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Does there exist a group $G$ (finite or infinite) with three subgroups $A, B, C \leq G$ satisfying the following three conditions?

  1. $A = N_G(A)$, $B = N_G(B)$, $C = N_G(C)$;

    $A = N_G(A)$, $B = N_G(B)$, $C = N_G(C)$;

  2. $AB = BC = CA = G$;

  3. $A \cap B = B \cap C = C \cap A = 1$.

  1. $AB = BC = CA = G$;
  1. $A \cap B = B \cap C = C \cap A = 1$.

(This question turned up in a more specific setting, but a negative answer to the existence of such a group would settle our case.)

Does there exist a group $G$ (finite or infinite) with three subgroups $A, B, C \leq G$ satisfying the following three conditions?

  1. $A = N_G(A)$, $B = N_G(B)$, $C = N_G(C)$;
  1. $AB = BC = CA = G$;
  1. $A \cap B = B \cap C = C \cap A = 1$.

(This question turned up in a more specific setting, but a negative answer to the existence of such a group would settle our case.)

Does there exist a group $G$ (finite or infinite) with three subgroups $A, B, C \leq G$ satisfying the following three conditions?

  1. $A = N_G(A)$, $B = N_G(B)$, $C = N_G(C)$;

  2. $AB = BC = CA = G$;

  3. $A \cap B = B \cap C = C \cap A = 1$.

(This question turned up in a more specific setting, but a negative answer to the existence of such a group would settle our case.)

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Tom De Medts
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Groups with "triple system"triple system of self-normalizing subgroups

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Tom De Medts
Tom De Medts
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Groups with "triple system" of subgroups

Does there exist a group $G$ (finite or infinite) with three subgroups $A, B, C \leq G$ satisfying the following three conditions?

  1. $A = N_G(A)$, $B = N_G(B)$, $C = N_G(C)$;
  1. $AB = BC = CA = G$;
  1. $A \cap B = B \cap C = C \cap A = 1$.

(This question turned up in a more specific setting, but a negative answer to the existence of such a group would settle our case.)