MAPPING THEOREMS ON <TEX>$X_1$</TEX><TEX>${\circled{+}}$</TEX><TEX>X_2$</TEX>

Kim, Jae-Woon; Kim, Jae-Woon

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P-ISSN3059-0604
E-ISSN3059-1309
KCI

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Vol.4 No.2

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Journal of the Korean Society of Mathematical Education Series B: Theoretical Mathematics and Pedagogical Mathematics / Journal of the Korean Society of Mathematical Education Series B: Theoretical Mathematics and Pedagogical Mathematics, (P)3059-0604; (E)3059-1309

1997, v.4 no.2, pp.115-119

Kim, Jae-Woon

Kim,, J. (1997). , 4(2), 115-119.

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Abstract

We show that if $f_{i}$:$X_{i}$ longrightarrow Y is strongly continuous(resp. weakly continuous, set connected, compact, feebly continuous, almost-continuous, strongly $\theta$-continuous, $\theta$-continuous, g-continuous, V-map), then F : $X_1 \bigoplus X_2$longrightarrow Y is strongly continuous(resp.weakly continuous, set connected, compact, feebly continuous, almost-continuous, strongly $\theta$-continuous, $\theta$-continuous, g-continuous, V-map).

keywords: strongly <tex> $\theta$</tex>-continuous, weakly continuous, set-connected, feebly continuous, almost-continuous, g-continuous, V-map

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Article Contents

Vol.4 No.2

Abstract

Journal of the Korean Society of Mathematical Education Series B: Theoretical Mathematics and Pedagogical Mathematics