Advances in Difference Equations 期刊简介
The theory of difference equations, the methods used, and their wide applications have advanced beyond their adolescent stage to occupy a central position in applicable analysis. In fact, in the last 15 years, the proliferation of the subject has been witnessed by hundreds of research articles, several monographs, many international conferences, and numerous special sessions.
The theory of differential and difference equations forms two extreme representations of real world problems. For example, a simple population model when represented as a differential equation shows the good behavior of solutions whereas the corresponding discrete analogue shows the chaotic behavior. The actual behavior of the population is somewhere in between.
The aim of Advances in Difference Equations is to report mainly the new developments in the field of difference equations, and their applications in all fields. We will also consider research articles emphasizing the qualitative behavior of solutions of ordinary, partial, delay, fractional, abstract, stochastic, fuzzy, and set-valued differential equations.
Advances in Difference Equations will accept high-quality articles containing original research results and survey articles of exceptional merit.
差分方程理论,所使用的方法及其广泛的应用已经超越了青少年阶段,在适用分析中占据了中心地位。事实上,在过去的15年里,数百篇研究文章、几本专著、许多国际会议和许多特别会议见证了这一主题的普及。
微分方程理论和差分方程形成了现实世界问题的两个极端表示。例如,简单的种群模型表示为微分方程时显示出解的良好行为,而相应的离散模拟则显示出混沌行为。人口的实际行为介于两者之间。
差分方程进展的目的主要是报告差分方程领域的新发展及其在所有领域中的应用。我们还将考虑研究文章,强调普通,部分,延迟,分数,抽象,随机,模糊,和集值微分方程。
差分方程的进展将接受包含原始研究结果和具有特殊价值的调查文章的高质量文章。
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期刊ISSN
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1687-1847 |
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影响指数
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2.775 |
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最新CiteScore值
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4.20 查看CiteScore评价数据 |
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最新自引率
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20.60% |
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官方指定润色网址
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https://www.deeredit.com/?type=ss1 |
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投稿语言要求
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Improve the quality of the paper, eliminate grammar and spelling errors, increase readability, ensure accurate communication of viewpoints, enhance academic reputation, and increase the chances of the paper being accepted. 建议点击这个网址:https://www.deeredit.com/?type=ss2,资深审稿专家为您评估稿件质量,提供针对性改进建议,最终可助您极大提升目标期刊录用率 |
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期刊官方网址
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https://www.peipusci.com/?type=9 |
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杂志社征稿网址
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https://www.peipusci.com/?type=10 |
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通讯地址
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ONE NEW YORK PLAZA, SUITE 4600 , NEW YORK, United States, NY, 10004 |
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偏重的研究方向(学科)
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MATHEMATICS, APPLIED-MATHEMATICS |
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出版周期
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出版年份
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2004 |
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出版国家/地区
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UNITED STATES |
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是否OA
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Yes |
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SCI期刊coverage
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Science Citation Index Expanded(科学引文索引扩展) |
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NCBI查询
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PubMed Central (PMC)链接 全文检索(pubmed central) |
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最新中科院JCR分区
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大类(学科)
小类(学科)
综述期刊
数学
MATHEMATICS(数学)2区
MATHEMATICS, APPLIED(应用数学)2区
否
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最新的影响因子
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2.775 | |||||
| 最新公布的期刊年发文量 |
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| 总被引频次 | 32 | |||||
| 影响因子趋势图 |
近年的影响因子趋势图(整体平稳趋势)
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2022年预警名单预测最新
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最新CiteScore值
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4.20
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| 年文章数 | 685 | ||||||||||||||||||
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SJR
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0.670 | ||||||||||||||||||
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SNIP
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1.130 | ||||||||||||||||||
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CiteScore排名
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CiteScore趋势图
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本刊同领域相关期刊
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| 期刊名称 | IF值 |
| JOURNAL OF COMPLEXITY | 1.383 |
| THEORY OF COMPUTING SYSTEMS | 0.576 |
| JOURNAL OF GEOMETRY AND PHYSICS | 1.237 |
| CALCOLO | 2.135 |
| Filomat | 0.836 |
| ASTERISQUE | 1.503 |
| POSITIVITY | 1.02 |
| MATHEMATIKA | 0.836 |
| COMBINATORICA | 1.054 |
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本刊同分区等级的相关期刊
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| 期刊名称 | IF值 |
| CALCOLO | 2.135 |
| Analysis & PDE | 2.55 |
| ACTA MATHEMATICA | 4.23 |
| ADVANCES IN MATHEMATICS | 1.671 |
| Boundary Value Problems | 2.054 |
| DUKE MATHEMATICAL JOURNAL | 2.379 |
| RUSSIAN MATHEMATICAL SURVEYS | 1.89 |
| JOURNAL OF FUNCTIONAL ANALYSIS | 1.731 |
| AMERICAN JOURNAL OF MATHEMATICS | 2.178 |
| 分享者 | 点评内容 |
