{"product_id":"on-near-la-rings-von-fazal-rehman","title":"On Near LA-Rings","description":"\u003cp\u003eWe introduce the notion of a near left almost ring (abbreviated as nLA-ring) which is in fact a generalization of left almost ring. A near left almost ring is a non-associative structure with respect to both the binary operations \"+\" and \".\". However, it possesses properties which we  usually encounter in \"near ring\" and \"LA-ring\". Historically, the first step towards the near-rings  in axiomatic research was done by Dickson in 1905. He showed that there do exist, \"Fields\" with  only one distributive law\" (Near-fields) some year later these near-fields showed up the connection between near-field¿s and fixed-point free permutation groups. A couple of years later  Veblen and Wedderburn started to use near-field¿s coordinatize certain kinds of geometric  planes.\u003c\/p\u003e\u003cdiv class=\"aw-variant-hidden-subtitle-div\" id=\"aw-variant-subtitle-9783846528372\"\u003e\u003ch3\u003eAnalysis of non associative and non commutative structures\u003c\/h3\u003e\u003c\/div\u003e","brand":"Autorenwelt Shop","offers":[{"title":"Softcover - 9783846528372","offer_id":39494598361181,"sku":"9783846528372","price":49.0,"currency_code":"EUR","in_stock":true}],"thumbnail_url":"\/\/cdn.shopify.com\/s\/files\/1\/0940\/0622\/files\/2bfa25b5-2d7c-4815-a87e-f91877f016cd.jpg?v=1757742391","url":"https:\/\/shop.autorenwelt.de\/products\/on-near-la-rings-von-fazal-rehman","provider":"Autorenwelt Shop","version":"1.0","type":"link"}