AbstractWe study the method of deciding whether the minimal genus Seifert surfaces for the given link in the 3-sphere are unique. We give a sufficient condition for the uniqueness by using product decompositions and A-operations of sutured manifolds. We give a necessary and sufficient condition in case when the link is the boundary of a Murasugi sum of two minimal genus Seifert surfaces
We study Seifert surfaces for links, and in particular the Kakimizu complex MS(L) of a link L, which...
We study Seifert surfaces for links, and in particular the Kakimizu complex MS(L) of a link L, which...
We study Seifert surfaces for links, and in particular the Kakimizu complex MS(L) of a link L, which...
AbstractWe study the method of deciding whether the minimal genus Seifert surfaces for the given lin...
AbstractWe study non-orientable Seifert surfaces for knots in the 3-sphere, and examine their bounda...
We describe a procedure for creating in nite families of knots having unique minimal genus Seifert...
Abstract. We describe a procedure for creating innite families of knots having unique minimal genus ...
Abstract. We describe a procedure for creating innite families of knots having unique minimal genus ...
Seifert surfaces are orientable surfaces, bounded by a mathematical knot. These surfaces have an int...
Seifert surfaces are orientable surfaces, bounded by a mathematical knot. These surfaces have an int...
Seifert surfaces are orientable surfaces, bounded by a mathematical knot. These surfaces have an int...
Seifert surfaces are orientable surfaces, bounded by a mathematical knot. These surfaces have an int...
Let K be a knot in S3 of genus g and let n> 0: We show that if rk1HFK.K;g / < 2nC1 (where1HFK ...
Two Seifert surfaces of links in $S^3$ are said to be twist equivalent if one can be obtain...
Two Seifert surfaces of links in $S^3$ are said to be twist equivalent if one can be obtain...
We study Seifert surfaces for links, and in particular the Kakimizu complex MS(L) of a link L, which...
We study Seifert surfaces for links, and in particular the Kakimizu complex MS(L) of a link L, which...
We study Seifert surfaces for links, and in particular the Kakimizu complex MS(L) of a link L, which...
AbstractWe study the method of deciding whether the minimal genus Seifert surfaces for the given lin...
AbstractWe study non-orientable Seifert surfaces for knots in the 3-sphere, and examine their bounda...
We describe a procedure for creating in nite families of knots having unique minimal genus Seifert...
Abstract. We describe a procedure for creating innite families of knots having unique minimal genus ...
Abstract. We describe a procedure for creating innite families of knots having unique minimal genus ...
Seifert surfaces are orientable surfaces, bounded by a mathematical knot. These surfaces have an int...
Seifert surfaces are orientable surfaces, bounded by a mathematical knot. These surfaces have an int...
Seifert surfaces are orientable surfaces, bounded by a mathematical knot. These surfaces have an int...
Seifert surfaces are orientable surfaces, bounded by a mathematical knot. These surfaces have an int...
Let K be a knot in S3 of genus g and let n> 0: We show that if rk1HFK.K;g / < 2nC1 (where1HFK ...
Two Seifert surfaces of links in $S^3$ are said to be twist equivalent if one can be obtain...
Two Seifert surfaces of links in $S^3$ are said to be twist equivalent if one can be obtain...
We study Seifert surfaces for links, and in particular the Kakimizu complex MS(L) of a link L, which...
We study Seifert surfaces for links, and in particular the Kakimizu complex MS(L) of a link L, which...
We study Seifert surfaces for links, and in particular the Kakimizu complex MS(L) of a link L, which...
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