Consider the following Cauchy problem:where 1 〈 p 〈 2, 1 〈 m 〈 p_~11, and # is a a-finite measure in N. By the Moser's iteration method, the existence of the weak solution is obtained, provided that (M+1)N 〈...Consider the following Cauchy problem:where 1 〈 p 〈 2, 1 〈 m 〈 p_~11, and # is a a-finite measure in N. By the Moser's iteration method, the existence of the weak solution is obtained, provided that (M+1)N 〈 P. In mN+l contrast, if 〉 p, there is no solution to the Cauchy problem with an initial value δ(X), where 5(x) is the classical Dirac function.展开更多
We introduce notions of ordinary and standard products of a-finite measures and prove their existence. This approach allows us to construct invariant extensions of ordinary and standard products of Haar measures. In p...We introduce notions of ordinary and standard products of a-finite measures and prove their existence. This approach allows us to construct invariant extensions of ordinary and standard products of Haar measures. In particular, we construct translation-invariant extensions of ordinary and standard Lebesgue measures on R∞ and Rogers-Fremlin measures on l∞, respectively, such that topological weights of quasi-metric spaces associated with these measures are maximal (i.e., 2c). We also solve some Fremlin problems concerned with an existence of uniform measures in Banach spaces.展开更多
基金Project supported by the Fujian Provincial Natural Science Foundation of China (No. 2012J01011)Pan Jinglong’s Natural Science Foundation of Jimei University (No. ZC2010019)
文摘Consider the following Cauchy problem:where 1 〈 p 〈 2, 1 〈 m 〈 p_~11, and # is a a-finite measure in N. By the Moser's iteration method, the existence of the weak solution is obtained, provided that (M+1)N 〈 P. In mN+l contrast, if 〉 p, there is no solution to the Cauchy problem with an initial value δ(X), where 5(x) is the classical Dirac function.
基金Supported by National Science Foundation of Georgia (Grants Nos. GNSF/ST 08/3-391, Sh. Rustaveli GNSF/ST 09_144-3-105)
文摘We introduce notions of ordinary and standard products of a-finite measures and prove their existence. This approach allows us to construct invariant extensions of ordinary and standard products of Haar measures. In particular, we construct translation-invariant extensions of ordinary and standard Lebesgue measures on R∞ and Rogers-Fremlin measures on l∞, respectively, such that topological weights of quasi-metric spaces associated with these measures are maximal (i.e., 2c). We also solve some Fremlin problems concerned with an existence of uniform measures in Banach spaces.
