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user81127
user81127
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Let $M$$M^m$ be an oriented Riemannian manifold. The signature operator associates to $M$ a class $\Delta_M\in KO_m(M)[1/2]$. I have two questions about this class $\Delta_M$:

  1. Rationally, $\Delta_M$ is computed by the Chern character, i.e. $$\text{ch}(\Delta_M)=L(M)\cap [M].$$ Where could I find details of the proof of this formula?

    Here $\text{ch}$ denotes the Chern character, $L$ denotes the $L$-class and $[M]$ the fundamental class in the ordinary homology theory.

  2. Is there a formula for $\Delta_{M\times N}$ in terms of $\Delta_M$ and $\Delta_N$?

Let $M$ be an oriented Riemannian manifold. The signature operator associates to $M$ a class $\Delta_M\in KO_m(M)[1/2]$. I have two questions about this class $\Delta_M$:

  1. Rationally, $\Delta_M$ is computed by the Chern character, i.e. $$\text{ch}(\Delta_M)=L(M)\cap [M].$$ Where could I find details of the proof of this formula?

    Here $\text{ch}$ denotes the Chern character, $L$ denotes the $L$-class and $[M]$ the fundamental class in the ordinary homology theory.

  2. Is there a formula for $\Delta_{M\times N}$ in terms of $\Delta_M$ and $\Delta_N$?

Let $M^m$ be an oriented Riemannian manifold. The signature operator associates to $M$ a class $\Delta_M\in KO_m(M)[1/2]$. I have two questions about this class $\Delta_M$:

  1. Rationally, $\Delta_M$ is computed by the Chern character, i.e. $$\text{ch}(\Delta_M)=L(M)\cap [M].$$ Where could I find details of the proof of this formula?

    Here $\text{ch}$ denotes the Chern character, $L$ denotes the $L$-class and $[M]$ the fundamental class in the ordinary homology theory.

  2. Is there a formula for $\Delta_{M\times N}$ in terms of $\Delta_M$ and $\Delta_N$?

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Stefan Kohl
Stefan Kohl
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fundamental Fundamental class in $KO[1/2]$

Let $M$ be an oriented Riemannian manifold.Signature The signature operator associates to $M$ a class class $\Delta_M\in KO_m(M)[1/2]$.  I have 2two questions about this class $\Delta_M$.

1.Rationally,$\Delta_M$ is computed by the Chern character,i.e. $$\text{ch}(\Delta_M)=L(M)\cap [M]$$

where could I fin details for the proof of this formula?

Here I use $\text{ch}$ for Chern character,$L$ for $L$-class and $[M]$ for the fundamental class in the ordinary homology theory.:

2.Is there a formula for $\Delta_{M\times N}$ in terms of $\Delta_M$ and $\Delta_N$

  1. Rationally, $\Delta_M$ is computed by the Chern character, i.e. $$\text{ch}(\Delta_M)=L(M)\cap [M].$$ Where could I find details of the proof of this formula?

    Here $\text{ch}$ denotes the Chern character, $L$ denotes the $L$-class and $[M]$ the fundamental class in the ordinary homology theory.

  2. Is there a formula for $\Delta_{M\times N}$ in terms of $\Delta_M$ and $\Delta_N$?

fundamental class in $KO[1/2]$

Let $M$ be an oriented Riemannian manifold.Signature operator associates to $M$ a class $\Delta_M\in KO_m(M)[1/2]$.I have 2 questions about this class $\Delta_M$.

1.Rationally,$\Delta_M$ is computed by the Chern character,i.e. $$\text{ch}(\Delta_M)=L(M)\cap [M]$$

where could I fin details for the proof of this formula?

Here I use $\text{ch}$ for Chern character,$L$ for $L$-class and $[M]$ for the fundamental class in the ordinary homology theory.

2.Is there a formula for $\Delta_{M\times N}$ in terms of $\Delta_M$ and $\Delta_N$

Fundamental class in $KO[1/2]$

Let $M$ be an oriented Riemannian manifold. The signature operator associates to $M$ a class $\Delta_M\in KO_m(M)[1/2]$.  I have two questions about this class $\Delta_M$:

  1. Rationally, $\Delta_M$ is computed by the Chern character, i.e. $$\text{ch}(\Delta_M)=L(M)\cap [M].$$ Where could I find details of the proof of this formula?

    Here $\text{ch}$ denotes the Chern character, $L$ denotes the $L$-class and $[M]$ the fundamental class in the ordinary homology theory.

  2. Is there a formula for $\Delta_{M\times N}$ in terms of $\Delta_M$ and $\Delta_N$?

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user81127
user81127
  • 61
  • 2

fundamental class in $KO[1/2]$

Let $M$ be an oriented Riemannian manifold.Signature operator associates to $M$ a class $\Delta_M\in KO_m(M)[1/2]$.I have 2 questions about this class $\Delta_M$.

1.Rationally,$\Delta_M$ is computed by the Chern character,i.e. $$\text{ch}(\Delta_M)=L(M)\cap [M]$$

where could I fin details for the proof of this formula?

Here I use $\text{ch}$ for Chern character,$L$ for $L$-class and $[M]$ for the fundamental class in the ordinary homology theory.

2.Is there a formula for $\Delta_{M\times N}$ in terms of $\Delta_M$ and $\Delta_N$