A consistent example of a hereditarily c-Lindelöf first countable space of size

A consistent example of a hereditarily $\mathfrak{c}$ -Lindelöf first countable space of size $>\mathfrak{c}$

István Juhász, Lajos Soukup and Zoltán Szentmiklóssy

Answering a question raised by Anishkievic and Arhangelski ${\u{\i\/}}\kern.15em$ , we show that if $V\vDash CH$ then there is an $\omega_1$ -closed and $\omega_2-CC$ partial order such that, in , there exists a 0-dimensional, , hereditarily $\mathfrak{c}$ -Lindelöf , and first countable space of cardinality $\omega_2=\mathfrak{c}^+$ . The question if there is such a space (even with ``hereditarily'' dropped) in ZFC remains open.

2000 Mathematics Subject Classification: 54A25, 54A35, 03E35

Key words and phrases: $\mathfrak{c}$ -Lindelöf, first countable, consistent example

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A consistent example of a hereditarily -Lindelöf first countable space of size

A consistent example of a hereditarily $\mathfrak{c}$ -Lindelöf first countable space of size $>\mathfrak{c}$