Skip to main content
MathOverflow

Return to Question

Notice removed Draw attention by CommunityBot
Bounty Ended with no winning answer by CommunityBot
Notice added Draw attention by Ali Taghavi
Bounty Started worth 200 reputation by Ali Taghavi
Notice removed Draw attention by CommunityBot
Bounty Ended with no winning answer by CommunityBot
Notice added Draw attention by Ali Taghavi
Bounty Started worth 100 reputation by Ali Taghavi
Notice removed Authoritative reference needed by CommunityBot
Bounty Ended with no winning answer by CommunityBot
deleted 1 character in body
Source Link
Ali Taghavi
Ali Taghavi
  • 356
  • 8
  • 31
  • 123

A unital $C^{*}$ algebra is called "Path connected" if the spectrum of all its elements is a path connected subset of $\mathbb{C}$.

Is the tensor product of two path connected algebra, a path connected algebra?(For spatial norm).

What is an example of a simple path connected $C^{*}$ algebra? In particular does $C^{*}_{red} F_{2}$ satisfiessatisfiy this property?

A unital $C^{*}$ algebra is called "Path connected" if the spectrum of all its elements is a path connected subset of $\mathbb{C}$.

Is the tensor product of two path connected algebra, a path connected algebra?(For spatial norm).

What is an example of a simple path connected $C^{*}$ algebra? In particular does $C^{*}_{red} F_{2}$ satisfies this property?

A unital $C^{*}$ algebra is called "Path connected" if the spectrum of all its elements is a path connected subset of $\mathbb{C}$.

Is the tensor product of two path connected algebra, a path connected algebra?(For spatial norm).

What is an example of a simple path connected $C^{*}$ algebra? In particular does $C^{*}_{red} F_{2}$ satisfiy this property?

added 25 characters in body
Source Link
Ali Taghavi
Ali Taghavi
  • 356
  • 8
  • 31
  • 123

A unital $C^{*}$ algebra is called "Path connected" if the spectrum of all its elements areis a path connected subset of $\mathbb{C}$.

Is the tensor product of two path connected algebra, a path connected algebra?(For spatial norm).

What is an example of a simple path connected $C^{*}$ algebra? In particular does $C^{*}_{red} F_{2}$ satisfies this property?

A unital $C^{*}$ algebra is called "Path connected" if the spectrum of all its elements are path connected.

Is the tensor product of two path connected algebra, a path connected algebra?(For spatial norm).

What is an example of a simple path connected $C^{*}$ algebra? In particular does $C^{*}_{red} F_{2}$ satisfies this property?

A unital $C^{*}$ algebra is called "Path connected" if the spectrum of all its elements is a path connected subset of $\mathbb{C}$.

Is the tensor product of two path connected algebra, a path connected algebra?(For spatial norm).

What is an example of a simple path connected $C^{*}$ algebra? In particular does $C^{*}_{red} F_{2}$ satisfies this property?

Notice added Authoritative reference needed by Ali Taghavi
Bounty Started worth 50 reputation by Ali Taghavi
edited tags
Source Link
Ali Taghavi
Ali Taghavi
  • 356
  • 8
  • 31
  • 123

A unital $C^{*}$ algebra is called "Path connected" if the spectrum of all its elements are path connected.

Is the tensor product of two path connected algebra, a path connected algebra?(For spatial norm).

What is an example of a simple path connected $C^{*}$ algebra? In particular does $C^{*}_{red} F_{2}$ satisfies this property?

A unital $C^{*}$ algebra is called "Path connected" if the spectrum of all its elements are path connected.

Is the tensor product of two path connected algebra, a path connected algebra?

What is an example of a simple path connected $C^{*}$ algebra? In particular does $C^{*}_{red} F_{2}$ satisfies this property?

A unital $C^{*}$ algebra is called "Path connected" if the spectrum of all its elements are path connected.

Is the tensor product of two path connected algebra, a path connected algebra?(For spatial norm).

What is an example of a simple path connected $C^{*}$ algebra? In particular does $C^{*}_{red} F_{2}$ satisfies this property?

added 64 characters in body; edited tags
Source Link
Ali Taghavi
Ali Taghavi
  • 356
  • 8
  • 31
  • 123
Source Link
Ali Taghavi
Ali Taghavi
  • 356
  • 8
  • 31
  • 123
1
2