Montesinos Amilibia, José MaríaGonzález Acuña, Francisco Javier2023-06-212023-06-2119830010-257110.1007/BF02564635https://hdl.handle.net/20.500.14352/64700A smooth n-knot K in Sn+2 is said to be quasiaspherical if Hn+1(U)=0, where U is the universal cover of the exterior of K. Let G be the group of K and H the subgroup generated by a meridian. Then (G,H) is said to be unsplittable if G does not have a free product with amalgamation decomposition A∗FB with F finite and H contained in A. The authors prove that K is quasiaspherical if and only if (G,H) is unsplittable. If the group of K has a finite number of ends, then K is quasiaspherical and it was conjectured by the reviewer [J. Pure Appl. Algebra 20 (1981), no. 3, 317–324; MR0604323 (82j:57019)] that the converse was true. The authors give a very nice and useful method of constructing knots in Sn+2 and apply this method to produce counterexamples to the conjecture.engjournal articlehttp://www.springerlink.com/content/q3x151q700053g45/http://www.springerlink.com/restricted access515.162.8quasiaspherical n-knotknot groupfree product with amalgamation over a finite groupHNN-extension over a finite subgroupinfinitely many endsTopología1210 Topología