论文信息 - Weighted Sobolev spaces

Weighted Sobolev spaces

The case when smooth functions are not dense in a weighted Sobolev space is considered. New examples of the inequality (where is the closure of the space of smooth functions) are presented. We pose the problem of 'viscosity' or 'attainable' spaces (that is, spaces that are in a certain sense limits of weighted Sobolev spaces corresponding to 'well-behaved' weights, which means weights bounded above and away from zero) such that . A precise definition of this property of 'attainability' is given in terms of the convergence of the solutions of the corresponding elliptic equations. It is proved that an attainable space always exists, but does not in general coincide with the extreme spaces and . Examples of strict inclusions are presented.

V. V. Zhikov | V. Zhikov

[1] S. L. Sobolev,et al. Applications of functional analysis in mathematical physics , 1963 .

[2] Василий Васильевич Жиков,et al. Связность и усреднение. Примеры фрактальной проводимости@@@Connectedness and homogenization. Examples of fractal conductivity , 1996 .

[3] Carlos E. Kenig,et al. The local regularity of solutions of degenerate elliptic equations , 1982 .

[4] N. Meyers,et al. H = W. , 1964, Proceedings of the National Academy of Sciences of the United States of America.

[5] Valeria Chiadò Piat,et al. Some remarks about the density of smooth functions in weighted Sobolev spaces , 1994 .

[6] F. S. Cassano,et al. Relaxation of degenerate variational integrals , 1994 .

[7] Ronald R. Coifman,et al. Weighted norm inequalities for maximal functions and singular integrals , 1974 .

[8] Zhikov. On Lavrentiev's Phenomenon. , 1995 .

[9] D. Gilbarg,et al. Elliptic Partial Differential Equa-tions of Second Order , 1977 .

[10] B. Muckenhoupt,et al. Weighted norm inequalities for the Hardy maximal function , 1972 .

[11] A. Kufner. Weighted Sobolev Spaces , 1985 .

[12] V. Zhikov,et al. Connectedness and homogenization. Examples of fractal conductivity , 1996 .