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Let $m\in \mathbb{N}_{0}$, $p>1$ and $$\alpha ^{\left[ m,p\right] }\left( x\right) :\sqrt{x},\left\{ \sqrt{\frac{\left( m+n-1\right) p-\left( m+n-2\right) }{\left( m+n\right) p-\left( m+n-1\right) }}\right\} _{n=1}^{\infty }.$$ In this paper, we consider the backward extensions of Bergman-type weighted shift $W_{\alpha ^{\left[ m,p\right] }\left( x\right) }.$ We consider its subnormality, $k$-hyponormality and positive quadratic hyponormality. Our results include all the results on Bergman weighted shift $W_{\alpha \left( x\right) }$ with $m\in \mathbb{N}$ and $$\alpha \left( x\right) :\sqrt{x},\sqrt{\frac{m}{m+1}},\sqrt{\frac{m+1}{m+2}},\sqrt{\frac{ m+2}{m+3}},\ldots .$$
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참고문헌 (18)
참고문헌 신청
Ju Youn Bae / 2002 / Criteria for positively quadratically hyponormal weighted shifts / Proceedings of the American Mathematical Society 130(11):3287~3294
Yong Bin Choi / 2000 / One-step extension of the Bergman shift / Proceedings of the American Mathematical Society 128(12):3639~3646
R. E. Curto / 1990 / Quadratically hyponormal weighted shifts / Integral Equations and Operator Theory 13(1):49~66
R. E. Curto / 1993 / Recursively generated weighted shifts and the subnormal completion problem / Integral Equations and Operator Theory 17(2):202~246
R. E. Curto / 1994 / Recursively generated weighted shifts and the subnormal completion problem, II / Integral Equations and Operator Theory 18(4):369~426
Yong Bin Choi / 2000 / One-step extension of the Bergman shift / Proceedings of the American Mathematical Society 128(12):3639~3646
R. E. Curto / 1990 / Quadratically hyponormal weighted shifts / Integral Equations and Operator Theory 13(1):49~66
R. E. Curto / 1993 / Recursively generated weighted shifts and the subnormal completion problem / Integral Equations and Operator Theory 17(2):202~246
R. E. Curto / 1994 / Recursively generated weighted shifts and the subnormal completion problem, II / Integral Equations and Operator Theory 18(4):369~426
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