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**On orientability and degree of Fredholm maps.**
*(English)*
Zbl 1093.58003

To construct a meaningful \(\mathbb Z\)-valued degree theory for smooth maps between Banach manifolds whose differentials are Fredholm of index 0, some concept of orientability has to be introduced. Instead of requiring the manifolds to be orientable, it has been shown in [P. M. Fitzpatrick, J. Pejsachowicz and P. J. Rabier, J. Funct. Anal. 124, 1–39 (1994; Zbl 0802.47056); P. Benevieri and M. Furi, Ann. Sci. Math. Qué. 22, No. 2, 131–148 (1998; Zbl 1058.58502)] that one may consider the orientability of the differential instead.

In contrast to the analytic definitions of orientability devised in the papers mentioned above, here the author follows a more geometric approach: a continuous family of Fredholm operators of index 0 is called orientable if the corresponding naturally defined determinant line bundle is trivial. Under certain connectivity restrictions on the parameter space it is then shown that these notions of orientability coincide if the operator family contains an invertible operator. It should be remarked that this idea also appears in [A. Floer and H. Hofer, Math. Z. 212, 13–38 (1993; Zbl 0789.58022)].

In contrast to the analytic definitions of orientability devised in the papers mentioned above, here the author follows a more geometric approach: a continuous family of Fredholm operators of index 0 is called orientable if the corresponding naturally defined determinant line bundle is trivial. Under certain connectivity restrictions on the parameter space it is then shown that these notions of orientability coincide if the operator family contains an invertible operator. It should be remarked that this idea also appears in [A. Floer and H. Hofer, Math. Z. 212, 13–38 (1993; Zbl 0789.58022)].

Reviewer: Nils Ackermann (México, D.F.)

### MSC:

58B15 | Fredholm structures on infinite-dimensional manifolds |

47H11 | Degree theory for nonlinear operators |

58C30 | Fixed-point theorems on manifolds |

Full Text:
DOI

### References:

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