On relative compactness of a set of abstract functions in a scale of Banach spaces

1. J. L. Lions, Quelques Methodes de Resolution des Problemes aux Limites Non Lineaires, Paris (1969).

2. Yu. A. Dubinskiî, “Weak convergence in nonlinear elliptic and parabolic equations,” Mat. Sb.,67, No. 4, 609–642 (1965).

   Google Scholar 

3. K. N. Soltanov, “Solvability of some nonlinear parabolic problems in Orlicz-Sobolev spaces,” in: Partial Differential Equation [in Russian], (Proc. Conf. on Differential Equations and Numerical Methods, Novosibirsk, 1978), Nauka, Novosibirsk, 1980, 99–104.

   Google Scholar 

4. K. N. Soltanov, “On solvability of some nonlinear parabolic problems,” Differentsial'nye Uravneniya,16, No. 5, 882–887 (1980).

   Google Scholar 

5. A. G. Podgaev, “Compactness of certain nonlinear sets,” Dokl. Akad. Nauk SSSR,32, No. 3, 840–842 (1985).

   Google Scholar 

6. A. G. Podgaev, “On compactness conditions for sets in spaces of Bochner-integrable functions,” in: Equations of Nonclassical Type, Institute of Mathematics SO AN SSSR. Novosibirsk, 1986, 111–113.

   Google Scholar 

7. A. G. Podgaev, “On boundary value problems for some quasilinear nonuniformly parabolic equations with nonclassical degeneracy,” Sibirsk. Mat. Zh.,28, No. 2, 129–139 (1987).

   Google Scholar 

8. S. G. Pyatkov and A. G. Podgaev, “On the solvability of the boundary value problem for a nonlinear parabolic equation with varying time direction,” Sibirsk. Mat. Zh.,28, No. 3, 184–192 (1987).

   Google Scholar 

9. N. Dinculeany, “On Kolmogorov-Tamarkin and M. Riesz compactness criteria in a function space over a locally compact group,” J. Math. Anal. and Appl.,89, No. 1, 67–85 (1982).

   Google Scholar 

10. H. Gajewski, K. Gröger, and K. Zacharias, Nonlinear Operator Equations and Operator Differential Equations [in Russian], Mir, Moscow (1978).

    Google Scholar 

11. K. Yosida, Functional Analysis, Springer, Berlin (1965).

    Google Scholar 

Download references