Periodica Mathematica Hungarica

Top Research Topics at Periodica Mathematica Hungarica?

The journal generally zeroes in on subjects such as Combinatorics, Discrete mathematics, Pure mathematics, Mathematical analysis and Algebra. The work on Combinatorics tackled in Periodica Mathematica Hungarica brings together disciplines like Upper and lower bounds, Regular polygon and Sequence.

• Combinatorics (39.77%)
• Discrete mathematics (30.70%)
• Pure mathematics (21.31%)

What are the most cited papers published in the journal?

• Convex set functions ind-space (381 citations)
• On the eigenvalues of trees (193 citations)
• UCB revisited: Improved regret bounds for the stochastic multi-armed bandit problem (191 citations)

Research areas of the most cited articles at Periodica Mathematica Hungarica:

The published papers explore disciplines such as Combinatorics, Discrete mathematics, Mathematical analysis, Algebra and Pure mathematics. The most cited papers hold forums on Combinatorics that merge themes from other disciplines such as Upper and lower bounds and Bounded function. The journal publications facilitate discussions on Discrete mathematics that incorporate concepts from other fields like Multiplicative function, Sequence, Point (geometry) and Pseudorandom binary sequence.

What topics the last edition of the journal is best known for?

• Mathematical analysis
• Combinatorics
• Algebra

The previous edition focused in particular on these issues:

The journal covers a variety of subjects, including Combinatorics, Pure mathematics, Integer, Function (mathematics) and Diophantine equation. The work tackled in it goes beyond the discipline of Combinatorics as it also encompasses Polynomial. Periodica Mathematica Hungarica facilitates discussions on Pure mathematics that incorporate concepts from other fields like Matrix (mathematics), Closure (topology) and Group (mathematics).

The study on Integer presented in the journal intersects with subjects under the field of Sequence. Topics in Diophantine equation were tackled in line with various other fields like Term (logic) and Exponential function. The studies on Invariant (mathematics) discussed can also contribute to research in the domains of Zero (complex analysis), Multiplicity (mathematics), Abelian group and Type (model theory).

The most cited articles from the last journal are:

• On a sum involving the Mangoldt function (6 citations)
• Two q-congruences from Carlitz’s formula (6 citations)
• On a sum involving the divisor function (5 citations)

Papers citation over time

A key indicator for each journal is its effectiveness in reaching other researchers with the papers published at that venue.

The chart below presents the interquartile range (first quartile 25%, median 50% and third quartile 75%) of the number of citations of articles over time.

Top authors and change over time

The top authors publishing in Periodica Mathematica Hungarica (based on the number of publications) are:

• Florian Luca (14 papers) absent at the last edition,
• A. G. Naoum (13 papers) absent at the last edition,
• András Sárközy (12 papers) absent at the last edition,
• Josip Pečarić (11 papers) absent at the last edition,
• Károly Bezdek (11 papers) absent at the last edition.

The overall trend for top authors publishing in this journal is outlined below. The chart shows the number of publications at each edition of the journal for top authors.

Top affiliations and change over time

Only papers with recognized affiliations are considered

The top affiliations publishing in Periodica Mathematica Hungarica (based on the number of publications) are:

• Eötvös Loránd University (127 papers) absent at the last edition,
• Hungarian Academy of Sciences (52 papers) absent at the last edition,
• University of Debrecen (38 papers) absent at the last edition,
• University of Szeged (24 papers) published 1 paper at the last edition,
• University of Zagreb (20 papers) published 3 papers at the last edition.

The overall trend for top affiliations publishing in this journal is outlined below. The chart shows the number of publications at each edition of the journal for top affiliations.

Publication chance based on affiliation

The publication chance index shows the ratio of articles published by the best research institutions in the journal edition to all articles published within that journal. The best research institutions were selected based on the largest number of articles published during all editions of the journal.

The chart below presents the percentage ratio of articles from top institutions (based on their ranking of total papers).Top affiliations were grouped by their rank into the following tiers: top 1-10, top 11-20, top 21-50, and top 51+. Only articles with a recognized affiliation are considered.

During the most recent 2021 edition, 13.95% of publications had an unrecognized affiliation. Out of the publications with recognized affiliations, 9.46% were posted by at least one author from the top 10 institutions publishing in the journal. Another 1.35% included authors affiliated with research institutions from the top 11-20 affiliations. Institutions from the 21-50 range included 10.81% of all publications and 78.38% were from other institutions.

Returning Authors Index

A very common phenomenon observed among researchers publishing scientific articles is the intentional selection of journals they have already attended in the past. In particular, it is worth analyzing the case when the authors participate in the same journal from year to year.

The Returning Authors Index presented below illustrates the ratio of authors who participated in both a given as well as the previous edition of the journal in relation to all participants in a given year.

Returning Institution Index

The graph below shows the Returning Institution Index, illustrating the ratio of institutions that participated in both a given and the previous edition of the conference in relation to all affiliations present in a given year.

The experience to innovation index

Our experience to innovation index was created to show a cross-section of the experience level of authors publishing in a journal. The index includes the authors publishing at the last edition of a journal, grouped by total number of publications throughout their academic career (P) and the total number of citations of these publications ever received (C).

The group intervals were selected empirically to best show the diversity of the authors' experiences, their labels were selected as a convenience, not as judgment. The authors were divided into the following groups:

• Novice - P < 5 or C < 25 (the number of publications less than 5 or the number of citations less than 25),
• Competent - P < 10 or C < 100 (the number of publications less than 10 or the number of citations less than 100),
• Experienced - P < 25 or C < 625 (the number of publications less than 25 or the number of citations less than 625),
• Master - P < 50 or C < 2500 (the number of publications less than 50 or the number of citations less than 2500),
• Star - P ≥ 50 and C ≥ 2500 (both the number of publications greater than 50 and the number of citations greater than 2500).

The chart below illustrates experience levels of first authors in cases of publications with multiple authors.