%0 Journal Article %T Almost Cohen-Macaulay and almost regular algebras via almost flat extensions %A Mohsen Asgharzadeh %A Kazuma Shimomoto %J Mathematics %D 2010 %I arXiv %X The present paper deals with various aspects of the notion of almost Cohen-Macaulay property, which was introduced and studied by Roberts, Singh and Srinivas. We employ the definition of almost zero modules as defined by a value map, which is different from the version of Gabber-Ramero. We prove that, if the local cohomology modules of an algebra $T$ of certain type over a local Noetherian ring are almost zero, $T$ maps to a big Cohen-Macaulay algebra. Then we study how the almost Cohen-Macaulay property behaves under almost faithfully flat extension. As a consequence, we study the structure of $F$-coherent rings of positive characteristic in terms of almost regularity. %U http://arxiv.org/abs/1003.0265v3