Arkiv for Matematik

Papers
(The TQCC of Arkiv for Matematik is 1. The table below lists those papers that are above that threshold based on CrossRef citation counts [max. 250 papers]. The publications cover those that have been published in the past four years, i.e., from 2021-08-01 to 2025-08-01.)
ArticleCitations
On a remark by Ohsawa related to the Berndtsson–Lempert method for $L^2$-holomorphic extension12
On Segre-degenerate Levi-flat hypervarieties6
On the regularity of systems of dispersive partial differential equations6
Extension of the $2$-representation theory of finitary $2$-categories to locally (graded) finitary $2$-categories3
On the finiteness of certain factorization invariants3
Notes on $H^{\log}$: structural properties, dyadic variants, and bilinear $H^1$-$\operatorname{BMO}$ mappings3
Topology of singularities on algebraic loop spaces2
Decay of extremals of Morrey’s inequality2
On the existence of Auslander–Reiten $n$-exangles in $n$-exangulated categories2
On the arithmetic of monoids of ideals2
Multiple solutions for two classes of quasilinear problems defined on a nonreflexive Orlicz–Sobolev space2
Characters and spin characters of alternating and symmetric groups determined by values on $l^\prime$-classes1
Proper holomorphic embeddings of complements of large Cantor sets in $\mathbb{C}^2$1
Removability of product sets for Sobolev functions in the plane1
Faces of polyhedra associated with relation modules1
On nonnegatively graded Weierstrass points1
A complex-analytic approach to streamline properties of deep-water Stokes waves1
Fluctuations in depth and associated primes of powers of ideals1
Stable functors and cohomology theory in abelian categories1
Quantum Euler class and virtual Tevelev degrees of Fano complete intersections1
Estimates of $p$-harmonic functions in planar sectors1
A geometric model for blocks of Frobenius kernels1
A formula to evaluate type-A webs and link polynomials1
Embedded eigenvalues for asymptotically periodic ODE systems1
Dimension compression and expansion under homeomorphisms with exponentially integrable distortion1
A quantitative Gauss–Lucas theorem1
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