Glasnik Matematicki, Vol. 18, No.2 (1983)
Scanned versions of the papers are
available through Google Books.
Contents
- J. Siftar, On the existence of
Ank-quasigroups, (217-219)
[Google Books]
- R. Yue Chi Ming, On regular rings and self-injective
rings. II, (221-229)
[Google Books]
- E. Psomopoulos, A commutativity theorem for rings
involving a subset of the ring, (231-236)
[Google Books]
- V. Dasic, Some properties of D-distributive
near-rings, (237-242)
[Google Books]
- A. Kotzig and C. Reischer, Associativity index of finite
quasigroups, (243-253)
[Google Books]
- D. Zubrinic, On a property of topological groups having
no small subgroups, (255-258)
[Google Books]
- M. Tadic, The topology of the dual space of a reductive
group over a local field, (259-279)
[Google Books]
- J. E. Pecaric, On variants of Jensen's inequality,
(281-289)
[Google Books]
- K. K. Dewan, Another proof of a theorem of
Ankeny and Rivlin, (291-293)
[Google Books]
- P. Berglez, On the representation of the Riemann
function by differential operators, (295-303)
[Google Books]
- M. Malenica, On the solutions of the functional equation
φ(f(x)) + φ(x) =
F(x) using Θ-summability, (305-315)
[Google Books]
- S. C. Arora and R. Kumar, Joint essential numerical range,
(317-320)
[Google Books]
- M. S. Khan and M. Imdad, Some commen fixed point theorems,
(321-326)
[Google Books]
- I. Kovacevic, Remark on almost closed mappings,
(327-329)
[Google Books]
- Y. Yajima, A characterization of normal covers of a
normal space, (331-334)
[Google Books]
- B. J. Pearson, An hereditarily locally connected
continuum which is not the continuous image of an arc,
(335-341)
[Google Books]
- L. S. Husch, Concerning some continua of simple shape,
(343-354)
[Google Books]
- M. Moszynska, On iterated 1-bouquets of 2-manifolds,
(355-358)
[Google Books]
- A. Koyama, A Whitehead-type theorem in fine shape
theory, (359-370)
[Google Books]
- Ju. T. Lisica, Strong shape theory and multivalued
maps, (371-382)
[Google Books]
- P. Hoppe and K. Veselic, A Jacobi-like method for the
symmetric indefinite eigenproblem Sx =
λTx with complex eigenvalues, (383-390)
[Google Books]
- D. Butkovic, Correction to the paper: "On the summability
of convolution sequences of measures", (391-392)
[Google Books]
- B. Najman, Correction to the paper: "Perturbation
theory for selfadjoint operators in Pontrjagin spaces I",
(393-394)
[Google Books]
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