Glasnik Matematicki

Papers
(The TQCC of Glasnik Matematicki 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 2021-05-01 to 2025-05-01.)
ArticleCitations
6
On uniform instability in mean of stochastic skew-evolution semiflows5
5
5
Generic irreducibility of parabolic induction for real reductive groups4
Limit theorems for numbers satisfying a class of triangular arrays4
Some arithmetic functions of factorials in Lucas sequences4
On symmetric \(2\)-\((70,24,8)\) designs with an automorphism of order \(6\)3
Parabolic induction from two segments, linked under contragredient, with a one half cuspidal reducibility, a special case3
Semiflows and intrinsic shape in topological spaces2
Fixed points of the sum of divisors function on \({{\mathbb{F}}}_2[x]\)2
On a generalization of some instability results for Riccati equations via nonassociative algebras2
A note on Dujella's unicity conjecture2
Reconstruction properties of selective Rips complexes2
2
Three kinds of numerical indices of \(l_p\)-spaces1
Hölder continuity for the solutions of the p(x)-Laplace equation with general right-hand side1
1
k-generalized Fibonacci numbers which are concatenations of two repdigits1
On the existence of \(D(-3)\)-quadruples over \(\mathbb{Z}\)1
Corrigendum to “A generalization of Iseki's formula”1
On the Ramanujan-Nagell type Diophantine equation \(Dx^2+k^n=B\)1
Real hypersurfaces with semi-parallel normal Jacobi operator in the real Grassmannians of rank two1
Steiner triple systems of order 21 with subsystems1
Polynomials vanishing on a basis of \(S_m(\Gamma_0(N))\)1
A family of \(2\)-groups and an associated family of semisymmetric, locally \(2\)-arc-transitive graphs1
Quasi-symmetric \(2\)-\((28,12,11)\) designs with an automorphism of order \(5\)1
On the multiplicity in Pillai's problem with Fibonacci numbers and powers of a fixed prime1
Bussey systems and Steiner's tactical problem1
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