[1] Málek, J.; Nečas, J.; Růžička, M.: On weak solutions to a class of non-Newtonian incompressible fluids in bounded three-dimensional domains: the case $p\ge 2$. Adv. Differential Equations 6 (2001), 257–302. | MR

[2] Mošna, F.; Nečas, J.: Nonlinear hyperbolic equations with dissipative temporal and spatial non-local memory. Z.  Anal. Anwendungen 18 (1999), 939–951. | DOI | MR

[3] Leonardi, S.; Málek, J.; Nečas, J.; Pokorný, M.: On axially symmetric flows in $\mathbb{R}^3$. Z.  Anal. Anwendungen 18 (1999), 639–649. | DOI | MR

[4] Málek, J.; Nečas, J.; Pokorný, M.; Schonbek, M. E.: On possible singular solutions to the Navier-Stokes equations. Math. Nachr. 199 (1999), 97–114. | DOI | MR

[5] Bellout, H.; Nečas, J.; Rajagopal, K. R.: On the existence and uniqueness of flows (of) multipolar fluids of grade $3$ and their stability. Internat. J. Engrg. Sci. 37 (1999), 75–96. | DOI | MR

[6] Bellout, H.; Nečas, J.: The exterior problem in the plane for a non-Newtonian incompressible bipolar viscous fluid. Rocky Mountain J. Math. 26 (1996), 1245–1260. | DOI | MR

[7] Nečas, J.; Růžička, M.; Šverák, V.: Sur une remarque de J. Leray concernant la construction de solutions singulières des équations de Navier-Stokes. C. R. Acad. Sci. Paris Sér. I Math. 323 (1996), 245–249. | MR

[8] Nečas, J.; Růžička, M.; Šverák, V.: On Leray’s self-similar solutions of the Navier-Stokes equations. Acta Math. 176 (1996), 283–294. | DOI | MR

[9] Hao, W.; Leonardi, S.; Nečas, J.: An example of irregular solution to a nonlinear Euler-Lagrange elliptic system with real analytic coefficients. Ann. Scuola Norm. Sup. Pisa Cl. Sci. 23 (1996), 57–67. | MR

[10] Málek, J.; Nečas, J.: A finite-dimensional attractor for three-dimensional flow of incompressible fluids. J. Differ. Equations 127 (1996), 498–518. | DOI | MR

[11] Bellout, H.; Bloom, F.; Nečas, J.: Bounds for the dimensions of the attractors of non-linear bipolar viscous fluids. Asymptotic Anal. 11 (1995), 131–167. | MR

[12] Bellout, H.; Bloom, F.; Nečas, J.: Existence, uniqueness, and stability of solutions to the initial-boundary value problem for bipolar viscous fluids. Differ. Integral Equ. 8 (1995), 453–464. | MR

[13] Bellout, H.; Bloom, F.; Nečas, J.: Young measure-valued solutions for non-Newtonian incompressible fluids. Comm. Partial Differential Equations 19 (1994), 1763–1803. | DOI | MR

[14] Gupta, C. P.; Kwong, Y. C.; Nečas, J.: Landesman-Lazer condition for properly elliptic operators. Boll. Un. Mat. Ital. A 8 (1994), 65–74. | MR

[15] Bellout, H.; Nečas, J.: Existence of global weak solutions for a class of quasilinear hyperbolic integro-differential equations describing viscoelastic materials. Math. Ann. 299 (1994), 275–291. | DOI | MR

[16] Bellout, H.; Bloom, F.; Nečas, J.: Solutions for incompressible non-Newtonian fluids. C. R. Acad. Sci. Paris Sér. I Math. 317 (1993), 795–800. | MR

[17] Bellout, H.; Bloom, F.; Nečas, J.: Existence of global weak solutions to the dynamical problem for a three-dimensional elastic body with singular memory. SIAM J. Math. Anal. 24 (1993), 36–45. | DOI | MR

[18] Málek, J.; Nečas, J.; Růžička, M.: On the non-Newtonian incompressible fluids. Math. Models Methods Appl. Sci. 3 (1993), 35–63. | DOI | MR

[19] Bellout, H.; Bloom, F.; Nečas, J.: Uniqueness and stability to the initial boundary value problem for bipolar viscous fluids. SIAM J. Math. Anal. 24 (1993), 26–45.

[20] Jarušek, J.; Málek, J.; Nečas, J.; Šverák, V.: Variational inequality for a viscous drum vibrating in the presence of an obstacle. Rend. Mat. Appl. 12 (1992), 943–958. | MR

[21] Bellout, H.; Bloom, F.; Nečas, J.: A model of wave propagation in a nonlinear superconducting dielectric. Differ. Integral Equ. 5 (1992). | MR

[22] Málek, J.; Nečas, J.; Novotný, A.: Measure-valued solutions and asymptotic behavior of a multipolar model of a boundary layer. Czechoslovak Math. J. 42 (1992), 549–576. | MR

[23] Bellout, H.; Bloom, F.; Nečas, J.: Phenomenological behavior of multipolar viscous fluids. Quart. Appl. Math. 50 (1992), 559–583. | DOI | MR

[24] Nečas, J.; Novotný, A.; Šilhavý, M.: Global solution to the viscous compressible barotropic multipolar gas. Theoret. Comput. Fluid Dynamics (1992), 1–11. | DOI

[25] Nečas, J.; Růžička, M.: Global solution to the incompressible viscous-multipolar material problem. J. Elasticity 29 (1992), 175–202. | DOI | MR

[26] Bellout, H.; Bloom, F.; Nečas, J.: Global existence of weak solutions to the nonlinear transmission line problem. Nonlinear Anal. 17 (1991), 903–921. | DOI | MR

[27] Nečas, J.; Novotný, A.; Šilhavý, M.: Global solution to the compressible isothermal multipolar fluid. J. Math. Anal. Appl. 162 (1991), 223–241. | DOI | MR

[28] Nečas, J.; Růžička, M.: A dynamic problem of thermoelasticity. Z.  Anal. Anwendungen 10 (1991), 357–368. | DOI | MR

[29] Nečas, J.; Novotný, A.: Some qualitative properties of the viscous compressible heat conductive multipolar fluid. Comm. Partial Differential Equations 16 (1991), 197–220. | DOI | MR

[30] Gupta, C. P.; Kwong, Y. C.; Nečas, J.: Nonresonance conditions for the strong solvability of a general elliptic partial differential operator. Nonlinear Anal. 17 (1991), 613–625. | DOI | MR

[31] Nečas, J.; Šilhavý, M.: Multipolar viscous fluids. Quart. Appl. Math. 49 (1991), 247–265. | DOI | MR

[32] Nečas, J.; Šverák, V.: On regularity of solutions of nonlinear parabolic systems. Ann. Scuola Norm. Sup. Pisa Cl. Sci. 18 (1991), 1–11. | MR

[33] Nečas, J.; Novotný, A.; Šverák, V.: Uniqueness of solutions to the systems for thermoelastic bodies with strong viscosity. Math. Nachr. 149 (1990), 319–324. | DOI | MR

[34] Nečas, J.; Klouček, P.: The solution of transonic flow problems by the method of stabilization. Appl. Anal. 37 (1990), 143–167. | DOI | MR

[35] Milota, J.; Nečas, J.; Šverák, V.: On weak solutions to a viscoelasticity model. Comment. Math. Univ. Carolin. 31 (1990), 557–565. | MR

[36] Nečas, J.; Roubíček, T.: Approximation of a nonlinear thermoelastic problem with a moving boundary via a fixed-domain method. Apl. Mat. 35 (1990), 361–372. | MR

[37] Nečas, J.; Novotný, A.; Šilhavý, M.: Global solution to the ideal compressible heat conductive multipolar fluid. Comment. Math. Univ. Carolin. 30 (1989), 551–564. | MR

[38] Friedman, A.; Nečas, J.: Systems of nonlinear wave equations with nonlinear viscosity. Pacific J. Math. 135 (1988), 29–55. | DOI | MR

[39] Ĭon, O.; Kondratev, V. A.; Lekveishvili, D. M.; Nečas, J.; Oleĭnik, O. A.: Solvability of the system of von Kármán equations with nonhomogeneous boundary conditions in nonsmooth domains. Trudy Sem. Petrovsk. (1988), 197–205.

[40] Feistauer, M.; Nečas, J.: Remarks on the solvability of transonic flow problems. Manuscripta Math. 61 (1988), 417–428. | DOI | MR

[41] Feistauer, M.; Nečas, J.: Viscosity method in a transonic flow. Comm. Partial Differential Equations 13 (1988), 775–812. | DOI | MR

[1] Málek, J.; Nečas, J.; Rokyta, M.; Růžička, M.: Weak and measure-valued solutions to evolutionary PDEs. Chapman & Hall, London, 1996. | MR

[2] Nečas, J.: Écoulements de fluide: compacité par entropie. Masson, Paris, 1989. | MR

[3] Hlaváček, I.; Haslinger, J.; Nečas, J.; Lovíšek, J.: Solution of variational inequalities in mechanics. Springer, New York, 1988. | MR

[4] Haslinger, J.; Hlaváček I.; Nečas, J.: Numerical methods for unilateral problems in solid mathematics. Handbook of numerical analysis, Vol. IV, North-Holland, Amsterodam, 1996, pp. 313–485.

[1] Nečas, J.: Theory of multipolar fluids. World Congress of Nonlinear Analysts ’92, Vol. I–IV (Tampa, FL, 1992), De Gruyter, Berlin, 1996, pp. 1073–1081. | MR

[2] Nečas, J.: Theory of multipolar fluids. Problems and methods in mathematical physics (Chemnitz, 1993), Teubner, Stuttgart, 1994, pp. 111–119. | MR

[3] Nečas, J.: Theory of multipolar viscous fluids. The mathematics of finite elements and applications, VII (Uxbridge, 1990), Academic Press, London, 1991, pp. 233–244. | MR

[4] Nečas, J.: Dynamic in the nonlinear thermo-visco-elasticity. Symposium Partial Differential Equations (Holzhau, 1988), Teubner, Leipzig, 1989, pp. 197–203. | MR

[5] Nečas, J.: Finite element approach to the transonic flow problem. Proceedings of the Second International Symposium on Numerical Analysis (Prague, 1987), Teubner, Leipzig, 1988, pp. 70–74. | MR

[6] Nečas, J.: A viscosity solution method for transonic flow. Functional and numerical methods in mathematical physics, Naukova Dumka, Kiev, 1988, pp. 155–161. (Russian) | MR

[1] Advances in Mathematical Fluid Mechanics. Lecture Notes of the Sixth International School Mathematical Theory in Fluid Mechanics, Paseky, Czech Republic, Sept. 19–25, 1999, Málek, J.; Nečas, J.; Rokyta, M. (eds.), Springer, Berlin, 2000. | Zbl

[2] Partial differential equations. Proceedings of the conference held in Praha, August 10–16, 1998. Theory and numerical solution, Jäger, W.; Nečas, J.; John, O.; Najzar, K.; Stará, J. (eds.), Chapman & Hall/CRC, Boca Raton, FL, 2000. | MR | Zbl

[3] Advanced topics in theoretical fluid mechanics. Papers from the 5th Winter School on Mathematical Theory in Fluid Mechanics held in Paseky nad Jizerou, December 6–14, 1997, Málek, J.; Nečas, J.; Rokyta, M. (eds.), Longman, Harlow, 1998. | MR | Zbl

[4] Mathematical theory in fluid mechanics. Papers from the 4th Winter School held in Paseky, December 3–9, 1995, Galdi, G. P.; Málek, J.; Nečas, J. (eds.), Longman, Harlow, 1996. | MR | Zbl

[5] Progress in theoretical and computational fluid mechanics. Papers from the Third Winter School in Fluid Dynamics held in Paseky, December 12–18, 1993, Galdi, G. P.; Málek, J.; Nečas, J. (eds.), Longman Scientific & Technical, Harlow, 1994. | MR | Zbl

[6] Recent developments in theoretical fluid mechanics. Papers from the Second Winter School on Fluid Dynamics held in Paseky, November 29–December 4, 1992, Galdi, G. P.; Nečas, J. (eds.), Longman Scientific & Technical, Harlow, 1993. | MR | Zbl

[1] Nečas, J.: The current state and future of nonlinear analysis in Czechoslovakia. Pokroky Mat. Fyz. Astronom. 35 (1990), 250–255. (Czech) | MR