Concordance maps in knot Floer homology

Concordance maps in knot Floer homology

We show that a decorated knot concordance C from K to K' induces a homomorphism F_C on knot Floer homology that preserves the Alexander and Maslov gradings. Furthermore, it induces a morphism of the spectral sequences to HF^(S^3) = Z_2 that agrees with F_C on the E^1 page and is the identity on...

書誌詳細
主要な著者:	Juhász, A, Marengon, M
フォーマット:	Journal article
言語:	English
出版事項:	Mathematical Sciences Publishers 2016

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