I am reading your article on Dold fibration

I have two questions:

How to construct Dold fibration ? Just like Hurewicz fibration, Hurewicz fibration has a theorem: A map $\pi:E \to B$ is a Hurewicz fibration iff there exists at least one Hurewicz connection for $\pi_!$. Please reference some good readings to me on Dold fibration.

Thanks,

]]>I am reading your article on Dold fibration

I have two questions:

How to construct Dold fibration ? Just like Hurewicz fibration, Hurewicz fibration has a theorem: A map $\pi :E \to B$ is a Hurewicz fibration iff there exists at least one Hurewicz connection for $\pi_!$. Please reference some good readings to me on Dold fibration.

Thanks,

]]>I am reading your article on Dold fibration

I have two questions:

- How to construct Dold fibration ? Just like Hurewicz fibration, Hurewicz fibration has a theorem: A map $\pi:E \to B$ is a Hurewicz fibration iff there exists at least one Hurewicz connection for $\pi_!$.
- Please reference some good readings to me on Dold fibration.

Thanks,

Tom

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