@article{SEMR_2024_21_2_a60,
author = {Yu. E. Drobotov and B. G. Vakulov},
title = {On the weighted generalized {H\"older} continuity of a hypersingular integral over a metric measure space},
journal = {Sibirskie \`elektronnye matemati\v{c}eskie izvesti\^a},
pages = {1347--1369},
year = {2024},
volume = {21},
number = {2},
language = {ru},
url = {http://geodesic.mathdoc.fr/item/SEMR_2024_21_2_a60/}
}
TY - JOUR AU - Yu. E. Drobotov AU - B. G. Vakulov TI - On the weighted generalized Hölder continuity of a hypersingular integral over a metric measure space JO - Sibirskie èlektronnye matematičeskie izvestiâ PY - 2024 SP - 1347 EP - 1369 VL - 21 IS - 2 UR - http://geodesic.mathdoc.fr/item/SEMR_2024_21_2_a60/ LA - ru ID - SEMR_2024_21_2_a60 ER -
%0 Journal Article %A Yu. E. Drobotov %A B. G. Vakulov %T On the weighted generalized Hölder continuity of a hypersingular integral over a metric measure space %J Sibirskie èlektronnye matematičeskie izvestiâ %D 2024 %P 1347-1369 %V 21 %N 2 %U http://geodesic.mathdoc.fr/item/SEMR_2024_21_2_a60/ %G ru %F SEMR_2024_21_2_a60
Yu. E. Drobotov; B. G. Vakulov. On the weighted generalized Hölder continuity of a hypersingular integral over a metric measure space. Sibirskie èlektronnye matematičeskie izvestiâ, Tome 21 (2024) no. 2, pp. 1347-1369. http://geodesic.mathdoc.fr/item/SEMR_2024_21_2_a60/
[1] S.G. Samko, A.A. Kilbas, O.I. Marichev, Fractional integrals and derivatives: theory and applications, Gordon and Breach, New York, 1993 | Zbl
[2] D. Gilbarg, N.S. Trudinger, Elliptic partial differential equations of second order, Springer, Berlin, 2001 | Zbl
[3] Yu.E. Drobotov, B.G. Vakulov, “Hypersingular integrals in power-weighted variable generalized Hölder spaces over metric measure spaces”, J. Math. Sci., 2024, 1–20 | DOI
[4] S.G. Samko, “On spaces of Riesz potentials”, Math. USSR, Izv., 10:5 (1976), 1089–1117 | DOI | Zbl
[5] S.G. Samko, “Generalized Riesz potentials and hypersingular integrals, their symbols and inversion”, Sov. Math., Dokl., 18 (1977), 97–101 | Zbl
[6] S.G. Samko, “Spherical potentials, spherical Riesz differentiation, and their applications”, Russian Math. (Iz. VUZ), 21:2 (1977), 106–110 | Zbl
[7] S.G. Samko, “Generalized Riesz potentials and hypersingular integrals with homogeneous characteristics, their symbols and inversion”, Proc. Steklov Inst. Math., 156 (1983), 173–243 | Zbl
[8] S.G. Samko, “Singular integrals over the sphere and construction of characteristics with respect to the symbol”, Russian Math. (Iz. VUZ), 27:4 (1983), 35–52 | Zbl
[9] B.G. Vakulov, “An operator of potential type in a sphere in Hölder generalized classes”, Sov. Math., 30:11 (1986), 90–94 | Zbl
[10] A.S. Dzhafarov, “A constructive description of generalized Besov classes on the multidimensional sphere”, Sov. Math., Dokl., 32 (1985), 722–726 | Zbl
[11] A.D. Gadzhiev, Kh.P. Rustamov, “Equivalent normalization in Besov spaces on a sphere and properties of the symbol of a multidimensional singular integral”, Sov. Math., 28:9 (1984), 95–99 | Zbl
[12] I.V. Petrova, “Jackson's theorem and Besov spaces on the sphere”, Sov. Math., Dokl., 30 (1984), 425–429 | Zbl
[13] S.M. Nikol'sky, P.I. Lizorkin, “Approximation by spherical polynomials”, Tr. Mat. Inst. Steklova, 166 (1984), 186–200 | Zbl
[14] B.G. Vakulov, S.G. Samko, “Equivalent normings in spaces of piecewise-smooth functions on a sphere of type $C^\lambda (\mathbb{S}_{n-1})$, $H^\lambda (\mathbb{S}_{n-1})$”, Sov. Math., 31:12 (1987), 90–95 | Zbl
[15] S.G. Samko, B.G. Vakulov, “On equivalent norms in fractional order function spaces of continuous functions on the unit sphere”, Fract. Calc. Appl. Anal., 3:4 (2000), 401–433 | Zbl
[16] B.G. Vakulov, “Ob ekvivalentnyh normirovkah v prostranstvah funkcij kompleksnoj gladkosti na sfere”, Proceedings of the Institute of Mathematics Belarusi, 9 (2001), 41–44
[17] A.S. Dzhafarov, “The best approximation using finite spherical sums and certain differential properties of functions harmonic in a sphere”, Teoremy vlozenija priloz., Trudy Simpoz. Teoremam Vlozenija (1966), Nauka, Baku, 1970, 75–81 | Zbl
[18] A.I. Gusejnov, Kh.Sh. Muhtarov, Introduction to the theory of nonlinear singular integral equations, Nauka, M., 1980 | Zbl
[19] H.P. Rustamov, O tochnosti gladkostnyh svojstv simvola mnogomernogo singuljarnogo operatora s nepreryvnoj harakteristikoj, Deponirovanie VINITI No 5014-81, Baku, 1981
[20] L.D. Shankishvili, Operatory tipa sfericheskogo potenciala kompleksnogo porjadka v obobshhjonnyh prostranstvah Gjol'dera, Deponirovanie VINITI 23.03.98 No 860-V9
[21] B.G. Vakulov, “Spherical operators of potential type in generalized weighted Hölder spaces on a sphere”, Izv. Vyssh. Uchebn. Zaved., Sev.-Kavk. Reg., Estestv. Nauki, 1999:4 (1999), 5–10 | Zbl
[22] B.G. Vakulov, N.K. Karapetians, L.D. Shankisdvili, “Spherical hypersingular operators of imaginary order and their multipliers”, Fract. Calc. Appl. Anal., 4:1 (2001), 101–112 | Zbl
[23] B.G. Vakulov, N.K. Karapetjanc, L.D. Shankishvili, “Spherical convolution operators with a power-logarithmic kernel in generalized Hölder spaces”, Russ. Math., 47:2 (2003), 1–12 | Zbl
[24] B.G. Vakulov, G.S. Kostetskaya, Yu.E. Drobotov, “Riesz potentials in generalized Hölder spaces”, Handbook of research on in-country determinants and implications of foreign land acquisitions, IGI Global, 2018, 249–273 | DOI
[25] B.G. Vakulov, Yu.E. Drobotov, “Riesz potential with logarithmic kernel in generalized Hölder spaces”, Recent Applications of Financial Risk Modelling and Portfolio Management, IGI Global, 2021, 275–296 | DOI
[26] B.G. Vakulov, Yu.E. Drobotov, “The Riesz potential type operator with a power-logarithmic kernel in the generalized Hölder spaces on a sphere”, Physics and mechanics of new materials and their applications, eds. Parinov I.A., Chang S.H., Kim Y.H., Noda N.A., Springer, Cham, 2021, 147–159 | DOI
[27] Yu.E. Drobotov, B.G. Vakulov, “Smoothness properties of a Riesz potential type operator with logarithmic characteristic”, University News. North-Caucasus Region. Natural Sciences Series, 1 (2022), 4–11 | DOI
[28] Yu.E. Drobotov, B.G. Vakulov, “The Riesz potential type operator with a power-logarithmic kernel in the generalized Hölder spaces on a sphere”, Springer Proceedings in Materials, 20 (2023), 120–132 | DOI
[29] S.G. Samko, B. Ross, “Integration and differentiation to a variable fractional order”, Integral Transform. Spec. Funct., 1:4 (1993), 277–300 | DOI | Zbl
[30] S.G. Samko, “Fractional integration and differentiation of variable order”, Anal. Math., 21:3 (1995), 213–236 | DOI | Zbl
[31] B.G. Vakulov, E.S. Kochurov, “Fractional integrals and differentials of variable order in Hölder spaces $H^{\omega (x, t)}$”, Vladikavkaz. Mat. Zh., 12:4 (2010), 3–11 | Zbl
[32] B.G. Vakulov, E.S. Kochurov, “Zygmund-type estimates for fractional integration and differentiation operators of variable order”, Izv. Vyssh. Uchebn. Zaved., Sev. Kavk. Region. Estestv. Nauki, 2011, Specvypusk, 15–17
[33] B. G. Vakulov, E. S. Kochurov, N. G. Samko, “Zygmund-type estimates for fractional integration and differentiation operators of variable order”, Russian Mathematics, 55:6 (2011), 20–28 | DOI | Zbl
[34] S.G. Samko, “Differentiation and integration of variable order and the spaces $L^{p(x)}$”, Contemporary Mathematics, 212 (1998), 203–219 | DOI
[35] B.G. Vakulov, S.G. Samko, “A weighted Sobolev theorem for spatial and spherical potentials in Lebesgue spaces with variable exponents”, Dokl. Math., 72:1 (2005), 487–490 | Zbl
[36] S. Samko, E. Shargorodsky, B. Vakulov, “Weighted Sobolev theorem with variable exponent for spatial and spherical potential operators, II”, J. Math. Anal. Appl., 325:1 (2007), 745–751 | DOI | Zbl
[37] N.G. Samko, S.G. Samko, B.G. Vakulov, “Weighted Sobolev theorem in Lebesgue spaces with variable exponent”, J. Math. Anal. Appl., 335:1 (2007), 560–583 | DOI | Zbl
[38] A.I. Ginsburg, N.K. Karapetyants, “Fractional integrodifferentiation in Hölder classes of variable order”, Russ. Acad. Sci., Dokl., Math., 50:3 (1995), 441–444 | Zbl
[39] B. Ross, S.G. Samko, “Fractional integration operator of a variable order in the Hölder spaces $H^{\lambda (x)}$”, Int. J. Math. Math. Sci., 18:4 (1995), 777–788 | DOI | Zbl
[40] B.G. Vakulov, “Spherical operators of potential type in weighted Holder spaces of variable order”, Vladikavkaz. Mat. Zh., 7:2 (2005), 26–40 | Zbl
[41] B.G. Vakulov, “Spherical potentials in weighted Hölder spaces of variable order”, Doklady Mathematics, 71:1 (2005), 1–4
[42] B.G. Vakulov, “Spherical potentials of complex order in the variable order Hölder spaces”, Integral Transforms Spec. Funct., 16:5-6 (2005), 489–497 | DOI | Zbl
[43] B.G. Vakulov, “Spherical convolution operators in spaces of variable Hölder order”, Math. Notes, 80:5 (2006), 645–657 | DOI | Zbl
[44] B.G. Vakulov, Yu.E. Drobotov, “Riesz potential with integrable density in Hölder-variable spaces”, Math. Notes, 108:5 (2020), 652–660 | DOI | Zbl
[45] B.G. Vakulov, “Spherical potentials of complex order in generalized Hölder spaces of variable order”, Doklady Akademii Nauk, 407:1 (2006), 12–15
[46] N. Samko, B. Vakulov, “Spherical fractional and hypersingular integrals of variable order in generalized Hölder spaces with variable characteristic”, Math. Nachr., 284:2-3 (2011), 355–369 | DOI | Zbl
[47] B.G. Vakulov, Yu.E. Drobotov, “Variable order Riesz potential over $\mathbb{\dot{R}}^n$ on weighted generalized variable Hölder spaces”, Sib. Èlektron. Mat. Izv., 14 (2017), 647–656 | Zbl
[48] B.G. Vakulov, N.G. Samko, S.G. Samko, “Operatory tipa potenciala i gipersingulyarnye integraly v prostranstvah Gyol'dera peremennogo poryadka na odnorodnyh prostranstvah”, Izv. Vuzov. Sev. Kavk. Region. Estestv. Nauki, 2009, Specvypusk, 40–45
[49] N. Samko, S. Samko, B. Vakulov, “Fractional integrals and hypersingular integrals in variable order Hölder spaces on homogeneous spaces”, J. Funct. Spaces Appl., 8:3 (2010), 215–244 | DOI | Zbl
[50] S.G. Samko, “Potential operators in generalized Hölder spaces on sets in quasi-metric measure spaces without the cancellation property”, Nonlinear Anal., Theory Methods Appl., Ser. A, Theory Methods, 78 (2013), 130–140 | DOI | Zbl
[51] A. Karapetyants, S. Samko, “Variable order fractional integrals in variable generalized Hölder spaces of holomorphic functions”, Anal. Math. Phys., 11:4 (2021), 156 | DOI | Zbl
[52] E.D. Kosov, “A characterization of Besov classes in terms of a new modulus of continuity”, Dokl.Math., 96:3 (2017), 587–590 | DOI | Zbl
[53] E.D. Kosov, “Besov classes on finite and infinite dimensional spaces”, Sb. Math., 210:5 (2019), 663–692 | DOI | Zbl
[54] M.L. Gol'dman, E.G. Bakhtigareeva, “Application of general approach to the theory of Morrey-type spaces”, Math. Methods Appl. Sci., 43:16 (2020), 9435–9447 | DOI | Zbl
[55] S.G. Samko, S.M. Umarkhadzhiev, “Grand Morrey type spaces”, Vladikavkaz. Math. J., 22:4 (2020), 104–118 | Zbl
[56] O.G. Avsyankin, “On integral operators with homogeneous kernels in Morrey spaces”, Eurasian Math. J., 12:1 (2021), 92–96 | DOI | Zbl
[57] V.I. Burenkov, M.A. Senouci, “Boundedness of the generalized Riesz potential in local Morrey type spaces”, Eurasian Math. J., 12:4 (2021), 92–98 | DOI | Zbl
[58] V.I. Burenkov, E.D. Nursultanov, “Interpolation theorems for nonlinear operators in general Morrey-type spaces and their applications”, Proc. Steklov Inst. Math., 312 (2021), 124–149 | DOI | Zbl
[59] I. Ekincioglu, S.M. Umarkhadzhiev, “Oscillatory integrals with variable Calder/'on-Zygmund kernel on generalized weighted Morrey spaces”, Trans. Natl. Acad. Sci. Azerb., Ser. Phys.-Tech. Math. Sci., 42:1 (2022), 99–110 | Zbl
[60] S.M. Umarkhadzhiev, “Generalization of a notion of grand Lebesgue space”, Russ. Math., 58:4 (2014), 35–43 | DOI | Zbl
[61] S.M. Umarkhadzhiev, Yu.E. Drobotov, “Riesz potential in generalized grand Lebesgue space”, Bulletin Academy Sciences Chechen Republic, 2015:4 (2015), 26–29
[62] Yu.E. Drobotov, S.M. Umarkhadzhiev, “Riesz potential with homogeneous kernel in grand Lebesgue spaces on semi-axis”, Bulletin Academy Sciences Chechen Republic, 2018:1 (2018), 18–25
[63] S.M. Umarkhadzhiev, “On elliptic homogeneous differential operators in grand spaces”, Russ. Math., 64:3 (2020), 57–65 | DOI | Zbl
[64] S.M. Umarkhadzhiev, “Unilateral ball potentials in grand Lebesgue spaces”, Operator theory and harmonic analysis, 357, eds. Karapetyants et al., Springer Proceedings in Mathematics and Statistics, Cham, 2021, 569–576
[65] S.G. Samko, S.M. Umarkhadzhiev, “Local grand Lebesgue spaces”, Vladikavkaz. Math. J., 23:4 (2021), 96–108 | Zbl
[66] S.G. Samko, S.M. Umarkhadzhiev, “Weighted Hardy operators in grand Lebesgue spaces on $\mathbb{R}^n$”, J. Math. Sci., New York, 268:4 (2022), 509–522 | DOI | Zbl
[67] H. Rafeiro, S. Samko, S. Umarkhadzhiev, “Grand Lebesgue space for $p = \infty$ and its application to Sobolev-Adams embedding theorems in borderline cases”, Math. Nachr., 295:5 (2022), 991–1007 | DOI | Zbl
[68] H. Rafeiro, S. Samko, S. Umarkhadzhiev, “Local grand Lebesgue spaces on quasi-metric measure spaces and some applications”, Positivity, 26:3 (2022), 53 | DOI | Zbl
[69] S.M. Umarkhadzhiev, “Embedding of grand central Morrey-type spaces into local grand weighted Lebesgue spaces”, J. Math. Sci., New York, Series A, 266:3, 483–490 | DOI | Zbl
[70] V.E. Tarasov, Fractional dynamics. Applications of fractional calculus to dynamics of particles, fields and media, Springer, Berlin, 2010 | Zbl
[71] I.A. Parinov, S.V. Zubkov, A.S. Skaliukh, V.A. Chebanenko, A.V. Cherpakov , Yu.E. Drobotov, Advanced ferroelectric and piezoelectric materials: With improved properties and their applications, World Scientific, 2024
[72] V.N. Berestovskii, “Submetries of space forms of negative curvature”, Sib. Math. J., 28:4 (1987), 552–562 | DOI | Zbl
[73] G.H. Hardy, J.E. Littlewood, G. Pólya, Inequalities, Cambridge University Press, Cambridge, 1934 | Zbl
[74] S.L. Sobolev, Introduction to the theory of cubature formulas, Nauka, M., 1974 | Zbl