On Some Sufficient Conditions for Polynomials to Be Closed Polynomials over Domains
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Publisher
Springer International Publishing
Link
http://link.springer.com/content/pdf/10.1007/978-3-030-42136-6_10
Reference12 articles.
1. Arzhantsev, I.V., Petravchuk, A.P.: Closed polynomials and saturated subalgebras of polynomial algebras. Ukrainian Math. J. 59, 1783–1790 (2007)
2. Ayad, M.: Sur les plynômes $$f(X, Y)$$f(X,Y) tels que $$K[f]$$K[f] est intégralement fermé dans $$K[X, Y]$$K[X,Y]. Acta Arith. 105, 9–28 (2002)
3. Bass, H., Connell, E., Wright, D.: The Jacobian conjecture: reduction of degree and formal expansion of the inverse. Bull. Am. Math. Soc. 7, 287–330 (1982)
4. Jȩdrzejewicz, P.: Positive characteristic analogue of closed polynomials. Cent. Eur. J. Math. 9, 50–56 (2011)
5. Kato, M., Kojima, H.: Closed polynomials in polynomial rings over unique factorization domains. Commun. Algebra 43, 1935–1938 (2015)
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