Hit papers significantly outperform the citation benchmark for their cohort. A paper qualifies
if it has ≥500 total citations, achieves ≥1.5× the top-1% citation threshold for papers in the
same subfield and year (this is the minimum needed to enter the top 1%, not the average
within it), or reaches the top citation threshold in at least one of its specific research
topics.
Polyharmonic Boundary Value Problems
2010315 citationsFilippo Gazzola, Hans-Christoph Grunau et al.profile →
Peers — A (Enhanced Table)
Peers by citation overlap · career bar shows stage (early→late)
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Countries citing papers authored by Filippo Gazzola
Since
Specialization
Citations
This map shows the geographic impact of Filippo Gazzola's research. It shows the number of citations coming from papers published by authors working in each country. You can also color the map by specialization and compare the number of citations received by Filippo Gazzola with the expected number of citations based on a country's size and research output (numbers larger than one mean the country cites Filippo Gazzola more than expected).
This network shows the impact of papers produced by Filippo Gazzola. Nodes represent research fields, and links connect fields that are likely to share authors. Colored nodes show fields that tend to cite the papers produced by Filippo Gazzola. The network helps show where Filippo Gazzola may publish in the future.
Co-authorship network of co-authors of Filippo Gazzola
This figure shows the co-authorship network connecting the top 25 collaborators of Filippo Gazzola.
A scholar is included among the top collaborators of Filippo Gazzola based on the total number of
citations received by their joint publications. Widths of edges
represent the number of papers authors have co-authored together.
Node borders
signify the number of papers an author published with Filippo Gazzola. Filippo Gazzola is excluded from
the visualization to improve readability, since they are connected to all nodes in the network.
Ferrero, Alberto, Filippo Gazzola, & Hans-Christoph Grunau. (2008). Decay and eventual local positivity for biharmonic parabolic equations. Discrete and Continuous Dynamical Systems - S. 21(4). 1129–1157.24 indexed citations
10.
Gazzola, Filippo. (2006). No geometric approach for general overdetermined elliptic problems with nonconstant source. Le Matematiche. 60(2). 259–268.4 indexed citations
Gazzola, Filippo, et al.. (2005). SOME REMARKS ON BIHARMONIC ELLIPTIC PROBLEMS WITH POSITIVE, INCREASING AND CONVEX NONLINEARITIES. SHILAP Revista de lepidopterología.121 indexed citations
13.
Gazzola, Filippo, et al.. (2005). Regularity and nonexistence results for anisotropic quasilinear elliptic equations in convex domains. Discrete and Continuous Dynamical Systems. 280–286.21 indexed citations
Gazzola, Filippo & Andrea Malchiodi. (2002). Some remarks on the equation $-Delta u=lambda(1+u)^p$ for varying $lambda$, $p$ and varying domains. Communications in Partial Differential Equations.1 indexed citations
Gazzola, Filippo, et al.. (2000). Existence results for general critical growth semilinear elliptic equations. Virtual Community of Pathological Anatomy (University of Castilla La Mancha).12 indexed citations
19.
Gazzola, Filippo & Vicenţiu D. Rădulescu. (2000). A NONSMOOTH CRITICAL POINT THEORY APPROACH TO SOME NONLINEAR ELLIPTIC EQUATIONS IN R n. Differential and Integral Equations. 13. 47–60.42 indexed citations
Rankless uses publication and citation data sourced from OpenAlex, an open and comprehensive
bibliographic database. While OpenAlex provides broad and valuable coverage of the global
research landscape, it—like all bibliographic datasets—has inherent limitations. These include
incomplete records, variations in author disambiguation, differences in journal indexing, and
delays in data updates. As a result, some metrics and network relationships displayed in
Rankless may not fully capture the entirety of a scholar's output or impact.