AbstractEvery hopfian n-manifold N with hyperhopfian fundamental group is known to be a codimension-2 orientable fibrator. In this paper, we generalize to the non-orientable setting by considering the covering space Ñ of N corresponding to H, where H is the intersection of all subgroups Hi of index 2 in π1(N). First, we will show that if π1(N) is hyperhopfian and Ñ is hopfian, then N is a codimension-2 fibrator. Then we get several results about codimension-2 fibrators as corollaries
AbstractOur main interest in this paper is further investigation of the concept of (PL) fibrators (i...
ABSTRACT. In this paper, we show that if N is a closed manifold with hyperhopfian fundamental group,...
ABSTRACT. In this paper, we show that if N is a closed manifold with hyperhopfian fundamental group,...
AbstractEvery hopfian n-manifold N with hyperhopfian fundamental group is known to be a codimension-...
AbstractIf a closed n-manifold N has a 2−1 covering, we consider the covering space Ñ of N correspo...
AbstractA closed connected n-manifold N is called a codimension-2 fibrator (codimension-2 orientable...
AbstractA closed connected n-manifold N is called a codimension-2 fibrator (codimension-2 orientable...
AbstractIf a closed n-manifold N has a 2−1 covering, we consider the covering space Ñ of N correspo...
AbstractWe describe several conditions under which the product of hopfian manifolds is another hopfi...
AbstractA closed connected n-manifold N is called a codimension-2 fibrator (codimension-2 orientable...
AbstractA closed connected n-manifold N is called a codimension 2 fibrator (codimension 2 orientable...
AbstractWe describe several conditions under which the product of hopfian manifolds is another hopfi...
AbstractA closed connected n-manifold N is called a codimension-2 fibrator (codimension-2 orientable...
The group of any nontorus knot is hyperhopfian. A group G is called hopfian if every homomorphism fr...
AbstractThis paper identifies a class of homology n-spheres that are codimension-(n+1) shape msimpl-...
AbstractOur main interest in this paper is further investigation of the concept of (PL) fibrators (i...
ABSTRACT. In this paper, we show that if N is a closed manifold with hyperhopfian fundamental group,...
ABSTRACT. In this paper, we show that if N is a closed manifold with hyperhopfian fundamental group,...
AbstractEvery hopfian n-manifold N with hyperhopfian fundamental group is known to be a codimension-...
AbstractIf a closed n-manifold N has a 2−1 covering, we consider the covering space Ñ of N correspo...
AbstractA closed connected n-manifold N is called a codimension-2 fibrator (codimension-2 orientable...
AbstractA closed connected n-manifold N is called a codimension-2 fibrator (codimension-2 orientable...
AbstractIf a closed n-manifold N has a 2−1 covering, we consider the covering space Ñ of N correspo...
AbstractWe describe several conditions under which the product of hopfian manifolds is another hopfi...
AbstractA closed connected n-manifold N is called a codimension-2 fibrator (codimension-2 orientable...
AbstractA closed connected n-manifold N is called a codimension 2 fibrator (codimension 2 orientable...
AbstractWe describe several conditions under which the product of hopfian manifolds is another hopfi...
AbstractA closed connected n-manifold N is called a codimension-2 fibrator (codimension-2 orientable...
The group of any nontorus knot is hyperhopfian. A group G is called hopfian if every homomorphism fr...
AbstractThis paper identifies a class of homology n-spheres that are codimension-(n+1) shape msimpl-...
AbstractOur main interest in this paper is further investigation of the concept of (PL) fibrators (i...
ABSTRACT. In this paper, we show that if N is a closed manifold with hyperhopfian fundamental group,...
ABSTRACT. In this paper, we show that if N is a closed manifold with hyperhopfian fundamental group,...
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