Abstract:
Let R be a commutative ring with unity. The notion of almost 𝜙-integrally closed ring is introduced which generalizes the concept of almost integrally closed domain. Let β be the set of all rings such that Nilβ‘(𝑅) is a divided prime ideal of R and 𝜙:𝑇β‘(𝑅)β𝑅Nilβ‘(𝑅) is a ring homomorphism defined as 𝜙β‘(𝑥)=𝑥 for all 𝑥β𝑇β‘(𝑅). A ring 𝑅ββ is said to be an almost 𝜙-integrally closed ring if 𝜙β‘(𝑅) is integrally closed in 𝜙β‘(𝑅)𝜙β‘(𝔭) for each nonnil prime ideal 𝔭 of R. Using the idealization theory of Nagata, examples are also given to strengthen the concept.