Advances in Mathematical Physics is a premier open-access journal published by HINDAWI LTD, dedicated to the dissemination of research in the fields of applied mathematics and physics. With its ISSN 1687-9120 and E-ISSN 1687-9139, this journal has been a vital platform for innovative studies since its inception in 2009, fostering a collaborative environment for researchers and professionals alike. The journal features a wide range of topics, including but not limited to mathematical models, computational physics, and interdisciplinary applications, thus attracting a diverse readership. Ranked in the Q3 quartile for both Applied Mathematics and Physics and Astronomy, it serves as a significant resource for academics looking to explore cutting-edge developments and theoretical advancements. With an emphasis on open accessibility, Advances in Mathematical Physics ensures that research findings are readily available to the global academic community, leveling the playing field for emerging scholars and seasoned researchers. By consistently showcasing high-quality manuscripts, the journal contributes substantially to the fields of mathematics and physics, encouraging scholarly dialogue and advancing knowledge across a myriad of applications.

Advances in Differential Equations is a premier journal that serves as a vital resource for researchers, professionals, and students in the fields of mathematics, particularly focusing on the theory and application of differential equations. Published by KHAYYAM PUBL CO INC, this journal has established itself as a key player in the academic landscape since its inception in 1996, with continuous contributions that bridge theoretical math and practical applications. With an impressive impact factor reflected in its category quartiles—ranking Q1 in Analysis and Q2 in Applied Mathematics for 2023—this journal is recognized for the quality and rigor of its published works. The journal's scope encompasses a wide array of topics, encouraging authors to submit innovative research that can advance the understanding of differential equations in various contexts. Although it does not operate as an Open Access journal, the subscription model ensures that readers receive high-quality, peer-reviewed research that contributes significantly to ongoing developments in mathematics. Based in the United States, Advances in Differential Equations continues to publish articles until 2024 and remains a crucial outlet for interdisciplinary collaboration and discourse in the mathematical sciences.

SIAM Journal on Applied Dynamical Systems, published by SIAM Publications, stands as a premier platform for disseminating vital research in the fields of applied dynamical systems, analysis, and modeling and simulation. With a commendable impact factor reflecting its scholarly influence, this journal ranks in the Q1 category for both analysis and modeling/simulation in 2023, positioning it among the top resources in these disciplines. Enthusiastic researchers, professionals, and students will benefit from its rigorous peer-reviewed content that spans innovative methodologies and applications in various scientific domains. Since its inception in 2002 and continuing through 2024, the journal aims to bridge theoretical insights with practical challenges, facilitating advancements that drive progress in dynamical systems research. Contributors and readers alike can expect to engage with high-quality articles that foster meaningful dialogue, making this journal an indispensable resource for the academic community.

Qualitative Theory of Dynamical Systems, published by SPRINGER BASEL AG, is a prestigious academic journal that serves as a central platform for the dissemination of research in the realms of applied mathematics and discrete mathematics. With an ISSN of 1575-5460 and an E-ISSN of 1662-3592, this journal has established itself with a strong impact, ranking in the Q2 category for both applied mathematics and discrete mathematics and combinatorics as of 2023. Having converged over critical years—from 1999 to 2005 and from 2008 to 2025—it aims to publish high-quality, peer-reviewed articles that contribute to the understanding of dynamical systems through qualitative methods. With a Scopus rank placing it in the top twenty of discrete mathematics and combinatorics as well as a respectable position in applied mathematics, the journal is considered essential for researchers, professionals, and students looking to stay abreast of the latest theoretical and practical advancements in these vibrant fields. While the journal currently does not offer open access options, its commitment to rigorous scientific inquiry and innovation ensures its lasting significance in mathematical literature.

Applied Mathematics Letters is a prestigious journal dedicated to the dissemination of significant research in the field of applied mathematics. Published by PERGAMON-ELSEVIER SCIENCE LTD in the United Kingdom, this journal serves as a vital resource for researchers, professionals, and students alike, aiming to bridge theoretical findings and practical applications. With an impressive impact factor placing it in the Q1 category and ranked 33 out of 635 in the Applied Mathematics category by Scopus, it showcases influential articles that contribute to advancements across various applications of mathematics. The journal's coverage from 1988 to 2025 ensures a rich archive of research that remains relevant and insightful for contemporary studies. Currently, it operates under a subscription-based model, providing access to cutting-edge research that forms the backbone of mathematical application in science and engineering. To become part of this dynamic community of scholars, readers are encouraged to explore the latest findings and ongoing discussions that highlight the interplay between mathematics and its real-world impacts.

The Electronic Journal of Qualitative Theory of Differential Equations, published by the esteemed UNIV SZEGED's BOLYAI INSTITUTE in Hungary, is a prominent platform in the realm of applied mathematics, recognized for its rich contributions to the field since its inception in 1998. With an ISSN of 1417-3875 and open access format, the journal ensures that cutting-edge research is accessible to a global audience, fostering collaboration and knowledge exchange among researchers, professionals, and students alike. It holds a commendable Q2 ranking in Applied Mathematics, reflecting its commitment to high-quality scholarship, and maintains a respectable Scopus rank, positioned at #432 out of 635. Covering a wide spectrum of qualitative theories related to differential equations, the journal guides its readers through the complexities of mathematical theories and applications, making it an essential resource for anyone looking to deepen their understanding in this vital area of study. The journal's focus on innovative and interdisciplinary approaches ensures that it remains at the forefront of mathematical research, ultimately contributing to advancements in the field.

ZEITSCHRIFT FUR ANALYSIS UND IHRE ANWENDUNGEN, published by the European Mathematical Society, stands as a vital resource in the fields of analysis and applied mathematics. With an ISSN of 0232-2064 and E-ISSN 1661-4534, this esteemed journal has been disseminating high-quality research since its inception in 1996, converging its efforts through 2024. Recognized within Q2 quartiles of both analysis and applied mathematics categories, it ranks #98 out of 193 in Mathematics _ Analysis and #379 out of 635 in Mathematics _ Applied Mathematics according to Scopus, affirming its significant impact within the academic community. Although not open access, the journal provides a platform for rigorous peer-reviewed articles that foster the interplay between theoretical insights and practical applications, catering to the needs of researchers, professionals, and students alike. With its editorial board comprised of leading experts, ZEITSCHRIFT FUR ANALYSIS UND IHRE ANWENDUNGEN continues to advance mathematical knowledge, making it an essential journal for those aiming to stay at the forefront of analysis and its applications.

COMMUNICATIONS ON PURE AND APPLIED ANALYSIS, published by the American Institute of Mathematical Sciences (AIMS), is a pivotal journal that serves the fields of pure and applied mathematics. With an ISSN of 1534-0392 and an E-ISSN of 1553-5258, this journal showcases rigorous research findings that span a myriad of topics within mathematical analysis and its applications. Given its impressive Q2 ranking in both Analysis and Applied Mathematics categories, it is recognized for its significant contributions, ranking 92nd out of 193 in Analysis and 369th out of 635 in Applied Mathematics according to Scopus. The journal, running continuously from 2004 to 2024, invites submissions that push the boundaries of mathematical thought and practice. While it operates under a traditional access model, the journal's comprehensive scope and burgeoning impact factor underscore its importance for researchers, professionals, and students who seek to engage deeply with current mathematical advancements.

Proceedings of the Institute of Mathematics and Mechanics is a pivotal journal in the field of mathematics, dedicated to the advancement and dissemination of cutting-edge research in various sub-disciplines. Published by INST MATHEMATICS & MECHANICS, NATL ACAD SCIENCES AZERBAIJAN, this journal plays a significant role in bridging local and international research communities. With an ISSN of 2409-4986 and E-ISSN of 2409-4994, it has gained recognition, attaining a Q3 ranking in the Miscellaneous Mathematics category and placing in the 67th percentile on Scopus. Run from 2017 to 2024, the journal serves as an accessible platform for scholars and practitioners, inviting contributions that advance theoretical knowledge and practical applications in mathematics. With an emphasis on quality and innovation, the Proceedings of the Institute of Mathematics and Mechanics stands out as a vital resource for those looking to stay at the forefront of mathematical research and its multifaceted applications in various fields.

Dynamics of Partial Differential Equations is a prestigious peer-reviewed journal published by INT PRESS BOSTON, INC in the United States, specializing in the intricate and innovative field of partial differential equations (PDEs). With an ISSN of 1548-159X, this journal has become an invaluable resource for researchers, professionals, and students alike since its inception in 2007. The journal is recognized for its rigorous scholarship, as indicated by its 2023 category quartiles, achieving Q1 status in Analysis and Q2 in Applied Mathematics. The Scopus rankings further affirm its relevance, placing it within the top half of its field. While the journal operates under a subscription model, it remains a vital platform for disseminating cutting-edge research that addresses both theoretical and applied aspects of differential equations, contributing significantly to advancements in mathematics and related disciplines. It serves as a meeting ground for researchers dedicated to exploring the dynamic and evolving nature of PDEs, fostering collaboration and innovation within the academic community.