(skrót LF oznacza, że czasopismo znajduje sie na tzw. liście filadelfijskiej)
1. (i M. Krüppel) Ein maßtheoretischer Fixpunktsatz für nichtlineare operatoren im Hilbert-Raum (German) [A measure-theoretic fixed-point theorem for nonlinear operator], Wissenschaftliche Zeitschrift der Pädagogische Hochschule „Liselotte Herrmann” Güstrow, Mathematisch-Naturwissenschaftlichen Fakultät, Heft 1/1986, 59-66;
MR0895133 (89b:47079); Zbl 0637.47032.
2. Uniformly normal structure and fixed pointsof uniformly lipschitzian mappings, Commentationes Mathematicae Universitatis Carolinae 28, 3 (1987), 481-489;
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3. Nonlinear ergodic theorems for nonexpansive mappings in uniformly convex Banach spaces, Wissenschaftliche Zeitschrift der Pädagogische Hochschule „Liselotte Herrmann” Güstrow, Mathematisch-Naturwissenschaftlichen Fakultät, Heft 1/1987, 133-152;
MR0929677 (89c:47066); Zbl 0642.47040.
4. Some remarks on almost convergence of the Picard iterates for non-expansive mappings in Banach spaces which satisfy the Opial condition, Commentationes Mathematicae 27 (1988), 59-68;
MR0988960 (90i:47055); Zbl 0747.47031.
5. (i M. Krüppel) Fixed points of uniformly lipschitzian mappings, Bulletin of the Polish Academy of Sciences, Mathematics 36, no. 1-2 (1988), 57-63;
MR0998208 (91a:47079); Zbl 0676.47039.
6. Weak convergence theorems for asymptotically nonexpansive mappings in uniformly convex Banach spaces, Commentationes Mathematicae Universitatis Carolinae 30, 2 (1989), 249-252;
MR1014125 (90g:47097); Zbl 0686.47045; PDF (0.5 MB)
7. Remarks on fixed points of uniformly lipschitzian mappings with certain densities, Zeszyty Naukowe Politechniki Rzeszowskiej, Matematyka i Fizyka z. 10, nr 73 (1990), 127-131;
MR1114751 (92e:47104); Zbl 0744.47048.
8. A remark on the generalization of Rolle’s and Lagrange’s theorems in differential calculus, Zeszyty Naukowe Wyższej Szkoły Pedagogicznej w Rzeszowie, Seria: Matematyka, Fizyka i Technika, 2 (1990), 51-58.
9. Fixed points for lipschitzian involutions of order n=3, Zeszyty Naukowe Politechniki Rzeszowskiej, Matematyka i Fizyka z. 12, nr 85 (1991), 115-119;
MR1153403 (92m:47112); Zbl 0752.47021.
10. (i M. Krüppel) A generalization of Bruck’s inequality for nonexpansive mappings, Zeszyty Naukowe Politechniki Rzeszowskiej, Matematyka i Fizyka z. 12, nr 85 (1991), 121-124;
MR1153404 (92m:47107); Zbl 0756.47038.
11. Fixed point theorems for asymptotically regular mappings in L^p spaces, Nonlinear Analysis, Theory, Methods & Applications 17, no. 2 (1991), 153-159, LF,
MR1118074 (92j:47109); Zbl 0758.47044.
12. Fixed points of asymptotically regular mappings in spaces with uniformly normal structure, Commentationes Mathematicae Universitatis Carolinae 32, 4 (1991), 639-643;
MR1159810 (93b:47118); Zbl 0768.47027.
13. Nonlinear ergodic theorems for asymptotically nonexpansive mappings in Banach spaces satisfying Opial’s condition, Journal of Mathematical Analysis and Applications 161, no. 2 (1991), 440-446, LF;
MR1132119 (92h:47085); Zbl 0756.47037.
14. (i M. Krüppel) Fixed point theorems for mappings with lipschitzian iterates, Nonlinear Analysis, Theory, Methods & Applications 19, no. 4 (1992), 353-363, LF;
MR1178409 (93i:47086); Zbl 0780.47040.
15. A fixed point theorem for asymptotically regular mappings, Colloquium Mathematicum 64 (1993), 55-57;
MR1201441 (94c:54077); Zbl 0863.54036.
16. Fixed points of asymptotically regular mappings, Mathematica Slovaca 43, no. 3 (1993), 327-336;
MR1241369 (94k:47085); Zbl 0806.47049.
17. (i M. Krüppel) An ergodic theorem for asymptotically nonexpansive mappings, Proceedings of the Royal Socoiety of Edinburgh 124A (1994), 23-31, LF;
MR1272428 (95e:47076); Zbl 0807.47042.
18. A remark on fixed point theorems for lipschitzian mappings, Journal of Mathematical Analysis and Applications 183, no. 3 (1994), 495-508, LF;
MR1274850 (95d:47074); Zbl 0806.47050.
19. A remark on fixed points of asymptotically regular mappings in uniformly convex Banach spaces, Zeszyty Naukowe Politechniki Rzeszowskiej, Matematyka z. 16, nr 129 (1994), 131-141;
MR1318237 (95k:47092); Zbl 0861.47035.
20. Fixed points of involutions, Mathematica Japonica 43, no. 1 (1996), 151-155;
MR1373993 (97a:47096); Zbl 0847.47037.
21. (i B.E. Rhoades) A general fixed point theorem for involutions, Indian Journal of Pure & Applied Mathematics 27 (1) (1996), 13-23, LF;
MR1374884 (97a:47095); Zbl 0847.47038.
22. Fixed points of asymptotically regular mappings in metric spaces, Demonstratio Mathematica 29, no. 3 (1996), 615-620;
MR1415503; Zbl 0992.47505.
23. Fixed points of lipschitzian semigroups in metric spaces with uniformly normal structure, Zeszyty Naukowe Politechniki Rzeszowskiej, Matematyka z. 20, nr 154 (1996), 41-48;
MR1473956 (98k:47110); Zbl 0881.47031.
24. Fixed points of asymptotically regular semigroups in Banach spaces, Rendiconti del Circolo Matematico di Palermo, Ser. II, 46 (1997), 89-118;
MR1462876 (98f:47064); Zbl 0889.47030.
25. Lipschitzian semigroups in Hilbert space, Nonlinear Analysis, Theory, Methods & Applications (Proc. 2nd World Congress of Nonlinear Analysts, Part 4 (Athens, 1996)) 30, no. 4 (1997), 2309-2315, LF;
MR1490353 (99a:47082); Zbl 0894.47043.
26. Fixed points of lipschitzian semigroups in Banach spaces, Studia Mathematica 126 (2) (1997), 101-113, LF;
MR1472693 (98i:47054); Zbl 0894.47044.
27. On some generalization of lipschitzian mappings in a Hilbert space, Proceedings of Workshop on Fixed Point Theory, Kazimierz Dolny, 1997, Annales Universitatis Mariae Curie-Skłodowska, Sect. A (Mathematics) 51 (1997) 109-118;
MR1666170 (99k:47139).; Zbl 1012.47020.
28. (i T.B. Singh) On some generalization of uniformly lipschitzian mappings and its fixed points, Demonstratio Mathematica 31, no. 2 (1998), 305-311;
MR1647572 (99g:47131); Zbl 0913.47054.
29. Remarks on fixed points of rotative Lipschitzian mappings, Commentationes Mathematicae Universitatis Carolinae 40, 3 (1999), 495-510;
MR1732485 (2000h:47083).; Zbl 1065.47504.
30. A survey of some fixed point results for Lipschitzian mappings in Hilbert spaces, Proceedings of the Third World Congress of Nonlinear Analysts, Part 4 (Catania, 2000), Nonlinear Analysis, Theory, Methods & Applications 47 (2001), 2743 – 2751, LF;
MR1972397; Zbl 1042.47514.
31. Podstawy nieliniowej teorii ergodycznej [Fundations of nonlinear ergodic theory], Wiadomości Matematyczne 37 (2001), 5 – 16;
MR1889867 (2002m:37004).
32. (i K. Pupka) Remarks on fixed points for involutions in order in Banach spaces, Demonstratio Mathematica 38, no 2, (2005), 431 – 435;
MR2140779 (2005k:47117); Zbl 1090.47040.
33. (i K. Pupka) Fixed point theorems for n-periodic mappings in Banach spaces, Commentationes Mathematicae Universitatis Carolinae 46, no. 1 (2005), 33 – 42;
MR2175857 (2006f:47071); Zbl 1123.47038.
34. (i K. Pupka) Fixed points of rotative mappings in Banach spaces, Journal of Nonlinear and Convex Analysis 6, no. 2 (2005), 217 – 233;
MR2159836 (2006e:47096); Zbl 1093.47051.
35. Another proof of the existence of fixed points of rotative nonexpansive mappings, Annales Universitatis Mariae Curie-Skłodowska, Sect. A (Mathematics) 59 (2005), 19 – 26;
MR2199234 (2006h:47090); Zbl 1143.47034.
36. (i K. Pupka) Rotative mappings in metric spaces of hyperbolic type, Journal of Mathematics and Applications 28 (2006), 49 – 70;
MR2216911 (2007c:54026); Zbl 1168.54019.
37. Remarks on the structure of the fixed-point sets of uniformly lipschitzian mappings in uniformly convex Banach spaces, Journal of Mathematical Analysis and Applications 355 (2009), 303 - 310, LF;
MR2514469 (2010b:47157); Zbl 1172.47037.
38. On the structure of fixed-point sets of asymptotically regular mappings in Hilbert spaces, Topological Methods in Nonlinear Analysis 34, no 2 (2009), 383 - 389, LF;
MR2604454 (2011b:47127); Zbl 1207.47058.
39. The methods of Hilbert spaces and structure of the fixed-point set of lipschitzian mapping, Fixed Point Theory and Applications, Volume 2009, Article ID 586487, 12 pages, doi:10.1155/2009/586487, LF;
MR2551610 (2010i:47120); Zbl 1193.47055.
40. Structure of the fixed-point set of mappings with lipschitzian iterates, Topological Methods in Nonlinear Analysis 36, no 2 (2010), 381 - 393, LF;
MR2788978.
41. Geometrical coefficients and the structure of the fixed-point set of asymptotically regular mappings in Banach spaces, Nonlinear Analysis, Theory, Methods & Applications 74 (2011), 1190 - 1199, LF;
MR2746799 (2012a:47129).
42. Structure of the fixed-point set of asymptotically regular mappings in uniformly convex Banach spaces, Taiwanese Journal of Mathematics 15 (2011), 1007 - 1020, LF;
MR2829894.
43. The structure of fixed-point sets of uniformly lipschitzian semigroups, Collectanea Mathematica 63 (2012), 333 - 344, LF;
44. Stefan Banach (1892 - 1945): geniusz!, Journal of Mathematics and Applications (praca wycofana z powodu braku zgody właścicieli na wykorzystanie archiwalnych zdjęć), (PDF) Stefan Banach (Life and mathematics) (researchgate.net)
45. Fixed point theorems for multi-valued uniformly Lipschitzian mappings in Banach and metric spaces, Journal of Nonlinear and Convex Analysis 17, no 12 (2016), 2455 - 2467, LF;
46. Fixed point theorems for Kannan type mappings, Journal of Fixed Point Theory and Applications 19 (2017), 2145 - 2152, DOI: 10.1007/s11784-017-0402-8, LF,
47. Remarks on contractive type mappings, Fixed Point Theory and Applications (2017), 2017:8, DOI: 10.1186/s13663-017-0601-4, LF,
48. Fixed point theorems for F-expanding mappings, Fixed Point Theory and Applications (2017), 2017:9, DOI: 10.1186/s13663-017-0602-3 , LF.
49. Various extensions of Kannan's fixed point theorem, Journal of Fixed Point Theory and Applications (2018) 20:20, https://doi.org/10.1007/s11784-018-0500-2, LF,
50. Remarks on asymptotic regularity and fixed points, Journal of Fixed Point Theory and Applications (2019) 21:29, https://doi.org/10.1007/s11784-019-0668-0, LF.
51. Fixed points, multi-valued uniformly Lipschitzian mappings and uniform normal structure, Fixed Point Theory 20 (2019), No. 1, 195 - 202, DOI:10.24193/fpt-ro.2019.01.12; http://www.math.ubbcluj.ro/~nodeacj/sfptcj.html , LF.
52. On some mappings with a unique fixed point, Journal of Fixed Point Theory and Applications (2020) 22: 8. https://doi.org/10.1007/s11784-019-0741-8, LF.
53. (i R.K. Bisht) Around averaged mappings, Journal of Fixed Point Theory and Applications (2021) 23:48. Around averaged mappings | SpringerLink, LF.
54. Fixed point theorems in preordered sets, Journal of Fixed Point Theory and Applications (2021) 23:71. Fixed point theorems in preordered sets (springer.com) , LF.