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Entire solutions of quasilinear elliptic type PDE's HOME

Entire solutions of quasilinear elliptic type PDE's

  1. New explicit solutions to the p-Laplace equation based on isoparametric foliations, submitted, 2018,
    Available on [arXiv:1802.09892 ] ,  
  2. A Jordan algebra approach to the eiconal equation,
    Journal of Algebra, 2014, 419:34-51 [arXiv:1211.7223]

  3. A note on isoparametric polynomials,
    Analysis and Mathematical Physics, 2014, 4(3):237-245 [arXiv:1209.0155]

  4. A generalization of Cartan's theorem on isoparametric cubics,
    Proc. Amer. Math. Soc., 2010, 138(8):2889-2895 [arxiv:1001.2387]

  5. The resultant on compact Riemann surfaces   (with B. Gustafsson),
    Comm. Math. Physics 2009, 286:313-358, [arxiv:0710.2326]

  6. Entire solutions of some quasilinear equations with quadratic principal symbol  (with Zorina I.G.),
    Vestnik SamGU, Matematika, 2008, 62(3), 108-123.

  7. Algebraic structure of quasiradial solutions to the \(\gamma\)-harmonic equation
    Pacific J. Math., 2006, 226(1):179-200, [arxiv:0709.4472]

  8. Entire solutions of the Simon equation  (with Zorina I.G.),
    Geometric Analysis and applications, Proceedings, Volgograd, 2005, p. 55-74

  9. Doubly periodic maximal surfaces with singularities (with Sergienko V.V.),
    Siberian Adv. Math. 2002, 12(1):77-91, [arxiv:0903.1368]

  10. Entire one-periodic maximal surfaces (with Sergienko V.V.),
    The Mansfield-Volgograd Journal, Ed.: James York Glimm, Mansfield University of Pennsylvania, 2000. 148-156. [arxiv:0902.3810]

  11. Denjoy-Ahlfors theorem for harmonic functions on Riemannian manifolds and external structure of minimal surfaces (with Miklyukov V.M.)
    Comm. Anal. Geom. 1996, 4(4):547-587, [arxiv:0903.2326]

  12. A remark on the Jorgens-Calabi-Pogorelov theorem
    Dokl. Akad. Nauk 1995, 340(3):317-318. PDF

  13. Some estimates for the mean curvature of nonparametric surfaces defined over domains in \(\mathbb{R}^n\),
    J. Math. Sci., 1994, 72(4):3250-3260, PDF

  14. Some estimates for the mean curvature of graphs over domains in \(\mathbb{R}^n\),
    Soviet Math. Dokl., 1991 42(2):387-390, PDF
     
  15. On one theorem of S.T. Yau and S.Y. Cheng,
    Proc. XXIIth Sci. Student Conference, Novosibirsk, 1984, 66-68. PDF



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Last updated: 2019-11-29