GP)生成GPR图像,并结合时域有限差分法和实地采集图像提出了一种构建GPR图像数据集的方法.相较于原始GAN与Wasserstein GAN等方法,WGAN-GP具有更好的稳定性,而且生成的GPR图像更接近真实图像.在此基础之上,将密集残差块和U-Net相结合提出了一种适合于GPR图像的密集残差去噪U-Net方法.该方法利用U-Net中编码-解码结构提高了GPR图像的去噪性能;同时,密集残差块的引入加强了GPR图像的特征复用,且使U-Net训练更加稳定.最后,利用仿真实验验证了所提去噪方法的性能,并与三维块匹配(BM3D)和U-Net方法进行了对比.结果表明:所提方法与BM3D以及U-Net去噪方法相比,具有更好的去噪效果.当σ等于20时,在模拟和实测数据上取平均值,其峰值信噪比分别提升了约6.5 dB和2.4 dB;结构相似性分别提升了约0.09和0.04.

公共不动点集的通有稳定性

本文研究了Hausdorff拓扑向量空间紧凸集上的集值映射族公共不动点集的通有稳定性,利用Fort定理,得到了在Baire分类意义下,存在一个稠密剩余子集使得公共不动点问题是本质的,从而是稳定的.

基于OBE理念的高校经济管理类实验室运营的影响因素分析

经济管理类实验室是培养学生实践能力的重要平台,其建设和运营效果直接影响着经济管理类人才的培养质量。基于OBE理念深入分析高校经济管理类实验室运营效果的影响因素。结果显示,设备完善程度、课程设置及学生参与度是影响实验室运营效果的重要因素,这些因素的优化能够显著提升实验室的运营效果,并为学生提供更加优质的学习体验。尽管师资力量并未显示出显著影响,但不能忽视其在实验室运营中的重要作用。基于此,应持续投入实验设备,优化课程设计,激发学生参与热情,以优化高校经济管理类实验室的运营。

基于有限Zak变换的零相关区序列集构造

针对Brodzik在2011年和2013年文中的完备序列和零相关区序列构造中参数的限制问题,分别提出完备序列和零相关区序列的新构造方法。首先,基于有限Zak变换,提出没有“参数为奇素数”限制的完备序列构造结构,并且用同余理论论证。其次,提出一种具有稀疏性、结构化特点的L×KL的零相关区序列集的Zak空间结构,从而得到零相关区序列集,用有限Zak变换和同余理论论证。相比Brodzik 2013年文中的零相关区序列集,新构造的零相关区序列集的零相关区的长度更长,序列的数量更多。

花期叶面喷施B和Ca对油橄榄完全花比率和坐果率的影响

【目的】在油橄榄花期叶面喷施硼和钙肥,研究叶面喷施硼、钙及硼-钙交互作用对油橄榄完全花和坐果率的影响。【方法】选甘肃陇南主栽的3个油橄榄品种(‘莱星’‘鄂植8’‘城固32’),采用完全正交试验,在花期前、中、后分别喷施不同浓度硼和钙的叶面肥,调查完全花比率和坐果率,并观察了硼和钙对花粉萌发的影响。【结果】花期叶面喷施硼和钙对各品种油橄榄完全花及坐果率的交互影响均不显著。但‘鄂植8’和‘城固32’在0.10%的硼酸因素下,完全花比率较对照分别提高了8.9%和11.5%;‘城固32’在0.05%的硼浓度下的坐果率较对照提高了154.2%;‘鄂植8’和‘城固32’在0.00%、0.25%的钙浓度处理下,其坐果率均显著高于更高浓度的处理,高浓度的钙反而对果实坐果率有显著抑制作用;‘莱星’的处理间差异均不显著。培养基50~75 mg·L^(-1)的硼酸对油橄榄花粉萌发促进作用最好,而培养基添加钙则抑制花粉萌发,且硼和钙存在一定的拮抗作用,因此高浓度的钙不利于油橄榄花受精和果实坐果。【结论】油橄榄不同品种对花期喷施硼和钙的响应程度不同,适量的硼(0.5%~1.0%)对油橄榄开花坐果有促进作用,而高浓度硼(大于1.00%)和高浓度钙(大于0.25%)均不利于油橄榄开花坐果,在油橄榄花期的叶面施肥中应谨慎使用外源高浓度钙。

连续Domain的特征与浓度

引入了连续Domain的局部基和稠密子集的概念 ,在此基础上定义了连续Domain的特征及浓度 .给出了局部基的刻画 ,并讨论了连续Domain的特征、浓度与连续Domain带上Scott拓扑或Lawson拓扑时的拓扑空间的特征、浓度之间的关系 .证明了连续Domain的特征、浓度分别与它带上Scott拓扑时的拓扑空间的特征、浓度相等 ,它们分别小于连续Domain带上Lawson拓扑时的拓扑空间的特征、浓度 .

不同授粉品种对香白杏坐果的影响

以北京"龙泉雾"香白杏为试材,研究不同结果枝的花发育状况及采用不同杏品种人工授粉对香白杏坐果率等方面的影响。结果表明:香白杏花束状果枝和短果枝上完全花比例和花粉发芽率较高,花发育质量较好,推测其坐果较好。香白杏自花授粉坐果率较低,仅为2.5%,采用其它品种为其授粉可明显提高坐果率,利用"金太阳"、"葫芦杏"为其人工授粉,香白杏坐果率更可高达12.8%和12.3%,因此推荐其在实际生产中作为"龙泉雾"香白杏的授粉树。

基于不完备集双聚类的缺失数据填补算法

缺失数据填补是数据清洗领域的一个重要问题。由于绝大部分局部填补方法基于全部属性进行分类,未考虑对象属性之间的关联性,因此基于不完备集双聚类,提出一种缺失数据填补算法。该算法利用双聚类完美簇的平均平方残基为0及簇内的属性值波动一致的特点,对缺失数据进行填补。通过数学分析,把寻找含有缺失值的最大完美簇问题转化为求解缺失对象与其他对象之间的最大相似属性集问题,在相同的最大相似属性集下,以缺失值的众数作为填补值。采用4组UCI数据集进行实验,结果表明,该算法相比ROUSTIDA算法平均提高了77.13%的填补值精确度。

广义相对差集偶与二元序列偶的研究

提出了一类新的区组设计——广义相对差集偶的概念,研究了广义相对差集偶的性质,给出了广义相对差集偶对应的二元序列偶的自相关函数,该函数具有脉冲函数的性质,在实际应用中可扩大最佳信号的可选范围,同时也为应用广义相对差集偶这种区组设计的方法研究最佳二元序列偶提供了理论依据。

一类零相关区序列集构造方法的改进

最近Matsufuji和Torii等人分别提出了由酉矩阵和完备序列构造零相关区序列集的方法.本文不仅推广了Matsufuji等人的结论,而且推广了Torii等人的部分结论,扩大了基于酉矩阵和完备序列构造零相关区序列集的方法的适用范围,得到了一些新的零相关区序列集.

Z-连续偏序集的特征与稠密度

该文引入了Z-连续偏序集的局部基和稠密子集的概念,基于此定义了Z-连续偏序集的特征和稠密度;给出了局部基的刻画,并讨论了Z-连续偏序集的特征和稠密度与Z-连续偏序集上Z-Scott拓扑和Z-Lawson拓扑的特征、稠密度之间的关系;证明了Z-连续偏序集上Z-Scott拓扑的特征小于或等于Z-连续偏序集及其Z-Lawson拓扑的特征,Z-连续偏序集的稠密度与其Z-Scott拓扑的稠密度相等,且小于或等于Z-Lawson拓扑的稠密度.

中国武术美学精神论略

在哲学、美学、文化学的指导下,对中国武术美学精神进行阐释。中国武术美学精神体现为:言"天人合一"的大美关怀之"志";寓"至善至美"的完美道德之"理";达"形神兼备"的审美修炼之"神";造"情景交融"的美学意象之"境";统"知情意行"的美育教化于"一"。指出:中国武术发展至今,正是美学精神的作用使然,美学精神是中国武术文化的核心价值。

由完备序列构造零相关区序列集的方法

提出了一种由一个完备序列的移位序列集和酉矩阵构造零相关区序列集的方法.该方法主要通过适当地选择完备序列的移位序列做成的正交序列集,结合相应阶数的酉矩阵进行序列扩展,从而得到几乎最优和最优的2类零相关区序列集.