Journal title
Le Matematiche

   
Home  /  Le Matematiche  /  Vol: 54 Núm: 3 Par: 0 (1999)  /  Article
ARTICLE
TITLE

An extension of a theorem by M. I. Freidlin to good solutions to elliptic nondivergence equations

SUMMARY

In the context of second order linear uniformly elliptic equations with measurable coefficients, a result of Freidlin [9], which deals with homogenization type properties for elliptic equations with smooth periodic coefficients, is extended to generalized solutions for equations with measurable coefficients.

PAGES
pp. 29 - 47

 Articles related

Kuppum V. Srikanth,Raj Bhawan Yadav    

The classical Stone-Weierstrass Theorem has been generalized and extended in different directions. Theorem 1 of [2] (D. Hill, E. Passow, and L. Raymon, Approximation with interpolatory constraints, Illinois J. Math. Volume 20, Issue 1 (1976), 65-71) may ... see more


Csaba Farkas, Andrea Éva Molnár, Szilard Nagy    

In this paper we establish and prove a generalized variational principle for b-metric spaces. As a consequence, we obtain a weak Zhong-type variational principle in b-metric spaces. We show the applicability of the mentioned generalized variational princ... see more

Revista: Le Matematiche

Orazio Arena, Paolo Manselli    

In the context of second order linear uniformly elliptic equations with measurable coefficients, a result of Freidlin [9], which deals with homogenization type properties for elliptic equations with smooth periodic coefficients, is extended to generalize... see more

Revista: Le Matematiche

Yi-Lin Lee    

Consider a weighted directed acyclic graph GG having an upward planar drawing. We give a formula for the total weight of the families of non-intersecting paths on GG with any given starting and ending points. While the Lindström-Gessel-Viennot theorem gi... see more


Ohad Zohar    

In this paper, we prove a sparse random analogue of the Van der Waerden Theorem. We show that, for all r>2r > 2 and all q1=q2=?=qr=3?Nq_1 \geq q_2 \geq \dotsb \geq q_r \geq 3 \in \mathbb{N}, n-q2q1(q2-1)n^{-\frac{q_2}{q_1(q_2-1)}} is a threshold for t... see more