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Let $C$ be a compact 2-dimensional cylinder $[0,1]\times S^1$. Let $A,A'$$A$, $A'$ be the two connected components of its boundary.

Let $Q$ be a square. Let $a,a'$$a$, $a'$ be a pair of opposite edges of $Q$.

Consider a smooth imbedding $f\colon Q\to C$ such that $$f(a)\subset A,\, \, f(a')\subset A'.$$ Assume moreover that $f(\partial Q\backslash (a\cup a'))$$f(\partial Q\setminus (a\cup a'))$ in contained in the interior of $C$.

Question. Is it true that $C\backslash f(Q)$$C\setminus f(Q)$ is connected?

A reference will be helpful.

Let $C$ be a compact 2-dimensional cylinder $[0,1]\times S^1$. Let $A,A'$ be the two connected components of its boundary.

Let $Q$ be a square. Let $a,a'$ be a pair of opposite edges of $Q$.

Consider a smooth imbedding $f\colon Q\to C$ such that $$f(a)\subset A,\, \, f(a')\subset A'.$$ Assume moreover that $f(\partial Q\backslash (a\cup a'))$ in contained in the interior of $C$.

Question. Is it true that $C\backslash f(Q)$ is connected?

A reference will be helpful.

Let $C$ be a compact 2-dimensional cylinder $[0,1]\times S^1$. Let $A$, $A'$ be the two connected components of its boundary.

Let $Q$ be a square. Let $a$, $a'$ be a pair of opposite edges of $Q$.

Consider a smooth imbedding $f\colon Q\to C$ such that $$f(a)\subset A,\, \, f(a')\subset A'.$$ Assume moreover that $f(\partial Q\setminus (a\cup a'))$ in contained in the interior of $C$.

Question. Is it true that $C\setminus f(Q)$ is connected?

A reference will be helpful.

edited body
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asv
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Let $C$ be a compact 2-dimensional cylinder $[0,1]\times S^1$. Let $A,A'$ be the two connected components of its boundary.

Let $Q$ be a square. Let $a,a'$ be a pair of opposite edges of $Q$.

Consider a smooth imbedding $f\colon Q\to C$ such that $$f(a)\subset A,\, \, f(a')\subset A'.$$ Assume moreover that $f(\partial C\backslash (a\cup a'))$$f(\partial Q\backslash (a\cup a'))$ in contained in the interior of $C$.

Question. Is it true that $C\backslash f(Q)$ is connected?

A reference will be helpful.

Let $C$ be a compact 2-dimensional cylinder $[0,1]\times S^1$. Let $A,A'$ be the two connected components of its boundary.

Let $Q$ be a square. Let $a,a'$ be a pair of opposite edges of $Q$.

Consider a smooth imbedding $f\colon Q\to C$ such that $$f(a)\subset A,\, \, f(a')\subset A'.$$ Assume moreover that $f(\partial C\backslash (a\cup a'))$ in contained in the interior of $C$.

Question. Is it true that $C\backslash f(Q)$ is connected?

A reference will be helpful.

Let $C$ be a compact 2-dimensional cylinder $[0,1]\times S^1$. Let $A,A'$ be the two connected components of its boundary.

Let $Q$ be a square. Let $a,a'$ be a pair of opposite edges of $Q$.

Consider a smooth imbedding $f\colon Q\to C$ such that $$f(a)\subset A,\, \, f(a')\subset A'.$$ Assume moreover that $f(\partial Q\backslash (a\cup a'))$ in contained in the interior of $C$.

Question. Is it true that $C\backslash f(Q)$ is connected?

A reference will be helpful.

edited body
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asv
  • 21.8k
  • 6
  • 54
  • 121

Let $C$ be a compact 2-dimensional cylinder $[0,1]\times S^1$. Let $A,A'$ be the two connected components of its boundary.

Let $Q$ be a square. Let $a,a'$ be a pair of opposite edges of $Q$.

Consider a smooth imbedding $f\colon Q\to C$ such that $$f(a)\subset A,\, \, f(a')\subset A'.$$ Assume moreover that $f(\partial C\backslash (a\cup a'))$ in contained in the interior of $C$.

Question. Is it true that $C\backslash f(Q)$ is connected?

A reference will be helpful?.

Let $C$ be a compact 2-dimensional cylinder $[0,1]\times S^1$. Let $A,A'$ be the two connected components of its boundary.

Let $Q$ be a square. Let $a,a'$ be a pair of opposite edges of $Q$.

Consider a smooth imbedding $f\colon Q\to C$ such that $$f(a)\subset A,\, \, f(a')\subset A'.$$ Assume moreover that $f(\partial C\backslash (a\cup a'))$ in contained in the interior of $C$.

Question. Is it true that $C\backslash f(Q)$ is connected?

A reference will be helpful?

Let $C$ be a compact 2-dimensional cylinder $[0,1]\times S^1$. Let $A,A'$ be the two connected components of its boundary.

Let $Q$ be a square. Let $a,a'$ be a pair of opposite edges of $Q$.

Consider a smooth imbedding $f\colon Q\to C$ such that $$f(a)\subset A,\, \, f(a')\subset A'.$$ Assume moreover that $f(\partial C\backslash (a\cup a'))$ in contained in the interior of $C$.

Question. Is it true that $C\backslash f(Q)$ is connected?

A reference will be helpful.

Source Link
asv
  • 21.8k
  • 6
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  • 121
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